diff --git "a/trainer_log.jsonl" "b/trainer_log.jsonl"
new file mode 100644--- /dev/null
+++ "b/trainer_log.jsonl"
@@ -0,0 +1,3123 @@
+{"current_steps": 1, "total_steps": 3122, "loss": 2.5505, "learning_rate": 1.597444089456869e-07, "epoch": 0.0003202562049639712, "percentage": 0.03, "elapsed_time": "0:00:10", "remaining_time": "9:26:55"}
+{"current_steps": 2, "total_steps": 3122, "loss": 2.302, "learning_rate": 3.194888178913738e-07, "epoch": 0.0006405124099279424, "percentage": 0.06, "elapsed_time": "0:00:21", "remaining_time": "9:08:56"}
+{"current_steps": 3, "total_steps": 3122, "loss": 2.0733, "learning_rate": 4.792332268370607e-07, "epoch": 0.0009607686148919135, "percentage": 0.1, "elapsed_time": "0:00:31", "remaining_time": "9:03:01"}
+{"current_steps": 4, "total_steps": 3122, "loss": 2.5665, "learning_rate": 6.389776357827476e-07, "epoch": 0.0012810248198558848, "percentage": 0.13, "elapsed_time": "0:00:41", "remaining_time": "9:00:23"}
+{"current_steps": 5, "total_steps": 3122, "loss": 2.2262, "learning_rate": 7.987220447284345e-07, "epoch": 0.0016012810248198558, "percentage": 0.16, "elapsed_time": "0:00:51", "remaining_time": "8:58:55"}
+{"current_steps": 6, "total_steps": 3122, "loss": 2.7195, "learning_rate": 9.584664536741213e-07, "epoch": 0.001921537229783827, "percentage": 0.19, "elapsed_time": "0:01:02", "remaining_time": "8:58:04"}
+{"current_steps": 7, "total_steps": 3122, "loss": 2.3025, "learning_rate": 1.1182108626198083e-06, "epoch": 0.0022417934347477983, "percentage": 0.22, "elapsed_time": "0:01:12", "remaining_time": "8:57:46"}
+{"current_steps": 8, "total_steps": 3122, "loss": 1.7873, "learning_rate": 1.2779552715654952e-06, "epoch": 0.0025620496397117695, "percentage": 0.26, "elapsed_time": "0:01:22", "remaining_time": "8:57:37"}
+{"current_steps": 9, "total_steps": 3122, "loss": 2.1716, "learning_rate": 1.4376996805111822e-06, "epoch": 0.0028823058446757407, "percentage": 0.29, "elapsed_time": "0:01:33", "remaining_time": "8:57:35"}
+{"current_steps": 10, "total_steps": 3122, "loss": 2.1507, "learning_rate": 1.597444089456869e-06, "epoch": 0.0032025620496397116, "percentage": 0.32, "elapsed_time": "0:01:43", "remaining_time": "8:57:34"}
+{"current_steps": 11, "total_steps": 3122, "loss": 2.2224, "learning_rate": 1.7571884984025559e-06, "epoch": 0.003522818254603683, "percentage": 0.35, "elapsed_time": "0:01:54", "remaining_time": "8:57:32"}
+{"current_steps": 12, "total_steps": 3122, "loss": 2.3008, "learning_rate": 1.9169329073482426e-06, "epoch": 0.003843074459567654, "percentage": 0.38, "elapsed_time": "0:02:04", "remaining_time": "8:57:31"}
+{"current_steps": 13, "total_steps": 3122, "loss": 2.3001, "learning_rate": 2.0766773162939296e-06, "epoch": 0.004163330664531626, "percentage": 0.42, "elapsed_time": "0:02:14", "remaining_time": "8:57:29"}
+{"current_steps": 14, "total_steps": 3122, "loss": 2.1583, "learning_rate": 2.2364217252396165e-06, "epoch": 0.0044835868694955965, "percentage": 0.45, "elapsed_time": "0:02:25", "remaining_time": "8:57:27"}
+{"current_steps": 15, "total_steps": 3122, "loss": 2.2752, "learning_rate": 2.3961661341853035e-06, "epoch": 0.004803843074459567, "percentage": 0.48, "elapsed_time": "0:02:35", "remaining_time": "8:57:24"}
+{"current_steps": 16, "total_steps": 3122, "loss": 1.6753, "learning_rate": 2.5559105431309904e-06, "epoch": 0.005124099279423539, "percentage": 0.51, "elapsed_time": "0:02:46", "remaining_time": "8:57:21"}
+{"current_steps": 17, "total_steps": 3122, "loss": 2.4427, "learning_rate": 2.7156549520766774e-06, "epoch": 0.00544435548438751, "percentage": 0.54, "elapsed_time": "0:02:56", "remaining_time": "8:57:15"}
+{"current_steps": 18, "total_steps": 3122, "loss": 2.3853, "learning_rate": 2.8753993610223644e-06, "epoch": 0.0057646116893514815, "percentage": 0.58, "elapsed_time": "0:03:06", "remaining_time": "8:57:07"}
+{"current_steps": 19, "total_steps": 3122, "loss": 2.4479, "learning_rate": 3.0351437699680513e-06, "epoch": 0.006084867894315452, "percentage": 0.61, "elapsed_time": "0:03:17", "remaining_time": "8:56:58"}
+{"current_steps": 20, "total_steps": 3122, "loss": 1.9668, "learning_rate": 3.194888178913738e-06, "epoch": 0.006405124099279423, "percentage": 0.64, "elapsed_time": "0:03:27", "remaining_time": "8:56:48"}
+{"current_steps": 21, "total_steps": 3122, "loss": 2.2987, "learning_rate": 3.354632587859425e-06, "epoch": 0.006725380304243395, "percentage": 0.67, "elapsed_time": "0:03:38", "remaining_time": "8:56:38"}
+{"current_steps": 22, "total_steps": 3122, "loss": 1.7833, "learning_rate": 3.5143769968051118e-06, "epoch": 0.007045636509207366, "percentage": 0.7, "elapsed_time": "0:03:48", "remaining_time": "8:56:26"}
+{"current_steps": 23, "total_steps": 3122, "loss": 2.3454, "learning_rate": 3.6741214057507987e-06, "epoch": 0.007365892714171337, "percentage": 0.74, "elapsed_time": "0:03:58", "remaining_time": "8:56:15"}
+{"current_steps": 24, "total_steps": 3122, "loss": 2.1669, "learning_rate": 3.833865814696485e-06, "epoch": 0.007686148919135308, "percentage": 0.77, "elapsed_time": "0:04:09", "remaining_time": "8:56:04"}
+{"current_steps": 25, "total_steps": 3122, "loss": 2.2589, "learning_rate": 3.993610223642173e-06, "epoch": 0.008006405124099279, "percentage": 0.8, "elapsed_time": "0:04:19", "remaining_time": "8:55:51"}
+{"current_steps": 26, "total_steps": 3122, "loss": 2.3922, "learning_rate": 4.153354632587859e-06, "epoch": 0.008326661329063251, "percentage": 0.83, "elapsed_time": "0:04:29", "remaining_time": "8:55:39"}
+{"current_steps": 27, "total_steps": 3122, "loss": 2.8444, "learning_rate": 4.3130990415335465e-06, "epoch": 0.008646917534027222, "percentage": 0.86, "elapsed_time": "0:04:40", "remaining_time": "8:55:26"}
+{"current_steps": 28, "total_steps": 3122, "loss": 1.6251, "learning_rate": 4.472843450479233e-06, "epoch": 0.008967173738991193, "percentage": 0.9, "elapsed_time": "0:04:50", "remaining_time": "8:55:14"}
+{"current_steps": 29, "total_steps": 3122, "loss": 1.4672, "learning_rate": 4.6325878594249205e-06, "epoch": 0.009287429943955164, "percentage": 0.93, "elapsed_time": "0:05:00", "remaining_time": "8:55:01"}
+{"current_steps": 30, "total_steps": 3122, "loss": 2.2324, "learning_rate": 4.792332268370607e-06, "epoch": 0.009607686148919135, "percentage": 0.96, "elapsed_time": "0:05:11", "remaining_time": "8:54:50"}
+{"current_steps": 31, "total_steps": 3122, "loss": 1.8752, "learning_rate": 4.952076677316294e-06, "epoch": 0.009927942353883107, "percentage": 0.99, "elapsed_time": "0:05:21", "remaining_time": "8:54:37"}
+{"current_steps": 32, "total_steps": 3122, "loss": 2.4251, "learning_rate": 5.111821086261981e-06, "epoch": 0.010248198558847078, "percentage": 1.02, "elapsed_time": "0:05:32", "remaining_time": "8:54:22"}
+{"current_steps": 33, "total_steps": 3122, "loss": 2.2702, "learning_rate": 5.2715654952076674e-06, "epoch": 0.010568454763811049, "percentage": 1.06, "elapsed_time": "0:05:42", "remaining_time": "8:54:07"}
+{"current_steps": 34, "total_steps": 3122, "loss": 2.2467, "learning_rate": 5.431309904153355e-06, "epoch": 0.01088871096877502, "percentage": 1.09, "elapsed_time": "0:05:52", "remaining_time": "8:53:53"}
+{"current_steps": 35, "total_steps": 3122, "loss": 1.8738, "learning_rate": 5.591054313099041e-06, "epoch": 0.01120896717373899, "percentage": 1.12, "elapsed_time": "0:06:03", "remaining_time": "8:53:39"}
+{"current_steps": 36, "total_steps": 3122, "loss": 2.0557, "learning_rate": 5.750798722044729e-06, "epoch": 0.011529223378702963, "percentage": 1.15, "elapsed_time": "0:06:13", "remaining_time": "8:53:25"}
+{"current_steps": 37, "total_steps": 3122, "loss": 2.236, "learning_rate": 5.910543130990415e-06, "epoch": 0.011849479583666934, "percentage": 1.19, "elapsed_time": "0:06:23", "remaining_time": "8:53:11"}
+{"current_steps": 38, "total_steps": 3122, "loss": 1.9037, "learning_rate": 6.070287539936103e-06, "epoch": 0.012169735788630905, "percentage": 1.22, "elapsed_time": "0:06:34", "remaining_time": "8:52:57"}
+{"current_steps": 39, "total_steps": 3122, "loss": 1.9012, "learning_rate": 6.230031948881789e-06, "epoch": 0.012489991993594875, "percentage": 1.25, "elapsed_time": "0:06:44", "remaining_time": "8:52:44"}
+{"current_steps": 40, "total_steps": 3122, "loss": 1.4725, "learning_rate": 6.389776357827476e-06, "epoch": 0.012810248198558846, "percentage": 1.28, "elapsed_time": "0:06:54", "remaining_time": "8:52:31"}
+{"current_steps": 41, "total_steps": 3122, "loss": 2.4334, "learning_rate": 6.549520766773164e-06, "epoch": 0.013130504403522819, "percentage": 1.31, "elapsed_time": "0:07:05", "remaining_time": "8:52:18"}
+{"current_steps": 42, "total_steps": 3122, "loss": 2.2842, "learning_rate": 6.70926517571885e-06, "epoch": 0.01345076060848679, "percentage": 1.35, "elapsed_time": "0:07:15", "remaining_time": "8:52:06"}
+{"current_steps": 43, "total_steps": 3122, "loss": 1.993, "learning_rate": 6.869009584664538e-06, "epoch": 0.01377101681345076, "percentage": 1.38, "elapsed_time": "0:07:25", "remaining_time": "8:51:53"}
+{"current_steps": 44, "total_steps": 3122, "loss": 1.7918, "learning_rate": 7.0287539936102235e-06, "epoch": 0.014091273018414731, "percentage": 1.41, "elapsed_time": "0:07:36", "remaining_time": "8:51:41"}
+{"current_steps": 45, "total_steps": 3122, "loss": 2.573, "learning_rate": 7.188498402555911e-06, "epoch": 0.014411529223378704, "percentage": 1.44, "elapsed_time": "0:07:46", "remaining_time": "8:51:28"}
+{"current_steps": 46, "total_steps": 3122, "loss": 2.0233, "learning_rate": 7.3482428115015974e-06, "epoch": 0.014731785428342675, "percentage": 1.47, "elapsed_time": "0:07:56", "remaining_time": "8:51:16"}
+{"current_steps": 47, "total_steps": 3122, "loss": 2.1536, "learning_rate": 7.507987220447285e-06, "epoch": 0.015052041633306645, "percentage": 1.51, "elapsed_time": "0:08:07", "remaining_time": "8:51:03"}
+{"current_steps": 48, "total_steps": 3122, "loss": 2.4289, "learning_rate": 7.66773162939297e-06, "epoch": 0.015372297838270616, "percentage": 1.54, "elapsed_time": "0:08:17", "remaining_time": "8:50:52"}
+{"current_steps": 49, "total_steps": 3122, "loss": 1.7267, "learning_rate": 7.82747603833866e-06, "epoch": 0.015692554043234587, "percentage": 1.57, "elapsed_time": "0:08:27", "remaining_time": "8:50:40"}
+{"current_steps": 50, "total_steps": 3122, "loss": 1.8542, "learning_rate": 7.987220447284345e-06, "epoch": 0.016012810248198558, "percentage": 1.6, "elapsed_time": "0:08:38", "remaining_time": "8:50:28"}
+{"current_steps": 51, "total_steps": 3122, "loss": 1.6736, "learning_rate": 8.146964856230033e-06, "epoch": 0.01633306645316253, "percentage": 1.63, "elapsed_time": "0:08:48", "remaining_time": "8:50:17"}
+{"current_steps": 52, "total_steps": 3122, "loss": 2.1386, "learning_rate": 8.306709265175718e-06, "epoch": 0.016653322658126503, "percentage": 1.67, "elapsed_time": "0:08:58", "remaining_time": "8:50:05"}
+{"current_steps": 53, "total_steps": 3122, "loss": 2.3592, "learning_rate": 8.466453674121406e-06, "epoch": 0.016973578863090474, "percentage": 1.7, "elapsed_time": "0:09:09", "remaining_time": "8:49:54"}
+{"current_steps": 54, "total_steps": 3122, "loss": 1.732, "learning_rate": 8.626198083067093e-06, "epoch": 0.017293835068054444, "percentage": 1.73, "elapsed_time": "0:09:19", "remaining_time": "8:49:42"}
+{"current_steps": 55, "total_steps": 3122, "loss": 1.5725, "learning_rate": 8.78594249201278e-06, "epoch": 0.017614091273018415, "percentage": 1.76, "elapsed_time": "0:09:29", "remaining_time": "8:49:30"}
+{"current_steps": 56, "total_steps": 3122, "loss": 2.4561, "learning_rate": 8.945686900958466e-06, "epoch": 0.017934347477982386, "percentage": 1.79, "elapsed_time": "0:09:40", "remaining_time": "8:49:19"}
+{"current_steps": 57, "total_steps": 3122, "loss": 1.8126, "learning_rate": 9.105431309904154e-06, "epoch": 0.018254603682946357, "percentage": 1.83, "elapsed_time": "0:09:50", "remaining_time": "8:49:07"}
+{"current_steps": 58, "total_steps": 3122, "loss": 2.1243, "learning_rate": 9.265175718849841e-06, "epoch": 0.018574859887910328, "percentage": 1.86, "elapsed_time": "0:10:00", "remaining_time": "8:48:55"}
+{"current_steps": 59, "total_steps": 3122, "loss": 2.3236, "learning_rate": 9.424920127795528e-06, "epoch": 0.0188951160928743, "percentage": 1.89, "elapsed_time": "0:10:11", "remaining_time": "8:48:44"}
+{"current_steps": 60, "total_steps": 3122, "loss": 2.3305, "learning_rate": 9.584664536741214e-06, "epoch": 0.01921537229783827, "percentage": 1.92, "elapsed_time": "0:10:21", "remaining_time": "8:48:34"}
+{"current_steps": 61, "total_steps": 3122, "loss": 2.1348, "learning_rate": 9.744408945686901e-06, "epoch": 0.01953562850280224, "percentage": 1.95, "elapsed_time": "0:10:31", "remaining_time": "8:48:22"}
+{"current_steps": 62, "total_steps": 3122, "loss": 1.91, "learning_rate": 9.904153354632589e-06, "epoch": 0.019855884707766214, "percentage": 1.99, "elapsed_time": "0:10:42", "remaining_time": "8:48:12"}
+{"current_steps": 63, "total_steps": 3122, "loss": 2.4788, "learning_rate": 1.0063897763578276e-05, "epoch": 0.020176140912730185, "percentage": 2.02, "elapsed_time": "0:10:52", "remaining_time": "8:48:01"}
+{"current_steps": 64, "total_steps": 3122, "loss": 2.4574, "learning_rate": 1.0223642172523962e-05, "epoch": 0.020496397117694156, "percentage": 2.05, "elapsed_time": "0:11:02", "remaining_time": "8:47:49"}
+{"current_steps": 65, "total_steps": 3122, "loss": 2.3022, "learning_rate": 1.038338658146965e-05, "epoch": 0.020816653322658127, "percentage": 2.08, "elapsed_time": "0:11:13", "remaining_time": "8:47:38"}
+{"current_steps": 66, "total_steps": 3122, "loss": 1.4106, "learning_rate": 1.0543130990415335e-05, "epoch": 0.021136909527622098, "percentage": 2.11, "elapsed_time": "0:11:23", "remaining_time": "8:47:28"}
+{"current_steps": 67, "total_steps": 3122, "loss": 2.4533, "learning_rate": 1.0702875399361024e-05, "epoch": 0.02145716573258607, "percentage": 2.15, "elapsed_time": "0:11:33", "remaining_time": "8:47:17"}
+{"current_steps": 68, "total_steps": 3122, "loss": 2.6732, "learning_rate": 1.086261980830671e-05, "epoch": 0.02177742193755004, "percentage": 2.18, "elapsed_time": "0:11:44", "remaining_time": "8:47:06"}
+{"current_steps": 69, "total_steps": 3122, "loss": 2.09, "learning_rate": 1.1022364217252397e-05, "epoch": 0.02209767814251401, "percentage": 2.21, "elapsed_time": "0:11:54", "remaining_time": "8:46:55"}
+{"current_steps": 70, "total_steps": 3122, "loss": 2.4639, "learning_rate": 1.1182108626198083e-05, "epoch": 0.02241793434747798, "percentage": 2.24, "elapsed_time": "0:12:04", "remaining_time": "8:46:45"}
+{"current_steps": 71, "total_steps": 3122, "loss": 2.195, "learning_rate": 1.134185303514377e-05, "epoch": 0.022738190552441955, "percentage": 2.27, "elapsed_time": "0:12:15", "remaining_time": "8:46:34"}
+{"current_steps": 72, "total_steps": 3122, "loss": 2.0553, "learning_rate": 1.1501597444089457e-05, "epoch": 0.023058446757405926, "percentage": 2.31, "elapsed_time": "0:12:25", "remaining_time": "8:46:23"}
+{"current_steps": 73, "total_steps": 3122, "loss": 1.6604, "learning_rate": 1.1661341853035145e-05, "epoch": 0.023378702962369897, "percentage": 2.34, "elapsed_time": "0:12:35", "remaining_time": "8:46:12"}
+{"current_steps": 74, "total_steps": 3122, "loss": 2.1982, "learning_rate": 1.182108626198083e-05, "epoch": 0.023698959167333868, "percentage": 2.37, "elapsed_time": "0:12:46", "remaining_time": "8:46:01"}
+{"current_steps": 75, "total_steps": 3122, "loss": 2.2353, "learning_rate": 1.1980830670926518e-05, "epoch": 0.02401921537229784, "percentage": 2.4, "elapsed_time": "0:12:56", "remaining_time": "8:45:50"}
+{"current_steps": 76, "total_steps": 3122, "loss": 2.0923, "learning_rate": 1.2140575079872205e-05, "epoch": 0.02433947157726181, "percentage": 2.43, "elapsed_time": "0:13:06", "remaining_time": "8:45:40"}
+{"current_steps": 77, "total_steps": 3122, "loss": 2.379, "learning_rate": 1.2300319488817893e-05, "epoch": 0.02465972778222578, "percentage": 2.47, "elapsed_time": "0:13:17", "remaining_time": "8:45:29"}
+{"current_steps": 78, "total_steps": 3122, "loss": 1.7649, "learning_rate": 1.2460063897763578e-05, "epoch": 0.02497998398718975, "percentage": 2.5, "elapsed_time": "0:13:27", "remaining_time": "8:45:18"}
+{"current_steps": 79, "total_steps": 3122, "loss": 2.475, "learning_rate": 1.2619808306709266e-05, "epoch": 0.02530024019215372, "percentage": 2.53, "elapsed_time": "0:13:37", "remaining_time": "8:45:07"}
+{"current_steps": 80, "total_steps": 3122, "loss": 2.4901, "learning_rate": 1.2779552715654951e-05, "epoch": 0.025620496397117692, "percentage": 2.56, "elapsed_time": "0:13:48", "remaining_time": "8:44:57"}
+{"current_steps": 81, "total_steps": 3122, "loss": 2.4741, "learning_rate": 1.2939297124600639e-05, "epoch": 0.025940752602081667, "percentage": 2.59, "elapsed_time": "0:13:58", "remaining_time": "8:44:46"}
+{"current_steps": 82, "total_steps": 3122, "loss": 2.1992, "learning_rate": 1.3099041533546328e-05, "epoch": 0.026261008807045638, "percentage": 2.63, "elapsed_time": "0:14:09", "remaining_time": "8:44:36"}
+{"current_steps": 83, "total_steps": 3122, "loss": 2.6322, "learning_rate": 1.3258785942492014e-05, "epoch": 0.02658126501200961, "percentage": 2.66, "elapsed_time": "0:14:19", "remaining_time": "8:44:25"}
+{"current_steps": 84, "total_steps": 3122, "loss": 2.2932, "learning_rate": 1.34185303514377e-05, "epoch": 0.02690152121697358, "percentage": 2.69, "elapsed_time": "0:14:29", "remaining_time": "8:44:14"}
+{"current_steps": 85, "total_steps": 3122, "loss": 1.828, "learning_rate": 1.3578274760383387e-05, "epoch": 0.02722177742193755, "percentage": 2.72, "elapsed_time": "0:14:40", "remaining_time": "8:44:03"}
+{"current_steps": 86, "total_steps": 3122, "loss": 2.0083, "learning_rate": 1.3738019169329076e-05, "epoch": 0.02754203362690152, "percentage": 2.75, "elapsed_time": "0:14:50", "remaining_time": "8:43:53"}
+{"current_steps": 87, "total_steps": 3122, "loss": 2.0055, "learning_rate": 1.3897763578274761e-05, "epoch": 0.02786228983186549, "percentage": 2.79, "elapsed_time": "0:15:00", "remaining_time": "8:43:42"}
+{"current_steps": 88, "total_steps": 3122, "loss": 2.3489, "learning_rate": 1.4057507987220447e-05, "epoch": 0.028182546036829462, "percentage": 2.82, "elapsed_time": "0:15:11", "remaining_time": "8:43:32"}
+{"current_steps": 89, "total_steps": 3122, "loss": 2.0319, "learning_rate": 1.4217252396166134e-05, "epoch": 0.028502802241793433, "percentage": 2.85, "elapsed_time": "0:15:21", "remaining_time": "8:43:21"}
+{"current_steps": 90, "total_steps": 3122, "loss": 1.8418, "learning_rate": 1.4376996805111822e-05, "epoch": 0.028823058446757407, "percentage": 2.88, "elapsed_time": "0:15:31", "remaining_time": "8:43:11"}
+{"current_steps": 91, "total_steps": 3122, "loss": 2.1933, "learning_rate": 1.453674121405751e-05, "epoch": 0.02914331465172138, "percentage": 2.91, "elapsed_time": "0:15:42", "remaining_time": "8:43:00"}
+{"current_steps": 92, "total_steps": 3122, "loss": 2.238, "learning_rate": 1.4696485623003195e-05, "epoch": 0.02946357085668535, "percentage": 2.95, "elapsed_time": "0:15:52", "remaining_time": "8:42:50"}
+{"current_steps": 93, "total_steps": 3122, "loss": 1.8154, "learning_rate": 1.485623003194888e-05, "epoch": 0.02978382706164932, "percentage": 2.98, "elapsed_time": "0:16:02", "remaining_time": "8:42:39"}
+{"current_steps": 94, "total_steps": 3122, "loss": 2.0664, "learning_rate": 1.501597444089457e-05, "epoch": 0.03010408326661329, "percentage": 3.01, "elapsed_time": "0:16:13", "remaining_time": "8:42:28"}
+{"current_steps": 95, "total_steps": 3122, "loss": 2.4674, "learning_rate": 1.5175718849840257e-05, "epoch": 0.03042433947157726, "percentage": 3.04, "elapsed_time": "0:16:23", "remaining_time": "8:42:18"}
+{"current_steps": 96, "total_steps": 3122, "loss": 2.5225, "learning_rate": 1.533546325878594e-05, "epoch": 0.030744595676541232, "percentage": 3.07, "elapsed_time": "0:16:33", "remaining_time": "8:42:08"}
+{"current_steps": 97, "total_steps": 3122, "loss": 2.5732, "learning_rate": 1.549520766773163e-05, "epoch": 0.031064851881505203, "percentage": 3.11, "elapsed_time": "0:16:44", "remaining_time": "8:41:57"}
+{"current_steps": 98, "total_steps": 3122, "loss": 2.4263, "learning_rate": 1.565495207667732e-05, "epoch": 0.031385108086469174, "percentage": 3.14, "elapsed_time": "0:16:54", "remaining_time": "8:41:47"}
+{"current_steps": 99, "total_steps": 3122, "loss": 1.8861, "learning_rate": 1.5814696485623005e-05, "epoch": 0.03170536429143315, "percentage": 3.17, "elapsed_time": "0:17:04", "remaining_time": "8:41:36"}
+{"current_steps": 100, "total_steps": 3122, "loss": 2.187, "learning_rate": 1.597444089456869e-05, "epoch": 0.032025620496397116, "percentage": 3.2, "elapsed_time": "0:17:15", "remaining_time": "8:41:26"}
+{"current_steps": 101, "total_steps": 3122, "loss": 2.4841, "learning_rate": 1.6134185303514376e-05, "epoch": 0.03234587670136109, "percentage": 3.24, "elapsed_time": "0:17:51", "remaining_time": "8:53:58"}
+{"current_steps": 102, "total_steps": 3122, "loss": 2.1184, "learning_rate": 1.6293929712460065e-05, "epoch": 0.03266613290632506, "percentage": 3.27, "elapsed_time": "0:18:01", "remaining_time": "8:53:39"}
+{"current_steps": 103, "total_steps": 3122, "loss": 2.5642, "learning_rate": 1.645367412140575e-05, "epoch": 0.03298638911128903, "percentage": 3.3, "elapsed_time": "0:18:11", "remaining_time": "8:53:22"}
+{"current_steps": 104, "total_steps": 3122, "loss": 2.2907, "learning_rate": 1.6613418530351437e-05, "epoch": 0.033306645316253006, "percentage": 3.33, "elapsed_time": "0:18:22", "remaining_time": "8:53:05"}
+{"current_steps": 105, "total_steps": 3122, "loss": 2.4367, "learning_rate": 1.6773162939297126e-05, "epoch": 0.03362690152121697, "percentage": 3.36, "elapsed_time": "0:18:32", "remaining_time": "8:52:50"}
+{"current_steps": 106, "total_steps": 3122, "loss": 2.5302, "learning_rate": 1.693290734824281e-05, "epoch": 0.03394715772618095, "percentage": 3.4, "elapsed_time": "0:18:43", "remaining_time": "8:52:34"}
+{"current_steps": 107, "total_steps": 3122, "loss": 2.1865, "learning_rate": 1.70926517571885e-05, "epoch": 0.034267413931144915, "percentage": 3.43, "elapsed_time": "0:18:53", "remaining_time": "8:52:19"}
+{"current_steps": 108, "total_steps": 3122, "loss": 2.1695, "learning_rate": 1.7252396166134186e-05, "epoch": 0.03458767013610889, "percentage": 3.46, "elapsed_time": "0:19:03", "remaining_time": "8:52:04"}
+{"current_steps": 109, "total_steps": 3122, "loss": 2.3653, "learning_rate": 1.7412140575079875e-05, "epoch": 0.034907926341072856, "percentage": 3.49, "elapsed_time": "0:19:14", "remaining_time": "8:51:49"}
+{"current_steps": 110, "total_steps": 3122, "loss": 1.9492, "learning_rate": 1.757188498402556e-05, "epoch": 0.03522818254603683, "percentage": 3.52, "elapsed_time": "0:19:24", "remaining_time": "8:51:33"}
+{"current_steps": 111, "total_steps": 3122, "loss": 2.7231, "learning_rate": 1.7731629392971247e-05, "epoch": 0.0355484387510008, "percentage": 3.56, "elapsed_time": "0:19:35", "remaining_time": "8:51:18"}
+{"current_steps": 112, "total_steps": 3122, "loss": 2.2126, "learning_rate": 1.7891373801916932e-05, "epoch": 0.03586869495596477, "percentage": 3.59, "elapsed_time": "0:19:45", "remaining_time": "8:51:02"}
+{"current_steps": 113, "total_steps": 3122, "loss": 2.4667, "learning_rate": 1.805111821086262e-05, "epoch": 0.03618895116092874, "percentage": 3.62, "elapsed_time": "0:19:55", "remaining_time": "8:50:46"}
+{"current_steps": 114, "total_steps": 3122, "loss": 2.3994, "learning_rate": 1.8210862619808307e-05, "epoch": 0.036509207365892714, "percentage": 3.65, "elapsed_time": "0:20:06", "remaining_time": "8:50:31"}
+{"current_steps": 115, "total_steps": 3122, "loss": 2.2501, "learning_rate": 1.8370607028753993e-05, "epoch": 0.03682946357085669, "percentage": 3.68, "elapsed_time": "0:20:16", "remaining_time": "8:50:15"}
+{"current_steps": 116, "total_steps": 3122, "loss": 2.5277, "learning_rate": 1.8530351437699682e-05, "epoch": 0.037149719775820655, "percentage": 3.72, "elapsed_time": "0:20:27", "remaining_time": "8:49:59"}
+{"current_steps": 117, "total_steps": 3122, "loss": 2.1283, "learning_rate": 1.869009584664537e-05, "epoch": 0.03746997598078463, "percentage": 3.75, "elapsed_time": "0:20:37", "remaining_time": "8:49:43"}
+{"current_steps": 118, "total_steps": 3122, "loss": 2.5671, "learning_rate": 1.8849840255591057e-05, "epoch": 0.0377902321857486, "percentage": 3.78, "elapsed_time": "0:20:47", "remaining_time": "8:49:26"}
+{"current_steps": 119, "total_steps": 3122, "loss": 1.7323, "learning_rate": 1.9009584664536742e-05, "epoch": 0.03811048839071257, "percentage": 3.81, "elapsed_time": "0:20:58", "remaining_time": "8:49:10"}
+{"current_steps": 120, "total_steps": 3122, "loss": 2.4496, "learning_rate": 1.9169329073482428e-05, "epoch": 0.03843074459567654, "percentage": 3.84, "elapsed_time": "0:21:08", "remaining_time": "8:48:54"}
+{"current_steps": 121, "total_steps": 3122, "loss": 2.3247, "learning_rate": 1.9329073482428117e-05, "epoch": 0.03875100080064051, "percentage": 3.88, "elapsed_time": "0:21:18", "remaining_time": "8:48:38"}
+{"current_steps": 122, "total_steps": 3122, "loss": 2.044, "learning_rate": 1.9488817891373803e-05, "epoch": 0.03907125700560448, "percentage": 3.91, "elapsed_time": "0:21:29", "remaining_time": "8:48:22"}
+{"current_steps": 123, "total_steps": 3122, "loss": 2.2774, "learning_rate": 1.964856230031949e-05, "epoch": 0.039391513210568455, "percentage": 3.94, "elapsed_time": "0:21:39", "remaining_time": "8:48:06"}
+{"current_steps": 124, "total_steps": 3122, "loss": 2.6735, "learning_rate": 1.9808306709265177e-05, "epoch": 0.03971176941553243, "percentage": 3.97, "elapsed_time": "0:21:49", "remaining_time": "8:47:50"}
+{"current_steps": 125, "total_steps": 3122, "loss": 2.5676, "learning_rate": 1.9968051118210863e-05, "epoch": 0.040032025620496396, "percentage": 4.0, "elapsed_time": "0:22:00", "remaining_time": "8:47:34"}
+{"current_steps": 126, "total_steps": 3122, "loss": 2.132, "learning_rate": 2.0127795527156552e-05, "epoch": 0.04035228182546037, "percentage": 4.04, "elapsed_time": "0:22:10", "remaining_time": "8:47:18"}
+{"current_steps": 127, "total_steps": 3122, "loss": 2.6514, "learning_rate": 2.0287539936102238e-05, "epoch": 0.04067253803042434, "percentage": 4.07, "elapsed_time": "0:22:20", "remaining_time": "8:47:03"}
+{"current_steps": 128, "total_steps": 3122, "loss": 2.6641, "learning_rate": 2.0447284345047924e-05, "epoch": 0.04099279423538831, "percentage": 4.1, "elapsed_time": "0:22:31", "remaining_time": "8:46:47"}
+{"current_steps": 129, "total_steps": 3122, "loss": 2.442, "learning_rate": 2.0607028753993613e-05, "epoch": 0.04131305044035228, "percentage": 4.13, "elapsed_time": "0:22:41", "remaining_time": "8:46:32"}
+{"current_steps": 130, "total_steps": 3122, "loss": 1.4356, "learning_rate": 2.07667731629393e-05, "epoch": 0.041633306645316254, "percentage": 4.16, "elapsed_time": "0:22:51", "remaining_time": "8:46:16"}
+{"current_steps": 131, "total_steps": 3122, "loss": 1.8376, "learning_rate": 2.0926517571884984e-05, "epoch": 0.04195356285028022, "percentage": 4.2, "elapsed_time": "0:23:02", "remaining_time": "8:46:01"}
+{"current_steps": 132, "total_steps": 3122, "loss": 2.4422, "learning_rate": 2.108626198083067e-05, "epoch": 0.042273819055244195, "percentage": 4.23, "elapsed_time": "0:23:12", "remaining_time": "8:45:46"}
+{"current_steps": 133, "total_steps": 3122, "loss": 2.1663, "learning_rate": 2.124600638977636e-05, "epoch": 0.04259407526020817, "percentage": 4.26, "elapsed_time": "0:23:23", "remaining_time": "8:45:30"}
+{"current_steps": 134, "total_steps": 3122, "loss": 2.5161, "learning_rate": 2.1405750798722048e-05, "epoch": 0.04291433146517214, "percentage": 4.29, "elapsed_time": "0:23:33", "remaining_time": "8:45:15"}
+{"current_steps": 135, "total_steps": 3122, "loss": 2.295, "learning_rate": 2.1565495207667734e-05, "epoch": 0.04323458767013611, "percentage": 4.32, "elapsed_time": "0:23:43", "remaining_time": "8:45:00"}
+{"current_steps": 136, "total_steps": 3122, "loss": 2.6238, "learning_rate": 2.172523961661342e-05, "epoch": 0.04355484387510008, "percentage": 4.36, "elapsed_time": "0:23:54", "remaining_time": "8:44:45"}
+{"current_steps": 137, "total_steps": 3122, "loss": 2.0364, "learning_rate": 2.188498402555911e-05, "epoch": 0.04387510008006405, "percentage": 4.39, "elapsed_time": "0:24:04", "remaining_time": "8:44:31"}
+{"current_steps": 138, "total_steps": 3122, "loss": 2.7412, "learning_rate": 2.2044728434504794e-05, "epoch": 0.04419535628502802, "percentage": 4.42, "elapsed_time": "0:24:14", "remaining_time": "8:44:16"}
+{"current_steps": 139, "total_steps": 3122, "loss": 1.8156, "learning_rate": 2.220447284345048e-05, "epoch": 0.044515612489991994, "percentage": 4.45, "elapsed_time": "0:24:25", "remaining_time": "8:44:01"}
+{"current_steps": 140, "total_steps": 3122, "loss": 2.3815, "learning_rate": 2.2364217252396165e-05, "epoch": 0.04483586869495596, "percentage": 4.48, "elapsed_time": "0:24:35", "remaining_time": "8:43:46"}
+{"current_steps": 141, "total_steps": 3122, "loss": 2.6271, "learning_rate": 2.2523961661341854e-05, "epoch": 0.045156124899919936, "percentage": 4.52, "elapsed_time": "0:24:45", "remaining_time": "8:43:32"}
+{"current_steps": 142, "total_steps": 3122, "loss": 1.6873, "learning_rate": 2.268370607028754e-05, "epoch": 0.04547638110488391, "percentage": 4.55, "elapsed_time": "0:24:56", "remaining_time": "8:43:17"}
+{"current_steps": 143, "total_steps": 3122, "loss": 2.3417, "learning_rate": 2.284345047923323e-05, "epoch": 0.04579663730984788, "percentage": 4.58, "elapsed_time": "0:25:06", "remaining_time": "8:43:03"}
+{"current_steps": 144, "total_steps": 3122, "loss": 2.1776, "learning_rate": 2.3003194888178915e-05, "epoch": 0.04611689351481185, "percentage": 4.61, "elapsed_time": "0:25:16", "remaining_time": "8:42:48"}
+{"current_steps": 145, "total_steps": 3122, "loss": 2.2616, "learning_rate": 2.3162939297124604e-05, "epoch": 0.04643714971977582, "percentage": 4.64, "elapsed_time": "0:25:27", "remaining_time": "8:42:34"}
+{"current_steps": 146, "total_steps": 3122, "loss": 2.5723, "learning_rate": 2.332268370607029e-05, "epoch": 0.046757405924739794, "percentage": 4.68, "elapsed_time": "0:25:37", "remaining_time": "8:42:20"}
+{"current_steps": 147, "total_steps": 3122, "loss": 2.4548, "learning_rate": 2.3482428115015975e-05, "epoch": 0.04707766212970376, "percentage": 4.71, "elapsed_time": "0:25:47", "remaining_time": "8:42:05"}
+{"current_steps": 148, "total_steps": 3122, "loss": 2.4736, "learning_rate": 2.364217252396166e-05, "epoch": 0.047397918334667735, "percentage": 4.74, "elapsed_time": "0:25:58", "remaining_time": "8:41:51"}
+{"current_steps": 149, "total_steps": 3122, "loss": 2.386, "learning_rate": 2.380191693290735e-05, "epoch": 0.0477181745396317, "percentage": 4.77, "elapsed_time": "0:26:08", "remaining_time": "8:41:37"}
+{"current_steps": 150, "total_steps": 3122, "loss": 2.644, "learning_rate": 2.3961661341853036e-05, "epoch": 0.04803843074459568, "percentage": 4.8, "elapsed_time": "0:26:18", "remaining_time": "8:41:23"}
+{"current_steps": 151, "total_steps": 3122, "loss": 2.1945, "learning_rate": 2.412140575079872e-05, "epoch": 0.04835868694955965, "percentage": 4.84, "elapsed_time": "0:26:29", "remaining_time": "8:41:09"}
+{"current_steps": 152, "total_steps": 3122, "loss": 2.2383, "learning_rate": 2.428115015974441e-05, "epoch": 0.04867894315452362, "percentage": 4.87, "elapsed_time": "0:26:39", "remaining_time": "8:40:55"}
+{"current_steps": 153, "total_steps": 3122, "loss": 2.5643, "learning_rate": 2.44408945686901e-05, "epoch": 0.04899919935948759, "percentage": 4.9, "elapsed_time": "0:26:49", "remaining_time": "8:40:41"}
+{"current_steps": 154, "total_steps": 3122, "loss": 1.6623, "learning_rate": 2.4600638977635785e-05, "epoch": 0.04931945556445156, "percentage": 4.93, "elapsed_time": "0:27:00", "remaining_time": "8:40:27"}
+{"current_steps": 155, "total_steps": 3122, "loss": 2.1212, "learning_rate": 2.476038338658147e-05, "epoch": 0.049639711769415534, "percentage": 4.96, "elapsed_time": "0:27:10", "remaining_time": "8:40:13"}
+{"current_steps": 156, "total_steps": 3122, "loss": 2.0499, "learning_rate": 2.4920127795527157e-05, "epoch": 0.0499599679743795, "percentage": 5.0, "elapsed_time": "0:27:21", "remaining_time": "8:40:00"}
+{"current_steps": 157, "total_steps": 3122, "loss": 2.004, "learning_rate": 2.5079872204472842e-05, "epoch": 0.050280224179343476, "percentage": 5.03, "elapsed_time": "0:27:31", "remaining_time": "8:39:46"}
+{"current_steps": 158, "total_steps": 3122, "loss": 2.4388, "learning_rate": 2.523961661341853e-05, "epoch": 0.05060048038430744, "percentage": 5.06, "elapsed_time": "0:27:41", "remaining_time": "8:39:32"}
+{"current_steps": 159, "total_steps": 3122, "loss": 2.2752, "learning_rate": 2.539936102236422e-05, "epoch": 0.05092073658927142, "percentage": 5.09, "elapsed_time": "0:27:52", "remaining_time": "8:39:18"}
+{"current_steps": 160, "total_steps": 3122, "loss": 2.1717, "learning_rate": 2.5559105431309903e-05, "epoch": 0.051240992794235385, "percentage": 5.12, "elapsed_time": "0:28:02", "remaining_time": "8:39:05"}
+{"current_steps": 161, "total_steps": 3122, "loss": 2.3856, "learning_rate": 2.5718849840255592e-05, "epoch": 0.05156124899919936, "percentage": 5.16, "elapsed_time": "0:28:12", "remaining_time": "8:38:51"}
+{"current_steps": 162, "total_steps": 3122, "loss": 1.7901, "learning_rate": 2.5878594249201278e-05, "epoch": 0.05188150520416333, "percentage": 5.19, "elapsed_time": "0:28:23", "remaining_time": "8:38:38"}
+{"current_steps": 163, "total_steps": 3122, "loss": 2.1485, "learning_rate": 2.6038338658146967e-05, "epoch": 0.0522017614091273, "percentage": 5.22, "elapsed_time": "0:28:33", "remaining_time": "8:38:24"}
+{"current_steps": 164, "total_steps": 3122, "loss": 2.4288, "learning_rate": 2.6198083067092656e-05, "epoch": 0.052522017614091275, "percentage": 5.25, "elapsed_time": "0:28:43", "remaining_time": "8:38:10"}
+{"current_steps": 165, "total_steps": 3122, "loss": 2.4144, "learning_rate": 2.6357827476038338e-05, "epoch": 0.05284227381905524, "percentage": 5.29, "elapsed_time": "0:28:54", "remaining_time": "8:37:57"}
+{"current_steps": 166, "total_steps": 3122, "loss": 2.4021, "learning_rate": 2.6517571884984027e-05, "epoch": 0.05316253002401922, "percentage": 5.32, "elapsed_time": "0:29:04", "remaining_time": "8:37:43"}
+{"current_steps": 167, "total_steps": 3122, "loss": 2.2037, "learning_rate": 2.6677316293929716e-05, "epoch": 0.053482786228983184, "percentage": 5.35, "elapsed_time": "0:29:14", "remaining_time": "8:37:30"}
+{"current_steps": 168, "total_steps": 3122, "loss": 2.33, "learning_rate": 2.68370607028754e-05, "epoch": 0.05380304243394716, "percentage": 5.38, "elapsed_time": "0:29:25", "remaining_time": "8:37:17"}
+{"current_steps": 169, "total_steps": 3122, "loss": 2.3497, "learning_rate": 2.6996805111821088e-05, "epoch": 0.054123298638911126, "percentage": 5.41, "elapsed_time": "0:29:35", "remaining_time": "8:37:04"}
+{"current_steps": 170, "total_steps": 3122, "loss": 2.0505, "learning_rate": 2.7156549520766773e-05, "epoch": 0.0544435548438751, "percentage": 5.45, "elapsed_time": "0:29:45", "remaining_time": "8:36:50"}
+{"current_steps": 171, "total_steps": 3122, "loss": 2.5688, "learning_rate": 2.7316293929712462e-05, "epoch": 0.054763811048839074, "percentage": 5.48, "elapsed_time": "0:29:56", "remaining_time": "8:36:37"}
+{"current_steps": 172, "total_steps": 3122, "loss": 2.5961, "learning_rate": 2.747603833865815e-05, "epoch": 0.05508406725380304, "percentage": 5.51, "elapsed_time": "0:30:06", "remaining_time": "8:36:24"}
+{"current_steps": 173, "total_steps": 3122, "loss": 1.9069, "learning_rate": 2.7635782747603834e-05, "epoch": 0.055404323458767016, "percentage": 5.54, "elapsed_time": "0:30:16", "remaining_time": "8:36:11"}
+{"current_steps": 174, "total_steps": 3122, "loss": 2.3172, "learning_rate": 2.7795527156549523e-05, "epoch": 0.05572457966373098, "percentage": 5.57, "elapsed_time": "0:30:27", "remaining_time": "8:35:58"}
+{"current_steps": 175, "total_steps": 3122, "loss": 2.5545, "learning_rate": 2.7955271565495212e-05, "epoch": 0.05604483586869496, "percentage": 5.61, "elapsed_time": "0:30:37", "remaining_time": "8:35:45"}
+{"current_steps": 176, "total_steps": 3122, "loss": 2.248, "learning_rate": 2.8115015974440894e-05, "epoch": 0.056365092073658925, "percentage": 5.64, "elapsed_time": "0:30:47", "remaining_time": "8:35:32"}
+{"current_steps": 177, "total_steps": 3122, "loss": 2.4285, "learning_rate": 2.8274760383386583e-05, "epoch": 0.0566853482786229, "percentage": 5.67, "elapsed_time": "0:30:58", "remaining_time": "8:35:19"}
+{"current_steps": 178, "total_steps": 3122, "loss": 1.4118, "learning_rate": 2.843450479233227e-05, "epoch": 0.057005604483586866, "percentage": 5.7, "elapsed_time": "0:31:08", "remaining_time": "8:35:06"}
+{"current_steps": 179, "total_steps": 3122, "loss": 1.8937, "learning_rate": 2.8594249201277955e-05, "epoch": 0.05732586068855084, "percentage": 5.73, "elapsed_time": "0:31:18", "remaining_time": "8:34:53"}
+{"current_steps": 180, "total_steps": 3122, "loss": 1.7478, "learning_rate": 2.8753993610223644e-05, "epoch": 0.057646116893514815, "percentage": 5.77, "elapsed_time": "0:31:29", "remaining_time": "8:34:40"}
+{"current_steps": 181, "total_steps": 3122, "loss": 1.8904, "learning_rate": 2.891373801916933e-05, "epoch": 0.05796637309847878, "percentage": 5.8, "elapsed_time": "0:31:39", "remaining_time": "8:34:27"}
+{"current_steps": 182, "total_steps": 3122, "loss": 2.6784, "learning_rate": 2.907348242811502e-05, "epoch": 0.05828662930344276, "percentage": 5.83, "elapsed_time": "0:31:50", "remaining_time": "8:34:14"}
+{"current_steps": 183, "total_steps": 3122, "loss": 2.4389, "learning_rate": 2.9233226837060707e-05, "epoch": 0.058606885508406724, "percentage": 5.86, "elapsed_time": "0:32:00", "remaining_time": "8:34:01"}
+{"current_steps": 184, "total_steps": 3122, "loss": 2.5659, "learning_rate": 2.939297124600639e-05, "epoch": 0.0589271417133707, "percentage": 5.89, "elapsed_time": "0:32:10", "remaining_time": "8:33:49"}
+{"current_steps": 185, "total_steps": 3122, "loss": 2.0976, "learning_rate": 2.955271565495208e-05, "epoch": 0.059247397918334666, "percentage": 5.93, "elapsed_time": "0:32:21", "remaining_time": "8:33:36"}
+{"current_steps": 186, "total_steps": 3122, "loss": 2.5468, "learning_rate": 2.971246006389776e-05, "epoch": 0.05956765412329864, "percentage": 5.96, "elapsed_time": "0:32:31", "remaining_time": "8:33:23"}
+{"current_steps": 187, "total_steps": 3122, "loss": 2.3513, "learning_rate": 2.987220447284345e-05, "epoch": 0.05988791032826261, "percentage": 5.99, "elapsed_time": "0:32:41", "remaining_time": "8:33:10"}
+{"current_steps": 188, "total_steps": 3122, "loss": 1.9096, "learning_rate": 3.003194888178914e-05, "epoch": 0.06020816653322658, "percentage": 6.02, "elapsed_time": "0:32:52", "remaining_time": "8:32:58"}
+{"current_steps": 189, "total_steps": 3122, "loss": 1.768, "learning_rate": 3.0191693290734825e-05, "epoch": 0.060528422738190556, "percentage": 6.05, "elapsed_time": "0:33:02", "remaining_time": "8:32:45"}
+{"current_steps": 190, "total_steps": 3122, "loss": 1.7802, "learning_rate": 3.0351437699680514e-05, "epoch": 0.06084867894315452, "percentage": 6.09, "elapsed_time": "0:33:12", "remaining_time": "8:32:32"}
+{"current_steps": 191, "total_steps": 3122, "loss": 1.9335, "learning_rate": 3.0511182108626203e-05, "epoch": 0.0611689351481185, "percentage": 6.12, "elapsed_time": "0:33:23", "remaining_time": "8:32:20"}
+{"current_steps": 192, "total_steps": 3122, "loss": 2.3403, "learning_rate": 3.067092651757188e-05, "epoch": 0.061489191353082465, "percentage": 6.15, "elapsed_time": "0:33:33", "remaining_time": "8:32:07"}
+{"current_steps": 193, "total_steps": 3122, "loss": 2.1596, "learning_rate": 3.083067092651757e-05, "epoch": 0.06180944755804644, "percentage": 6.18, "elapsed_time": "0:33:43", "remaining_time": "8:31:55"}
+{"current_steps": 194, "total_steps": 3122, "loss": 2.6126, "learning_rate": 3.099041533546326e-05, "epoch": 0.062129703763010406, "percentage": 6.21, "elapsed_time": "0:33:54", "remaining_time": "8:31:42"}
+{"current_steps": 195, "total_steps": 3122, "loss": 1.772, "learning_rate": 3.115015974440895e-05, "epoch": 0.06244995996797438, "percentage": 6.25, "elapsed_time": "0:34:04", "remaining_time": "8:31:30"}
+{"current_steps": 196, "total_steps": 3122, "loss": 2.694, "learning_rate": 3.130990415335464e-05, "epoch": 0.06277021617293835, "percentage": 6.28, "elapsed_time": "0:34:14", "remaining_time": "8:31:17"}
+{"current_steps": 197, "total_steps": 3122, "loss": 2.045, "learning_rate": 3.146964856230032e-05, "epoch": 0.06309047237790232, "percentage": 6.31, "elapsed_time": "0:34:25", "remaining_time": "8:31:05"}
+{"current_steps": 198, "total_steps": 3122, "loss": 1.7398, "learning_rate": 3.162939297124601e-05, "epoch": 0.0634107285828663, "percentage": 6.34, "elapsed_time": "0:34:35", "remaining_time": "8:30:52"}
+{"current_steps": 199, "total_steps": 3122, "loss": 2.344, "learning_rate": 3.17891373801917e-05, "epoch": 0.06373098478783026, "percentage": 6.37, "elapsed_time": "0:34:45", "remaining_time": "8:30:40"}
+{"current_steps": 200, "total_steps": 3122, "loss": 2.1837, "learning_rate": 3.194888178913738e-05, "epoch": 0.06405124099279423, "percentage": 6.41, "elapsed_time": "0:34:56", "remaining_time": "8:30:27"}
+{"current_steps": 201, "total_steps": 3122, "loss": 2.0782, "learning_rate": 3.210862619808307e-05, "epoch": 0.06437149719775821, "percentage": 6.44, "elapsed_time": "0:35:32", "remaining_time": "8:36:29"}
+{"current_steps": 202, "total_steps": 3122, "loss": 2.2655, "learning_rate": 3.226837060702875e-05, "epoch": 0.06469175340272218, "percentage": 6.47, "elapsed_time": "0:35:42", "remaining_time": "8:36:15"}
+{"current_steps": 203, "total_steps": 3122, "loss": 2.55, "learning_rate": 3.242811501597444e-05, "epoch": 0.06501200960768615, "percentage": 6.5, "elapsed_time": "0:35:53", "remaining_time": "8:36:01"}
+{"current_steps": 204, "total_steps": 3122, "loss": 2.2424, "learning_rate": 3.258785942492013e-05, "epoch": 0.06533226581265011, "percentage": 6.53, "elapsed_time": "0:36:03", "remaining_time": "8:35:47"}
+{"current_steps": 205, "total_steps": 3122, "loss": 2.5929, "learning_rate": 3.274760383386581e-05, "epoch": 0.0656525220176141, "percentage": 6.57, "elapsed_time": "0:36:13", "remaining_time": "8:35:34"}
+{"current_steps": 206, "total_steps": 3122, "loss": 2.2174, "learning_rate": 3.29073482428115e-05, "epoch": 0.06597277822257806, "percentage": 6.6, "elapsed_time": "0:36:24", "remaining_time": "8:35:21"}
+{"current_steps": 207, "total_steps": 3122, "loss": 2.685, "learning_rate": 3.306709265175719e-05, "epoch": 0.06629303442754203, "percentage": 6.63, "elapsed_time": "0:36:34", "remaining_time": "8:35:07"}
+{"current_steps": 208, "total_steps": 3122, "loss": 2.242, "learning_rate": 3.322683706070287e-05, "epoch": 0.06661329063250601, "percentage": 6.66, "elapsed_time": "0:36:45", "remaining_time": "8:34:54"}
+{"current_steps": 209, "total_steps": 3122, "loss": 1.9813, "learning_rate": 3.338658146964856e-05, "epoch": 0.06693354683746998, "percentage": 6.69, "elapsed_time": "0:36:55", "remaining_time": "8:34:41"}
+{"current_steps": 210, "total_steps": 3122, "loss": 2.0788, "learning_rate": 3.354632587859425e-05, "epoch": 0.06725380304243395, "percentage": 6.73, "elapsed_time": "0:37:06", "remaining_time": "8:34:28"}
+{"current_steps": 211, "total_steps": 3122, "loss": 2.2187, "learning_rate": 3.3706070287539934e-05, "epoch": 0.06757405924739791, "percentage": 6.76, "elapsed_time": "0:37:16", "remaining_time": "8:34:15"}
+{"current_steps": 212, "total_steps": 3122, "loss": 2.2772, "learning_rate": 3.386581469648562e-05, "epoch": 0.0678943154523619, "percentage": 6.79, "elapsed_time": "0:37:26", "remaining_time": "8:34:02"}
+{"current_steps": 213, "total_steps": 3122, "loss": 1.4853, "learning_rate": 3.402555910543131e-05, "epoch": 0.06821457165732586, "percentage": 6.82, "elapsed_time": "0:37:37", "remaining_time": "8:33:48"}
+{"current_steps": 214, "total_steps": 3122, "loss": 2.0633, "learning_rate": 3.4185303514377e-05, "epoch": 0.06853482786228983, "percentage": 6.85, "elapsed_time": "0:37:47", "remaining_time": "8:33:35"}
+{"current_steps": 215, "total_steps": 3122, "loss": 2.3552, "learning_rate": 3.434504792332269e-05, "epoch": 0.0688550840672538, "percentage": 6.89, "elapsed_time": "0:37:58", "remaining_time": "8:33:21"}
+{"current_steps": 216, "total_steps": 3122, "loss": 2.7011, "learning_rate": 3.450479233226837e-05, "epoch": 0.06917534027221778, "percentage": 6.92, "elapsed_time": "0:38:08", "remaining_time": "8:33:08"}
+{"current_steps": 217, "total_steps": 3122, "loss": 2.0144, "learning_rate": 3.466453674121406e-05, "epoch": 0.06949559647718175, "percentage": 6.95, "elapsed_time": "0:38:18", "remaining_time": "8:32:54"}
+{"current_steps": 218, "total_steps": 3122, "loss": 2.293, "learning_rate": 3.482428115015975e-05, "epoch": 0.06981585268214571, "percentage": 6.98, "elapsed_time": "0:38:29", "remaining_time": "8:32:40"}
+{"current_steps": 219, "total_steps": 3122, "loss": 2.2046, "learning_rate": 3.498402555910543e-05, "epoch": 0.0701361088871097, "percentage": 7.01, "elapsed_time": "0:38:39", "remaining_time": "8:32:26"}
+{"current_steps": 220, "total_steps": 3122, "loss": 2.0654, "learning_rate": 3.514376996805112e-05, "epoch": 0.07045636509207366, "percentage": 7.05, "elapsed_time": "0:38:49", "remaining_time": "8:32:12"}
+{"current_steps": 221, "total_steps": 3122, "loss": 2.3501, "learning_rate": 3.5303514376996804e-05, "epoch": 0.07077662129703763, "percentage": 7.08, "elapsed_time": "0:39:00", "remaining_time": "8:31:58"}
+{"current_steps": 222, "total_steps": 3122, "loss": 2.3258, "learning_rate": 3.546325878594249e-05, "epoch": 0.0710968775020016, "percentage": 7.11, "elapsed_time": "0:39:10", "remaining_time": "8:31:44"}
+{"current_steps": 223, "total_steps": 3122, "loss": 2.3782, "learning_rate": 3.562300319488818e-05, "epoch": 0.07141713370696558, "percentage": 7.14, "elapsed_time": "0:39:20", "remaining_time": "8:31:30"}
+{"current_steps": 224, "total_steps": 3122, "loss": 2.2688, "learning_rate": 3.5782747603833865e-05, "epoch": 0.07173738991192954, "percentage": 7.17, "elapsed_time": "0:39:31", "remaining_time": "8:31:17"}
+{"current_steps": 225, "total_steps": 3122, "loss": 2.2505, "learning_rate": 3.5942492012779554e-05, "epoch": 0.07205764611689351, "percentage": 7.21, "elapsed_time": "0:39:41", "remaining_time": "8:31:03"}
+{"current_steps": 226, "total_steps": 3122, "loss": 2.4121, "learning_rate": 3.610223642172524e-05, "epoch": 0.07237790232185748, "percentage": 7.24, "elapsed_time": "0:39:51", "remaining_time": "8:30:49"}
+{"current_steps": 227, "total_steps": 3122, "loss": 2.4804, "learning_rate": 3.6261980830670925e-05, "epoch": 0.07269815852682146, "percentage": 7.27, "elapsed_time": "0:40:02", "remaining_time": "8:30:36"}
+{"current_steps": 228, "total_steps": 3122, "loss": 2.4248, "learning_rate": 3.6421725239616614e-05, "epoch": 0.07301841473178543, "percentage": 7.3, "elapsed_time": "0:40:12", "remaining_time": "8:30:22"}
+{"current_steps": 229, "total_steps": 3122, "loss": 2.2826, "learning_rate": 3.65814696485623e-05, "epoch": 0.0733386709367494, "percentage": 7.34, "elapsed_time": "0:40:22", "remaining_time": "8:30:08"}
+{"current_steps": 230, "total_steps": 3122, "loss": 1.8805, "learning_rate": 3.6741214057507985e-05, "epoch": 0.07365892714171338, "percentage": 7.37, "elapsed_time": "0:40:33", "remaining_time": "8:29:55"}
+{"current_steps": 231, "total_steps": 3122, "loss": 1.9896, "learning_rate": 3.6900958466453675e-05, "epoch": 0.07397918334667734, "percentage": 7.4, "elapsed_time": "0:40:43", "remaining_time": "8:29:41"}
+{"current_steps": 232, "total_steps": 3122, "loss": 2.6494, "learning_rate": 3.7060702875399364e-05, "epoch": 0.07429943955164131, "percentage": 7.43, "elapsed_time": "0:40:53", "remaining_time": "8:29:28"}
+{"current_steps": 233, "total_steps": 3122, "loss": 1.5742, "learning_rate": 3.722044728434505e-05, "epoch": 0.07461969575660528, "percentage": 7.46, "elapsed_time": "0:41:04", "remaining_time": "8:29:15"}
+{"current_steps": 234, "total_steps": 3122, "loss": 1.9401, "learning_rate": 3.738019169329074e-05, "epoch": 0.07493995196156926, "percentage": 7.5, "elapsed_time": "0:41:14", "remaining_time": "8:29:01"}
+{"current_steps": 235, "total_steps": 3122, "loss": 2.5195, "learning_rate": 3.7539936102236424e-05, "epoch": 0.07526020816653323, "percentage": 7.53, "elapsed_time": "0:41:24", "remaining_time": "8:28:48"}
+{"current_steps": 236, "total_steps": 3122, "loss": 2.1442, "learning_rate": 3.769968051118211e-05, "epoch": 0.0755804643714972, "percentage": 7.56, "elapsed_time": "0:41:35", "remaining_time": "8:28:35"}
+{"current_steps": 237, "total_steps": 3122, "loss": 2.2005, "learning_rate": 3.7859424920127795e-05, "epoch": 0.07590072057646118, "percentage": 7.59, "elapsed_time": "0:41:45", "remaining_time": "8:28:21"}
+{"current_steps": 238, "total_steps": 3122, "loss": 2.5538, "learning_rate": 3.8019169329073485e-05, "epoch": 0.07622097678142514, "percentage": 7.62, "elapsed_time": "0:41:56", "remaining_time": "8:28:08"}
+{"current_steps": 239, "total_steps": 3122, "loss": 2.22, "learning_rate": 3.8178913738019174e-05, "epoch": 0.07654123298638911, "percentage": 7.66, "elapsed_time": "0:42:06", "remaining_time": "8:27:55"}
+{"current_steps": 240, "total_steps": 3122, "loss": 2.4174, "learning_rate": 3.8338658146964856e-05, "epoch": 0.07686148919135308, "percentage": 7.69, "elapsed_time": "0:42:16", "remaining_time": "8:27:42"}
+{"current_steps": 241, "total_steps": 3122, "loss": 2.3724, "learning_rate": 3.8498402555910545e-05, "epoch": 0.07718174539631706, "percentage": 7.72, "elapsed_time": "0:42:27", "remaining_time": "8:27:28"}
+{"current_steps": 242, "total_steps": 3122, "loss": 2.1111, "learning_rate": 3.8658146964856234e-05, "epoch": 0.07750200160128103, "percentage": 7.75, "elapsed_time": "0:42:37", "remaining_time": "8:27:15"}
+{"current_steps": 243, "total_steps": 3122, "loss": 2.2114, "learning_rate": 3.8817891373801916e-05, "epoch": 0.077822257806245, "percentage": 7.78, "elapsed_time": "0:42:47", "remaining_time": "8:27:02"}
+{"current_steps": 244, "total_steps": 3122, "loss": 2.718, "learning_rate": 3.8977635782747605e-05, "epoch": 0.07814251401120896, "percentage": 7.82, "elapsed_time": "0:42:58", "remaining_time": "8:26:49"}
+{"current_steps": 245, "total_steps": 3122, "loss": 2.1236, "learning_rate": 3.913738019169329e-05, "epoch": 0.07846277021617294, "percentage": 7.85, "elapsed_time": "0:43:08", "remaining_time": "8:26:36"}
+{"current_steps": 246, "total_steps": 3122, "loss": 2.3918, "learning_rate": 3.929712460063898e-05, "epoch": 0.07878302642113691, "percentage": 7.88, "elapsed_time": "0:43:18", "remaining_time": "8:26:23"}
+{"current_steps": 247, "total_steps": 3122, "loss": 1.8762, "learning_rate": 3.9456869009584666e-05, "epoch": 0.07910328262610088, "percentage": 7.91, "elapsed_time": "0:43:29", "remaining_time": "8:26:10"}
+{"current_steps": 248, "total_steps": 3122, "loss": 2.2969, "learning_rate": 3.9616613418530355e-05, "epoch": 0.07942353883106486, "percentage": 7.94, "elapsed_time": "0:43:39", "remaining_time": "8:25:57"}
+{"current_steps": 249, "total_steps": 3122, "loss": 2.1578, "learning_rate": 3.9776357827476044e-05, "epoch": 0.07974379503602883, "percentage": 7.98, "elapsed_time": "0:43:49", "remaining_time": "8:25:44"}
+{"current_steps": 250, "total_steps": 3122, "loss": 2.5525, "learning_rate": 3.9936102236421726e-05, "epoch": 0.08006405124099279, "percentage": 8.01, "elapsed_time": "0:44:00", "remaining_time": "8:25:31"}
+{"current_steps": 251, "total_steps": 3122, "loss": 2.4644, "learning_rate": 4.0095846645367415e-05, "epoch": 0.08038430744595676, "percentage": 8.04, "elapsed_time": "0:44:10", "remaining_time": "8:25:18"}
+{"current_steps": 252, "total_steps": 3122, "loss": 1.2111, "learning_rate": 4.0255591054313104e-05, "epoch": 0.08070456365092074, "percentage": 8.07, "elapsed_time": "0:44:20", "remaining_time": "8:25:05"}
+{"current_steps": 253, "total_steps": 3122, "loss": 2.522, "learning_rate": 4.041533546325879e-05, "epoch": 0.08102481985588471, "percentage": 8.1, "elapsed_time": "0:44:31", "remaining_time": "8:24:52"}
+{"current_steps": 254, "total_steps": 3122, "loss": 1.5268, "learning_rate": 4.0575079872204476e-05, "epoch": 0.08134507606084868, "percentage": 8.14, "elapsed_time": "0:44:41", "remaining_time": "8:24:39"}
+{"current_steps": 255, "total_steps": 3122, "loss": 2.331, "learning_rate": 4.0734824281150165e-05, "epoch": 0.08166533226581266, "percentage": 8.17, "elapsed_time": "0:44:52", "remaining_time": "8:24:26"}
+{"current_steps": 256, "total_steps": 3122, "loss": 2.2693, "learning_rate": 4.089456869009585e-05, "epoch": 0.08198558847077662, "percentage": 8.2, "elapsed_time": "0:45:02", "remaining_time": "8:24:13"}
+{"current_steps": 257, "total_steps": 3122, "loss": 2.0041, "learning_rate": 4.1054313099041536e-05, "epoch": 0.08230584467574059, "percentage": 8.23, "elapsed_time": "0:45:12", "remaining_time": "8:24:00"}
+{"current_steps": 258, "total_steps": 3122, "loss": 1.814, "learning_rate": 4.1214057507987225e-05, "epoch": 0.08262610088070456, "percentage": 8.26, "elapsed_time": "0:45:23", "remaining_time": "8:23:47"}
+{"current_steps": 259, "total_steps": 3122, "loss": 2.1807, "learning_rate": 4.137380191693291e-05, "epoch": 0.08294635708566854, "percentage": 8.3, "elapsed_time": "0:45:33", "remaining_time": "8:23:35"}
+{"current_steps": 260, "total_steps": 3122, "loss": 1.8303, "learning_rate": 4.15335463258786e-05, "epoch": 0.08326661329063251, "percentage": 8.33, "elapsed_time": "0:45:43", "remaining_time": "8:23:22"}
+{"current_steps": 261, "total_steps": 3122, "loss": 2.0817, "learning_rate": 4.169329073482428e-05, "epoch": 0.08358686949559647, "percentage": 8.36, "elapsed_time": "0:45:54", "remaining_time": "8:23:09"}
+{"current_steps": 262, "total_steps": 3122, "loss": 2.572, "learning_rate": 4.185303514376997e-05, "epoch": 0.08390712570056044, "percentage": 8.39, "elapsed_time": "0:46:04", "remaining_time": "8:22:56"}
+{"current_steps": 263, "total_steps": 3122, "loss": 2.4427, "learning_rate": 4.201277955271566e-05, "epoch": 0.08422738190552442, "percentage": 8.42, "elapsed_time": "0:46:14", "remaining_time": "8:22:43"}
+{"current_steps": 264, "total_steps": 3122, "loss": 1.6031, "learning_rate": 4.217252396166134e-05, "epoch": 0.08454763811048839, "percentage": 8.46, "elapsed_time": "0:46:25", "remaining_time": "8:22:30"}
+{"current_steps": 265, "total_steps": 3122, "loss": 2.3756, "learning_rate": 4.233226837060703e-05, "epoch": 0.08486789431545236, "percentage": 8.49, "elapsed_time": "0:46:35", "remaining_time": "8:22:18"}
+{"current_steps": 266, "total_steps": 3122, "loss": 2.5675, "learning_rate": 4.249201277955272e-05, "epoch": 0.08518815052041634, "percentage": 8.52, "elapsed_time": "0:46:45", "remaining_time": "8:22:05"}
+{"current_steps": 267, "total_steps": 3122, "loss": 2.3992, "learning_rate": 4.265175718849841e-05, "epoch": 0.0855084067253803, "percentage": 8.55, "elapsed_time": "0:46:56", "remaining_time": "8:21:52"}
+{"current_steps": 268, "total_steps": 3122, "loss": 1.8396, "learning_rate": 4.2811501597444096e-05, "epoch": 0.08582866293034427, "percentage": 8.58, "elapsed_time": "0:47:06", "remaining_time": "8:21:40"}
+{"current_steps": 269, "total_steps": 3122, "loss": 1.8471, "learning_rate": 4.297124600638978e-05, "epoch": 0.08614891913530824, "percentage": 8.62, "elapsed_time": "0:47:16", "remaining_time": "8:21:27"}
+{"current_steps": 270, "total_steps": 3122, "loss": 2.4466, "learning_rate": 4.313099041533547e-05, "epoch": 0.08646917534027222, "percentage": 8.65, "elapsed_time": "0:47:27", "remaining_time": "8:21:14"}
+{"current_steps": 271, "total_steps": 3122, "loss": 2.4973, "learning_rate": 4.3290734824281156e-05, "epoch": 0.08678943154523619, "percentage": 8.68, "elapsed_time": "0:47:37", "remaining_time": "8:21:02"}
+{"current_steps": 272, "total_steps": 3122, "loss": 2.3791, "learning_rate": 4.345047923322684e-05, "epoch": 0.08710968775020016, "percentage": 8.71, "elapsed_time": "0:47:47", "remaining_time": "8:20:49"}
+{"current_steps": 273, "total_steps": 3122, "loss": 2.2905, "learning_rate": 4.361022364217253e-05, "epoch": 0.08742994395516412, "percentage": 8.74, "elapsed_time": "0:47:58", "remaining_time": "8:20:36"}
+{"current_steps": 274, "total_steps": 3122, "loss": 2.1515, "learning_rate": 4.376996805111822e-05, "epoch": 0.0877502001601281, "percentage": 8.78, "elapsed_time": "0:48:08", "remaining_time": "8:20:24"}
+{"current_steps": 275, "total_steps": 3122, "loss": 2.2641, "learning_rate": 4.39297124600639e-05, "epoch": 0.08807045636509207, "percentage": 8.81, "elapsed_time": "0:48:18", "remaining_time": "8:20:11"}
+{"current_steps": 276, "total_steps": 3122, "loss": 2.4807, "learning_rate": 4.408945686900959e-05, "epoch": 0.08839071257005604, "percentage": 8.84, "elapsed_time": "0:48:29", "remaining_time": "8:19:58"}
+{"current_steps": 277, "total_steps": 3122, "loss": 2.3933, "learning_rate": 4.424920127795527e-05, "epoch": 0.08871096877502002, "percentage": 8.87, "elapsed_time": "0:48:39", "remaining_time": "8:19:46"}
+{"current_steps": 278, "total_steps": 3122, "loss": 1.7232, "learning_rate": 4.440894568690096e-05, "epoch": 0.08903122497998399, "percentage": 8.9, "elapsed_time": "0:48:49", "remaining_time": "8:19:33"}
+{"current_steps": 279, "total_steps": 3122, "loss": 2.3984, "learning_rate": 4.456869009584665e-05, "epoch": 0.08935148118494796, "percentage": 8.94, "elapsed_time": "0:49:00", "remaining_time": "8:19:21"}
+{"current_steps": 280, "total_steps": 3122, "loss": 2.2911, "learning_rate": 4.472843450479233e-05, "epoch": 0.08967173738991192, "percentage": 8.97, "elapsed_time": "0:49:10", "remaining_time": "8:19:08"}
+{"current_steps": 281, "total_steps": 3122, "loss": 2.3337, "learning_rate": 4.488817891373802e-05, "epoch": 0.0899919935948759, "percentage": 9.0, "elapsed_time": "0:49:20", "remaining_time": "8:18:56"}
+{"current_steps": 282, "total_steps": 3122, "loss": 2.0545, "learning_rate": 4.504792332268371e-05, "epoch": 0.09031224979983987, "percentage": 9.03, "elapsed_time": "0:49:31", "remaining_time": "8:18:44"}
+{"current_steps": 283, "total_steps": 3122, "loss": 2.1376, "learning_rate": 4.520766773162939e-05, "epoch": 0.09063250600480384, "percentage": 9.06, "elapsed_time": "0:49:41", "remaining_time": "8:18:31"}
+{"current_steps": 284, "total_steps": 3122, "loss": 2.1938, "learning_rate": 4.536741214057508e-05, "epoch": 0.09095276220976782, "percentage": 9.1, "elapsed_time": "0:49:52", "remaining_time": "8:18:19"}
+{"current_steps": 285, "total_steps": 3122, "loss": 2.4041, "learning_rate": 4.552715654952077e-05, "epoch": 0.09127301841473179, "percentage": 9.13, "elapsed_time": "0:50:02", "remaining_time": "8:18:06"}
+{"current_steps": 286, "total_steps": 3122, "loss": 2.2543, "learning_rate": 4.568690095846646e-05, "epoch": 0.09159327461969576, "percentage": 9.16, "elapsed_time": "0:50:12", "remaining_time": "8:17:54"}
+{"current_steps": 287, "total_steps": 3122, "loss": 2.0115, "learning_rate": 4.584664536741215e-05, "epoch": 0.09191353082465972, "percentage": 9.19, "elapsed_time": "0:50:23", "remaining_time": "8:17:42"}
+{"current_steps": 288, "total_steps": 3122, "loss": 2.3996, "learning_rate": 4.600638977635783e-05, "epoch": 0.0922337870296237, "percentage": 9.22, "elapsed_time": "0:50:33", "remaining_time": "8:17:29"}
+{"current_steps": 289, "total_steps": 3122, "loss": 2.7077, "learning_rate": 4.616613418530352e-05, "epoch": 0.09255404323458767, "percentage": 9.26, "elapsed_time": "0:50:43", "remaining_time": "8:17:17"}
+{"current_steps": 290, "total_steps": 3122, "loss": 2.0203, "learning_rate": 4.632587859424921e-05, "epoch": 0.09287429943955164, "percentage": 9.29, "elapsed_time": "0:50:54", "remaining_time": "8:17:05"}
+{"current_steps": 291, "total_steps": 3122, "loss": 2.2094, "learning_rate": 4.648562300319489e-05, "epoch": 0.0931945556445156, "percentage": 9.32, "elapsed_time": "0:51:04", "remaining_time": "8:16:52"}
+{"current_steps": 292, "total_steps": 3122, "loss": 2.2682, "learning_rate": 4.664536741214058e-05, "epoch": 0.09351481184947959, "percentage": 9.35, "elapsed_time": "0:51:14", "remaining_time": "8:16:40"}
+{"current_steps": 293, "total_steps": 3122, "loss": 2.1374, "learning_rate": 4.680511182108626e-05, "epoch": 0.09383506805444355, "percentage": 9.39, "elapsed_time": "0:51:25", "remaining_time": "8:16:28"}
+{"current_steps": 294, "total_steps": 3122, "loss": 2.272, "learning_rate": 4.696485623003195e-05, "epoch": 0.09415532425940752, "percentage": 9.42, "elapsed_time": "0:51:35", "remaining_time": "8:16:15"}
+{"current_steps": 295, "total_steps": 3122, "loss": 2.384, "learning_rate": 4.712460063897764e-05, "epoch": 0.0944755804643715, "percentage": 9.45, "elapsed_time": "0:51:45", "remaining_time": "8:16:03"}
+{"current_steps": 296, "total_steps": 3122, "loss": 2.4198, "learning_rate": 4.728434504792332e-05, "epoch": 0.09479583666933547, "percentage": 9.48, "elapsed_time": "0:51:56", "remaining_time": "8:15:51"}
+{"current_steps": 297, "total_steps": 3122, "loss": 2.3007, "learning_rate": 4.744408945686901e-05, "epoch": 0.09511609287429944, "percentage": 9.51, "elapsed_time": "0:52:06", "remaining_time": "8:15:39"}
+{"current_steps": 298, "total_steps": 3122, "loss": 2.6156, "learning_rate": 4.76038338658147e-05, "epoch": 0.0954363490792634, "percentage": 9.55, "elapsed_time": "0:52:16", "remaining_time": "8:15:27"}
+{"current_steps": 299, "total_steps": 3122, "loss": 2.2731, "learning_rate": 4.776357827476038e-05, "epoch": 0.09575660528422739, "percentage": 9.58, "elapsed_time": "0:52:27", "remaining_time": "8:15:15"}
+{"current_steps": 300, "total_steps": 3122, "loss": 2.5316, "learning_rate": 4.792332268370607e-05, "epoch": 0.09607686148919135, "percentage": 9.61, "elapsed_time": "0:52:37", "remaining_time": "8:15:02"}
+{"current_steps": 301, "total_steps": 3122, "loss": 1.9556, "learning_rate": 4.8083067092651754e-05, "epoch": 0.09639711769415532, "percentage": 9.64, "elapsed_time": "0:53:14", "remaining_time": "8:18:56"}
+{"current_steps": 302, "total_steps": 3122, "loss": 2.4008, "learning_rate": 4.824281150159744e-05, "epoch": 0.0967173738991193, "percentage": 9.67, "elapsed_time": "0:53:24", "remaining_time": "8:18:43"}
+{"current_steps": 303, "total_steps": 3122, "loss": 2.2126, "learning_rate": 4.840255591054313e-05, "epoch": 0.09703763010408327, "percentage": 9.71, "elapsed_time": "0:53:34", "remaining_time": "8:18:30"}
+{"current_steps": 304, "total_steps": 3122, "loss": 1.9912, "learning_rate": 4.856230031948882e-05, "epoch": 0.09735788630904724, "percentage": 9.74, "elapsed_time": "0:53:45", "remaining_time": "8:18:17"}
+{"current_steps": 305, "total_steps": 3122, "loss": 2.3782, "learning_rate": 4.872204472843451e-05, "epoch": 0.0976781425140112, "percentage": 9.77, "elapsed_time": "0:53:55", "remaining_time": "8:18:05"}
+{"current_steps": 306, "total_steps": 3122, "loss": 2.2945, "learning_rate": 4.88817891373802e-05, "epoch": 0.09799839871897519, "percentage": 9.8, "elapsed_time": "0:54:06", "remaining_time": "8:17:53"}
+{"current_steps": 307, "total_steps": 3122, "loss": 2.7067, "learning_rate": 4.904153354632588e-05, "epoch": 0.09831865492393915, "percentage": 9.83, "elapsed_time": "0:54:16", "remaining_time": "8:17:41"}
+{"current_steps": 308, "total_steps": 3122, "loss": 2.0701, "learning_rate": 4.920127795527157e-05, "epoch": 0.09863891112890312, "percentage": 9.87, "elapsed_time": "0:54:27", "remaining_time": "8:17:29"}
+{"current_steps": 309, "total_steps": 3122, "loss": 2.5141, "learning_rate": 4.936102236421725e-05, "epoch": 0.09895916733386709, "percentage": 9.9, "elapsed_time": "0:54:37", "remaining_time": "8:17:16"}
+{"current_steps": 310, "total_steps": 3122, "loss": 2.1579, "learning_rate": 4.952076677316294e-05, "epoch": 0.09927942353883107, "percentage": 9.93, "elapsed_time": "0:54:47", "remaining_time": "8:17:04"}
+{"current_steps": 311, "total_steps": 3122, "loss": 2.4784, "learning_rate": 4.968051118210863e-05, "epoch": 0.09959967974379504, "percentage": 9.96, "elapsed_time": "0:54:58", "remaining_time": "8:16:52"}
+{"current_steps": 312, "total_steps": 3122, "loss": 2.285, "learning_rate": 4.984025559105431e-05, "epoch": 0.099919935948759, "percentage": 9.99, "elapsed_time": "0:55:08", "remaining_time": "8:16:39"}
+{"current_steps": 313, "total_steps": 3122, "loss": 2.4196, "learning_rate": 5e-05, "epoch": 0.10024019215372298, "percentage": 10.03, "elapsed_time": "0:55:19", "remaining_time": "8:16:27"}
+{"current_steps": 314, "total_steps": 3122, "loss": 1.4867, "learning_rate": 4.9999984364699426e-05, "epoch": 0.10056044835868695, "percentage": 10.06, "elapsed_time": "0:55:29", "remaining_time": "8:16:14"}
+{"current_steps": 315, "total_steps": 3122, "loss": 2.2844, "learning_rate": 4.999993745881724e-05, "epoch": 0.10088070456365092, "percentage": 10.09, "elapsed_time": "0:55:39", "remaining_time": "8:16:02"}
+{"current_steps": 316, "total_steps": 3122, "loss": 1.8481, "learning_rate": 4.9999859282412125e-05, "epoch": 0.10120096076861489, "percentage": 10.12, "elapsed_time": "0:55:50", "remaining_time": "8:15:49"}
+{"current_steps": 317, "total_steps": 3122, "loss": 2.4302, "learning_rate": 4.9999749835581864e-05, "epoch": 0.10152121697357887, "percentage": 10.15, "elapsed_time": "0:56:00", "remaining_time": "8:15:37"}
+{"current_steps": 318, "total_steps": 3122, "loss": 2.3678, "learning_rate": 4.999960911846336e-05, "epoch": 0.10184147317854284, "percentage": 10.19, "elapsed_time": "0:56:11", "remaining_time": "8:15:24"}
+{"current_steps": 319, "total_steps": 3122, "loss": 2.1427, "learning_rate": 4.999943713123261e-05, "epoch": 0.1021617293835068, "percentage": 10.22, "elapsed_time": "0:56:21", "remaining_time": "8:15:12"}
+{"current_steps": 320, "total_steps": 3122, "loss": 1.591, "learning_rate": 4.9999233874104755e-05, "epoch": 0.10248198558847077, "percentage": 10.25, "elapsed_time": "0:56:31", "remaining_time": "8:14:59"}
+{"current_steps": 321, "total_steps": 3122, "loss": 2.353, "learning_rate": 4.9998999347334036e-05, "epoch": 0.10280224179343475, "percentage": 10.28, "elapsed_time": "0:56:42", "remaining_time": "8:14:47"}
+{"current_steps": 322, "total_steps": 3122, "loss": 2.0951, "learning_rate": 4.9998733551213795e-05, "epoch": 0.10312249799839872, "percentage": 10.31, "elapsed_time": "0:56:52", "remaining_time": "8:14:34"}
+{"current_steps": 323, "total_steps": 3122, "loss": 2.4225, "learning_rate": 4.9998436486076495e-05, "epoch": 0.10344275420336269, "percentage": 10.35, "elapsed_time": "0:57:02", "remaining_time": "8:14:22"}
+{"current_steps": 324, "total_steps": 3122, "loss": 1.8435, "learning_rate": 4.999810815229372e-05, "epoch": 0.10376301040832667, "percentage": 10.38, "elapsed_time": "0:57:13", "remaining_time": "8:14:09"}
+{"current_steps": 325, "total_steps": 3122, "loss": 2.0037, "learning_rate": 4.999774855027615e-05, "epoch": 0.10408326661329063, "percentage": 10.41, "elapsed_time": "0:57:23", "remaining_time": "8:13:57"}
+{"current_steps": 326, "total_steps": 3122, "loss": 2.6103, "learning_rate": 4.999735768047359e-05, "epoch": 0.1044035228182546, "percentage": 10.44, "elapsed_time": "0:57:34", "remaining_time": "8:13:45"}
+{"current_steps": 327, "total_steps": 3122, "loss": 2.0573, "learning_rate": 4.999693554337495e-05, "epoch": 0.10472377902321857, "percentage": 10.47, "elapsed_time": "0:57:44", "remaining_time": "8:13:32"}
+{"current_steps": 328, "total_steps": 3122, "loss": 2.1116, "learning_rate": 4.9996482139508236e-05, "epoch": 0.10504403522818255, "percentage": 10.51, "elapsed_time": "0:57:54", "remaining_time": "8:13:20"}
+{"current_steps": 329, "total_steps": 3122, "loss": 2.677, "learning_rate": 4.999599746944059e-05, "epoch": 0.10536429143314652, "percentage": 10.54, "elapsed_time": "0:58:05", "remaining_time": "8:13:07"}
+{"current_steps": 330, "total_steps": 3122, "loss": 2.2031, "learning_rate": 4.9995481533778256e-05, "epoch": 0.10568454763811048, "percentage": 10.57, "elapsed_time": "0:58:15", "remaining_time": "8:12:55"}
+{"current_steps": 331, "total_steps": 3122, "loss": 2.1728, "learning_rate": 4.999493433316656e-05, "epoch": 0.10600480384307447, "percentage": 10.6, "elapsed_time": "0:58:26", "remaining_time": "8:12:43"}
+{"current_steps": 332, "total_steps": 3122, "loss": 2.239, "learning_rate": 4.9994355868289965e-05, "epoch": 0.10632506004803843, "percentage": 10.63, "elapsed_time": "0:58:36", "remaining_time": "8:12:31"}
+{"current_steps": 333, "total_steps": 3122, "loss": 2.5327, "learning_rate": 4.999374613987202e-05, "epoch": 0.1066453162530024, "percentage": 10.67, "elapsed_time": "0:58:46", "remaining_time": "8:12:18"}
+{"current_steps": 334, "total_steps": 3122, "loss": 2.2862, "learning_rate": 4.9993105148675405e-05, "epoch": 0.10696557245796637, "percentage": 10.7, "elapsed_time": "0:58:57", "remaining_time": "8:12:06"}
+{"current_steps": 335, "total_steps": 3122, "loss": 2.0678, "learning_rate": 4.9992432895501874e-05, "epoch": 0.10728582866293035, "percentage": 10.73, "elapsed_time": "0:59:07", "remaining_time": "8:11:54"}
+{"current_steps": 336, "total_steps": 3122, "loss": 2.2222, "learning_rate": 4.99917293811923e-05, "epoch": 0.10760608486789432, "percentage": 10.76, "elapsed_time": "0:59:18", "remaining_time": "8:11:41"}
+{"current_steps": 337, "total_steps": 3122, "loss": 2.195, "learning_rate": 4.9990994606626647e-05, "epoch": 0.10792634107285828, "percentage": 10.79, "elapsed_time": "0:59:28", "remaining_time": "8:11:29"}
+{"current_steps": 338, "total_steps": 3122, "loss": 2.0068, "learning_rate": 4.9990228572724e-05, "epoch": 0.10824659727782225, "percentage": 10.83, "elapsed_time": "0:59:38", "remaining_time": "8:11:17"}
+{"current_steps": 339, "total_steps": 3122, "loss": 2.0167, "learning_rate": 4.998943128044254e-05, "epoch": 0.10856685348278623, "percentage": 10.86, "elapsed_time": "0:59:49", "remaining_time": "8:11:05"}
+{"current_steps": 340, "total_steps": 3122, "loss": 2.3055, "learning_rate": 4.9988602730779515e-05, "epoch": 0.1088871096877502, "percentage": 10.89, "elapsed_time": "0:59:59", "remaining_time": "8:10:53"}
+{"current_steps": 341, "total_steps": 3122, "loss": 2.2542, "learning_rate": 4.998774292477131e-05, "epoch": 0.10920736589271417, "percentage": 10.92, "elapsed_time": "1:00:09", "remaining_time": "8:10:40"}
+{"current_steps": 342, "total_steps": 3122, "loss": 2.564, "learning_rate": 4.99868518634934e-05, "epoch": 0.10952762209767815, "percentage": 10.95, "elapsed_time": "1:00:20", "remaining_time": "8:10:28"}
+{"current_steps": 343, "total_steps": 3122, "loss": 2.2191, "learning_rate": 4.998592954806033e-05, "epoch": 0.10984787830264212, "percentage": 10.99, "elapsed_time": "1:00:30", "remaining_time": "8:10:16"}
+{"current_steps": 344, "total_steps": 3122, "loss": 2.5834, "learning_rate": 4.998497597962576e-05, "epoch": 0.11016813450760608, "percentage": 11.02, "elapsed_time": "1:00:41", "remaining_time": "8:10:04"}
+{"current_steps": 345, "total_steps": 3122, "loss": 2.6079, "learning_rate": 4.998399115938244e-05, "epoch": 0.11048839071257005, "percentage": 11.05, "elapsed_time": "1:00:51", "remaining_time": "8:09:52"}
+{"current_steps": 346, "total_steps": 3122, "loss": 2.0724, "learning_rate": 4.99829750885622e-05, "epoch": 0.11080864691753403, "percentage": 11.08, "elapsed_time": "1:01:01", "remaining_time": "8:09:40"}
+{"current_steps": 347, "total_steps": 3122, "loss": 2.0157, "learning_rate": 4.9981927768435964e-05, "epoch": 0.111128903122498, "percentage": 11.11, "elapsed_time": "1:01:12", "remaining_time": "8:09:28"}
+{"current_steps": 348, "total_steps": 3122, "loss": 2.4644, "learning_rate": 4.998084920031376e-05, "epoch": 0.11144915932746197, "percentage": 11.15, "elapsed_time": "1:01:22", "remaining_time": "8:09:16"}
+{"current_steps": 349, "total_steps": 3122, "loss": 2.6107, "learning_rate": 4.997973938554466e-05, "epoch": 0.11176941553242595, "percentage": 11.18, "elapsed_time": "1:01:33", "remaining_time": "8:09:04"}
+{"current_steps": 350, "total_steps": 3122, "loss": 2.3877, "learning_rate": 4.997859832551689e-05, "epoch": 0.11208967173738991, "percentage": 11.21, "elapsed_time": "1:01:43", "remaining_time": "8:08:52"}
+{"current_steps": 351, "total_steps": 3122, "loss": 2.179, "learning_rate": 4.997742602165767e-05, "epoch": 0.11240992794235388, "percentage": 11.24, "elapsed_time": "1:01:53", "remaining_time": "8:08:40"}
+{"current_steps": 352, "total_steps": 3122, "loss": 2.5496, "learning_rate": 4.997622247543338e-05, "epoch": 0.11273018414731785, "percentage": 11.27, "elapsed_time": "1:02:04", "remaining_time": "8:08:28"}
+{"current_steps": 353, "total_steps": 3122, "loss": 1.8469, "learning_rate": 4.9974987688349415e-05, "epoch": 0.11305044035228183, "percentage": 11.31, "elapsed_time": "1:02:14", "remaining_time": "8:08:15"}
+{"current_steps": 354, "total_steps": 3122, "loss": 2.3798, "learning_rate": 4.9973721661950295e-05, "epoch": 0.1133706965572458, "percentage": 11.34, "elapsed_time": "1:02:25", "remaining_time": "8:08:03"}
+{"current_steps": 355, "total_steps": 3122, "loss": 2.4496, "learning_rate": 4.9972424397819596e-05, "epoch": 0.11369095276220977, "percentage": 11.37, "elapsed_time": "1:02:35", "remaining_time": "8:07:51"}
+{"current_steps": 356, "total_steps": 3122, "loss": 2.0667, "learning_rate": 4.997109589757997e-05, "epoch": 0.11401120896717373, "percentage": 11.4, "elapsed_time": "1:02:45", "remaining_time": "8:07:39"}
+{"current_steps": 357, "total_steps": 3122, "loss": 2.1528, "learning_rate": 4.996973616289312e-05, "epoch": 0.11433146517213771, "percentage": 11.43, "elapsed_time": "1:02:56", "remaining_time": "8:07:27"}
+{"current_steps": 358, "total_steps": 3122, "loss": 1.8263, "learning_rate": 4.996834519545985e-05, "epoch": 0.11465172137710168, "percentage": 11.47, "elapsed_time": "1:03:06", "remaining_time": "8:07:15"}
+{"current_steps": 359, "total_steps": 3122, "loss": 2.629, "learning_rate": 4.996692299702e-05, "epoch": 0.11497197758206565, "percentage": 11.5, "elapsed_time": "1:03:17", "remaining_time": "8:07:03"}
+{"current_steps": 360, "total_steps": 3122, "loss": 2.4788, "learning_rate": 4.996546956935252e-05, "epoch": 0.11529223378702963, "percentage": 11.53, "elapsed_time": "1:03:27", "remaining_time": "8:06:51"}
+{"current_steps": 361, "total_steps": 3122, "loss": 2.2397, "learning_rate": 4.9963984914275363e-05, "epoch": 0.1156124899919936, "percentage": 11.56, "elapsed_time": "1:03:37", "remaining_time": "8:06:39"}
+{"current_steps": 362, "total_steps": 3122, "loss": 2.3035, "learning_rate": 4.996246903364559e-05, "epoch": 0.11593274619695756, "percentage": 11.6, "elapsed_time": "1:03:48", "remaining_time": "8:06:27"}
+{"current_steps": 363, "total_steps": 3122, "loss": 2.6009, "learning_rate": 4.996092192935929e-05, "epoch": 0.11625300240192153, "percentage": 11.63, "elapsed_time": "1:03:58", "remaining_time": "8:06:15"}
+{"current_steps": 364, "total_steps": 3122, "loss": 2.3057, "learning_rate": 4.99593436033516e-05, "epoch": 0.11657325860688551, "percentage": 11.66, "elapsed_time": "1:04:09", "remaining_time": "8:06:04"}
+{"current_steps": 365, "total_steps": 3122, "loss": 2.5767, "learning_rate": 4.9957734057596774e-05, "epoch": 0.11689351481184948, "percentage": 11.69, "elapsed_time": "1:04:19", "remaining_time": "8:05:52"}
+{"current_steps": 366, "total_steps": 3122, "loss": 1.9374, "learning_rate": 4.995609329410804e-05, "epoch": 0.11721377101681345, "percentage": 11.72, "elapsed_time": "1:04:29", "remaining_time": "8:05:40"}
+{"current_steps": 367, "total_steps": 3122, "loss": 1.9711, "learning_rate": 4.995442131493771e-05, "epoch": 0.11753402722177742, "percentage": 11.76, "elapsed_time": "1:04:40", "remaining_time": "8:05:28"}
+{"current_steps": 368, "total_steps": 3122, "loss": 2.3285, "learning_rate": 4.9952718122177126e-05, "epoch": 0.1178542834267414, "percentage": 11.79, "elapsed_time": "1:04:50", "remaining_time": "8:05:16"}
+{"current_steps": 369, "total_steps": 3122, "loss": 2.0349, "learning_rate": 4.9950983717956703e-05, "epoch": 0.11817453963170536, "percentage": 11.82, "elapsed_time": "1:05:01", "remaining_time": "8:05:04"}
+{"current_steps": 370, "total_steps": 3122, "loss": 2.1336, "learning_rate": 4.994921810444586e-05, "epoch": 0.11849479583666933, "percentage": 11.85, "elapsed_time": "1:05:11", "remaining_time": "8:04:52"}
+{"current_steps": 371, "total_steps": 3122, "loss": 2.319, "learning_rate": 4.994742128385307e-05, "epoch": 0.11881505204163331, "percentage": 11.88, "elapsed_time": "1:05:21", "remaining_time": "8:04:40"}
+{"current_steps": 372, "total_steps": 3122, "loss": 2.0951, "learning_rate": 4.994559325842585e-05, "epoch": 0.11913530824659728, "percentage": 11.92, "elapsed_time": "1:05:32", "remaining_time": "8:04:28"}
+{"current_steps": 373, "total_steps": 3122, "loss": 2.4311, "learning_rate": 4.994373403045073e-05, "epoch": 0.11945556445156125, "percentage": 11.95, "elapsed_time": "1:05:42", "remaining_time": "8:04:16"}
+{"current_steps": 374, "total_steps": 3122, "loss": 1.8299, "learning_rate": 4.994184360225328e-05, "epoch": 0.11977582065652521, "percentage": 11.98, "elapsed_time": "1:05:52", "remaining_time": "8:04:04"}
+{"current_steps": 375, "total_steps": 3122, "loss": 2.4937, "learning_rate": 4.993992197619809e-05, "epoch": 0.1200960768614892, "percentage": 12.01, "elapsed_time": "1:06:03", "remaining_time": "8:03:53"}
+{"current_steps": 376, "total_steps": 3122, "loss": 2.3098, "learning_rate": 4.9937969154688766e-05, "epoch": 0.12041633306645316, "percentage": 12.04, "elapsed_time": "1:06:13", "remaining_time": "8:03:41"}
+{"current_steps": 377, "total_steps": 3122, "loss": 2.2064, "learning_rate": 4.993598514016797e-05, "epoch": 0.12073658927141713, "percentage": 12.08, "elapsed_time": "1:06:24", "remaining_time": "8:03:29"}
+{"current_steps": 378, "total_steps": 3122, "loss": 2.0565, "learning_rate": 4.9933969935117335e-05, "epoch": 0.12105684547638111, "percentage": 12.11, "elapsed_time": "1:06:34", "remaining_time": "8:03:17"}
+{"current_steps": 379, "total_steps": 3122, "loss": 2.6077, "learning_rate": 4.9931923542057534e-05, "epoch": 0.12137710168134508, "percentage": 12.14, "elapsed_time": "1:06:44", "remaining_time": "8:03:05"}
+{"current_steps": 380, "total_steps": 3122, "loss": 2.3129, "learning_rate": 4.9929845963548246e-05, "epoch": 0.12169735788630905, "percentage": 12.17, "elapsed_time": "1:06:55", "remaining_time": "8:02:53"}
+{"current_steps": 381, "total_steps": 3122, "loss": 2.5353, "learning_rate": 4.9927737202188155e-05, "epoch": 0.12201761409127301, "percentage": 12.2, "elapsed_time": "1:07:05", "remaining_time": "8:02:41"}
+{"current_steps": 382, "total_steps": 3122, "loss": 2.0995, "learning_rate": 4.992559726061494e-05, "epoch": 0.122337870296237, "percentage": 12.24, "elapsed_time": "1:07:16", "remaining_time": "8:02:30"}
+{"current_steps": 383, "total_steps": 3122, "loss": 1.9616, "learning_rate": 4.9923426141505305e-05, "epoch": 0.12265812650120096, "percentage": 12.27, "elapsed_time": "1:07:26", "remaining_time": "8:02:18"}
+{"current_steps": 384, "total_steps": 3122, "loss": 2.1245, "learning_rate": 4.9921223847574935e-05, "epoch": 0.12297838270616493, "percentage": 12.3, "elapsed_time": "1:07:36", "remaining_time": "8:02:06"}
+{"current_steps": 385, "total_steps": 3122, "loss": 2.2955, "learning_rate": 4.991899038157851e-05, "epoch": 0.1232986389111289, "percentage": 12.33, "elapsed_time": "1:07:47", "remaining_time": "8:01:54"}
+{"current_steps": 386, "total_steps": 3122, "loss": 2.2364, "learning_rate": 4.991672574630971e-05, "epoch": 0.12361889511609288, "percentage": 12.36, "elapsed_time": "1:07:57", "remaining_time": "8:01:42"}
+{"current_steps": 387, "total_steps": 3122, "loss": 2.2836, "learning_rate": 4.9914429944601185e-05, "epoch": 0.12393915132105685, "percentage": 12.4, "elapsed_time": "1:08:08", "remaining_time": "8:01:30"}
+{"current_steps": 388, "total_steps": 3122, "loss": 1.9992, "learning_rate": 4.991210297932459e-05, "epoch": 0.12425940752602081, "percentage": 12.43, "elapsed_time": "1:08:18", "remaining_time": "8:01:19"}
+{"current_steps": 389, "total_steps": 3122, "loss": 2.2879, "learning_rate": 4.9909744853390534e-05, "epoch": 0.1245796637309848, "percentage": 12.46, "elapsed_time": "1:08:28", "remaining_time": "8:01:07"}
+{"current_steps": 390, "total_steps": 3122, "loss": 2.2375, "learning_rate": 4.990735556974863e-05, "epoch": 0.12489991993594876, "percentage": 12.49, "elapsed_time": "1:08:39", "remaining_time": "8:00:55"}
+{"current_steps": 391, "total_steps": 3122, "loss": 2.5697, "learning_rate": 4.990493513138744e-05, "epoch": 0.12522017614091274, "percentage": 12.52, "elapsed_time": "1:08:49", "remaining_time": "8:00:43"}
+{"current_steps": 392, "total_steps": 3122, "loss": 1.9927, "learning_rate": 4.990248354133452e-05, "epoch": 0.1255404323458767, "percentage": 12.56, "elapsed_time": "1:08:59", "remaining_time": "8:00:31"}
+{"current_steps": 393, "total_steps": 3122, "loss": 2.2876, "learning_rate": 4.9900000802656376e-05, "epoch": 0.12586068855084068, "percentage": 12.59, "elapsed_time": "1:09:10", "remaining_time": "8:00:20"}
+{"current_steps": 394, "total_steps": 3122, "loss": 2.3259, "learning_rate": 4.989748691845847e-05, "epoch": 0.12618094475580463, "percentage": 12.62, "elapsed_time": "1:09:20", "remaining_time": "8:00:08"}
+{"current_steps": 395, "total_steps": 3122, "loss": 2.6403, "learning_rate": 4.989494189188523e-05, "epoch": 0.1265012009607686, "percentage": 12.65, "elapsed_time": "1:09:31", "remaining_time": "7:59:56"}
+{"current_steps": 396, "total_steps": 3122, "loss": 2.4835, "learning_rate": 4.989236572612004e-05, "epoch": 0.1268214571657326, "percentage": 12.68, "elapsed_time": "1:09:41", "remaining_time": "7:59:44"}
+{"current_steps": 397, "total_steps": 3122, "loss": 2.2297, "learning_rate": 4.988975842438523e-05, "epoch": 0.12714171337069655, "percentage": 12.72, "elapsed_time": "1:09:51", "remaining_time": "7:59:32"}
+{"current_steps": 398, "total_steps": 3122, "loss": 2.4837, "learning_rate": 4.9887119989942073e-05, "epoch": 0.12746196957566053, "percentage": 12.75, "elapsed_time": "1:10:02", "remaining_time": "7:59:21"}
+{"current_steps": 399, "total_steps": 3122, "loss": 2.9118, "learning_rate": 4.9884450426090786e-05, "epoch": 0.1277822257806245, "percentage": 12.78, "elapsed_time": "1:10:12", "remaining_time": "7:59:09"}
+{"current_steps": 400, "total_steps": 3122, "loss": 2.4227, "learning_rate": 4.9881749736170525e-05, "epoch": 0.12810248198558846, "percentage": 12.81, "elapsed_time": "1:10:23", "remaining_time": "7:58:57"}
+{"current_steps": 401, "total_steps": 3122, "loss": 2.6651, "learning_rate": 4.987901792355938e-05, "epoch": 0.12842273819055244, "percentage": 12.84, "elapsed_time": "1:10:59", "remaining_time": "8:01:41"}
+{"current_steps": 402, "total_steps": 3122, "loss": 2.61, "learning_rate": 4.987625499167436e-05, "epoch": 0.12874299439551642, "percentage": 12.88, "elapsed_time": "1:11:09", "remaining_time": "8:01:28"}
+{"current_steps": 403, "total_steps": 3122, "loss": 2.1197, "learning_rate": 4.9873460943971416e-05, "epoch": 0.12906325060048038, "percentage": 12.91, "elapsed_time": "1:11:19", "remaining_time": "8:01:16"}
+{"current_steps": 404, "total_steps": 3122, "loss": 2.6976, "learning_rate": 4.987063578394541e-05, "epoch": 0.12938350680544436, "percentage": 12.94, "elapsed_time": "1:11:30", "remaining_time": "8:01:04"}
+{"current_steps": 405, "total_steps": 3122, "loss": 2.242, "learning_rate": 4.986777951513011e-05, "epoch": 0.1297037630104083, "percentage": 12.97, "elapsed_time": "1:11:40", "remaining_time": "8:00:52"}
+{"current_steps": 406, "total_steps": 3122, "loss": 2.3003, "learning_rate": 4.9864892141098215e-05, "epoch": 0.1300240192153723, "percentage": 13.0, "elapsed_time": "1:11:51", "remaining_time": "8:00:40"}
+{"current_steps": 407, "total_steps": 3122, "loss": 1.8946, "learning_rate": 4.986197366546133e-05, "epoch": 0.13034427542033628, "percentage": 13.04, "elapsed_time": "1:12:01", "remaining_time": "8:00:28"}
+{"current_steps": 408, "total_steps": 3122, "loss": 2.1781, "learning_rate": 4.985902409186993e-05, "epoch": 0.13066453162530023, "percentage": 13.07, "elapsed_time": "1:12:12", "remaining_time": "8:00:16"}
+{"current_steps": 409, "total_steps": 3122, "loss": 1.9627, "learning_rate": 4.985604342401343e-05, "epoch": 0.1309847878302642, "percentage": 13.1, "elapsed_time": "1:12:22", "remaining_time": "8:00:04"}
+{"current_steps": 410, "total_steps": 3122, "loss": 2.161, "learning_rate": 4.9853031665620116e-05, "epoch": 0.1313050440352282, "percentage": 13.13, "elapsed_time": "1:12:32", "remaining_time": "7:59:52"}
+{"current_steps": 411, "total_steps": 3122, "loss": 2.3552, "learning_rate": 4.984998882045717e-05, "epoch": 0.13162530024019214, "percentage": 13.16, "elapsed_time": "1:12:43", "remaining_time": "7:59:40"}
+{"current_steps": 412, "total_steps": 3122, "loss": 2.2441, "learning_rate": 4.9846914892330654e-05, "epoch": 0.13194555644515613, "percentage": 13.2, "elapsed_time": "1:12:53", "remaining_time": "7:59:28"}
+{"current_steps": 413, "total_steps": 3122, "loss": 1.9077, "learning_rate": 4.984380988508551e-05, "epoch": 0.1322658126501201, "percentage": 13.23, "elapsed_time": "1:13:04", "remaining_time": "7:59:16"}
+{"current_steps": 414, "total_steps": 3122, "loss": 2.5129, "learning_rate": 4.9840673802605566e-05, "epoch": 0.13258606885508406, "percentage": 13.26, "elapsed_time": "1:13:14", "remaining_time": "7:59:04"}
+{"current_steps": 415, "total_steps": 3122, "loss": 2.2193, "learning_rate": 4.98375066488135e-05, "epoch": 0.13290632506004804, "percentage": 13.29, "elapsed_time": "1:13:24", "remaining_time": "7:58:52"}
+{"current_steps": 416, "total_steps": 3122, "loss": 2.5459, "learning_rate": 4.983430842767086e-05, "epoch": 0.13322658126501202, "percentage": 13.32, "elapsed_time": "1:13:35", "remaining_time": "7:58:40"}
+{"current_steps": 417, "total_steps": 3122, "loss": 2.6023, "learning_rate": 4.9831079143178066e-05, "epoch": 0.13354683746997598, "percentage": 13.36, "elapsed_time": "1:13:45", "remaining_time": "7:58:28"}
+{"current_steps": 418, "total_steps": 3122, "loss": 2.1457, "learning_rate": 4.982781879937438e-05, "epoch": 0.13386709367493996, "percentage": 13.39, "elapsed_time": "1:13:56", "remaining_time": "7:58:16"}
+{"current_steps": 419, "total_steps": 3122, "loss": 2.0819, "learning_rate": 4.982452740033793e-05, "epoch": 0.1341873498799039, "percentage": 13.42, "elapsed_time": "1:14:06", "remaining_time": "7:58:03"}
+{"current_steps": 420, "total_steps": 3122, "loss": 2.6695, "learning_rate": 4.982120495018566e-05, "epoch": 0.1345076060848679, "percentage": 13.45, "elapsed_time": "1:14:16", "remaining_time": "7:57:51"}
+{"current_steps": 421, "total_steps": 3122, "loss": 2.4198, "learning_rate": 4.981785145307337e-05, "epoch": 0.13482786228983187, "percentage": 13.48, "elapsed_time": "1:14:27", "remaining_time": "7:57:39"}
+{"current_steps": 422, "total_steps": 3122, "loss": 2.0445, "learning_rate": 4.9814466913195717e-05, "epoch": 0.13514811849479583, "percentage": 13.52, "elapsed_time": "1:14:37", "remaining_time": "7:57:27"}
+{"current_steps": 423, "total_steps": 3122, "loss": 2.3541, "learning_rate": 4.981105133478614e-05, "epoch": 0.1354683746997598, "percentage": 13.55, "elapsed_time": "1:14:47", "remaining_time": "7:57:15"}
+{"current_steps": 424, "total_steps": 3122, "loss": 1.7954, "learning_rate": 4.9807604722116945e-05, "epoch": 0.1357886309047238, "percentage": 13.58, "elapsed_time": "1:14:58", "remaining_time": "7:57:02"}
+{"current_steps": 425, "total_steps": 3122, "loss": 2.3201, "learning_rate": 4.980412707949923e-05, "epoch": 0.13610888710968774, "percentage": 13.61, "elapsed_time": "1:15:08", "remaining_time": "7:56:50"}
+{"current_steps": 426, "total_steps": 3122, "loss": 2.3104, "learning_rate": 4.9800618411282914e-05, "epoch": 0.13642914331465172, "percentage": 13.65, "elapsed_time": "1:15:18", "remaining_time": "7:56:38"}
+{"current_steps": 427, "total_steps": 3122, "loss": 2.4099, "learning_rate": 4.979707872185672e-05, "epoch": 0.1367493995196157, "percentage": 13.68, "elapsed_time": "1:15:29", "remaining_time": "7:56:26"}
+{"current_steps": 428, "total_steps": 3122, "loss": 2.0, "learning_rate": 4.979350801564818e-05, "epoch": 0.13706965572457966, "percentage": 13.71, "elapsed_time": "1:15:39", "remaining_time": "7:56:13"}
+{"current_steps": 429, "total_steps": 3122, "loss": 2.3145, "learning_rate": 4.9789906297123626e-05, "epoch": 0.13738991192954364, "percentage": 13.74, "elapsed_time": "1:15:49", "remaining_time": "7:56:01"}
+{"current_steps": 430, "total_steps": 3122, "loss": 2.1489, "learning_rate": 4.978627357078817e-05, "epoch": 0.1377101681345076, "percentage": 13.77, "elapsed_time": "1:16:00", "remaining_time": "7:55:49"}
+{"current_steps": 431, "total_steps": 3122, "loss": 2.0548, "learning_rate": 4.97826098411857e-05, "epoch": 0.13803042433947157, "percentage": 13.81, "elapsed_time": "1:16:10", "remaining_time": "7:55:37"}
+{"current_steps": 432, "total_steps": 3122, "loss": 2.3199, "learning_rate": 4.9778915112898914e-05, "epoch": 0.13835068054443556, "percentage": 13.84, "elapsed_time": "1:16:21", "remaining_time": "7:55:25"}
+{"current_steps": 433, "total_steps": 3122, "loss": 2.1056, "learning_rate": 4.977518939054927e-05, "epoch": 0.1386709367493995, "percentage": 13.87, "elapsed_time": "1:16:31", "remaining_time": "7:55:13"}
+{"current_steps": 434, "total_steps": 3122, "loss": 2.2003, "learning_rate": 4.977143267879697e-05, "epoch": 0.1389911929543635, "percentage": 13.9, "elapsed_time": "1:16:41", "remaining_time": "7:55:01"}
+{"current_steps": 435, "total_steps": 3122, "loss": 2.1945, "learning_rate": 4.9767644982341014e-05, "epoch": 0.13931144915932747, "percentage": 13.93, "elapsed_time": "1:16:52", "remaining_time": "7:54:49"}
+{"current_steps": 436, "total_steps": 3122, "loss": 2.4707, "learning_rate": 4.9763826305919146e-05, "epoch": 0.13963170536429143, "percentage": 13.97, "elapsed_time": "1:17:02", "remaining_time": "7:54:37"}
+{"current_steps": 437, "total_steps": 3122, "loss": 2.5856, "learning_rate": 4.975997665430785e-05, "epoch": 0.1399519615692554, "percentage": 14.0, "elapsed_time": "1:17:12", "remaining_time": "7:54:24"}
+{"current_steps": 438, "total_steps": 3122, "loss": 2.2698, "learning_rate": 4.9756096032322376e-05, "epoch": 0.1402722177742194, "percentage": 14.03, "elapsed_time": "1:17:23", "remaining_time": "7:54:12"}
+{"current_steps": 439, "total_steps": 3122, "loss": 2.5266, "learning_rate": 4.975218444481668e-05, "epoch": 0.14059247397918334, "percentage": 14.06, "elapsed_time": "1:17:33", "remaining_time": "7:54:00"}
+{"current_steps": 440, "total_steps": 3122, "loss": 2.2826, "learning_rate": 4.974824189668348e-05, "epoch": 0.14091273018414732, "percentage": 14.09, "elapsed_time": "1:17:43", "remaining_time": "7:53:48"}
+{"current_steps": 441, "total_steps": 3122, "loss": 1.8341, "learning_rate": 4.974426839285422e-05, "epoch": 0.14123298638911128, "percentage": 14.13, "elapsed_time": "1:17:54", "remaining_time": "7:53:36"}
+{"current_steps": 442, "total_steps": 3122, "loss": 2.6753, "learning_rate": 4.9740263938299034e-05, "epoch": 0.14155324259407526, "percentage": 14.16, "elapsed_time": "1:18:04", "remaining_time": "7:53:24"}
+{"current_steps": 443, "total_steps": 3122, "loss": 2.436, "learning_rate": 4.973622853802681e-05, "epoch": 0.14187349879903924, "percentage": 14.19, "elapsed_time": "1:18:15", "remaining_time": "7:53:12"}
+{"current_steps": 444, "total_steps": 3122, "loss": 2.1716, "learning_rate": 4.97321621970851e-05, "epoch": 0.1421937550040032, "percentage": 14.22, "elapsed_time": "1:18:25", "remaining_time": "7:53:00"}
+{"current_steps": 445, "total_steps": 3122, "loss": 2.0777, "learning_rate": 4.97280649205602e-05, "epoch": 0.14251401120896717, "percentage": 14.25, "elapsed_time": "1:18:35", "remaining_time": "7:52:48"}
+{"current_steps": 446, "total_steps": 3122, "loss": 1.7713, "learning_rate": 4.9723936713577084e-05, "epoch": 0.14283426741393115, "percentage": 14.29, "elapsed_time": "1:18:46", "remaining_time": "7:52:36"}
+{"current_steps": 447, "total_steps": 3122, "loss": 2.645, "learning_rate": 4.97197775812994e-05, "epoch": 0.1431545236188951, "percentage": 14.32, "elapsed_time": "1:18:56", "remaining_time": "7:52:24"}
+{"current_steps": 448, "total_steps": 3122, "loss": 2.1758, "learning_rate": 4.97155875289295e-05, "epoch": 0.1434747798238591, "percentage": 14.35, "elapsed_time": "1:19:06", "remaining_time": "7:52:12"}
+{"current_steps": 449, "total_steps": 3122, "loss": 2.2733, "learning_rate": 4.9711366561708395e-05, "epoch": 0.14379503602882307, "percentage": 14.38, "elapsed_time": "1:19:17", "remaining_time": "7:52:00"}
+{"current_steps": 450, "total_steps": 3122, "loss": 1.9709, "learning_rate": 4.9707114684915776e-05, "epoch": 0.14411529223378702, "percentage": 14.41, "elapsed_time": "1:19:27", "remaining_time": "7:51:48"}
+{"current_steps": 451, "total_steps": 3122, "loss": 1.9222, "learning_rate": 4.9702831903869996e-05, "epoch": 0.144435548438751, "percentage": 14.45, "elapsed_time": "1:19:37", "remaining_time": "7:51:36"}
+{"current_steps": 452, "total_steps": 3122, "loss": 2.0273, "learning_rate": 4.969851822392805e-05, "epoch": 0.14475580464371496, "percentage": 14.48, "elapsed_time": "1:19:48", "remaining_time": "7:51:24"}
+{"current_steps": 453, "total_steps": 3122, "loss": 2.286, "learning_rate": 4.9694173650485595e-05, "epoch": 0.14507606084867894, "percentage": 14.51, "elapsed_time": "1:19:58", "remaining_time": "7:51:12"}
+{"current_steps": 454, "total_steps": 3122, "loss": 2.6001, "learning_rate": 4.968979818897694e-05, "epoch": 0.14539631705364292, "percentage": 14.54, "elapsed_time": "1:20:09", "remaining_time": "7:51:00"}
+{"current_steps": 455, "total_steps": 3122, "loss": 2.4443, "learning_rate": 4.968539184487502e-05, "epoch": 0.14571657325860687, "percentage": 14.57, "elapsed_time": "1:20:19", "remaining_time": "7:50:48"}
+{"current_steps": 456, "total_steps": 3122, "loss": 2.2168, "learning_rate": 4.9680954623691374e-05, "epoch": 0.14603682946357086, "percentage": 14.61, "elapsed_time": "1:20:29", "remaining_time": "7:50:37"}
+{"current_steps": 457, "total_steps": 3122, "loss": 2.4374, "learning_rate": 4.9676486530976196e-05, "epoch": 0.14635708566853484, "percentage": 14.64, "elapsed_time": "1:20:40", "remaining_time": "7:50:25"}
+{"current_steps": 458, "total_steps": 3122, "loss": 2.1691, "learning_rate": 4.967198757231829e-05, "epoch": 0.1466773418734988, "percentage": 14.67, "elapsed_time": "1:20:50", "remaining_time": "7:50:13"}
+{"current_steps": 459, "total_steps": 3122, "loss": 2.7222, "learning_rate": 4.966745775334505e-05, "epoch": 0.14699759807846277, "percentage": 14.7, "elapsed_time": "1:21:00", "remaining_time": "7:50:01"}
+{"current_steps": 460, "total_steps": 3122, "loss": 1.9953, "learning_rate": 4.966289707972249e-05, "epoch": 0.14731785428342675, "percentage": 14.73, "elapsed_time": "1:21:11", "remaining_time": "7:49:49"}
+{"current_steps": 461, "total_steps": 3122, "loss": 2.0458, "learning_rate": 4.965830555715522e-05, "epoch": 0.1476381104883907, "percentage": 14.77, "elapsed_time": "1:21:21", "remaining_time": "7:49:37"}
+{"current_steps": 462, "total_steps": 3122, "loss": 2.2034, "learning_rate": 4.9653683191386405e-05, "epoch": 0.1479583666933547, "percentage": 14.8, "elapsed_time": "1:21:31", "remaining_time": "7:49:25"}
+{"current_steps": 463, "total_steps": 3122, "loss": 2.0623, "learning_rate": 4.964902998819782e-05, "epoch": 0.14827862289831867, "percentage": 14.83, "elapsed_time": "1:21:42", "remaining_time": "7:49:13"}
+{"current_steps": 464, "total_steps": 3122, "loss": 2.0543, "learning_rate": 4.964434595340982e-05, "epoch": 0.14859887910328262, "percentage": 14.86, "elapsed_time": "1:21:52", "remaining_time": "7:49:02"}
+{"current_steps": 465, "total_steps": 3122, "loss": 1.7578, "learning_rate": 4.963963109288129e-05, "epoch": 0.1489191353082466, "percentage": 14.89, "elapsed_time": "1:22:03", "remaining_time": "7:48:50"}
+{"current_steps": 466, "total_steps": 3122, "loss": 1.9211, "learning_rate": 4.963488541250969e-05, "epoch": 0.14923939151321056, "percentage": 14.93, "elapsed_time": "1:22:13", "remaining_time": "7:48:38"}
+{"current_steps": 467, "total_steps": 3122, "loss": 2.1433, "learning_rate": 4.963010891823103e-05, "epoch": 0.14955964771817454, "percentage": 14.96, "elapsed_time": "1:22:23", "remaining_time": "7:48:26"}
+{"current_steps": 468, "total_steps": 3122, "loss": 2.7066, "learning_rate": 4.962530161601988e-05, "epoch": 0.14987990392313852, "percentage": 14.99, "elapsed_time": "1:22:34", "remaining_time": "7:48:14"}
+{"current_steps": 469, "total_steps": 3122, "loss": 1.7484, "learning_rate": 4.9620463511889314e-05, "epoch": 0.15020016012810247, "percentage": 15.02, "elapsed_time": "1:22:44", "remaining_time": "7:48:02"}
+{"current_steps": 470, "total_steps": 3122, "loss": 2.2189, "learning_rate": 4.961559461189096e-05, "epoch": 0.15052041633306645, "percentage": 15.05, "elapsed_time": "1:22:54", "remaining_time": "7:47:51"}
+{"current_steps": 471, "total_steps": 3122, "loss": 1.9058, "learning_rate": 4.961069492211494e-05, "epoch": 0.15084067253803043, "percentage": 15.09, "elapsed_time": "1:23:05", "remaining_time": "7:47:39"}
+{"current_steps": 472, "total_steps": 3122, "loss": 2.1691, "learning_rate": 4.960576444868992e-05, "epoch": 0.1511609287429944, "percentage": 15.12, "elapsed_time": "1:23:15", "remaining_time": "7:47:27"}
+{"current_steps": 473, "total_steps": 3122, "loss": 2.2587, "learning_rate": 4.960080319778305e-05, "epoch": 0.15148118494795837, "percentage": 15.15, "elapsed_time": "1:23:25", "remaining_time": "7:47:15"}
+{"current_steps": 474, "total_steps": 3122, "loss": 1.6996, "learning_rate": 4.959581117559998e-05, "epoch": 0.15180144115292235, "percentage": 15.18, "elapsed_time": "1:23:36", "remaining_time": "7:47:03"}
+{"current_steps": 475, "total_steps": 3122, "loss": 2.3875, "learning_rate": 4.959078838838485e-05, "epoch": 0.1521216973578863, "percentage": 15.21, "elapsed_time": "1:23:46", "remaining_time": "7:46:52"}
+{"current_steps": 476, "total_steps": 3122, "loss": 2.4589, "learning_rate": 4.958573484242027e-05, "epoch": 0.15244195356285029, "percentage": 15.25, "elapsed_time": "1:23:57", "remaining_time": "7:46:40"}
+{"current_steps": 477, "total_steps": 3122, "loss": 2.1532, "learning_rate": 4.9580650544027376e-05, "epoch": 0.15276220976781424, "percentage": 15.28, "elapsed_time": "1:24:07", "remaining_time": "7:46:28"}
+{"current_steps": 478, "total_steps": 3122, "loss": 2.2743, "learning_rate": 4.957553549956568e-05, "epoch": 0.15308246597277822, "percentage": 15.31, "elapsed_time": "1:24:17", "remaining_time": "7:46:16"}
+{"current_steps": 479, "total_steps": 3122, "loss": 1.9105, "learning_rate": 4.957038971543325e-05, "epoch": 0.1534027221777422, "percentage": 15.34, "elapsed_time": "1:24:28", "remaining_time": "7:46:05"}
+{"current_steps": 480, "total_steps": 3122, "loss": 2.2667, "learning_rate": 4.956521319806653e-05, "epoch": 0.15372297838270615, "percentage": 15.37, "elapsed_time": "1:24:38", "remaining_time": "7:45:53"}
+{"current_steps": 481, "total_steps": 3122, "loss": 1.9691, "learning_rate": 4.956000595394043e-05, "epoch": 0.15404323458767014, "percentage": 15.41, "elapsed_time": "1:24:48", "remaining_time": "7:45:41"}
+{"current_steps": 482, "total_steps": 3122, "loss": 1.549, "learning_rate": 4.955476798956831e-05, "epoch": 0.15436349079263412, "percentage": 15.44, "elapsed_time": "1:24:59", "remaining_time": "7:45:29"}
+{"current_steps": 483, "total_steps": 3122, "loss": 1.8682, "learning_rate": 4.954949931150193e-05, "epoch": 0.15468374699759807, "percentage": 15.47, "elapsed_time": "1:25:09", "remaining_time": "7:45:17"}
+{"current_steps": 484, "total_steps": 3122, "loss": 1.846, "learning_rate": 4.9544199926331484e-05, "epoch": 0.15500400320256205, "percentage": 15.5, "elapsed_time": "1:25:20", "remaining_time": "7:45:06"}
+{"current_steps": 485, "total_steps": 3122, "loss": 2.1578, "learning_rate": 4.953886984068558e-05, "epoch": 0.15532425940752603, "percentage": 15.53, "elapsed_time": "1:25:30", "remaining_time": "7:44:54"}
+{"current_steps": 486, "total_steps": 3122, "loss": 2.2433, "learning_rate": 4.95335090612312e-05, "epoch": 0.15564451561249, "percentage": 15.57, "elapsed_time": "1:25:40", "remaining_time": "7:44:42"}
+{"current_steps": 487, "total_steps": 3122, "loss": 2.2284, "learning_rate": 4.952811759467374e-05, "epoch": 0.15596477181745397, "percentage": 15.6, "elapsed_time": "1:25:51", "remaining_time": "7:44:31"}
+{"current_steps": 488, "total_steps": 3122, "loss": 2.5033, "learning_rate": 4.9522695447757e-05, "epoch": 0.15628502802241792, "percentage": 15.63, "elapsed_time": "1:26:01", "remaining_time": "7:44:19"}
+{"current_steps": 489, "total_steps": 3122, "loss": 1.7995, "learning_rate": 4.9517242627263096e-05, "epoch": 0.1566052842273819, "percentage": 15.66, "elapsed_time": "1:26:11", "remaining_time": "7:44:07"}
+{"current_steps": 490, "total_steps": 3122, "loss": 2.5606, "learning_rate": 4.951175914001256e-05, "epoch": 0.15692554043234588, "percentage": 15.7, "elapsed_time": "1:26:22", "remaining_time": "7:43:55"}
+{"current_steps": 491, "total_steps": 3122, "loss": 2.3475, "learning_rate": 4.950624499286428e-05, "epoch": 0.15724579663730984, "percentage": 15.73, "elapsed_time": "1:26:32", "remaining_time": "7:43:44"}
+{"current_steps": 492, "total_steps": 3122, "loss": 2.3772, "learning_rate": 4.950070019271547e-05, "epoch": 0.15756605284227382, "percentage": 15.76, "elapsed_time": "1:26:42", "remaining_time": "7:43:32"}
+{"current_steps": 493, "total_steps": 3122, "loss": 1.9745, "learning_rate": 4.949512474650171e-05, "epoch": 0.1578863090472378, "percentage": 15.79, "elapsed_time": "1:26:53", "remaining_time": "7:43:20"}
+{"current_steps": 494, "total_steps": 3122, "loss": 2.5581, "learning_rate": 4.94895186611969e-05, "epoch": 0.15820656525220175, "percentage": 15.82, "elapsed_time": "1:27:03", "remaining_time": "7:43:09"}
+{"current_steps": 495, "total_steps": 3122, "loss": 2.3336, "learning_rate": 4.948388194381326e-05, "epoch": 0.15852682145716573, "percentage": 15.86, "elapsed_time": "1:27:14", "remaining_time": "7:42:57"}
+{"current_steps": 496, "total_steps": 3122, "loss": 2.1051, "learning_rate": 4.947821460140134e-05, "epoch": 0.15884707766212972, "percentage": 15.89, "elapsed_time": "1:27:24", "remaining_time": "7:42:45"}
+{"current_steps": 497, "total_steps": 3122, "loss": 2.4866, "learning_rate": 4.947251664104998e-05, "epoch": 0.15916733386709367, "percentage": 15.92, "elapsed_time": "1:27:34", "remaining_time": "7:42:33"}
+{"current_steps": 498, "total_steps": 3122, "loss": 2.2679, "learning_rate": 4.946678806988633e-05, "epoch": 0.15948759007205765, "percentage": 15.95, "elapsed_time": "1:27:45", "remaining_time": "7:42:22"}
+{"current_steps": 499, "total_steps": 3122, "loss": 2.4515, "learning_rate": 4.9461028895075825e-05, "epoch": 0.1598078462770216, "percentage": 15.98, "elapsed_time": "1:27:55", "remaining_time": "7:42:10"}
+{"current_steps": 500, "total_steps": 3122, "loss": 1.6854, "learning_rate": 4.9455239123822184e-05, "epoch": 0.16012810248198558, "percentage": 16.02, "elapsed_time": "1:28:05", "remaining_time": "7:41:58"}
+{"current_steps": 501, "total_steps": 3122, "loss": 2.0233, "learning_rate": 4.944941876336738e-05, "epoch": 0.16044835868694957, "percentage": 16.05, "elapsed_time": "1:28:42", "remaining_time": "7:44:02"}
+{"current_steps": 502, "total_steps": 3122, "loss": 2.467, "learning_rate": 4.944356782099167e-05, "epoch": 0.16076861489191352, "percentage": 16.08, "elapsed_time": "1:28:52", "remaining_time": "7:43:50"}
+{"current_steps": 503, "total_steps": 3122, "loss": 2.4588, "learning_rate": 4.943768630401355e-05, "epoch": 0.1610888710968775, "percentage": 16.11, "elapsed_time": "1:29:02", "remaining_time": "7:43:38"}
+{"current_steps": 504, "total_steps": 3122, "loss": 2.4571, "learning_rate": 4.943177421978976e-05, "epoch": 0.16140912730184148, "percentage": 16.14, "elapsed_time": "1:29:13", "remaining_time": "7:43:26"}
+{"current_steps": 505, "total_steps": 3122, "loss": 2.6707, "learning_rate": 4.9425831575715286e-05, "epoch": 0.16172938350680544, "percentage": 16.18, "elapsed_time": "1:29:23", "remaining_time": "7:43:15"}
+{"current_steps": 506, "total_steps": 3122, "loss": 2.1903, "learning_rate": 4.941985837922332e-05, "epoch": 0.16204963971176942, "percentage": 16.21, "elapsed_time": "1:29:34", "remaining_time": "7:43:03"}
+{"current_steps": 507, "total_steps": 3122, "loss": 1.7641, "learning_rate": 4.941385463778528e-05, "epoch": 0.1623698959167334, "percentage": 16.24, "elapsed_time": "1:29:44", "remaining_time": "7:42:51"}
+{"current_steps": 508, "total_steps": 3122, "loss": 2.4916, "learning_rate": 4.9407820358910804e-05, "epoch": 0.16269015212169735, "percentage": 16.27, "elapsed_time": "1:29:54", "remaining_time": "7:42:40"}
+{"current_steps": 509, "total_steps": 3122, "loss": 2.0425, "learning_rate": 4.94017555501477e-05, "epoch": 0.16301040832666133, "percentage": 16.3, "elapsed_time": "1:30:05", "remaining_time": "7:42:28"}
+{"current_steps": 510, "total_steps": 3122, "loss": 2.0939, "learning_rate": 4.939566021908197e-05, "epoch": 0.1633306645316253, "percentage": 16.34, "elapsed_time": "1:30:15", "remaining_time": "7:42:17"}
+{"current_steps": 511, "total_steps": 3122, "loss": 2.3065, "learning_rate": 4.938953437333783e-05, "epoch": 0.16365092073658927, "percentage": 16.37, "elapsed_time": "1:30:26", "remaining_time": "7:42:05"}
+{"current_steps": 512, "total_steps": 3122, "loss": 2.7856, "learning_rate": 4.93833780205776e-05, "epoch": 0.16397117694155325, "percentage": 16.4, "elapsed_time": "1:30:36", "remaining_time": "7:41:53"}
+{"current_steps": 513, "total_steps": 3122, "loss": 2.3894, "learning_rate": 4.937719116850181e-05, "epoch": 0.1642914331465172, "percentage": 16.43, "elapsed_time": "1:30:46", "remaining_time": "7:41:42"}
+{"current_steps": 514, "total_steps": 3122, "loss": 2.5719, "learning_rate": 4.937097382484913e-05, "epoch": 0.16461168935148118, "percentage": 16.46, "elapsed_time": "1:30:57", "remaining_time": "7:41:30"}
+{"current_steps": 515, "total_steps": 3122, "loss": 1.8058, "learning_rate": 4.936472599739635e-05, "epoch": 0.16493194555644516, "percentage": 16.5, "elapsed_time": "1:31:07", "remaining_time": "7:41:18"}
+{"current_steps": 516, "total_steps": 3122, "loss": 2.2764, "learning_rate": 4.935844769395842e-05, "epoch": 0.16525220176140912, "percentage": 16.53, "elapsed_time": "1:31:18", "remaining_time": "7:41:06"}
+{"current_steps": 517, "total_steps": 3122, "loss": 1.6205, "learning_rate": 4.9352138922388375e-05, "epoch": 0.1655724579663731, "percentage": 16.56, "elapsed_time": "1:31:28", "remaining_time": "7:40:55"}
+{"current_steps": 518, "total_steps": 3122, "loss": 1.8822, "learning_rate": 4.9345799690577385e-05, "epoch": 0.16589271417133708, "percentage": 16.59, "elapsed_time": "1:31:38", "remaining_time": "7:40:43"}
+{"current_steps": 519, "total_steps": 3122, "loss": 2.3701, "learning_rate": 4.933943000645471e-05, "epoch": 0.16621297037630103, "percentage": 16.62, "elapsed_time": "1:31:49", "remaining_time": "7:40:31"}
+{"current_steps": 520, "total_steps": 3122, "loss": 2.474, "learning_rate": 4.9333029877987715e-05, "epoch": 0.16653322658126501, "percentage": 16.66, "elapsed_time": "1:31:59", "remaining_time": "7:40:19"}
+{"current_steps": 521, "total_steps": 3122, "loss": 2.0294, "learning_rate": 4.932659931318182e-05, "epoch": 0.166853482786229, "percentage": 16.69, "elapsed_time": "1:32:10", "remaining_time": "7:40:07"}
+{"current_steps": 522, "total_steps": 3122, "loss": 2.218, "learning_rate": 4.932013832008054e-05, "epoch": 0.16717373899119295, "percentage": 16.72, "elapsed_time": "1:32:20", "remaining_time": "7:39:55"}
+{"current_steps": 523, "total_steps": 3122, "loss": 2.5899, "learning_rate": 4.931364690676544e-05, "epoch": 0.16749399519615693, "percentage": 16.75, "elapsed_time": "1:32:30", "remaining_time": "7:39:43"}
+{"current_steps": 524, "total_steps": 3122, "loss": 1.828, "learning_rate": 4.930712508135613e-05, "epoch": 0.16781425140112088, "percentage": 16.78, "elapsed_time": "1:32:41", "remaining_time": "7:39:32"}
+{"current_steps": 525, "total_steps": 3122, "loss": 2.627, "learning_rate": 4.930057285201027e-05, "epoch": 0.16813450760608487, "percentage": 16.82, "elapsed_time": "1:32:51", "remaining_time": "7:39:20"}
+{"current_steps": 526, "total_steps": 3122, "loss": 2.1664, "learning_rate": 4.929399022692355e-05, "epoch": 0.16845476381104885, "percentage": 16.85, "elapsed_time": "1:33:01", "remaining_time": "7:39:08"}
+{"current_steps": 527, "total_steps": 3122, "loss": 1.8216, "learning_rate": 4.928737721432967e-05, "epoch": 0.1687750200160128, "percentage": 16.88, "elapsed_time": "1:33:12", "remaining_time": "7:38:56"}
+{"current_steps": 528, "total_steps": 3122, "loss": 1.9037, "learning_rate": 4.9280733822500346e-05, "epoch": 0.16909527622097678, "percentage": 16.91, "elapsed_time": "1:33:22", "remaining_time": "7:38:44"}
+{"current_steps": 529, "total_steps": 3122, "loss": 2.0505, "learning_rate": 4.927406005974529e-05, "epoch": 0.16941553242594076, "percentage": 16.94, "elapsed_time": "1:33:32", "remaining_time": "7:38:33"}
+{"current_steps": 530, "total_steps": 3122, "loss": 2.3799, "learning_rate": 4.9267355934412214e-05, "epoch": 0.16973578863090472, "percentage": 16.98, "elapsed_time": "1:33:43", "remaining_time": "7:38:21"}
+{"current_steps": 531, "total_steps": 3122, "loss": 2.2806, "learning_rate": 4.926062145488679e-05, "epoch": 0.1700560448358687, "percentage": 17.01, "elapsed_time": "1:33:53", "remaining_time": "7:38:09"}
+{"current_steps": 532, "total_steps": 3122, "loss": 2.4759, "learning_rate": 4.9253856629592663e-05, "epoch": 0.17037630104083268, "percentage": 17.04, "elapsed_time": "1:34:04", "remaining_time": "7:37:57"}
+{"current_steps": 533, "total_steps": 3122, "loss": 2.6853, "learning_rate": 4.924706146699146e-05, "epoch": 0.17069655724579663, "percentage": 17.07, "elapsed_time": "1:34:14", "remaining_time": "7:37:45"}
+{"current_steps": 534, "total_steps": 3122, "loss": 1.9226, "learning_rate": 4.924023597558271e-05, "epoch": 0.1710168134507606, "percentage": 17.1, "elapsed_time": "1:34:24", "remaining_time": "7:37:34"}
+{"current_steps": 535, "total_steps": 3122, "loss": 1.8459, "learning_rate": 4.923338016390392e-05, "epoch": 0.17133706965572457, "percentage": 17.14, "elapsed_time": "1:34:35", "remaining_time": "7:37:22"}
+{"current_steps": 536, "total_steps": 3122, "loss": 2.0748, "learning_rate": 4.922649404053048e-05, "epoch": 0.17165732586068855, "percentage": 17.17, "elapsed_time": "1:34:45", "remaining_time": "7:37:10"}
+{"current_steps": 537, "total_steps": 3122, "loss": 2.0169, "learning_rate": 4.921957761407575e-05, "epoch": 0.17197758206565253, "percentage": 17.2, "elapsed_time": "1:34:55", "remaining_time": "7:36:58"}
+{"current_steps": 538, "total_steps": 3122, "loss": 1.7651, "learning_rate": 4.921263089319095e-05, "epoch": 0.17229783827061648, "percentage": 17.23, "elapsed_time": "1:35:06", "remaining_time": "7:36:47"}
+{"current_steps": 539, "total_steps": 3122, "loss": 2.498, "learning_rate": 4.920565388656519e-05, "epoch": 0.17261809447558046, "percentage": 17.26, "elapsed_time": "1:35:16", "remaining_time": "7:36:35"}
+{"current_steps": 540, "total_steps": 3122, "loss": 2.1956, "learning_rate": 4.919864660292549e-05, "epoch": 0.17293835068054444, "percentage": 17.3, "elapsed_time": "1:35:26", "remaining_time": "7:36:23"}
+{"current_steps": 541, "total_steps": 3122, "loss": 2.4898, "learning_rate": 4.919160905103673e-05, "epoch": 0.1732586068855084, "percentage": 17.33, "elapsed_time": "1:35:37", "remaining_time": "7:36:11"}
+{"current_steps": 542, "total_steps": 3122, "loss": 2.1794, "learning_rate": 4.9184541239701666e-05, "epoch": 0.17357886309047238, "percentage": 17.36, "elapsed_time": "1:35:47", "remaining_time": "7:35:59"}
+{"current_steps": 543, "total_steps": 3122, "loss": 2.1124, "learning_rate": 4.9177443177760854e-05, "epoch": 0.17389911929543636, "percentage": 17.39, "elapsed_time": "1:35:58", "remaining_time": "7:35:48"}
+{"current_steps": 544, "total_steps": 3122, "loss": 2.161, "learning_rate": 4.9170314874092734e-05, "epoch": 0.17421937550040031, "percentage": 17.42, "elapsed_time": "1:36:08", "remaining_time": "7:35:36"}
+{"current_steps": 545, "total_steps": 3122, "loss": 2.2314, "learning_rate": 4.916315633761356e-05, "epoch": 0.1745396317053643, "percentage": 17.46, "elapsed_time": "1:36:18", "remaining_time": "7:35:24"}
+{"current_steps": 546, "total_steps": 3122, "loss": 1.9608, "learning_rate": 4.915596757727741e-05, "epoch": 0.17485988791032825, "percentage": 17.49, "elapsed_time": "1:36:29", "remaining_time": "7:35:12"}
+{"current_steps": 547, "total_steps": 3122, "loss": 1.8623, "learning_rate": 4.9148748602076146e-05, "epoch": 0.17518014411529223, "percentage": 17.52, "elapsed_time": "1:36:39", "remaining_time": "7:35:01"}
+{"current_steps": 548, "total_steps": 3122, "loss": 2.0954, "learning_rate": 4.914149942103944e-05, "epoch": 0.1755004003202562, "percentage": 17.55, "elapsed_time": "1:36:49", "remaining_time": "7:34:49"}
+{"current_steps": 549, "total_steps": 3122, "loss": 2.0595, "learning_rate": 4.913422004323474e-05, "epoch": 0.17582065652522016, "percentage": 17.58, "elapsed_time": "1:37:00", "remaining_time": "7:34:37"}
+{"current_steps": 550, "total_steps": 3122, "loss": 2.1955, "learning_rate": 4.912691047776727e-05, "epoch": 0.17614091273018415, "percentage": 17.62, "elapsed_time": "1:37:10", "remaining_time": "7:34:26"}
+{"current_steps": 551, "total_steps": 3122, "loss": 2.0215, "learning_rate": 4.9119570733780015e-05, "epoch": 0.17646116893514813, "percentage": 17.65, "elapsed_time": "1:37:20", "remaining_time": "7:34:14"}
+{"current_steps": 552, "total_steps": 3122, "loss": 2.29, "learning_rate": 4.91122008204537e-05, "epoch": 0.17678142514011208, "percentage": 17.68, "elapsed_time": "1:37:31", "remaining_time": "7:34:02"}
+{"current_steps": 553, "total_steps": 3122, "loss": 2.1564, "learning_rate": 4.910480074700678e-05, "epoch": 0.17710168134507606, "percentage": 17.71, "elapsed_time": "1:37:41", "remaining_time": "7:33:51"}
+{"current_steps": 554, "total_steps": 3122, "loss": 2.0404, "learning_rate": 4.909737052269545e-05, "epoch": 0.17742193755004004, "percentage": 17.75, "elapsed_time": "1:37:52", "remaining_time": "7:33:39"}
+{"current_steps": 555, "total_steps": 3122, "loss": 2.3606, "learning_rate": 4.908991015681362e-05, "epoch": 0.177742193755004, "percentage": 17.78, "elapsed_time": "1:38:02", "remaining_time": "7:33:27"}
+{"current_steps": 556, "total_steps": 3122, "loss": 2.4787, "learning_rate": 4.908241965869289e-05, "epoch": 0.17806244995996798, "percentage": 17.81, "elapsed_time": "1:38:12", "remaining_time": "7:33:16"}
+{"current_steps": 557, "total_steps": 3122, "loss": 2.3174, "learning_rate": 4.907489903770256e-05, "epoch": 0.17838270616493196, "percentage": 17.84, "elapsed_time": "1:38:23", "remaining_time": "7:33:04"}
+{"current_steps": 558, "total_steps": 3122, "loss": 2.5595, "learning_rate": 4.9067348303249594e-05, "epoch": 0.1787029623698959, "percentage": 17.87, "elapsed_time": "1:38:33", "remaining_time": "7:32:52"}
+{"current_steps": 559, "total_steps": 3122, "loss": 2.6765, "learning_rate": 4.905976746477864e-05, "epoch": 0.1790232185748599, "percentage": 17.91, "elapsed_time": "1:38:43", "remaining_time": "7:32:41"}
+{"current_steps": 560, "total_steps": 3122, "loss": 2.6524, "learning_rate": 4.905215653177199e-05, "epoch": 0.17934347477982385, "percentage": 17.94, "elapsed_time": "1:38:54", "remaining_time": "7:32:29"}
+{"current_steps": 561, "total_steps": 3122, "loss": 2.497, "learning_rate": 4.904451551374959e-05, "epoch": 0.17966373098478783, "percentage": 17.97, "elapsed_time": "1:39:04", "remaining_time": "7:32:17"}
+{"current_steps": 562, "total_steps": 3122, "loss": 2.0149, "learning_rate": 4.903684442026899e-05, "epoch": 0.1799839871897518, "percentage": 18.0, "elapsed_time": "1:39:15", "remaining_time": "7:32:06"}
+{"current_steps": 563, "total_steps": 3122, "loss": 2.1776, "learning_rate": 4.9029143260925395e-05, "epoch": 0.18030424339471576, "percentage": 18.03, "elapsed_time": "1:39:25", "remaining_time": "7:31:54"}
+{"current_steps": 564, "total_steps": 3122, "loss": 1.8415, "learning_rate": 4.902141204535159e-05, "epoch": 0.18062449959967974, "percentage": 18.07, "elapsed_time": "1:39:35", "remaining_time": "7:31:42"}
+{"current_steps": 565, "total_steps": 3122, "loss": 2.2762, "learning_rate": 4.901365078321798e-05, "epoch": 0.18094475580464373, "percentage": 18.1, "elapsed_time": "1:39:46", "remaining_time": "7:31:31"}
+{"current_steps": 566, "total_steps": 3122, "loss": 2.6546, "learning_rate": 4.9005859484232526e-05, "epoch": 0.18126501200960768, "percentage": 18.13, "elapsed_time": "1:39:56", "remaining_time": "7:31:19"}
+{"current_steps": 567, "total_steps": 3122, "loss": 2.1712, "learning_rate": 4.899803815814077e-05, "epoch": 0.18158526821457166, "percentage": 18.16, "elapsed_time": "1:40:06", "remaining_time": "7:31:07"}
+{"current_steps": 568, "total_steps": 3122, "loss": 2.5383, "learning_rate": 4.899018681472582e-05, "epoch": 0.18190552441953564, "percentage": 18.19, "elapsed_time": "1:40:17", "remaining_time": "7:30:56"}
+{"current_steps": 569, "total_steps": 3122, "loss": 2.3668, "learning_rate": 4.8982305463808334e-05, "epoch": 0.1822257806244996, "percentage": 18.23, "elapsed_time": "1:40:27", "remaining_time": "7:30:44"}
+{"current_steps": 570, "total_steps": 3122, "loss": 2.4888, "learning_rate": 4.897439411524648e-05, "epoch": 0.18254603682946358, "percentage": 18.26, "elapsed_time": "1:40:37", "remaining_time": "7:30:33"}
+{"current_steps": 571, "total_steps": 3122, "loss": 1.5993, "learning_rate": 4.896645277893597e-05, "epoch": 0.18286629303442753, "percentage": 18.29, "elapsed_time": "1:40:48", "remaining_time": "7:30:21"}
+{"current_steps": 572, "total_steps": 3122, "loss": 2.1428, "learning_rate": 4.895848146481002e-05, "epoch": 0.1831865492393915, "percentage": 18.32, "elapsed_time": "1:40:58", "remaining_time": "7:30:09"}
+{"current_steps": 573, "total_steps": 3122, "loss": 2.6575, "learning_rate": 4.895048018283933e-05, "epoch": 0.1835068054443555, "percentage": 18.35, "elapsed_time": "1:41:09", "remaining_time": "7:29:58"}
+{"current_steps": 574, "total_steps": 3122, "loss": 2.0452, "learning_rate": 4.8942448943032116e-05, "epoch": 0.18382706164931945, "percentage": 18.39, "elapsed_time": "1:41:19", "remaining_time": "7:29:46"}
+{"current_steps": 575, "total_steps": 3122, "loss": 1.9505, "learning_rate": 4.893438775543403e-05, "epoch": 0.18414731785428343, "percentage": 18.42, "elapsed_time": "1:41:29", "remaining_time": "7:29:35"}
+{"current_steps": 576, "total_steps": 3122, "loss": 1.9657, "learning_rate": 4.89262966301282e-05, "epoch": 0.1844675740592474, "percentage": 18.45, "elapsed_time": "1:41:40", "remaining_time": "7:29:23"}
+{"current_steps": 577, "total_steps": 3122, "loss": 2.5377, "learning_rate": 4.8918175577235214e-05, "epoch": 0.18478783026421136, "percentage": 18.48, "elapsed_time": "1:41:50", "remaining_time": "7:29:11"}
+{"current_steps": 578, "total_steps": 3122, "loss": 2.1608, "learning_rate": 4.891002460691306e-05, "epoch": 0.18510808646917534, "percentage": 18.51, "elapsed_time": "1:42:00", "remaining_time": "7:29:00"}
+{"current_steps": 579, "total_steps": 3122, "loss": 2.0481, "learning_rate": 4.890184372935719e-05, "epoch": 0.18542834267413932, "percentage": 18.55, "elapsed_time": "1:42:11", "remaining_time": "7:28:48"}
+{"current_steps": 580, "total_steps": 3122, "loss": 1.9898, "learning_rate": 4.889363295480042e-05, "epoch": 0.18574859887910328, "percentage": 18.58, "elapsed_time": "1:42:21", "remaining_time": "7:28:37"}
+{"current_steps": 581, "total_steps": 3122, "loss": 2.3255, "learning_rate": 4.8885392293513e-05, "epoch": 0.18606885508406726, "percentage": 18.61, "elapsed_time": "1:42:31", "remaining_time": "7:28:25"}
+{"current_steps": 582, "total_steps": 3122, "loss": 2.2675, "learning_rate": 4.8877121755802536e-05, "epoch": 0.1863891112890312, "percentage": 18.64, "elapsed_time": "1:42:42", "remaining_time": "7:28:14"}
+{"current_steps": 583, "total_steps": 3122, "loss": 2.2714, "learning_rate": 4.8868821352014024e-05, "epoch": 0.1867093674939952, "percentage": 18.67, "elapsed_time": "1:42:52", "remaining_time": "7:28:02"}
+{"current_steps": 584, "total_steps": 3122, "loss": 2.0052, "learning_rate": 4.886049109252981e-05, "epoch": 0.18702962369895917, "percentage": 18.71, "elapsed_time": "1:43:03", "remaining_time": "7:27:50"}
+{"current_steps": 585, "total_steps": 3122, "loss": 2.4493, "learning_rate": 4.8852130987769574e-05, "epoch": 0.18734987990392313, "percentage": 18.74, "elapsed_time": "1:43:13", "remaining_time": "7:27:39"}
+{"current_steps": 586, "total_steps": 3122, "loss": 2.2796, "learning_rate": 4.884374104819035e-05, "epoch": 0.1876701361088871, "percentage": 18.77, "elapsed_time": "1:43:23", "remaining_time": "7:27:27"}
+{"current_steps": 587, "total_steps": 3122, "loss": 1.4809, "learning_rate": 4.883532128428645e-05, "epoch": 0.1879903923138511, "percentage": 18.8, "elapsed_time": "1:43:34", "remaining_time": "7:27:16"}
+{"current_steps": 588, "total_steps": 3122, "loss": 1.5241, "learning_rate": 4.882687170658955e-05, "epoch": 0.18831064851881504, "percentage": 18.83, "elapsed_time": "1:43:44", "remaining_time": "7:27:04"}
+{"current_steps": 589, "total_steps": 3122, "loss": 2.1891, "learning_rate": 4.881839232566856e-05, "epoch": 0.18863090472377902, "percentage": 18.87, "elapsed_time": "1:43:54", "remaining_time": "7:26:53"}
+{"current_steps": 590, "total_steps": 3122, "loss": 2.2043, "learning_rate": 4.880988315212971e-05, "epoch": 0.188951160928743, "percentage": 18.9, "elapsed_time": "1:44:05", "remaining_time": "7:26:41"}
+{"current_steps": 591, "total_steps": 3122, "loss": 2.3487, "learning_rate": 4.880134419661647e-05, "epoch": 0.18927141713370696, "percentage": 18.93, "elapsed_time": "1:44:15", "remaining_time": "7:26:30"}
+{"current_steps": 592, "total_steps": 3122, "loss": 2.6678, "learning_rate": 4.879277546980957e-05, "epoch": 0.18959167333867094, "percentage": 18.96, "elapsed_time": "1:44:25", "remaining_time": "7:26:18"}
+{"current_steps": 593, "total_steps": 3122, "loss": 2.1424, "learning_rate": 4.8784176982426984e-05, "epoch": 0.1899119295436349, "percentage": 18.99, "elapsed_time": "1:44:36", "remaining_time": "7:26:07"}
+{"current_steps": 594, "total_steps": 3122, "loss": 2.3376, "learning_rate": 4.87755487452239e-05, "epoch": 0.19023218574859888, "percentage": 19.03, "elapsed_time": "1:44:46", "remaining_time": "7:25:55"}
+{"current_steps": 595, "total_steps": 3122, "loss": 2.4265, "learning_rate": 4.8766890768992734e-05, "epoch": 0.19055244195356286, "percentage": 19.06, "elapsed_time": "1:44:57", "remaining_time": "7:25:44"}
+{"current_steps": 596, "total_steps": 3122, "loss": 2.366, "learning_rate": 4.875820306456309e-05, "epoch": 0.1908726981585268, "percentage": 19.09, "elapsed_time": "1:45:07", "remaining_time": "7:25:32"}
+{"current_steps": 597, "total_steps": 3122, "loss": 2.4942, "learning_rate": 4.8749485642801754e-05, "epoch": 0.1911929543634908, "percentage": 19.12, "elapsed_time": "1:45:17", "remaining_time": "7:25:21"}
+{"current_steps": 598, "total_steps": 3122, "loss": 1.9429, "learning_rate": 4.874073851461268e-05, "epoch": 0.19151321056845477, "percentage": 19.15, "elapsed_time": "1:45:28", "remaining_time": "7:25:09"}
+{"current_steps": 599, "total_steps": 3122, "loss": 2.1505, "learning_rate": 4.873196169093699e-05, "epoch": 0.19183346677341873, "percentage": 19.19, "elapsed_time": "1:45:38", "remaining_time": "7:24:58"}
+{"current_steps": 600, "total_steps": 3122, "loss": 2.373, "learning_rate": 4.872315518275296e-05, "epoch": 0.1921537229783827, "percentage": 19.22, "elapsed_time": "1:45:48", "remaining_time": "7:24:46"}
+{"current_steps": 601, "total_steps": 3122, "loss": 2.2588, "learning_rate": 4.871431900107597e-05, "epoch": 0.1924739791833467, "percentage": 19.25, "elapsed_time": "1:46:26", "remaining_time": "7:26:28"}
+{"current_steps": 602, "total_steps": 3122, "loss": 2.6125, "learning_rate": 4.870545315695853e-05, "epoch": 0.19279423538831064, "percentage": 19.28, "elapsed_time": "1:46:36", "remaining_time": "7:26:16"}
+{"current_steps": 603, "total_steps": 3122, "loss": 2.489, "learning_rate": 4.869655766149024e-05, "epoch": 0.19311449159327462, "percentage": 19.31, "elapsed_time": "1:46:47", "remaining_time": "7:26:05"}
+{"current_steps": 604, "total_steps": 3122, "loss": 2.29, "learning_rate": 4.868763252579782e-05, "epoch": 0.1934347477982386, "percentage": 19.35, "elapsed_time": "1:46:57", "remaining_time": "7:25:53"}
+{"current_steps": 605, "total_steps": 3122, "loss": 2.3659, "learning_rate": 4.867867776104503e-05, "epoch": 0.19375500400320256, "percentage": 19.38, "elapsed_time": "1:47:07", "remaining_time": "7:25:42"}
+{"current_steps": 606, "total_steps": 3122, "loss": 1.8565, "learning_rate": 4.866969337843271e-05, "epoch": 0.19407526020816654, "percentage": 19.41, "elapsed_time": "1:47:18", "remaining_time": "7:25:30"}
+{"current_steps": 607, "total_steps": 3122, "loss": 2.5902, "learning_rate": 4.8660679389198746e-05, "epoch": 0.1943955164131305, "percentage": 19.44, "elapsed_time": "1:47:28", "remaining_time": "7:25:19"}
+{"current_steps": 608, "total_steps": 3122, "loss": 2.3034, "learning_rate": 4.8651635804618046e-05, "epoch": 0.19471577261809447, "percentage": 19.47, "elapsed_time": "1:47:39", "remaining_time": "7:25:07"}
+{"current_steps": 609, "total_steps": 3122, "loss": 2.4728, "learning_rate": 4.8642562636002546e-05, "epoch": 0.19503602882305845, "percentage": 19.51, "elapsed_time": "1:47:49", "remaining_time": "7:24:56"}
+{"current_steps": 610, "total_steps": 3122, "loss": 2.1875, "learning_rate": 4.8633459894701186e-05, "epoch": 0.1953562850280224, "percentage": 19.54, "elapsed_time": "1:48:00", "remaining_time": "7:24:44"}
+{"current_steps": 611, "total_steps": 3122, "loss": 2.2461, "learning_rate": 4.8624327592099884e-05, "epoch": 0.1956765412329864, "percentage": 19.57, "elapsed_time": "1:48:10", "remaining_time": "7:24:33"}
+{"current_steps": 612, "total_steps": 3122, "loss": 1.8182, "learning_rate": 4.861516573962156e-05, "epoch": 0.19599679743795037, "percentage": 19.6, "elapsed_time": "1:48:20", "remaining_time": "7:24:21"}
+{"current_steps": 613, "total_steps": 3122, "loss": 1.7308, "learning_rate": 4.860597434872606e-05, "epoch": 0.19631705364291432, "percentage": 19.63, "elapsed_time": "1:48:31", "remaining_time": "7:24:10"}
+{"current_steps": 614, "total_steps": 3122, "loss": 2.5587, "learning_rate": 4.859675343091021e-05, "epoch": 0.1966373098478783, "percentage": 19.67, "elapsed_time": "1:48:41", "remaining_time": "7:23:58"}
+{"current_steps": 615, "total_steps": 3122, "loss": 2.2981, "learning_rate": 4.858750299770774e-05, "epoch": 0.1969575660528423, "percentage": 19.7, "elapsed_time": "1:48:52", "remaining_time": "7:23:47"}
+{"current_steps": 616, "total_steps": 3122, "loss": 2.356, "learning_rate": 4.8578223060689346e-05, "epoch": 0.19727782225780624, "percentage": 19.73, "elapsed_time": "1:49:02", "remaining_time": "7:23:35"}
+{"current_steps": 617, "total_steps": 3122, "loss": 1.9542, "learning_rate": 4.8568913631462565e-05, "epoch": 0.19759807846277022, "percentage": 19.76, "elapsed_time": "1:49:12", "remaining_time": "7:23:24"}
+{"current_steps": 618, "total_steps": 3122, "loss": 2.3769, "learning_rate": 4.855957472167187e-05, "epoch": 0.19791833466773417, "percentage": 19.8, "elapsed_time": "1:49:23", "remaining_time": "7:23:12"}
+{"current_steps": 619, "total_steps": 3122, "loss": 2.4044, "learning_rate": 4.85502063429986e-05, "epoch": 0.19823859087269816, "percentage": 19.83, "elapsed_time": "1:49:33", "remaining_time": "7:23:00"}
+{"current_steps": 620, "total_steps": 3122, "loss": 2.4242, "learning_rate": 4.8540808507160926e-05, "epoch": 0.19855884707766214, "percentage": 19.86, "elapsed_time": "1:49:43", "remaining_time": "7:22:49"}
+{"current_steps": 621, "total_steps": 3122, "loss": 2.3783, "learning_rate": 4.85313812259139e-05, "epoch": 0.1988791032826261, "percentage": 19.89, "elapsed_time": "1:49:54", "remaining_time": "7:22:37"}
+{"current_steps": 622, "total_steps": 3122, "loss": 2.5425, "learning_rate": 4.85219245110494e-05, "epoch": 0.19919935948759007, "percentage": 19.92, "elapsed_time": "1:50:04", "remaining_time": "7:22:25"}
+{"current_steps": 623, "total_steps": 3122, "loss": 2.3095, "learning_rate": 4.8512438374396095e-05, "epoch": 0.19951961569255405, "percentage": 19.96, "elapsed_time": "1:50:14", "remaining_time": "7:22:14"}
+{"current_steps": 624, "total_steps": 3122, "loss": 2.5806, "learning_rate": 4.850292282781949e-05, "epoch": 0.199839871897518, "percentage": 19.99, "elapsed_time": "1:50:25", "remaining_time": "7:22:02"}
+{"current_steps": 625, "total_steps": 3122, "loss": 2.4287, "learning_rate": 4.849337788322185e-05, "epoch": 0.200160128102482, "percentage": 20.02, "elapsed_time": "1:50:35", "remaining_time": "7:21:50"}
+{"current_steps": 626, "total_steps": 3122, "loss": 2.6023, "learning_rate": 4.848380355254222e-05, "epoch": 0.20048038430744597, "percentage": 20.05, "elapsed_time": "1:50:46", "remaining_time": "7:21:39"}
+{"current_steps": 627, "total_steps": 3122, "loss": 2.0865, "learning_rate": 4.847419984775641e-05, "epoch": 0.20080064051240992, "percentage": 20.08, "elapsed_time": "1:50:56", "remaining_time": "7:21:27"}
+{"current_steps": 628, "total_steps": 3122, "loss": 1.8258, "learning_rate": 4.8464566780876954e-05, "epoch": 0.2011208967173739, "percentage": 20.12, "elapsed_time": "1:51:06", "remaining_time": "7:21:15"}
+{"current_steps": 629, "total_steps": 3122, "loss": 2.2667, "learning_rate": 4.845490436395314e-05, "epoch": 0.20144115292233786, "percentage": 20.15, "elapsed_time": "1:51:17", "remaining_time": "7:21:04"}
+{"current_steps": 630, "total_steps": 3122, "loss": 2.394, "learning_rate": 4.8445212609070934e-05, "epoch": 0.20176140912730184, "percentage": 20.18, "elapsed_time": "1:51:27", "remaining_time": "7:20:52"}
+{"current_steps": 631, "total_steps": 3122, "loss": 2.6123, "learning_rate": 4.8435491528353026e-05, "epoch": 0.20208166533226582, "percentage": 20.21, "elapsed_time": "1:51:37", "remaining_time": "7:20:40"}
+{"current_steps": 632, "total_steps": 3122, "loss": 2.2056, "learning_rate": 4.8425741133958774e-05, "epoch": 0.20240192153722977, "percentage": 20.24, "elapsed_time": "1:51:48", "remaining_time": "7:20:29"}
+{"current_steps": 633, "total_steps": 3122, "loss": 2.6455, "learning_rate": 4.841596143808421e-05, "epoch": 0.20272217774219375, "percentage": 20.28, "elapsed_time": "1:51:58", "remaining_time": "7:20:17"}
+{"current_steps": 634, "total_steps": 3122, "loss": 2.1008, "learning_rate": 4.840615245296201e-05, "epoch": 0.20304243394715774, "percentage": 20.31, "elapsed_time": "1:52:08", "remaining_time": "7:20:06"}
+{"current_steps": 635, "total_steps": 3122, "loss": 1.9474, "learning_rate": 4.8396314190861495e-05, "epoch": 0.2033626901521217, "percentage": 20.34, "elapsed_time": "1:52:19", "remaining_time": "7:19:54"}
+{"current_steps": 636, "total_steps": 3122, "loss": 2.1314, "learning_rate": 4.838644666408858e-05, "epoch": 0.20368294635708567, "percentage": 20.37, "elapsed_time": "1:52:29", "remaining_time": "7:19:42"}
+{"current_steps": 637, "total_steps": 3122, "loss": 2.4542, "learning_rate": 4.8376549884985825e-05, "epoch": 0.20400320256204965, "percentage": 20.4, "elapsed_time": "1:52:39", "remaining_time": "7:19:31"}
+{"current_steps": 638, "total_steps": 3122, "loss": 2.2233, "learning_rate": 4.836662386593235e-05, "epoch": 0.2043234587670136, "percentage": 20.44, "elapsed_time": "1:52:50", "remaining_time": "7:19:19"}
+{"current_steps": 639, "total_steps": 3122, "loss": 1.8406, "learning_rate": 4.835666861934387e-05, "epoch": 0.20464371497197759, "percentage": 20.47, "elapsed_time": "1:53:00", "remaining_time": "7:19:07"}
+{"current_steps": 640, "total_steps": 3122, "loss": 2.3927, "learning_rate": 4.834668415767263e-05, "epoch": 0.20496397117694154, "percentage": 20.5, "elapsed_time": "1:53:10", "remaining_time": "7:18:56"}
+{"current_steps": 641, "total_steps": 3122, "loss": 2.4086, "learning_rate": 4.833667049340744e-05, "epoch": 0.20528422738190552, "percentage": 20.53, "elapsed_time": "1:53:21", "remaining_time": "7:18:44"}
+{"current_steps": 642, "total_steps": 3122, "loss": 1.7985, "learning_rate": 4.832662763907363e-05, "epoch": 0.2056044835868695, "percentage": 20.56, "elapsed_time": "1:53:31", "remaining_time": "7:18:33"}
+{"current_steps": 643, "total_steps": 3122, "loss": 2.2216, "learning_rate": 4.831655560723306e-05, "epoch": 0.20592473979183346, "percentage": 20.6, "elapsed_time": "1:53:42", "remaining_time": "7:18:21"}
+{"current_steps": 644, "total_steps": 3122, "loss": 2.4505, "learning_rate": 4.8306454410484055e-05, "epoch": 0.20624499599679744, "percentage": 20.63, "elapsed_time": "1:53:52", "remaining_time": "7:18:09"}
+{"current_steps": 645, "total_steps": 3122, "loss": 2.1029, "learning_rate": 4.829632406146143e-05, "epoch": 0.20656525220176142, "percentage": 20.66, "elapsed_time": "1:54:02", "remaining_time": "7:17:58"}
+{"current_steps": 646, "total_steps": 3122, "loss": 2.4966, "learning_rate": 4.828616457283648e-05, "epoch": 0.20688550840672537, "percentage": 20.69, "elapsed_time": "1:54:13", "remaining_time": "7:17:46"}
+{"current_steps": 647, "total_steps": 3122, "loss": 1.7865, "learning_rate": 4.8275975957316943e-05, "epoch": 0.20720576461168935, "percentage": 20.72, "elapsed_time": "1:54:23", "remaining_time": "7:17:35"}
+{"current_steps": 648, "total_steps": 3122, "loss": 1.674, "learning_rate": 4.826575822764696e-05, "epoch": 0.20752602081665333, "percentage": 20.76, "elapsed_time": "1:54:33", "remaining_time": "7:17:23"}
+{"current_steps": 649, "total_steps": 3122, "loss": 1.9932, "learning_rate": 4.825551139660715e-05, "epoch": 0.2078462770216173, "percentage": 20.79, "elapsed_time": "1:54:44", "remaining_time": "7:17:12"}
+{"current_steps": 650, "total_steps": 3122, "loss": 2.18, "learning_rate": 4.824523547701445e-05, "epoch": 0.20816653322658127, "percentage": 20.82, "elapsed_time": "1:54:54", "remaining_time": "7:17:00"}
+{"current_steps": 651, "total_steps": 3122, "loss": 1.9729, "learning_rate": 4.8234930481722264e-05, "epoch": 0.20848678943154525, "percentage": 20.85, "elapsed_time": "1:55:04", "remaining_time": "7:16:48"}
+{"current_steps": 652, "total_steps": 3122, "loss": 2.0876, "learning_rate": 4.8224596423620315e-05, "epoch": 0.2088070456365092, "percentage": 20.88, "elapsed_time": "1:55:15", "remaining_time": "7:16:37"}
+{"current_steps": 653, "total_steps": 3122, "loss": 2.0135, "learning_rate": 4.821423331563469e-05, "epoch": 0.20912730184147318, "percentage": 20.92, "elapsed_time": "1:55:25", "remaining_time": "7:16:25"}
+{"current_steps": 654, "total_steps": 3122, "loss": 2.3225, "learning_rate": 4.820384117072781e-05, "epoch": 0.20944755804643714, "percentage": 20.95, "elapsed_time": "1:55:35", "remaining_time": "7:16:14"}
+{"current_steps": 655, "total_steps": 3122, "loss": 1.6923, "learning_rate": 4.819342000189844e-05, "epoch": 0.20976781425140112, "percentage": 20.98, "elapsed_time": "1:55:46", "remaining_time": "7:16:02"}
+{"current_steps": 656, "total_steps": 3122, "loss": 2.1741, "learning_rate": 4.818296982218161e-05, "epoch": 0.2100880704563651, "percentage": 21.01, "elapsed_time": "1:55:56", "remaining_time": "7:15:51"}
+{"current_steps": 657, "total_steps": 3122, "loss": 2.285, "learning_rate": 4.817249064464865e-05, "epoch": 0.21040832666132905, "percentage": 21.04, "elapsed_time": "1:56:07", "remaining_time": "7:15:39"}
+{"current_steps": 658, "total_steps": 3122, "loss": 2.1315, "learning_rate": 4.816198248240718e-05, "epoch": 0.21072858286629303, "percentage": 21.08, "elapsed_time": "1:56:17", "remaining_time": "7:15:28"}
+{"current_steps": 659, "total_steps": 3122, "loss": 1.9737, "learning_rate": 4.815144534860106e-05, "epoch": 0.21104883907125702, "percentage": 21.11, "elapsed_time": "1:56:27", "remaining_time": "7:15:16"}
+{"current_steps": 660, "total_steps": 3122, "loss": 1.6167, "learning_rate": 4.81408792564104e-05, "epoch": 0.21136909527622097, "percentage": 21.14, "elapsed_time": "1:56:38", "remaining_time": "7:15:04"}
+{"current_steps": 661, "total_steps": 3122, "loss": 2.4866, "learning_rate": 4.8130284219051494e-05, "epoch": 0.21168935148118495, "percentage": 21.17, "elapsed_time": "1:56:48", "remaining_time": "7:14:53"}
+{"current_steps": 662, "total_steps": 3122, "loss": 2.2202, "learning_rate": 4.81196602497769e-05, "epoch": 0.21200960768614893, "percentage": 21.2, "elapsed_time": "1:56:58", "remaining_time": "7:14:41"}
+{"current_steps": 663, "total_steps": 3122, "loss": 2.1335, "learning_rate": 4.810900736187531e-05, "epoch": 0.21232986389111289, "percentage": 21.24, "elapsed_time": "1:57:09", "remaining_time": "7:14:30"}
+{"current_steps": 664, "total_steps": 3122, "loss": 2.0997, "learning_rate": 4.809832556867164e-05, "epoch": 0.21265012009607687, "percentage": 21.27, "elapsed_time": "1:57:19", "remaining_time": "7:14:18"}
+{"current_steps": 665, "total_steps": 3122, "loss": 2.5337, "learning_rate": 4.80876148835269e-05, "epoch": 0.21297037630104082, "percentage": 21.3, "elapsed_time": "1:57:29", "remaining_time": "7:14:07"}
+{"current_steps": 666, "total_steps": 3122, "loss": 2.4361, "learning_rate": 4.80768753198383e-05, "epoch": 0.2132906325060048, "percentage": 21.33, "elapsed_time": "1:57:40", "remaining_time": "7:13:55"}
+{"current_steps": 667, "total_steps": 3122, "loss": 2.7403, "learning_rate": 4.8066106891039135e-05, "epoch": 0.21361088871096878, "percentage": 21.36, "elapsed_time": "1:57:50", "remaining_time": "7:13:44"}
+{"current_steps": 668, "total_steps": 3122, "loss": 1.8824, "learning_rate": 4.805530961059881e-05, "epoch": 0.21393114491593274, "percentage": 21.4, "elapsed_time": "1:58:00", "remaining_time": "7:13:32"}
+{"current_steps": 669, "total_steps": 3122, "loss": 1.9837, "learning_rate": 4.804448349202283e-05, "epoch": 0.21425140112089672, "percentage": 21.43, "elapsed_time": "1:58:11", "remaining_time": "7:13:21"}
+{"current_steps": 670, "total_steps": 3122, "loss": 2.0329, "learning_rate": 4.803362854885276e-05, "epoch": 0.2145716573258607, "percentage": 21.46, "elapsed_time": "1:58:21", "remaining_time": "7:13:09"}
+{"current_steps": 671, "total_steps": 3122, "loss": 2.314, "learning_rate": 4.802274479466623e-05, "epoch": 0.21489191353082465, "percentage": 21.49, "elapsed_time": "1:58:31", "remaining_time": "7:12:58"}
+{"current_steps": 672, "total_steps": 3122, "loss": 2.324, "learning_rate": 4.8011832243076895e-05, "epoch": 0.21521216973578863, "percentage": 21.52, "elapsed_time": "1:58:42", "remaining_time": "7:12:46"}
+{"current_steps": 673, "total_steps": 3122, "loss": 1.7424, "learning_rate": 4.8000890907734434e-05, "epoch": 0.21553242594075261, "percentage": 21.56, "elapsed_time": "1:58:52", "remaining_time": "7:12:35"}
+{"current_steps": 674, "total_steps": 3122, "loss": 1.981, "learning_rate": 4.7989920802324537e-05, "epoch": 0.21585268214571657, "percentage": 21.59, "elapsed_time": "1:59:03", "remaining_time": "7:12:23"}
+{"current_steps": 675, "total_steps": 3122, "loss": 1.6027, "learning_rate": 4.797892194056889e-05, "epoch": 0.21617293835068055, "percentage": 21.62, "elapsed_time": "1:59:13", "remaining_time": "7:12:12"}
+{"current_steps": 676, "total_steps": 3122, "loss": 2.5835, "learning_rate": 4.79678943362251e-05, "epoch": 0.2164931945556445, "percentage": 21.65, "elapsed_time": "1:59:23", "remaining_time": "7:12:00"}
+{"current_steps": 677, "total_steps": 3122, "loss": 2.4851, "learning_rate": 4.79568380030868e-05, "epoch": 0.21681345076060848, "percentage": 21.68, "elapsed_time": "1:59:34", "remaining_time": "7:11:49"}
+{"current_steps": 678, "total_steps": 3122, "loss": 2.6476, "learning_rate": 4.794575295498348e-05, "epoch": 0.21713370696557246, "percentage": 21.72, "elapsed_time": "1:59:44", "remaining_time": "7:11:37"}
+{"current_steps": 679, "total_steps": 3122, "loss": 2.6871, "learning_rate": 4.793463920578061e-05, "epoch": 0.21745396317053642, "percentage": 21.75, "elapsed_time": "1:59:54", "remaining_time": "7:11:26"}
+{"current_steps": 680, "total_steps": 3122, "loss": 2.124, "learning_rate": 4.792349676937953e-05, "epoch": 0.2177742193755004, "percentage": 21.78, "elapsed_time": "2:00:05", "remaining_time": "7:11:15"}
+{"current_steps": 681, "total_steps": 3122, "loss": 2.3615, "learning_rate": 4.791232565971745e-05, "epoch": 0.21809447558046438, "percentage": 21.81, "elapsed_time": "2:00:15", "remaining_time": "7:11:03"}
+{"current_steps": 682, "total_steps": 3122, "loss": 1.8175, "learning_rate": 4.7901125890767484e-05, "epoch": 0.21841473178542833, "percentage": 21.84, "elapsed_time": "2:00:25", "remaining_time": "7:10:52"}
+{"current_steps": 683, "total_steps": 3122, "loss": 2.2353, "learning_rate": 4.788989747653857e-05, "epoch": 0.21873498799039232, "percentage": 21.88, "elapsed_time": "2:00:36", "remaining_time": "7:10:40"}
+{"current_steps": 684, "total_steps": 3122, "loss": 1.9429, "learning_rate": 4.787864043107546e-05, "epoch": 0.2190552441953563, "percentage": 21.91, "elapsed_time": "2:00:46", "remaining_time": "7:10:29"}
+{"current_steps": 685, "total_steps": 3122, "loss": 2.1238, "learning_rate": 4.786735476845876e-05, "epoch": 0.21937550040032025, "percentage": 21.94, "elapsed_time": "2:00:56", "remaining_time": "7:10:17"}
+{"current_steps": 686, "total_steps": 3122, "loss": 1.7298, "learning_rate": 4.7856040502804836e-05, "epoch": 0.21969575660528423, "percentage": 21.97, "elapsed_time": "2:01:07", "remaining_time": "7:10:06"}
+{"current_steps": 687, "total_steps": 3122, "loss": 1.9109, "learning_rate": 4.784469764826585e-05, "epoch": 0.22001601281024818, "percentage": 22.01, "elapsed_time": "2:01:17", "remaining_time": "7:09:55"}
+{"current_steps": 688, "total_steps": 3122, "loss": 2.7153, "learning_rate": 4.783332621902971e-05, "epoch": 0.22033626901521217, "percentage": 22.04, "elapsed_time": "2:01:28", "remaining_time": "7:09:43"}
+{"current_steps": 689, "total_steps": 3122, "loss": 2.3001, "learning_rate": 4.782192622932008e-05, "epoch": 0.22065652522017615, "percentage": 22.07, "elapsed_time": "2:01:38", "remaining_time": "7:09:32"}
+{"current_steps": 690, "total_steps": 3122, "loss": 2.0766, "learning_rate": 4.7810497693396327e-05, "epoch": 0.2209767814251401, "percentage": 22.1, "elapsed_time": "2:01:48", "remaining_time": "7:09:20"}
+{"current_steps": 691, "total_steps": 3122, "loss": 2.2382, "learning_rate": 4.779904062555356e-05, "epoch": 0.22129703763010408, "percentage": 22.13, "elapsed_time": "2:01:59", "remaining_time": "7:09:09"}
+{"current_steps": 692, "total_steps": 3122, "loss": 2.6912, "learning_rate": 4.7787555040122534e-05, "epoch": 0.22161729383506806, "percentage": 22.17, "elapsed_time": "2:02:09", "remaining_time": "7:08:57"}
+{"current_steps": 693, "total_steps": 3122, "loss": 2.3497, "learning_rate": 4.777604095146971e-05, "epoch": 0.22193755004003202, "percentage": 22.2, "elapsed_time": "2:02:19", "remaining_time": "7:08:46"}
+{"current_steps": 694, "total_steps": 3122, "loss": 2.4798, "learning_rate": 4.7764498373997194e-05, "epoch": 0.222257806244996, "percentage": 22.23, "elapsed_time": "2:02:30", "remaining_time": "7:08:34"}
+{"current_steps": 695, "total_steps": 3122, "loss": 2.6314, "learning_rate": 4.775292732214269e-05, "epoch": 0.22257806244995998, "percentage": 22.26, "elapsed_time": "2:02:40", "remaining_time": "7:08:23"}
+{"current_steps": 696, "total_steps": 3122, "loss": 2.2279, "learning_rate": 4.774132781037958e-05, "epoch": 0.22289831865492393, "percentage": 22.29, "elapsed_time": "2:02:50", "remaining_time": "7:08:12"}
+{"current_steps": 697, "total_steps": 3122, "loss": 2.6009, "learning_rate": 4.7729699853216784e-05, "epoch": 0.2232185748598879, "percentage": 22.33, "elapsed_time": "2:03:01", "remaining_time": "7:08:00"}
+{"current_steps": 698, "total_steps": 3122, "loss": 2.1287, "learning_rate": 4.771804346519886e-05, "epoch": 0.2235388310648519, "percentage": 22.36, "elapsed_time": "2:03:11", "remaining_time": "7:07:49"}
+{"current_steps": 699, "total_steps": 3122, "loss": 2.0747, "learning_rate": 4.770635866090587e-05, "epoch": 0.22385908726981585, "percentage": 22.39, "elapsed_time": "2:03:21", "remaining_time": "7:07:38"}
+{"current_steps": 700, "total_steps": 3122, "loss": 2.1692, "learning_rate": 4.769464545495347e-05, "epoch": 0.22417934347477983, "percentage": 22.42, "elapsed_time": "2:03:32", "remaining_time": "7:07:26"}
+{"current_steps": 701, "total_steps": 3122, "loss": 2.1745, "learning_rate": 4.768290386199281e-05, "epoch": 0.22449959967974378, "percentage": 22.45, "elapsed_time": "2:04:10", "remaining_time": "7:08:52"}
+{"current_steps": 702, "total_steps": 3122, "loss": 2.4571, "learning_rate": 4.767113389671055e-05, "epoch": 0.22481985588470776, "percentage": 22.49, "elapsed_time": "2:04:21", "remaining_time": "7:08:40"}
+{"current_steps": 703, "total_steps": 3122, "loss": 2.1443, "learning_rate": 4.7659335573828855e-05, "epoch": 0.22514011208967175, "percentage": 22.52, "elapsed_time": "2:04:31", "remaining_time": "7:08:29"}
+{"current_steps": 704, "total_steps": 3122, "loss": 2.645, "learning_rate": 4.7647508908105354e-05, "epoch": 0.2254603682946357, "percentage": 22.55, "elapsed_time": "2:04:41", "remaining_time": "7:08:17"}
+{"current_steps": 705, "total_steps": 3122, "loss": 2.5967, "learning_rate": 4.7635653914333123e-05, "epoch": 0.22578062449959968, "percentage": 22.58, "elapsed_time": "2:04:52", "remaining_time": "7:08:06"}
+{"current_steps": 706, "total_steps": 3122, "loss": 1.8238, "learning_rate": 4.7623770607340656e-05, "epoch": 0.22610088070456366, "percentage": 22.61, "elapsed_time": "2:05:02", "remaining_time": "7:07:55"}
+{"current_steps": 707, "total_steps": 3122, "loss": 2.1985, "learning_rate": 4.761185900199191e-05, "epoch": 0.22642113690952761, "percentage": 22.65, "elapsed_time": "2:05:13", "remaining_time": "7:07:43"}
+{"current_steps": 708, "total_steps": 3122, "loss": 1.9056, "learning_rate": 4.7599919113186184e-05, "epoch": 0.2267413931144916, "percentage": 22.68, "elapsed_time": "2:05:23", "remaining_time": "7:07:32"}
+{"current_steps": 709, "total_steps": 3122, "loss": 2.0725, "learning_rate": 4.7587950955858184e-05, "epoch": 0.22706164931945558, "percentage": 22.71, "elapsed_time": "2:05:34", "remaining_time": "7:07:21"}
+{"current_steps": 710, "total_steps": 3122, "loss": 2.1442, "learning_rate": 4.757595454497798e-05, "epoch": 0.22738190552441953, "percentage": 22.74, "elapsed_time": "2:05:44", "remaining_time": "7:07:10"}
+{"current_steps": 711, "total_steps": 3122, "loss": 1.8137, "learning_rate": 4.756392989555094e-05, "epoch": 0.2277021617293835, "percentage": 22.77, "elapsed_time": "2:05:54", "remaining_time": "7:06:58"}
+{"current_steps": 712, "total_steps": 3122, "loss": 2.4148, "learning_rate": 4.755187702261782e-05, "epoch": 0.22802241793434747, "percentage": 22.81, "elapsed_time": "2:06:05", "remaining_time": "7:06:47"}
+{"current_steps": 713, "total_steps": 3122, "loss": 2.579, "learning_rate": 4.753979594125463e-05, "epoch": 0.22834267413931145, "percentage": 22.84, "elapsed_time": "2:06:15", "remaining_time": "7:06:35"}
+{"current_steps": 714, "total_steps": 3122, "loss": 2.4936, "learning_rate": 4.752768666657267e-05, "epoch": 0.22866293034427543, "percentage": 22.87, "elapsed_time": "2:06:26", "remaining_time": "7:06:24"}
+{"current_steps": 715, "total_steps": 3122, "loss": 2.104, "learning_rate": 4.751554921371852e-05, "epoch": 0.22898318654923938, "percentage": 22.9, "elapsed_time": "2:06:36", "remaining_time": "7:06:13"}
+{"current_steps": 716, "total_steps": 3122, "loss": 2.0582, "learning_rate": 4.7503383597873994e-05, "epoch": 0.22930344275420336, "percentage": 22.93, "elapsed_time": "2:06:46", "remaining_time": "7:06:01"}
+{"current_steps": 717, "total_steps": 3122, "loss": 2.2863, "learning_rate": 4.7491189834256147e-05, "epoch": 0.22962369895916734, "percentage": 22.97, "elapsed_time": "2:06:57", "remaining_time": "7:05:50"}
+{"current_steps": 718, "total_steps": 3122, "loss": 2.4744, "learning_rate": 4.747896793811721e-05, "epoch": 0.2299439551641313, "percentage": 23.0, "elapsed_time": "2:07:07", "remaining_time": "7:05:38"}
+{"current_steps": 719, "total_steps": 3122, "loss": 2.4798, "learning_rate": 4.746671792474465e-05, "epoch": 0.23026421136909528, "percentage": 23.03, "elapsed_time": "2:07:18", "remaining_time": "7:05:27"}
+{"current_steps": 720, "total_steps": 3122, "loss": 2.4989, "learning_rate": 4.7454439809461064e-05, "epoch": 0.23058446757405926, "percentage": 23.06, "elapsed_time": "2:07:28", "remaining_time": "7:05:15"}
+{"current_steps": 721, "total_steps": 3122, "loss": 2.4011, "learning_rate": 4.7442133607624216e-05, "epoch": 0.2309047237790232, "percentage": 23.09, "elapsed_time": "2:07:38", "remaining_time": "7:05:04"}
+{"current_steps": 722, "total_steps": 3122, "loss": 1.8769, "learning_rate": 4.7429799334627e-05, "epoch": 0.2312249799839872, "percentage": 23.13, "elapsed_time": "2:07:49", "remaining_time": "7:04:52"}
+{"current_steps": 723, "total_steps": 3122, "loss": 2.1301, "learning_rate": 4.7417437005897415e-05, "epoch": 0.23154523618895115, "percentage": 23.16, "elapsed_time": "2:07:59", "remaining_time": "7:04:41"}
+{"current_steps": 724, "total_steps": 3122, "loss": 1.8229, "learning_rate": 4.740504663689857e-05, "epoch": 0.23186549239391513, "percentage": 23.19, "elapsed_time": "2:08:09", "remaining_time": "7:04:29"}
+{"current_steps": 725, "total_steps": 3122, "loss": 2.2332, "learning_rate": 4.739262824312863e-05, "epoch": 0.2321857485988791, "percentage": 23.22, "elapsed_time": "2:08:20", "remaining_time": "7:04:18"}
+{"current_steps": 726, "total_steps": 3122, "loss": 2.4415, "learning_rate": 4.7380181840120825e-05, "epoch": 0.23250600480384306, "percentage": 23.25, "elapsed_time": "2:08:30", "remaining_time": "7:04:06"}
+{"current_steps": 727, "total_steps": 3122, "loss": 2.4059, "learning_rate": 4.736770744344341e-05, "epoch": 0.23282626100880705, "percentage": 23.29, "elapsed_time": "2:08:40", "remaining_time": "7:03:55"}
+{"current_steps": 728, "total_steps": 3122, "loss": 2.3278, "learning_rate": 4.735520506869966e-05, "epoch": 0.23314651721377103, "percentage": 23.32, "elapsed_time": "2:08:51", "remaining_time": "7:03:43"}
+{"current_steps": 729, "total_steps": 3122, "loss": 2.3155, "learning_rate": 4.734267473152785e-05, "epoch": 0.23346677341873498, "percentage": 23.35, "elapsed_time": "2:09:01", "remaining_time": "7:03:32"}
+{"current_steps": 730, "total_steps": 3122, "loss": 1.8021, "learning_rate": 4.7330116447601225e-05, "epoch": 0.23378702962369896, "percentage": 23.38, "elapsed_time": "2:09:11", "remaining_time": "7:03:20"}
+{"current_steps": 731, "total_steps": 3122, "loss": 2.0426, "learning_rate": 4.731753023262798e-05, "epoch": 0.23410728582866294, "percentage": 23.41, "elapsed_time": "2:09:22", "remaining_time": "7:03:09"}
+{"current_steps": 732, "total_steps": 3122, "loss": 1.5206, "learning_rate": 4.730491610235128e-05, "epoch": 0.2344275420336269, "percentage": 23.45, "elapsed_time": "2:09:32", "remaining_time": "7:02:57"}
+{"current_steps": 733, "total_steps": 3122, "loss": 2.1711, "learning_rate": 4.729227407254916e-05, "epoch": 0.23474779823859088, "percentage": 23.48, "elapsed_time": "2:09:42", "remaining_time": "7:02:46"}
+{"current_steps": 734, "total_steps": 3122, "loss": 2.246, "learning_rate": 4.727960415903458e-05, "epoch": 0.23506805444355483, "percentage": 23.51, "elapsed_time": "2:09:53", "remaining_time": "7:02:34"}
+{"current_steps": 735, "total_steps": 3122, "loss": 1.8435, "learning_rate": 4.7266906377655375e-05, "epoch": 0.2353883106485188, "percentage": 23.54, "elapsed_time": "2:10:03", "remaining_time": "7:02:23"}
+{"current_steps": 736, "total_steps": 3122, "loss": 1.9849, "learning_rate": 4.725418074429423e-05, "epoch": 0.2357085668534828, "percentage": 23.57, "elapsed_time": "2:10:14", "remaining_time": "7:02:11"}
+{"current_steps": 737, "total_steps": 3122, "loss": 2.6527, "learning_rate": 4.724142727486869e-05, "epoch": 0.23602882305844675, "percentage": 23.61, "elapsed_time": "2:10:24", "remaining_time": "7:02:00"}
+{"current_steps": 738, "total_steps": 3122, "loss": 2.5422, "learning_rate": 4.722864598533108e-05, "epoch": 0.23634907926341073, "percentage": 23.64, "elapsed_time": "2:10:34", "remaining_time": "7:01:49"}
+{"current_steps": 739, "total_steps": 3122, "loss": 2.0435, "learning_rate": 4.721583689166855e-05, "epoch": 0.2366693354683747, "percentage": 23.67, "elapsed_time": "2:10:45", "remaining_time": "7:01:37"}
+{"current_steps": 740, "total_steps": 3122, "loss": 1.571, "learning_rate": 4.720300000990302e-05, "epoch": 0.23698959167333866, "percentage": 23.7, "elapsed_time": "2:10:55", "remaining_time": "7:01:26"}
+{"current_steps": 741, "total_steps": 3122, "loss": 1.9472, "learning_rate": 4.719013535609119e-05, "epoch": 0.23730984787830264, "percentage": 23.73, "elapsed_time": "2:11:05", "remaining_time": "7:01:14"}
+{"current_steps": 742, "total_steps": 3122, "loss": 2.4293, "learning_rate": 4.717724294632446e-05, "epoch": 0.23763010408326662, "percentage": 23.77, "elapsed_time": "2:11:16", "remaining_time": "7:01:03"}
+{"current_steps": 743, "total_steps": 3122, "loss": 2.4161, "learning_rate": 4.716432279672897e-05, "epoch": 0.23795036028823058, "percentage": 23.8, "elapsed_time": "2:11:26", "remaining_time": "7:00:51"}
+{"current_steps": 744, "total_steps": 3122, "loss": 2.4954, "learning_rate": 4.7151374923465554e-05, "epoch": 0.23827061649319456, "percentage": 23.83, "elapsed_time": "2:11:36", "remaining_time": "7:00:40"}
+{"current_steps": 745, "total_steps": 3122, "loss": 2.3457, "learning_rate": 4.7138399342729723e-05, "epoch": 0.23859087269815854, "percentage": 23.86, "elapsed_time": "2:11:47", "remaining_time": "7:00:29"}
+{"current_steps": 746, "total_steps": 3122, "loss": 2.2736, "learning_rate": 4.712539607075164e-05, "epoch": 0.2389111289031225, "percentage": 23.89, "elapsed_time": "2:11:57", "remaining_time": "7:00:17"}
+{"current_steps": 747, "total_steps": 3122, "loss": 2.1532, "learning_rate": 4.711236512379612e-05, "epoch": 0.23923138510808648, "percentage": 23.93, "elapsed_time": "2:12:08", "remaining_time": "7:00:06"}
+{"current_steps": 748, "total_steps": 3122, "loss": 2.0565, "learning_rate": 4.709930651816258e-05, "epoch": 0.23955164131305043, "percentage": 23.96, "elapsed_time": "2:12:18", "remaining_time": "6:59:54"}
+{"current_steps": 749, "total_steps": 3122, "loss": 2.5243, "learning_rate": 4.708622027018504e-05, "epoch": 0.2398718975180144, "percentage": 23.99, "elapsed_time": "2:12:28", "remaining_time": "6:59:43"}
+{"current_steps": 750, "total_steps": 3122, "loss": 2.1374, "learning_rate": 4.70731063962321e-05, "epoch": 0.2401921537229784, "percentage": 24.02, "elapsed_time": "2:12:39", "remaining_time": "6:59:32"}
+{"current_steps": 751, "total_steps": 3122, "loss": 2.0636, "learning_rate": 4.705996491270689e-05, "epoch": 0.24051240992794234, "percentage": 24.06, "elapsed_time": "2:12:49", "remaining_time": "6:59:20"}
+{"current_steps": 752, "total_steps": 3122, "loss": 2.4744, "learning_rate": 4.704679583604711e-05, "epoch": 0.24083266613290633, "percentage": 24.09, "elapsed_time": "2:12:59", "remaining_time": "6:59:09"}
+{"current_steps": 753, "total_steps": 3122, "loss": 2.2096, "learning_rate": 4.703359918272495e-05, "epoch": 0.2411529223378703, "percentage": 24.12, "elapsed_time": "2:13:10", "remaining_time": "6:58:57"}
+{"current_steps": 754, "total_steps": 3122, "loss": 2.576, "learning_rate": 4.7020374969247106e-05, "epoch": 0.24147317854283426, "percentage": 24.15, "elapsed_time": "2:13:20", "remaining_time": "6:58:46"}
+{"current_steps": 755, "total_steps": 3122, "loss": 2.3694, "learning_rate": 4.700712321215474e-05, "epoch": 0.24179343474779824, "percentage": 24.18, "elapsed_time": "2:13:30", "remaining_time": "6:58:35"}
+{"current_steps": 756, "total_steps": 3122, "loss": 2.4635, "learning_rate": 4.699384392802346e-05, "epoch": 0.24211369095276222, "percentage": 24.22, "elapsed_time": "2:13:41", "remaining_time": "6:58:23"}
+{"current_steps": 757, "total_steps": 3122, "loss": 2.7555, "learning_rate": 4.698053713346334e-05, "epoch": 0.24243394715772618, "percentage": 24.25, "elapsed_time": "2:13:51", "remaining_time": "6:58:12"}
+{"current_steps": 758, "total_steps": 3122, "loss": 2.4657, "learning_rate": 4.696720284511881e-05, "epoch": 0.24275420336269016, "percentage": 24.28, "elapsed_time": "2:14:01", "remaining_time": "6:58:00"}
+{"current_steps": 759, "total_steps": 3122, "loss": 1.6963, "learning_rate": 4.6953841079668724e-05, "epoch": 0.2430744595676541, "percentage": 24.31, "elapsed_time": "2:14:12", "remaining_time": "6:57:49"}
+{"current_steps": 760, "total_steps": 3122, "loss": 2.1481, "learning_rate": 4.6940451853826316e-05, "epoch": 0.2433947157726181, "percentage": 24.34, "elapsed_time": "2:14:22", "remaining_time": "6:57:38"}
+{"current_steps": 761, "total_steps": 3122, "loss": 2.1694, "learning_rate": 4.692703518433913e-05, "epoch": 0.24371497197758207, "percentage": 24.38, "elapsed_time": "2:14:33", "remaining_time": "6:57:26"}
+{"current_steps": 762, "total_steps": 3122, "loss": 2.0632, "learning_rate": 4.6913591087989084e-05, "epoch": 0.24403522818254603, "percentage": 24.41, "elapsed_time": "2:14:43", "remaining_time": "6:57:15"}
+{"current_steps": 763, "total_steps": 3122, "loss": 2.0139, "learning_rate": 4.690011958159235e-05, "epoch": 0.24435548438751, "percentage": 24.44, "elapsed_time": "2:14:53", "remaining_time": "6:57:03"}
+{"current_steps": 764, "total_steps": 3122, "loss": 2.0248, "learning_rate": 4.6886620681999434e-05, "epoch": 0.244675740592474, "percentage": 24.47, "elapsed_time": "2:15:04", "remaining_time": "6:56:52"}
+{"current_steps": 765, "total_steps": 3122, "loss": 2.3785, "learning_rate": 4.6873094406095066e-05, "epoch": 0.24499599679743794, "percentage": 24.5, "elapsed_time": "2:15:14", "remaining_time": "6:56:41"}
+{"current_steps": 766, "total_steps": 3122, "loss": 2.6487, "learning_rate": 4.685954077079825e-05, "epoch": 0.24531625300240192, "percentage": 24.54, "elapsed_time": "2:15:24", "remaining_time": "6:56:29"}
+{"current_steps": 767, "total_steps": 3122, "loss": 2.0873, "learning_rate": 4.68459597930622e-05, "epoch": 0.2456365092073659, "percentage": 24.57, "elapsed_time": "2:15:35", "remaining_time": "6:56:18"}
+{"current_steps": 768, "total_steps": 3122, "loss": 2.0824, "learning_rate": 4.683235148987432e-05, "epoch": 0.24595676541232986, "percentage": 24.6, "elapsed_time": "2:15:45", "remaining_time": "6:56:07"}
+{"current_steps": 769, "total_steps": 3122, "loss": 2.6039, "learning_rate": 4.68187158782562e-05, "epoch": 0.24627702161729384, "percentage": 24.63, "elapsed_time": "2:15:55", "remaining_time": "6:55:55"}
+{"current_steps": 770, "total_steps": 3122, "loss": 2.1172, "learning_rate": 4.680505297526361e-05, "epoch": 0.2465972778222578, "percentage": 24.66, "elapsed_time": "2:16:06", "remaining_time": "6:55:44"}
+{"current_steps": 771, "total_steps": 3122, "loss": 2.3141, "learning_rate": 4.679136279798642e-05, "epoch": 0.24691753402722177, "percentage": 24.7, "elapsed_time": "2:16:16", "remaining_time": "6:55:33"}
+{"current_steps": 772, "total_steps": 3122, "loss": 2.0481, "learning_rate": 4.677764536354864e-05, "epoch": 0.24723779023218576, "percentage": 24.73, "elapsed_time": "2:16:27", "remaining_time": "6:55:21"}
+{"current_steps": 773, "total_steps": 3122, "loss": 1.7297, "learning_rate": 4.6763900689108365e-05, "epoch": 0.2475580464371497, "percentage": 24.76, "elapsed_time": "2:16:37", "remaining_time": "6:55:10"}
+{"current_steps": 774, "total_steps": 3122, "loss": 2.4405, "learning_rate": 4.675012879185777e-05, "epoch": 0.2478783026421137, "percentage": 24.79, "elapsed_time": "2:16:47", "remaining_time": "6:54:58"}
+{"current_steps": 775, "total_steps": 3122, "loss": 2.1231, "learning_rate": 4.673632968902306e-05, "epoch": 0.24819855884707767, "percentage": 24.82, "elapsed_time": "2:16:58", "remaining_time": "6:54:47"}
+{"current_steps": 776, "total_steps": 3122, "loss": 1.7979, "learning_rate": 4.67225033978645e-05, "epoch": 0.24851881505204163, "percentage": 24.86, "elapsed_time": "2:17:08", "remaining_time": "6:54:36"}
+{"current_steps": 777, "total_steps": 3122, "loss": 1.7725, "learning_rate": 4.670864993567635e-05, "epoch": 0.2488390712570056, "percentage": 24.89, "elapsed_time": "2:17:18", "remaining_time": "6:54:24"}
+{"current_steps": 778, "total_steps": 3122, "loss": 2.0591, "learning_rate": 4.6694769319786834e-05, "epoch": 0.2491593274619696, "percentage": 24.92, "elapsed_time": "2:17:29", "remaining_time": "6:54:13"}
+{"current_steps": 779, "total_steps": 3122, "loss": 2.1371, "learning_rate": 4.668086156755818e-05, "epoch": 0.24947958366693354, "percentage": 24.95, "elapsed_time": "2:17:39", "remaining_time": "6:54:02"}
+{"current_steps": 780, "total_steps": 3122, "loss": 2.1823, "learning_rate": 4.666692669638653e-05, "epoch": 0.24979983987189752, "percentage": 24.98, "elapsed_time": "2:17:49", "remaining_time": "6:53:50"}
+{"current_steps": 781, "total_steps": 3122, "loss": 1.8962, "learning_rate": 4.665296472370195e-05, "epoch": 0.2501200960768615, "percentage": 25.02, "elapsed_time": "2:18:00", "remaining_time": "6:53:39"}
+{"current_steps": 782, "total_steps": 3122, "loss": 2.6859, "learning_rate": 4.663897566696843e-05, "epoch": 0.2504403522818255, "percentage": 25.05, "elapsed_time": "2:18:10", "remaining_time": "6:53:28"}
+{"current_steps": 783, "total_steps": 3122, "loss": 2.4368, "learning_rate": 4.66249595436838e-05, "epoch": 0.25076060848678944, "percentage": 25.08, "elapsed_time": "2:18:20", "remaining_time": "6:53:16"}
+{"current_steps": 784, "total_steps": 3122, "loss": 1.895, "learning_rate": 4.661091637137977e-05, "epoch": 0.2510808646917534, "percentage": 25.11, "elapsed_time": "2:18:31", "remaining_time": "6:53:05"}
+{"current_steps": 785, "total_steps": 3122, "loss": 2.1725, "learning_rate": 4.659684616762188e-05, "epoch": 0.2514011208967174, "percentage": 25.14, "elapsed_time": "2:18:41", "remaining_time": "6:52:54"}
+{"current_steps": 786, "total_steps": 3122, "loss": 2.7823, "learning_rate": 4.6582748950009475e-05, "epoch": 0.25172137710168135, "percentage": 25.18, "elapsed_time": "2:18:52", "remaining_time": "6:52:42"}
+{"current_steps": 787, "total_steps": 3122, "loss": 2.3225, "learning_rate": 4.65686247361757e-05, "epoch": 0.2520416333066453, "percentage": 25.21, "elapsed_time": "2:19:02", "remaining_time": "6:52:31"}
+{"current_steps": 788, "total_steps": 3122, "loss": 2.1723, "learning_rate": 4.655447354378745e-05, "epoch": 0.25236188951160926, "percentage": 25.24, "elapsed_time": "2:19:12", "remaining_time": "6:52:20"}
+{"current_steps": 789, "total_steps": 3122, "loss": 1.9019, "learning_rate": 4.654029539054539e-05, "epoch": 0.25268214571657327, "percentage": 25.27, "elapsed_time": "2:19:23", "remaining_time": "6:52:08"}
+{"current_steps": 790, "total_steps": 3122, "loss": 2.178, "learning_rate": 4.652609029418389e-05, "epoch": 0.2530024019215372, "percentage": 25.3, "elapsed_time": "2:19:33", "remaining_time": "6:51:57"}
+{"current_steps": 791, "total_steps": 3122, "loss": 1.4949, "learning_rate": 4.651185827247103e-05, "epoch": 0.2533226581265012, "percentage": 25.34, "elapsed_time": "2:19:43", "remaining_time": "6:51:46"}
+{"current_steps": 792, "total_steps": 3122, "loss": 2.6352, "learning_rate": 4.649759934320855e-05, "epoch": 0.2536429143314652, "percentage": 25.37, "elapsed_time": "2:19:54", "remaining_time": "6:51:35"}
+{"current_steps": 793, "total_steps": 3122, "loss": 2.1695, "learning_rate": 4.6483313524231874e-05, "epoch": 0.25396317053642914, "percentage": 25.4, "elapsed_time": "2:20:04", "remaining_time": "6:51:23"}
+{"current_steps": 794, "total_steps": 3122, "loss": 2.4847, "learning_rate": 4.646900083341005e-05, "epoch": 0.2542834267413931, "percentage": 25.43, "elapsed_time": "2:20:14", "remaining_time": "6:51:12"}
+{"current_steps": 795, "total_steps": 3122, "loss": 2.0651, "learning_rate": 4.645466128864573e-05, "epoch": 0.2546036829463571, "percentage": 25.46, "elapsed_time": "2:20:25", "remaining_time": "6:51:01"}
+{"current_steps": 796, "total_steps": 3122, "loss": 2.7276, "learning_rate": 4.644029490787517e-05, "epoch": 0.25492393915132106, "percentage": 25.5, "elapsed_time": "2:20:35", "remaining_time": "6:50:49"}
+{"current_steps": 797, "total_steps": 3122, "loss": 2.5108, "learning_rate": 4.642590170906816e-05, "epoch": 0.255244195356285, "percentage": 25.53, "elapsed_time": "2:20:45", "remaining_time": "6:50:38"}
+{"current_steps": 798, "total_steps": 3122, "loss": 2.3693, "learning_rate": 4.6411481710228096e-05, "epoch": 0.255564451561249, "percentage": 25.56, "elapsed_time": "2:20:56", "remaining_time": "6:50:27"}
+{"current_steps": 799, "total_steps": 3122, "loss": 2.333, "learning_rate": 4.6397034929391834e-05, "epoch": 0.25588470776621297, "percentage": 25.59, "elapsed_time": "2:21:06", "remaining_time": "6:50:15"}
+{"current_steps": 800, "total_steps": 3122, "loss": 2.4582, "learning_rate": 4.638256138462975e-05, "epoch": 0.2562049639711769, "percentage": 25.62, "elapsed_time": "2:21:17", "remaining_time": "6:50:04"}
+{"current_steps": 801, "total_steps": 3122, "loss": 2.5472, "learning_rate": 4.636806109404573e-05, "epoch": 0.25652522017614093, "percentage": 25.66, "elapsed_time": "2:21:53", "remaining_time": "6:51:09"}
+{"current_steps": 802, "total_steps": 3122, "loss": 2.4438, "learning_rate": 4.635353407577706e-05, "epoch": 0.2568454763811049, "percentage": 25.69, "elapsed_time": "2:22:04", "remaining_time": "6:50:58"}
+{"current_steps": 803, "total_steps": 3122, "loss": 2.3358, "learning_rate": 4.633898034799449e-05, "epoch": 0.25716573258606884, "percentage": 25.72, "elapsed_time": "2:22:14", "remaining_time": "6:50:47"}
+{"current_steps": 804, "total_steps": 3122, "loss": 2.4705, "learning_rate": 4.632439992890218e-05, "epoch": 0.25748598879103285, "percentage": 25.75, "elapsed_time": "2:22:24", "remaining_time": "6:50:35"}
+{"current_steps": 805, "total_steps": 3122, "loss": 2.163, "learning_rate": 4.630979283673766e-05, "epoch": 0.2578062449959968, "percentage": 25.78, "elapsed_time": "2:22:35", "remaining_time": "6:50:24"}
+{"current_steps": 806, "total_steps": 3122, "loss": 1.7262, "learning_rate": 4.629515908977184e-05, "epoch": 0.25812650120096076, "percentage": 25.82, "elapsed_time": "2:22:45", "remaining_time": "6:50:13"}
+{"current_steps": 807, "total_steps": 3122, "loss": 2.2349, "learning_rate": 4.628049870630896e-05, "epoch": 0.25844675740592477, "percentage": 25.85, "elapsed_time": "2:22:56", "remaining_time": "6:50:02"}
+{"current_steps": 808, "total_steps": 3122, "loss": 2.3561, "learning_rate": 4.626581170468658e-05, "epoch": 0.2587670136108887, "percentage": 25.88, "elapsed_time": "2:23:06", "remaining_time": "6:49:51"}
+{"current_steps": 809, "total_steps": 3122, "loss": 2.5208, "learning_rate": 4.625109810327556e-05, "epoch": 0.25908726981585267, "percentage": 25.91, "elapsed_time": "2:23:17", "remaining_time": "6:49:39"}
+{"current_steps": 810, "total_steps": 3122, "loss": 2.0921, "learning_rate": 4.6236357920480013e-05, "epoch": 0.2594075260208166, "percentage": 25.94, "elapsed_time": "2:23:27", "remaining_time": "6:49:28"}
+{"current_steps": 811, "total_steps": 3122, "loss": 2.2984, "learning_rate": 4.6221591174737314e-05, "epoch": 0.25972778222578063, "percentage": 25.98, "elapsed_time": "2:23:37", "remaining_time": "6:49:17"}
+{"current_steps": 812, "total_steps": 3122, "loss": 1.6466, "learning_rate": 4.620679788451808e-05, "epoch": 0.2600480384307446, "percentage": 26.01, "elapsed_time": "2:23:48", "remaining_time": "6:49:06"}
+{"current_steps": 813, "total_steps": 3122, "loss": 2.3331, "learning_rate": 4.61919780683261e-05, "epoch": 0.26036829463570854, "percentage": 26.04, "elapsed_time": "2:23:58", "remaining_time": "6:48:54"}
+{"current_steps": 814, "total_steps": 3122, "loss": 2.313, "learning_rate": 4.6177131744698364e-05, "epoch": 0.26068855084067255, "percentage": 26.07, "elapsed_time": "2:24:09", "remaining_time": "6:48:43"}
+{"current_steps": 815, "total_steps": 3122, "loss": 2.4781, "learning_rate": 4.616225893220502e-05, "epoch": 0.2610088070456365, "percentage": 26.11, "elapsed_time": "2:24:19", "remaining_time": "6:48:32"}
+{"current_steps": 816, "total_steps": 3122, "loss": 2.2835, "learning_rate": 4.6147359649449305e-05, "epoch": 0.26132906325060046, "percentage": 26.14, "elapsed_time": "2:24:29", "remaining_time": "6:48:21"}
+{"current_steps": 817, "total_steps": 3122, "loss": 2.2348, "learning_rate": 4.613243391506764e-05, "epoch": 0.26164931945556447, "percentage": 26.17, "elapsed_time": "2:24:40", "remaining_time": "6:48:09"}
+{"current_steps": 818, "total_steps": 3122, "loss": 2.4842, "learning_rate": 4.6117481747729476e-05, "epoch": 0.2619695756605284, "percentage": 26.2, "elapsed_time": "2:24:50", "remaining_time": "6:47:58"}
+{"current_steps": 819, "total_steps": 3122, "loss": 2.0446, "learning_rate": 4.6102503166137336e-05, "epoch": 0.2622898318654924, "percentage": 26.23, "elapsed_time": "2:25:01", "remaining_time": "6:47:47"}
+{"current_steps": 820, "total_steps": 3122, "loss": 1.8785, "learning_rate": 4.608749818902679e-05, "epoch": 0.2626100880704564, "percentage": 26.27, "elapsed_time": "2:25:11", "remaining_time": "6:47:35"}
+{"current_steps": 821, "total_steps": 3122, "loss": 2.5239, "learning_rate": 4.607246683516644e-05, "epoch": 0.26293034427542034, "percentage": 26.3, "elapsed_time": "2:25:21", "remaining_time": "6:47:24"}
+{"current_steps": 822, "total_steps": 3122, "loss": 2.61, "learning_rate": 4.605740912335786e-05, "epoch": 0.2632506004803843, "percentage": 26.33, "elapsed_time": "2:25:32", "remaining_time": "6:47:13"}
+{"current_steps": 823, "total_steps": 3122, "loss": 1.8585, "learning_rate": 4.604232507243559e-05, "epoch": 0.2635708566853483, "percentage": 26.36, "elapsed_time": "2:25:42", "remaining_time": "6:47:01"}
+{"current_steps": 824, "total_steps": 3122, "loss": 2.3605, "learning_rate": 4.6027214701267126e-05, "epoch": 0.26389111289031225, "percentage": 26.39, "elapsed_time": "2:25:52", "remaining_time": "6:46:50"}
+{"current_steps": 825, "total_steps": 3122, "loss": 2.2571, "learning_rate": 4.6012078028752885e-05, "epoch": 0.2642113690952762, "percentage": 26.43, "elapsed_time": "2:26:03", "remaining_time": "6:46:38"}
+{"current_steps": 826, "total_steps": 3122, "loss": 1.8091, "learning_rate": 4.5996915073826187e-05, "epoch": 0.2645316253002402, "percentage": 26.46, "elapsed_time": "2:26:13", "remaining_time": "6:46:27"}
+{"current_steps": 827, "total_steps": 3122, "loss": 2.3873, "learning_rate": 4.598172585545321e-05, "epoch": 0.26485188150520417, "percentage": 26.49, "elapsed_time": "2:26:23", "remaining_time": "6:46:16"}
+{"current_steps": 828, "total_steps": 3122, "loss": 2.171, "learning_rate": 4.5966510392633e-05, "epoch": 0.2651721377101681, "percentage": 26.52, "elapsed_time": "2:26:34", "remaining_time": "6:46:04"}
+{"current_steps": 829, "total_steps": 3122, "loss": 2.4189, "learning_rate": 4.595126870439742e-05, "epoch": 0.26549239391513213, "percentage": 26.55, "elapsed_time": "2:26:44", "remaining_time": "6:45:53"}
+{"current_steps": 830, "total_steps": 3122, "loss": 2.3643, "learning_rate": 4.593600080981114e-05, "epoch": 0.2658126501200961, "percentage": 26.59, "elapsed_time": "2:26:54", "remaining_time": "6:45:42"}
+{"current_steps": 831, "total_steps": 3122, "loss": 2.1314, "learning_rate": 4.592070672797161e-05, "epoch": 0.26613290632506004, "percentage": 26.62, "elapsed_time": "2:27:05", "remaining_time": "6:45:30"}
+{"current_steps": 832, "total_steps": 3122, "loss": 2.5095, "learning_rate": 4.590538647800904e-05, "epoch": 0.26645316253002405, "percentage": 26.65, "elapsed_time": "2:27:15", "remaining_time": "6:45:19"}
+{"current_steps": 833, "total_steps": 3122, "loss": 2.1051, "learning_rate": 4.5890040079086374e-05, "epoch": 0.266773418734988, "percentage": 26.68, "elapsed_time": "2:27:25", "remaining_time": "6:45:07"}
+{"current_steps": 834, "total_steps": 3122, "loss": 2.6451, "learning_rate": 4.587466755039924e-05, "epoch": 0.26709367493995195, "percentage": 26.71, "elapsed_time": "2:27:36", "remaining_time": "6:44:56"}
+{"current_steps": 835, "total_steps": 3122, "loss": 2.3557, "learning_rate": 4.585926891117597e-05, "epoch": 0.2674139311449159, "percentage": 26.75, "elapsed_time": "2:27:46", "remaining_time": "6:44:45"}
+{"current_steps": 836, "total_steps": 3122, "loss": 2.2055, "learning_rate": 4.584384418067756e-05, "epoch": 0.2677341873498799, "percentage": 26.78, "elapsed_time": "2:27:57", "remaining_time": "6:44:33"}
+{"current_steps": 837, "total_steps": 3122, "loss": 1.711, "learning_rate": 4.582839337819763e-05, "epoch": 0.26805444355484387, "percentage": 26.81, "elapsed_time": "2:28:07", "remaining_time": "6:44:22"}
+{"current_steps": 838, "total_steps": 3122, "loss": 2.7919, "learning_rate": 4.581291652306241e-05, "epoch": 0.2683746997598078, "percentage": 26.84, "elapsed_time": "2:28:17", "remaining_time": "6:44:11"}
+{"current_steps": 839, "total_steps": 3122, "loss": 2.3713, "learning_rate": 4.579741363463074e-05, "epoch": 0.26869495596477183, "percentage": 26.87, "elapsed_time": "2:28:28", "remaining_time": "6:43:59"}
+{"current_steps": 840, "total_steps": 3122, "loss": 2.4531, "learning_rate": 4.578188473229398e-05, "epoch": 0.2690152121697358, "percentage": 26.91, "elapsed_time": "2:28:38", "remaining_time": "6:43:48"}
+{"current_steps": 841, "total_steps": 3122, "loss": 2.2186, "learning_rate": 4.576632983547607e-05, "epoch": 0.26933546837469974, "percentage": 26.94, "elapsed_time": "2:28:48", "remaining_time": "6:43:37"}
+{"current_steps": 842, "total_steps": 3122, "loss": 2.3781, "learning_rate": 4.575074896363345e-05, "epoch": 0.26965572457966375, "percentage": 26.97, "elapsed_time": "2:28:59", "remaining_time": "6:43:25"}
+{"current_steps": 843, "total_steps": 3122, "loss": 2.1847, "learning_rate": 4.573514213625505e-05, "epoch": 0.2699759807846277, "percentage": 27.0, "elapsed_time": "2:29:09", "remaining_time": "6:43:14"}
+{"current_steps": 844, "total_steps": 3122, "loss": 2.1921, "learning_rate": 4.571950937286225e-05, "epoch": 0.27029623698959165, "percentage": 27.03, "elapsed_time": "2:29:19", "remaining_time": "6:43:03"}
+{"current_steps": 845, "total_steps": 3122, "loss": 2.6008, "learning_rate": 4.570385069300891e-05, "epoch": 0.27061649319455566, "percentage": 27.07, "elapsed_time": "2:29:30", "remaining_time": "6:42:51"}
+{"current_steps": 846, "total_steps": 3122, "loss": 2.5111, "learning_rate": 4.568816611628126e-05, "epoch": 0.2709367493995196, "percentage": 27.1, "elapsed_time": "2:29:40", "remaining_time": "6:42:40"}
+{"current_steps": 847, "total_steps": 3122, "loss": 2.4546, "learning_rate": 4.5672455662297966e-05, "epoch": 0.27125700560448357, "percentage": 27.13, "elapsed_time": "2:29:50", "remaining_time": "6:42:29"}
+{"current_steps": 848, "total_steps": 3122, "loss": 2.2381, "learning_rate": 4.565671935071002e-05, "epoch": 0.2715772618094476, "percentage": 27.16, "elapsed_time": "2:30:01", "remaining_time": "6:42:17"}
+{"current_steps": 849, "total_steps": 3122, "loss": 2.5955, "learning_rate": 4.56409572012008e-05, "epoch": 0.27189751801441153, "percentage": 27.19, "elapsed_time": "2:30:11", "remaining_time": "6:42:06"}
+{"current_steps": 850, "total_steps": 3122, "loss": 2.2343, "learning_rate": 4.562516923348597e-05, "epoch": 0.2722177742193755, "percentage": 27.23, "elapsed_time": "2:30:21", "remaining_time": "6:41:55"}
+{"current_steps": 851, "total_steps": 3122, "loss": 2.4699, "learning_rate": 4.56093554673135e-05, "epoch": 0.2725380304243395, "percentage": 27.26, "elapsed_time": "2:30:32", "remaining_time": "6:41:43"}
+{"current_steps": 852, "total_steps": 3122, "loss": 2.4249, "learning_rate": 4.559351592246363e-05, "epoch": 0.27285828662930345, "percentage": 27.29, "elapsed_time": "2:30:42", "remaining_time": "6:41:32"}
+{"current_steps": 853, "total_steps": 3122, "loss": 1.7957, "learning_rate": 4.5577650618748846e-05, "epoch": 0.2731785428342674, "percentage": 27.32, "elapsed_time": "2:30:53", "remaining_time": "6:41:21"}
+{"current_steps": 854, "total_steps": 3122, "loss": 2.3653, "learning_rate": 4.556175957601385e-05, "epoch": 0.2734987990392314, "percentage": 27.35, "elapsed_time": "2:31:03", "remaining_time": "6:41:09"}
+{"current_steps": 855, "total_steps": 3122, "loss": 2.7702, "learning_rate": 4.5545842814135545e-05, "epoch": 0.27381905524419536, "percentage": 27.39, "elapsed_time": "2:31:13", "remaining_time": "6:40:58"}
+{"current_steps": 856, "total_steps": 3122, "loss": 2.3475, "learning_rate": 4.552990035302299e-05, "epoch": 0.2741393114491593, "percentage": 27.42, "elapsed_time": "2:31:24", "remaining_time": "6:40:47"}
+{"current_steps": 857, "total_steps": 3122, "loss": 2.1684, "learning_rate": 4.55139322126174e-05, "epoch": 0.27445956765412327, "percentage": 27.45, "elapsed_time": "2:31:34", "remaining_time": "6:40:36"}
+{"current_steps": 858, "total_steps": 3122, "loss": 1.8475, "learning_rate": 4.549793841289211e-05, "epoch": 0.2747798238590873, "percentage": 27.48, "elapsed_time": "2:31:44", "remaining_time": "6:40:24"}
+{"current_steps": 859, "total_steps": 3122, "loss": 2.3642, "learning_rate": 4.548191897385257e-05, "epoch": 0.27510008006405123, "percentage": 27.51, "elapsed_time": "2:31:55", "remaining_time": "6:40:13"}
+{"current_steps": 860, "total_steps": 3122, "loss": 1.9096, "learning_rate": 4.546587391553624e-05, "epoch": 0.2754203362690152, "percentage": 27.55, "elapsed_time": "2:32:05", "remaining_time": "6:40:02"}
+{"current_steps": 861, "total_steps": 3122, "loss": 2.4123, "learning_rate": 4.54498032580127e-05, "epoch": 0.2757405924739792, "percentage": 27.58, "elapsed_time": "2:32:15", "remaining_time": "6:39:50"}
+{"current_steps": 862, "total_steps": 3122, "loss": 2.431, "learning_rate": 4.54337070213835e-05, "epoch": 0.27606084867894315, "percentage": 27.61, "elapsed_time": "2:32:26", "remaining_time": "6:39:39"}
+{"current_steps": 863, "total_steps": 3122, "loss": 2.5574, "learning_rate": 4.54175852257822e-05, "epoch": 0.2763811048839071, "percentage": 27.64, "elapsed_time": "2:32:36", "remaining_time": "6:39:28"}
+{"current_steps": 864, "total_steps": 3122, "loss": 2.4494, "learning_rate": 4.5401437891374326e-05, "epoch": 0.2767013610888711, "percentage": 27.67, "elapsed_time": "2:32:46", "remaining_time": "6:39:17"}
+{"current_steps": 865, "total_steps": 3122, "loss": 2.2868, "learning_rate": 4.5385265038357363e-05, "epoch": 0.27702161729383507, "percentage": 27.71, "elapsed_time": "2:32:57", "remaining_time": "6:39:05"}
+{"current_steps": 866, "total_steps": 3122, "loss": 2.2944, "learning_rate": 4.5369066686960694e-05, "epoch": 0.277341873498799, "percentage": 27.74, "elapsed_time": "2:33:07", "remaining_time": "6:38:54"}
+{"current_steps": 867, "total_steps": 3122, "loss": 1.8372, "learning_rate": 4.535284285744561e-05, "epoch": 0.277662129703763, "percentage": 27.77, "elapsed_time": "2:33:18", "remaining_time": "6:38:43"}
+{"current_steps": 868, "total_steps": 3122, "loss": 2.3709, "learning_rate": 4.5336593570105266e-05, "epoch": 0.277982385908727, "percentage": 27.8, "elapsed_time": "2:33:28", "remaining_time": "6:38:32"}
+{"current_steps": 869, "total_steps": 3122, "loss": 2.1215, "learning_rate": 4.5320318845264664e-05, "epoch": 0.27830264211369093, "percentage": 27.83, "elapsed_time": "2:33:38", "remaining_time": "6:38:20"}
+{"current_steps": 870, "total_steps": 3122, "loss": 2.8229, "learning_rate": 4.530401870328063e-05, "epoch": 0.27862289831865494, "percentage": 27.87, "elapsed_time": "2:33:49", "remaining_time": "6:38:09"}
+{"current_steps": 871, "total_steps": 3122, "loss": 2.272, "learning_rate": 4.528769316454176e-05, "epoch": 0.2789431545236189, "percentage": 27.9, "elapsed_time": "2:33:59", "remaining_time": "6:37:58"}
+{"current_steps": 872, "total_steps": 3122, "loss": 2.1168, "learning_rate": 4.5271342249468424e-05, "epoch": 0.27926341072858285, "percentage": 27.93, "elapsed_time": "2:34:09", "remaining_time": "6:37:47"}
+{"current_steps": 873, "total_steps": 3122, "loss": 1.5178, "learning_rate": 4.525496597851275e-05, "epoch": 0.27958366693354686, "percentage": 27.96, "elapsed_time": "2:34:20", "remaining_time": "6:37:35"}
+{"current_steps": 874, "total_steps": 3122, "loss": 1.6794, "learning_rate": 4.523856437215858e-05, "epoch": 0.2799039231385108, "percentage": 27.99, "elapsed_time": "2:34:30", "remaining_time": "6:37:24"}
+{"current_steps": 875, "total_steps": 3122, "loss": 2.3376, "learning_rate": 4.522213745092143e-05, "epoch": 0.28022417934347477, "percentage": 28.03, "elapsed_time": "2:34:40", "remaining_time": "6:37:13"}
+{"current_steps": 876, "total_steps": 3122, "loss": 2.4695, "learning_rate": 4.520568523534848e-05, "epoch": 0.2805444355484388, "percentage": 28.06, "elapsed_time": "2:34:51", "remaining_time": "6:37:02"}
+{"current_steps": 877, "total_steps": 3122, "loss": 1.6355, "learning_rate": 4.5189207746018566e-05, "epoch": 0.28086469175340273, "percentage": 28.09, "elapsed_time": "2:35:01", "remaining_time": "6:36:50"}
+{"current_steps": 878, "total_steps": 3122, "loss": 2.0943, "learning_rate": 4.5172705003542125e-05, "epoch": 0.2811849479583667, "percentage": 28.12, "elapsed_time": "2:35:11", "remaining_time": "6:36:39"}
+{"current_steps": 879, "total_steps": 3122, "loss": 1.9592, "learning_rate": 4.515617702856119e-05, "epoch": 0.2815052041633307, "percentage": 28.16, "elapsed_time": "2:35:22", "remaining_time": "6:36:28"}
+{"current_steps": 880, "total_steps": 3122, "loss": 2.0776, "learning_rate": 4.5139623841749346e-05, "epoch": 0.28182546036829464, "percentage": 28.19, "elapsed_time": "2:35:32", "remaining_time": "6:36:17"}
+{"current_steps": 881, "total_steps": 3122, "loss": 2.2985, "learning_rate": 4.5123045463811706e-05, "epoch": 0.2821457165732586, "percentage": 28.22, "elapsed_time": "2:35:43", "remaining_time": "6:36:05"}
+{"current_steps": 882, "total_steps": 3122, "loss": 1.9178, "learning_rate": 4.510644191548492e-05, "epoch": 0.28246597277822255, "percentage": 28.25, "elapsed_time": "2:35:53", "remaining_time": "6:35:54"}
+{"current_steps": 883, "total_steps": 3122, "loss": 2.3869, "learning_rate": 4.50898132175371e-05, "epoch": 0.28278622898318656, "percentage": 28.28, "elapsed_time": "2:36:03", "remaining_time": "6:35:43"}
+{"current_steps": 884, "total_steps": 3122, "loss": 1.5066, "learning_rate": 4.507315939076782e-05, "epoch": 0.2831064851881505, "percentage": 28.32, "elapsed_time": "2:36:14", "remaining_time": "6:35:32"}
+{"current_steps": 885, "total_steps": 3122, "loss": 2.5622, "learning_rate": 4.5056480456008085e-05, "epoch": 0.28342674139311447, "percentage": 28.35, "elapsed_time": "2:36:24", "remaining_time": "6:35:21"}
+{"current_steps": 886, "total_steps": 3122, "loss": 2.3004, "learning_rate": 4.5039776434120306e-05, "epoch": 0.2837469975980785, "percentage": 28.38, "elapsed_time": "2:36:34", "remaining_time": "6:35:09"}
+{"current_steps": 887, "total_steps": 3122, "loss": 2.3096, "learning_rate": 4.502304734599828e-05, "epoch": 0.28406725380304243, "percentage": 28.41, "elapsed_time": "2:36:45", "remaining_time": "6:34:58"}
+{"current_steps": 888, "total_steps": 3122, "loss": 2.1645, "learning_rate": 4.5006293212567164e-05, "epoch": 0.2843875100080064, "percentage": 28.44, "elapsed_time": "2:36:55", "remaining_time": "6:34:47"}
+{"current_steps": 889, "total_steps": 3122, "loss": 2.2932, "learning_rate": 4.4989514054783406e-05, "epoch": 0.2847077662129704, "percentage": 28.48, "elapsed_time": "2:37:05", "remaining_time": "6:34:36"}
+{"current_steps": 890, "total_steps": 3122, "loss": 2.1796, "learning_rate": 4.49727098936348e-05, "epoch": 0.28502802241793435, "percentage": 28.51, "elapsed_time": "2:37:16", "remaining_time": "6:34:24"}
+{"current_steps": 891, "total_steps": 3122, "loss": 1.7093, "learning_rate": 4.495588075014038e-05, "epoch": 0.2853482786228983, "percentage": 28.54, "elapsed_time": "2:37:26", "remaining_time": "6:34:13"}
+{"current_steps": 892, "total_steps": 3122, "loss": 2.5258, "learning_rate": 4.4939026645350454e-05, "epoch": 0.2856685348278623, "percentage": 28.57, "elapsed_time": "2:37:37", "remaining_time": "6:34:02"}
+{"current_steps": 893, "total_steps": 3122, "loss": 1.979, "learning_rate": 4.4922147600346545e-05, "epoch": 0.28598879103282626, "percentage": 28.6, "elapsed_time": "2:37:47", "remaining_time": "6:33:51"}
+{"current_steps": 894, "total_steps": 3122, "loss": 2.0999, "learning_rate": 4.4905243636241354e-05, "epoch": 0.2863090472377902, "percentage": 28.64, "elapsed_time": "2:37:57", "remaining_time": "6:33:40"}
+{"current_steps": 895, "total_steps": 3122, "loss": 2.4738, "learning_rate": 4.4888314774178776e-05, "epoch": 0.2866293034427542, "percentage": 28.67, "elapsed_time": "2:38:08", "remaining_time": "6:33:28"}
+{"current_steps": 896, "total_steps": 3122, "loss": 2.3017, "learning_rate": 4.4871361035333836e-05, "epoch": 0.2869495596477182, "percentage": 28.7, "elapsed_time": "2:38:18", "remaining_time": "6:33:17"}
+{"current_steps": 897, "total_steps": 3122, "loss": 2.2876, "learning_rate": 4.485438244091268e-05, "epoch": 0.28726981585268213, "percentage": 28.73, "elapsed_time": "2:38:28", "remaining_time": "6:33:06"}
+{"current_steps": 898, "total_steps": 3122, "loss": 2.1632, "learning_rate": 4.483737901215254e-05, "epoch": 0.28759007205764614, "percentage": 28.76, "elapsed_time": "2:38:39", "remaining_time": "6:32:55"}
+{"current_steps": 899, "total_steps": 3122, "loss": 2.4111, "learning_rate": 4.482035077032171e-05, "epoch": 0.2879103282626101, "percentage": 28.8, "elapsed_time": "2:38:49", "remaining_time": "6:32:44"}
+{"current_steps": 900, "total_steps": 3122, "loss": 2.6698, "learning_rate": 4.4803297736719534e-05, "epoch": 0.28823058446757405, "percentage": 28.83, "elapsed_time": "2:38:59", "remaining_time": "6:32:32"}
+{"current_steps": 901, "total_steps": 3122, "loss": 2.4385, "learning_rate": 4.478621993267635e-05, "epoch": 0.28855084067253806, "percentage": 28.86, "elapsed_time": "2:39:36", "remaining_time": "6:33:26"}
+{"current_steps": 902, "total_steps": 3122, "loss": 1.9053, "learning_rate": 4.476911737955349e-05, "epoch": 0.288871096877502, "percentage": 28.89, "elapsed_time": "2:39:47", "remaining_time": "6:33:15"}
+{"current_steps": 903, "total_steps": 3122, "loss": 1.8812, "learning_rate": 4.475199009874323e-05, "epoch": 0.28919135308246596, "percentage": 28.92, "elapsed_time": "2:39:57", "remaining_time": "6:33:04"}
+{"current_steps": 904, "total_steps": 3122, "loss": 1.812, "learning_rate": 4.47348381116688e-05, "epoch": 0.2895116092874299, "percentage": 28.96, "elapsed_time": "2:40:07", "remaining_time": "6:32:53"}
+{"current_steps": 905, "total_steps": 3122, "loss": 2.3822, "learning_rate": 4.47176614397843e-05, "epoch": 0.2898318654923939, "percentage": 28.99, "elapsed_time": "2:40:18", "remaining_time": "6:32:41"}
+{"current_steps": 906, "total_steps": 3122, "loss": 1.8144, "learning_rate": 4.470046010457473e-05, "epoch": 0.2901521216973579, "percentage": 29.02, "elapsed_time": "2:40:28", "remaining_time": "6:32:30"}
+{"current_steps": 907, "total_steps": 3122, "loss": 2.3208, "learning_rate": 4.4683234127555944e-05, "epoch": 0.29047237790232183, "percentage": 29.05, "elapsed_time": "2:40:39", "remaining_time": "6:32:19"}
+{"current_steps": 908, "total_steps": 3122, "loss": 2.0736, "learning_rate": 4.46659835302746e-05, "epoch": 0.29079263410728584, "percentage": 29.08, "elapsed_time": "2:40:49", "remaining_time": "6:32:08"}
+{"current_steps": 909, "total_steps": 3122, "loss": 2.6272, "learning_rate": 4.4648708334308156e-05, "epoch": 0.2911128903122498, "percentage": 29.12, "elapsed_time": "2:40:59", "remaining_time": "6:31:57"}
+{"current_steps": 910, "total_steps": 3122, "loss": 2.2224, "learning_rate": 4.463140856126485e-05, "epoch": 0.29143314651721375, "percentage": 29.15, "elapsed_time": "2:41:10", "remaining_time": "6:31:46"}
+{"current_steps": 911, "total_steps": 3122, "loss": 2.1467, "learning_rate": 4.461408423278365e-05, "epoch": 0.29175340272217776, "percentage": 29.18, "elapsed_time": "2:41:20", "remaining_time": "6:31:35"}
+{"current_steps": 912, "total_steps": 3122, "loss": 2.5051, "learning_rate": 4.4596735370534246e-05, "epoch": 0.2920736589271417, "percentage": 29.21, "elapsed_time": "2:41:31", "remaining_time": "6:31:24"}
+{"current_steps": 913, "total_steps": 3122, "loss": 2.0413, "learning_rate": 4.457936199621701e-05, "epoch": 0.29239391513210566, "percentage": 29.24, "elapsed_time": "2:41:41", "remaining_time": "6:31:12"}
+{"current_steps": 914, "total_steps": 3122, "loss": 2.1757, "learning_rate": 4.456196413156297e-05, "epoch": 0.2927141713370697, "percentage": 29.28, "elapsed_time": "2:41:51", "remaining_time": "6:31:01"}
+{"current_steps": 915, "total_steps": 3122, "loss": 2.51, "learning_rate": 4.45445417983338e-05, "epoch": 0.2930344275420336, "percentage": 29.31, "elapsed_time": "2:42:02", "remaining_time": "6:30:50"}
+{"current_steps": 916, "total_steps": 3122, "loss": 2.3372, "learning_rate": 4.4527095018321786e-05, "epoch": 0.2933546837469976, "percentage": 29.34, "elapsed_time": "2:42:12", "remaining_time": "6:30:39"}
+{"current_steps": 917, "total_steps": 3122, "loss": 2.4337, "learning_rate": 4.4509623813349755e-05, "epoch": 0.2936749399519616, "percentage": 29.37, "elapsed_time": "2:42:23", "remaining_time": "6:30:28"}
+{"current_steps": 918, "total_steps": 3122, "loss": 2.0431, "learning_rate": 4.4492128205271134e-05, "epoch": 0.29399519615692554, "percentage": 29.4, "elapsed_time": "2:42:33", "remaining_time": "6:30:17"}
+{"current_steps": 919, "total_steps": 3122, "loss": 2.0454, "learning_rate": 4.4474608215969825e-05, "epoch": 0.2943154523618895, "percentage": 29.44, "elapsed_time": "2:42:43", "remaining_time": "6:30:05"}
+{"current_steps": 920, "total_steps": 3122, "loss": 1.6327, "learning_rate": 4.445706386736027e-05, "epoch": 0.2946357085668535, "percentage": 29.47, "elapsed_time": "2:42:54", "remaining_time": "6:29:54"}
+{"current_steps": 921, "total_steps": 3122, "loss": 2.1912, "learning_rate": 4.4439495181387355e-05, "epoch": 0.29495596477181746, "percentage": 29.5, "elapsed_time": "2:43:04", "remaining_time": "6:29:43"}
+{"current_steps": 922, "total_steps": 3122, "loss": 2.5112, "learning_rate": 4.442190218002643e-05, "epoch": 0.2952762209767814, "percentage": 29.53, "elapsed_time": "2:43:14", "remaining_time": "6:29:31"}
+{"current_steps": 923, "total_steps": 3122, "loss": 2.2843, "learning_rate": 4.440428488528322e-05, "epoch": 0.2955964771817454, "percentage": 29.56, "elapsed_time": "2:43:25", "remaining_time": "6:29:20"}
+{"current_steps": 924, "total_steps": 3122, "loss": 2.0363, "learning_rate": 4.4386643319193874e-05, "epoch": 0.2959167333867094, "percentage": 29.6, "elapsed_time": "2:43:35", "remaining_time": "6:29:09"}
+{"current_steps": 925, "total_steps": 3122, "loss": 2.4265, "learning_rate": 4.436897750382489e-05, "epoch": 0.2962369895916733, "percentage": 29.63, "elapsed_time": "2:43:46", "remaining_time": "6:28:58"}
+{"current_steps": 926, "total_steps": 3122, "loss": 2.0594, "learning_rate": 4.435128746127309e-05, "epoch": 0.29655724579663734, "percentage": 29.66, "elapsed_time": "2:43:56", "remaining_time": "6:28:46"}
+{"current_steps": 927, "total_steps": 3122, "loss": 2.3537, "learning_rate": 4.4333573213665604e-05, "epoch": 0.2968775020016013, "percentage": 29.69, "elapsed_time": "2:44:06", "remaining_time": "6:28:35"}
+{"current_steps": 928, "total_steps": 3122, "loss": 2.7564, "learning_rate": 4.431583478315984e-05, "epoch": 0.29719775820656524, "percentage": 29.72, "elapsed_time": "2:44:17", "remaining_time": "6:28:24"}
+{"current_steps": 929, "total_steps": 3122, "loss": 2.0438, "learning_rate": 4.429807219194345e-05, "epoch": 0.2975180144115292, "percentage": 29.76, "elapsed_time": "2:44:27", "remaining_time": "6:28:13"}
+{"current_steps": 930, "total_steps": 3122, "loss": 2.0035, "learning_rate": 4.428028546223432e-05, "epoch": 0.2978382706164932, "percentage": 29.79, "elapsed_time": "2:44:37", "remaining_time": "6:28:01"}
+{"current_steps": 931, "total_steps": 3122, "loss": 1.9675, "learning_rate": 4.4262474616280506e-05, "epoch": 0.29815852682145716, "percentage": 29.82, "elapsed_time": "2:44:48", "remaining_time": "6:27:50"}
+{"current_steps": 932, "total_steps": 3122, "loss": 2.2379, "learning_rate": 4.4244639676360253e-05, "epoch": 0.2984787830264211, "percentage": 29.85, "elapsed_time": "2:44:58", "remaining_time": "6:27:39"}
+{"current_steps": 933, "total_steps": 3122, "loss": 1.8438, "learning_rate": 4.422678066478192e-05, "epoch": 0.2987990392313851, "percentage": 29.88, "elapsed_time": "2:45:08", "remaining_time": "6:27:28"}
+{"current_steps": 934, "total_steps": 3122, "loss": 2.166, "learning_rate": 4.4208897603884016e-05, "epoch": 0.2991192954363491, "percentage": 29.92, "elapsed_time": "2:45:19", "remaining_time": "6:27:16"}
+{"current_steps": 935, "total_steps": 3122, "loss": 2.4782, "learning_rate": 4.419099051603507e-05, "epoch": 0.29943955164131303, "percentage": 29.95, "elapsed_time": "2:45:29", "remaining_time": "6:27:05"}
+{"current_steps": 936, "total_steps": 3122, "loss": 1.9755, "learning_rate": 4.417305942363371e-05, "epoch": 0.29975980784627704, "percentage": 29.98, "elapsed_time": "2:45:39", "remaining_time": "6:26:54"}
+{"current_steps": 937, "total_steps": 3122, "loss": 2.6677, "learning_rate": 4.415510434910859e-05, "epoch": 0.300080064051241, "percentage": 30.01, "elapsed_time": "2:45:50", "remaining_time": "6:26:43"}
+{"current_steps": 938, "total_steps": 3122, "loss": 2.0538, "learning_rate": 4.413712531491833e-05, "epoch": 0.30040032025620494, "percentage": 30.04, "elapsed_time": "2:46:00", "remaining_time": "6:26:31"}
+{"current_steps": 939, "total_steps": 3122, "loss": 2.4744, "learning_rate": 4.411912234355156e-05, "epoch": 0.30072057646116895, "percentage": 30.08, "elapsed_time": "2:46:10", "remaining_time": "6:26:20"}
+{"current_steps": 940, "total_steps": 3122, "loss": 2.4799, "learning_rate": 4.41010954575268e-05, "epoch": 0.3010408326661329, "percentage": 30.11, "elapsed_time": "2:46:21", "remaining_time": "6:26:09"}
+{"current_steps": 941, "total_steps": 3122, "loss": 2.5785, "learning_rate": 4.408304467939254e-05, "epoch": 0.30136108887109686, "percentage": 30.14, "elapsed_time": "2:46:31", "remaining_time": "6:25:58"}
+{"current_steps": 942, "total_steps": 3122, "loss": 2.2337, "learning_rate": 4.4064970031727114e-05, "epoch": 0.30168134507606087, "percentage": 30.17, "elapsed_time": "2:46:42", "remaining_time": "6:25:46"}
+{"current_steps": 943, "total_steps": 3122, "loss": 2.5195, "learning_rate": 4.4046871537138734e-05, "epoch": 0.3020016012810248, "percentage": 30.2, "elapsed_time": "2:46:52", "remaining_time": "6:25:35"}
+{"current_steps": 944, "total_steps": 3122, "loss": 2.3741, "learning_rate": 4.402874921826542e-05, "epoch": 0.3023218574859888, "percentage": 30.24, "elapsed_time": "2:47:02", "remaining_time": "6:25:24"}
+{"current_steps": 945, "total_steps": 3122, "loss": 2.4184, "learning_rate": 4.4010603097775015e-05, "epoch": 0.3026421136909528, "percentage": 30.27, "elapsed_time": "2:47:13", "remaining_time": "6:25:13"}
+{"current_steps": 946, "total_steps": 3122, "loss": 2.1592, "learning_rate": 4.399243319836512e-05, "epoch": 0.30296236989591674, "percentage": 30.3, "elapsed_time": "2:47:23", "remaining_time": "6:25:02"}
+{"current_steps": 947, "total_steps": 3122, "loss": 1.8628, "learning_rate": 4.397423954276308e-05, "epoch": 0.3032826261008807, "percentage": 30.33, "elapsed_time": "2:47:33", "remaining_time": "6:24:50"}
+{"current_steps": 948, "total_steps": 3122, "loss": 1.8973, "learning_rate": 4.395602215372596e-05, "epoch": 0.3036028823058447, "percentage": 30.37, "elapsed_time": "2:47:44", "remaining_time": "6:24:39"}
+{"current_steps": 949, "total_steps": 3122, "loss": 2.1797, "learning_rate": 4.3937781054040505e-05, "epoch": 0.30392313851080865, "percentage": 30.4, "elapsed_time": "2:47:54", "remaining_time": "6:24:28"}
+{"current_steps": 950, "total_steps": 3122, "loss": 2.0715, "learning_rate": 4.391951626652312e-05, "epoch": 0.3042433947157726, "percentage": 30.43, "elapsed_time": "2:48:04", "remaining_time": "6:24:17"}
+{"current_steps": 951, "total_steps": 3122, "loss": 1.859, "learning_rate": 4.3901227814019845e-05, "epoch": 0.30456365092073656, "percentage": 30.46, "elapsed_time": "2:48:15", "remaining_time": "6:24:06"}
+{"current_steps": 952, "total_steps": 3122, "loss": 2.4701, "learning_rate": 4.388291571940631e-05, "epoch": 0.30488390712570057, "percentage": 30.49, "elapsed_time": "2:48:25", "remaining_time": "6:23:54"}
+{"current_steps": 953, "total_steps": 3122, "loss": 2.0972, "learning_rate": 4.386458000558773e-05, "epoch": 0.3052041633306645, "percentage": 30.53, "elapsed_time": "2:48:35", "remaining_time": "6:23:43"}
+{"current_steps": 954, "total_steps": 3122, "loss": 1.9298, "learning_rate": 4.384622069549886e-05, "epoch": 0.3055244195356285, "percentage": 30.56, "elapsed_time": "2:48:46", "remaining_time": "6:23:32"}
+{"current_steps": 955, "total_steps": 3122, "loss": 2.1858, "learning_rate": 4.382783781210395e-05, "epoch": 0.3058446757405925, "percentage": 30.59, "elapsed_time": "2:48:56", "remaining_time": "6:23:21"}
+{"current_steps": 956, "total_steps": 3122, "loss": 2.1796, "learning_rate": 4.3809431378396776e-05, "epoch": 0.30616493194555644, "percentage": 30.62, "elapsed_time": "2:49:07", "remaining_time": "6:23:10"}
+{"current_steps": 957, "total_steps": 3122, "loss": 2.071, "learning_rate": 4.379100141740053e-05, "epoch": 0.3064851881505204, "percentage": 30.65, "elapsed_time": "2:49:17", "remaining_time": "6:22:58"}
+{"current_steps": 958, "total_steps": 3122, "loss": 2.5639, "learning_rate": 4.377254795216785e-05, "epoch": 0.3068054443554844, "percentage": 30.69, "elapsed_time": "2:49:27", "remaining_time": "6:22:47"}
+{"current_steps": 959, "total_steps": 3122, "loss": 2.4597, "learning_rate": 4.3754071005780785e-05, "epoch": 0.30712570056044836, "percentage": 30.72, "elapsed_time": "2:49:38", "remaining_time": "6:22:36"}
+{"current_steps": 960, "total_steps": 3122, "loss": 2.6462, "learning_rate": 4.3735570601350736e-05, "epoch": 0.3074459567654123, "percentage": 30.75, "elapsed_time": "2:49:48", "remaining_time": "6:22:25"}
+{"current_steps": 961, "total_steps": 3122, "loss": 2.2894, "learning_rate": 4.3717046762018454e-05, "epoch": 0.3077662129703763, "percentage": 30.78, "elapsed_time": "2:49:58", "remaining_time": "6:22:14"}
+{"current_steps": 962, "total_steps": 3122, "loss": 1.6288, "learning_rate": 4.369849951095401e-05, "epoch": 0.30808646917534027, "percentage": 30.81, "elapsed_time": "2:50:09", "remaining_time": "6:22:02"}
+{"current_steps": 963, "total_steps": 3122, "loss": 1.4223, "learning_rate": 4.3679928871356743e-05, "epoch": 0.3084067253803042, "percentage": 30.85, "elapsed_time": "2:50:19", "remaining_time": "6:21:51"}
+{"current_steps": 964, "total_steps": 3122, "loss": 2.0063, "learning_rate": 4.366133486645526e-05, "epoch": 0.30872698158526823, "percentage": 30.88, "elapsed_time": "2:50:29", "remaining_time": "6:21:40"}
+{"current_steps": 965, "total_steps": 3122, "loss": 2.1687, "learning_rate": 4.364271751950739e-05, "epoch": 0.3090472377902322, "percentage": 30.91, "elapsed_time": "2:50:40", "remaining_time": "6:21:29"}
+{"current_steps": 966, "total_steps": 3122, "loss": 2.4734, "learning_rate": 4.362407685380015e-05, "epoch": 0.30936749399519614, "percentage": 30.94, "elapsed_time": "2:50:50", "remaining_time": "6:21:18"}
+{"current_steps": 967, "total_steps": 3122, "loss": 2.215, "learning_rate": 4.3605412892649744e-05, "epoch": 0.30968775020016015, "percentage": 30.97, "elapsed_time": "2:51:00", "remaining_time": "6:21:06"}
+{"current_steps": 968, "total_steps": 3122, "loss": 2.1618, "learning_rate": 4.3586725659401504e-05, "epoch": 0.3100080064051241, "percentage": 31.01, "elapsed_time": "2:51:11", "remaining_time": "6:20:55"}
+{"current_steps": 969, "total_steps": 3122, "loss": 2.6403, "learning_rate": 4.356801517742986e-05, "epoch": 0.31032826261008806, "percentage": 31.04, "elapsed_time": "2:51:21", "remaining_time": "6:20:44"}
+{"current_steps": 970, "total_steps": 3122, "loss": 2.0227, "learning_rate": 4.3549281470138334e-05, "epoch": 0.31064851881505207, "percentage": 31.07, "elapsed_time": "2:51:31", "remaining_time": "6:20:33"}
+{"current_steps": 971, "total_steps": 3122, "loss": 2.4126, "learning_rate": 4.353052456095952e-05, "epoch": 0.310968775020016, "percentage": 31.1, "elapsed_time": "2:51:42", "remaining_time": "6:20:22"}
+{"current_steps": 972, "total_steps": 3122, "loss": 2.1611, "learning_rate": 4.351174447335498e-05, "epoch": 0.31128903122498, "percentage": 31.13, "elapsed_time": "2:51:52", "remaining_time": "6:20:11"}
+{"current_steps": 973, "total_steps": 3122, "loss": 2.2805, "learning_rate": 4.349294123081531e-05, "epoch": 0.311609287429944, "percentage": 31.17, "elapsed_time": "2:52:03", "remaining_time": "6:19:59"}
+{"current_steps": 974, "total_steps": 3122, "loss": 2.2679, "learning_rate": 4.347411485686006e-05, "epoch": 0.31192954363490794, "percentage": 31.2, "elapsed_time": "2:52:13", "remaining_time": "6:19:48"}
+{"current_steps": 975, "total_steps": 3122, "loss": 2.2008, "learning_rate": 4.345526537503771e-05, "epoch": 0.3122497998398719, "percentage": 31.23, "elapsed_time": "2:52:23", "remaining_time": "6:19:37"}
+{"current_steps": 976, "total_steps": 3122, "loss": 1.8056, "learning_rate": 4.3436392808925654e-05, "epoch": 0.31257005604483584, "percentage": 31.26, "elapsed_time": "2:52:34", "remaining_time": "6:19:26"}
+{"current_steps": 977, "total_steps": 3122, "loss": 2.3376, "learning_rate": 4.341749718213014e-05, "epoch": 0.31289031224979985, "percentage": 31.29, "elapsed_time": "2:52:44", "remaining_time": "6:19:15"}
+{"current_steps": 978, "total_steps": 3122, "loss": 2.4653, "learning_rate": 4.339857851828628e-05, "epoch": 0.3132105684547638, "percentage": 31.33, "elapsed_time": "2:52:54", "remaining_time": "6:19:04"}
+{"current_steps": 979, "total_steps": 3122, "loss": 2.2227, "learning_rate": 4.337963684105799e-05, "epoch": 0.31353082465972776, "percentage": 31.36, "elapsed_time": "2:53:05", "remaining_time": "6:18:52"}
+{"current_steps": 980, "total_steps": 3122, "loss": 2.2355, "learning_rate": 4.336067217413797e-05, "epoch": 0.31385108086469177, "percentage": 31.39, "elapsed_time": "2:53:15", "remaining_time": "6:18:41"}
+{"current_steps": 981, "total_steps": 3122, "loss": 2.4895, "learning_rate": 4.334168454124769e-05, "epoch": 0.3141713370696557, "percentage": 31.42, "elapsed_time": "2:53:25", "remaining_time": "6:18:30"}
+{"current_steps": 982, "total_steps": 3122, "loss": 1.9417, "learning_rate": 4.332267396613734e-05, "epoch": 0.3144915932746197, "percentage": 31.45, "elapsed_time": "2:53:36", "remaining_time": "6:18:19"}
+{"current_steps": 983, "total_steps": 3122, "loss": 2.6751, "learning_rate": 4.330364047258579e-05, "epoch": 0.3148118494795837, "percentage": 31.49, "elapsed_time": "2:53:46", "remaining_time": "6:18:08"}
+{"current_steps": 984, "total_steps": 3122, "loss": 1.9346, "learning_rate": 4.3284584084400604e-05, "epoch": 0.31513210568454764, "percentage": 31.52, "elapsed_time": "2:53:57", "remaining_time": "6:17:57"}
+{"current_steps": 985, "total_steps": 3122, "loss": 2.1739, "learning_rate": 4.3265504825417966e-05, "epoch": 0.3154523618895116, "percentage": 31.55, "elapsed_time": "2:54:07", "remaining_time": "6:17:46"}
+{"current_steps": 986, "total_steps": 3122, "loss": 1.7595, "learning_rate": 4.3246402719502676e-05, "epoch": 0.3157726180944756, "percentage": 31.58, "elapsed_time": "2:54:17", "remaining_time": "6:17:34"}
+{"current_steps": 987, "total_steps": 3122, "loss": 2.2438, "learning_rate": 4.3227277790548104e-05, "epoch": 0.31609287429943955, "percentage": 31.61, "elapsed_time": "2:54:28", "remaining_time": "6:17:23"}
+{"current_steps": 988, "total_steps": 3122, "loss": 2.4872, "learning_rate": 4.3208130062476174e-05, "epoch": 0.3164131305044035, "percentage": 31.65, "elapsed_time": "2:54:38", "remaining_time": "6:17:12"}
+{"current_steps": 989, "total_steps": 3122, "loss": 2.4345, "learning_rate": 4.318895955923731e-05, "epoch": 0.3167333867093675, "percentage": 31.68, "elapsed_time": "2:54:48", "remaining_time": "6:17:01"}
+{"current_steps": 990, "total_steps": 3122, "loss": 2.2613, "learning_rate": 4.316976630481046e-05, "epoch": 0.31705364291433147, "percentage": 31.71, "elapsed_time": "2:54:59", "remaining_time": "6:16:50"}
+{"current_steps": 991, "total_steps": 3122, "loss": 2.1071, "learning_rate": 4.3150550323203e-05, "epoch": 0.3173738991192954, "percentage": 31.74, "elapsed_time": "2:55:09", "remaining_time": "6:16:39"}
+{"current_steps": 992, "total_steps": 3122, "loss": 2.1463, "learning_rate": 4.313131163845073e-05, "epoch": 0.31769415532425943, "percentage": 31.77, "elapsed_time": "2:55:19", "remaining_time": "6:16:27"}
+{"current_steps": 993, "total_steps": 3122, "loss": 1.4839, "learning_rate": 4.311205027461789e-05, "epoch": 0.3180144115292234, "percentage": 31.81, "elapsed_time": "2:55:30", "remaining_time": "6:16:16"}
+{"current_steps": 994, "total_steps": 3122, "loss": 2.4197, "learning_rate": 4.309276625579703e-05, "epoch": 0.31833466773418734, "percentage": 31.84, "elapsed_time": "2:55:40", "remaining_time": "6:16:05"}
+{"current_steps": 995, "total_steps": 3122, "loss": 2.0932, "learning_rate": 4.307345960610906e-05, "epoch": 0.31865492393915135, "percentage": 31.87, "elapsed_time": "2:55:50", "remaining_time": "6:15:54"}
+{"current_steps": 996, "total_steps": 3122, "loss": 2.1792, "learning_rate": 4.305413034970322e-05, "epoch": 0.3189751801441153, "percentage": 31.9, "elapsed_time": "2:56:01", "remaining_time": "6:15:43"}
+{"current_steps": 997, "total_steps": 3122, "loss": 2.5835, "learning_rate": 4.3034778510757e-05, "epoch": 0.31929543634907925, "percentage": 31.93, "elapsed_time": "2:56:11", "remaining_time": "6:15:32"}
+{"current_steps": 998, "total_steps": 3122, "loss": 1.9542, "learning_rate": 4.3015404113476156e-05, "epoch": 0.3196156925540432, "percentage": 31.97, "elapsed_time": "2:56:22", "remaining_time": "6:15:21"}
+{"current_steps": 999, "total_steps": 3122, "loss": 1.7533, "learning_rate": 4.2996007182094634e-05, "epoch": 0.3199359487590072, "percentage": 32.0, "elapsed_time": "2:56:32", "remaining_time": "6:15:10"}
+{"current_steps": 1000, "total_steps": 3122, "loss": 2.4536, "learning_rate": 4.297658774087459e-05, "epoch": 0.32025620496397117, "percentage": 32.03, "elapsed_time": "2:56:42", "remaining_time": "6:14:58"}
+{"current_steps": 1001, "total_steps": 3122, "loss": 2.0973, "learning_rate": 4.295714581410633e-05, "epoch": 0.3205764611689351, "percentage": 32.06, "elapsed_time": "2:57:28", "remaining_time": "6:16:02"}
+{"current_steps": 1002, "total_steps": 3122, "loss": 2.5078, "learning_rate": 4.293768142610828e-05, "epoch": 0.32089671737389913, "percentage": 32.09, "elapsed_time": "2:57:38", "remaining_time": "6:15:51"}
+{"current_steps": 1003, "total_steps": 3122, "loss": 1.7711, "learning_rate": 4.291819460122697e-05, "epoch": 0.3212169735788631, "percentage": 32.13, "elapsed_time": "2:57:48", "remaining_time": "6:15:39"}
+{"current_steps": 1004, "total_steps": 3122, "loss": 2.1171, "learning_rate": 4.2898685363836974e-05, "epoch": 0.32153722978382704, "percentage": 32.16, "elapsed_time": "2:57:59", "remaining_time": "6:15:28"}
+{"current_steps": 1005, "total_steps": 3122, "loss": 2.2499, "learning_rate": 4.287915373834094e-05, "epoch": 0.32185748598879105, "percentage": 32.19, "elapsed_time": "2:58:09", "remaining_time": "6:15:17"}
+{"current_steps": 1006, "total_steps": 3122, "loss": 1.9514, "learning_rate": 4.2859599749169474e-05, "epoch": 0.322177742193755, "percentage": 32.22, "elapsed_time": "2:58:20", "remaining_time": "6:15:06"}
+{"current_steps": 1007, "total_steps": 3122, "loss": 2.2806, "learning_rate": 4.284002342078119e-05, "epoch": 0.32249799839871895, "percentage": 32.25, "elapsed_time": "2:58:30", "remaining_time": "6:14:55"}
+{"current_steps": 1008, "total_steps": 3122, "loss": 1.9288, "learning_rate": 4.2820424777662616e-05, "epoch": 0.32281825460368296, "percentage": 32.29, "elapsed_time": "2:58:41", "remaining_time": "6:14:44"}
+{"current_steps": 1009, "total_steps": 3122, "loss": 2.4497, "learning_rate": 4.280080384432821e-05, "epoch": 0.3231385108086469, "percentage": 32.32, "elapsed_time": "2:58:51", "remaining_time": "6:14:33"}
+{"current_steps": 1010, "total_steps": 3122, "loss": 2.273, "learning_rate": 4.278116064532032e-05, "epoch": 0.32345876701361087, "percentage": 32.35, "elapsed_time": "2:59:01", "remaining_time": "6:14:22"}
+{"current_steps": 1011, "total_steps": 3122, "loss": 2.2382, "learning_rate": 4.2761495205209114e-05, "epoch": 0.3237790232185749, "percentage": 32.38, "elapsed_time": "2:59:12", "remaining_time": "6:14:11"}
+{"current_steps": 1012, "total_steps": 3122, "loss": 2.0357, "learning_rate": 4.274180754859261e-05, "epoch": 0.32409927942353883, "percentage": 32.42, "elapsed_time": "2:59:22", "remaining_time": "6:14:00"}
+{"current_steps": 1013, "total_steps": 3122, "loss": 1.655, "learning_rate": 4.27220977000966e-05, "epoch": 0.3244195356285028, "percentage": 32.45, "elapsed_time": "2:59:33", "remaining_time": "6:13:49"}
+{"current_steps": 1014, "total_steps": 3122, "loss": 2.2382, "learning_rate": 4.2702365684374626e-05, "epoch": 0.3247397918334668, "percentage": 32.48, "elapsed_time": "2:59:43", "remaining_time": "6:13:38"}
+{"current_steps": 1015, "total_steps": 3122, "loss": 1.7932, "learning_rate": 4.2682611526107986e-05, "epoch": 0.32506004803843075, "percentage": 32.51, "elapsed_time": "2:59:54", "remaining_time": "6:13:26"}
+{"current_steps": 1016, "total_steps": 3122, "loss": 2.5412, "learning_rate": 4.266283525000564e-05, "epoch": 0.3253803042433947, "percentage": 32.54, "elapsed_time": "3:00:04", "remaining_time": "6:13:15"}
+{"current_steps": 1017, "total_steps": 3122, "loss": 2.1839, "learning_rate": 4.2643036880804236e-05, "epoch": 0.3257005604483587, "percentage": 32.58, "elapsed_time": "3:00:14", "remaining_time": "6:13:04"}
+{"current_steps": 1018, "total_steps": 3122, "loss": 2.3921, "learning_rate": 4.2623216443268055e-05, "epoch": 0.32602081665332266, "percentage": 32.61, "elapsed_time": "3:00:25", "remaining_time": "6:12:53"}
+{"current_steps": 1019, "total_steps": 3122, "loss": 2.1971, "learning_rate": 4.2603373962188966e-05, "epoch": 0.3263410728582866, "percentage": 32.64, "elapsed_time": "3:00:35", "remaining_time": "6:12:42"}
+{"current_steps": 1020, "total_steps": 3122, "loss": 2.4754, "learning_rate": 4.258350946238643e-05, "epoch": 0.3266613290632506, "percentage": 32.67, "elapsed_time": "3:00:45", "remaining_time": "6:12:31"}
+{"current_steps": 1021, "total_steps": 3122, "loss": 2.1899, "learning_rate": 4.256362296870744e-05, "epoch": 0.3269815852682146, "percentage": 32.7, "elapsed_time": "3:00:56", "remaining_time": "6:12:19"}
+{"current_steps": 1022, "total_steps": 3122, "loss": 2.5574, "learning_rate": 4.25437145060265e-05, "epoch": 0.32730184147317853, "percentage": 32.74, "elapsed_time": "3:01:06", "remaining_time": "6:12:08"}
+{"current_steps": 1023, "total_steps": 3122, "loss": 2.1373, "learning_rate": 4.252378409924559e-05, "epoch": 0.3276220976781425, "percentage": 32.77, "elapsed_time": "3:01:17", "remaining_time": "6:11:57"}
+{"current_steps": 1024, "total_steps": 3122, "loss": 2.4083, "learning_rate": 4.2503831773294144e-05, "epoch": 0.3279423538831065, "percentage": 32.8, "elapsed_time": "3:01:27", "remaining_time": "6:11:46"}
+{"current_steps": 1025, "total_steps": 3122, "loss": 1.7979, "learning_rate": 4.248385755312901e-05, "epoch": 0.32826261008807045, "percentage": 32.83, "elapsed_time": "3:01:37", "remaining_time": "6:11:35"}
+{"current_steps": 1026, "total_steps": 3122, "loss": 2.0333, "learning_rate": 4.246386146373444e-05, "epoch": 0.3285828662930344, "percentage": 32.86, "elapsed_time": "3:01:48", "remaining_time": "6:11:23"}
+{"current_steps": 1027, "total_steps": 3122, "loss": 1.9149, "learning_rate": 4.244384353012199e-05, "epoch": 0.3289031224979984, "percentage": 32.9, "elapsed_time": "3:01:58", "remaining_time": "6:11:12"}
+{"current_steps": 1028, "total_steps": 3122, "loss": 2.0417, "learning_rate": 4.2423803777330606e-05, "epoch": 0.32922337870296237, "percentage": 32.93, "elapsed_time": "3:02:08", "remaining_time": "6:11:01"}
+{"current_steps": 1029, "total_steps": 3122, "loss": 1.9744, "learning_rate": 4.240374223042647e-05, "epoch": 0.3295436349079263, "percentage": 32.96, "elapsed_time": "3:02:19", "remaining_time": "6:10:50"}
+{"current_steps": 1030, "total_steps": 3122, "loss": 2.2739, "learning_rate": 4.2383658914503056e-05, "epoch": 0.32986389111289033, "percentage": 32.99, "elapsed_time": "3:02:29", "remaining_time": "6:10:39"}
+{"current_steps": 1031, "total_steps": 3122, "loss": 1.5005, "learning_rate": 4.236355385468106e-05, "epoch": 0.3301841473178543, "percentage": 33.02, "elapsed_time": "3:02:39", "remaining_time": "6:10:27"}
+{"current_steps": 1032, "total_steps": 3122, "loss": 2.1598, "learning_rate": 4.234342707610837e-05, "epoch": 0.33050440352281824, "percentage": 33.06, "elapsed_time": "3:02:50", "remaining_time": "6:10:16"}
+{"current_steps": 1033, "total_steps": 3122, "loss": 2.4382, "learning_rate": 4.2323278603960046e-05, "epoch": 0.33082465972778224, "percentage": 33.09, "elapsed_time": "3:03:00", "remaining_time": "6:10:05"}
+{"current_steps": 1034, "total_steps": 3122, "loss": 1.963, "learning_rate": 4.230310846343828e-05, "epoch": 0.3311449159327462, "percentage": 33.12, "elapsed_time": "3:03:10", "remaining_time": "6:09:54"}
+{"current_steps": 1035, "total_steps": 3122, "loss": 1.9068, "learning_rate": 4.228291667977238e-05, "epoch": 0.33146517213771015, "percentage": 33.15, "elapsed_time": "3:03:21", "remaining_time": "6:09:43"}
+{"current_steps": 1036, "total_steps": 3122, "loss": 1.4926, "learning_rate": 4.22627032782187e-05, "epoch": 0.33178542834267416, "percentage": 33.18, "elapsed_time": "3:03:31", "remaining_time": "6:09:31"}
+{"current_steps": 1037, "total_steps": 3122, "loss": 2.3178, "learning_rate": 4.2242468284060644e-05, "epoch": 0.3321056845476381, "percentage": 33.22, "elapsed_time": "3:03:41", "remaining_time": "6:09:20"}
+{"current_steps": 1038, "total_steps": 3122, "loss": 2.6006, "learning_rate": 4.222221172260865e-05, "epoch": 0.33242594075260207, "percentage": 33.25, "elapsed_time": "3:03:52", "remaining_time": "6:09:09"}
+{"current_steps": 1039, "total_steps": 3122, "loss": 2.1655, "learning_rate": 4.2201933619200095e-05, "epoch": 0.3327461969575661, "percentage": 33.28, "elapsed_time": "3:04:02", "remaining_time": "6:08:58"}
+{"current_steps": 1040, "total_steps": 3122, "loss": 2.2719, "learning_rate": 4.218163399919933e-05, "epoch": 0.33306645316253003, "percentage": 33.31, "elapsed_time": "3:04:12", "remaining_time": "6:08:47"}
+{"current_steps": 1041, "total_steps": 3122, "loss": 2.1145, "learning_rate": 4.216131288799761e-05, "epoch": 0.333386709367494, "percentage": 33.34, "elapsed_time": "3:04:23", "remaining_time": "6:08:36"}
+{"current_steps": 1042, "total_steps": 3122, "loss": 1.9372, "learning_rate": 4.214097031101305e-05, "epoch": 0.333706965572458, "percentage": 33.38, "elapsed_time": "3:04:33", "remaining_time": "6:08:24"}
+{"current_steps": 1043, "total_steps": 3122, "loss": 2.4681, "learning_rate": 4.212060629369065e-05, "epoch": 0.33402722177742195, "percentage": 33.41, "elapsed_time": "3:04:44", "remaining_time": "6:08:13"}
+{"current_steps": 1044, "total_steps": 3122, "loss": 1.957, "learning_rate": 4.210022086150221e-05, "epoch": 0.3343474779823859, "percentage": 33.44, "elapsed_time": "3:04:54", "remaining_time": "6:08:02"}
+{"current_steps": 1045, "total_steps": 3122, "loss": 2.0795, "learning_rate": 4.207981403994632e-05, "epoch": 0.33466773418734985, "percentage": 33.47, "elapsed_time": "3:05:04", "remaining_time": "6:07:51"}
+{"current_steps": 1046, "total_steps": 3122, "loss": 2.4652, "learning_rate": 4.2059385854548316e-05, "epoch": 0.33498799039231386, "percentage": 33.5, "elapsed_time": "3:05:15", "remaining_time": "6:07:40"}
+{"current_steps": 1047, "total_steps": 3122, "loss": 2.3613, "learning_rate": 4.203893633086027e-05, "epoch": 0.3353082465972778, "percentage": 33.54, "elapsed_time": "3:05:25", "remaining_time": "6:07:29"}
+{"current_steps": 1048, "total_steps": 3122, "loss": 2.4627, "learning_rate": 4.201846549446094e-05, "epoch": 0.33562850280224177, "percentage": 33.57, "elapsed_time": "3:05:35", "remaining_time": "6:07:17"}
+{"current_steps": 1049, "total_steps": 3122, "loss": 2.232, "learning_rate": 4.1997973370955734e-05, "epoch": 0.3359487590072058, "percentage": 33.6, "elapsed_time": "3:05:46", "remaining_time": "6:07:06"}
+{"current_steps": 1050, "total_steps": 3122, "loss": 2.6032, "learning_rate": 4.19774599859767e-05, "epoch": 0.33626901521216973, "percentage": 33.63, "elapsed_time": "3:05:56", "remaining_time": "6:06:55"}
+{"current_steps": 1051, "total_steps": 3122, "loss": 2.4148, "learning_rate": 4.1956925365182466e-05, "epoch": 0.3365892714171337, "percentage": 33.66, "elapsed_time": "3:06:06", "remaining_time": "6:06:44"}
+{"current_steps": 1052, "total_steps": 3122, "loss": 1.6132, "learning_rate": 4.193636953425823e-05, "epoch": 0.3369095276220977, "percentage": 33.7, "elapsed_time": "3:06:17", "remaining_time": "6:06:33"}
+{"current_steps": 1053, "total_steps": 3122, "loss": 2.2119, "learning_rate": 4.191579251891572e-05, "epoch": 0.33722978382706165, "percentage": 33.73, "elapsed_time": "3:06:27", "remaining_time": "6:06:22"}
+{"current_steps": 1054, "total_steps": 3122, "loss": 2.0276, "learning_rate": 4.1895194344893177e-05, "epoch": 0.3375500400320256, "percentage": 33.76, "elapsed_time": "3:06:37", "remaining_time": "6:06:10"}
+{"current_steps": 1055, "total_steps": 3122, "loss": 2.0666, "learning_rate": 4.187457503795527e-05, "epoch": 0.3378702962369896, "percentage": 33.79, "elapsed_time": "3:06:48", "remaining_time": "6:05:59"}
+{"current_steps": 1056, "total_steps": 3122, "loss": 2.1673, "learning_rate": 4.185393462389313e-05, "epoch": 0.33819055244195356, "percentage": 33.82, "elapsed_time": "3:06:58", "remaining_time": "6:05:48"}
+{"current_steps": 1057, "total_steps": 3122, "loss": 2.0761, "learning_rate": 4.1833273128524284e-05, "epoch": 0.3385108086469175, "percentage": 33.86, "elapsed_time": "3:07:09", "remaining_time": "6:05:37"}
+{"current_steps": 1058, "total_steps": 3122, "loss": 2.4819, "learning_rate": 4.181259057769264e-05, "epoch": 0.3388310648518815, "percentage": 33.89, "elapsed_time": "3:07:19", "remaining_time": "6:05:26"}
+{"current_steps": 1059, "total_steps": 3122, "loss": 2.1933, "learning_rate": 4.1791886997268414e-05, "epoch": 0.3391513210568455, "percentage": 33.92, "elapsed_time": "3:07:29", "remaining_time": "6:05:15"}
+{"current_steps": 1060, "total_steps": 3122, "loss": 2.2095, "learning_rate": 4.177116241314815e-05, "epoch": 0.33947157726180943, "percentage": 33.95, "elapsed_time": "3:07:40", "remaining_time": "6:05:04"}
+{"current_steps": 1061, "total_steps": 3122, "loss": 2.0342, "learning_rate": 4.175041685125465e-05, "epoch": 0.33979183346677344, "percentage": 33.98, "elapsed_time": "3:07:50", "remaining_time": "6:04:52"}
+{"current_steps": 1062, "total_steps": 3122, "loss": 2.3994, "learning_rate": 4.172965033753697e-05, "epoch": 0.3401120896717374, "percentage": 34.02, "elapsed_time": "3:08:00", "remaining_time": "6:04:41"}
+{"current_steps": 1063, "total_steps": 3122, "loss": 2.0665, "learning_rate": 4.170886289797036e-05, "epoch": 0.34043234587670135, "percentage": 34.05, "elapsed_time": "3:08:11", "remaining_time": "6:04:30"}
+{"current_steps": 1064, "total_steps": 3122, "loss": 1.9771, "learning_rate": 4.1688054558556245e-05, "epoch": 0.34075260208166536, "percentage": 34.08, "elapsed_time": "3:08:21", "remaining_time": "6:04:19"}
+{"current_steps": 1065, "total_steps": 3122, "loss": 2.5785, "learning_rate": 4.16672253453222e-05, "epoch": 0.3410728582866293, "percentage": 34.11, "elapsed_time": "3:08:31", "remaining_time": "6:04:08"}
+{"current_steps": 1066, "total_steps": 3122, "loss": 2.0384, "learning_rate": 4.1646375284321916e-05, "epoch": 0.34139311449159326, "percentage": 34.14, "elapsed_time": "3:08:42", "remaining_time": "6:03:57"}
+{"current_steps": 1067, "total_steps": 3122, "loss": 2.1372, "learning_rate": 4.1625504401635126e-05, "epoch": 0.3417133706965573, "percentage": 34.18, "elapsed_time": "3:08:52", "remaining_time": "6:03:46"}
+{"current_steps": 1068, "total_steps": 3122, "loss": 1.9049, "learning_rate": 4.1604612723367666e-05, "epoch": 0.3420336269015212, "percentage": 34.21, "elapsed_time": "3:09:02", "remaining_time": "6:03:35"}
+{"current_steps": 1069, "total_steps": 3122, "loss": 2.012, "learning_rate": 4.1583700275651314e-05, "epoch": 0.3423538831064852, "percentage": 34.24, "elapsed_time": "3:09:13", "remaining_time": "6:03:23"}
+{"current_steps": 1070, "total_steps": 3122, "loss": 2.1901, "learning_rate": 4.1562767084643885e-05, "epoch": 0.34267413931144913, "percentage": 34.27, "elapsed_time": "3:09:23", "remaining_time": "6:03:12"}
+{"current_steps": 1071, "total_steps": 3122, "loss": 2.4813, "learning_rate": 4.154181317652911e-05, "epoch": 0.34299439551641314, "percentage": 34.3, "elapsed_time": "3:09:34", "remaining_time": "6:03:01"}
+{"current_steps": 1072, "total_steps": 3122, "loss": 2.4138, "learning_rate": 4.152083857751665e-05, "epoch": 0.3433146517213771, "percentage": 34.34, "elapsed_time": "3:09:44", "remaining_time": "6:02:50"}
+{"current_steps": 1073, "total_steps": 3122, "loss": 2.4764, "learning_rate": 4.149984331384203e-05, "epoch": 0.34363490792634105, "percentage": 34.37, "elapsed_time": "3:09:54", "remaining_time": "6:02:39"}
+{"current_steps": 1074, "total_steps": 3122, "loss": 2.5071, "learning_rate": 4.147882741176662e-05, "epoch": 0.34395516413130506, "percentage": 34.4, "elapsed_time": "3:10:05", "remaining_time": "6:02:28"}
+{"current_steps": 1075, "total_steps": 3122, "loss": 2.285, "learning_rate": 4.145779089757764e-05, "epoch": 0.344275420336269, "percentage": 34.43, "elapsed_time": "3:10:15", "remaining_time": "6:02:17"}
+{"current_steps": 1076, "total_steps": 3122, "loss": 2.2156, "learning_rate": 4.1436733797588056e-05, "epoch": 0.34459567654123296, "percentage": 34.47, "elapsed_time": "3:10:25", "remaining_time": "6:02:05"}
+{"current_steps": 1077, "total_steps": 3122, "loss": 2.0952, "learning_rate": 4.141565613813658e-05, "epoch": 0.344915932746197, "percentage": 34.5, "elapsed_time": "3:10:36", "remaining_time": "6:01:54"}
+{"current_steps": 1078, "total_steps": 3122, "loss": 2.3122, "learning_rate": 4.139455794558768e-05, "epoch": 0.3452361889511609, "percentage": 34.53, "elapsed_time": "3:10:46", "remaining_time": "6:01:43"}
+{"current_steps": 1079, "total_steps": 3122, "loss": 1.9691, "learning_rate": 4.137343924633147e-05, "epoch": 0.3455564451561249, "percentage": 34.56, "elapsed_time": "3:10:56", "remaining_time": "6:01:32"}
+{"current_steps": 1080, "total_steps": 3122, "loss": 2.2278, "learning_rate": 4.135230006678373e-05, "epoch": 0.3458767013610889, "percentage": 34.59, "elapsed_time": "3:11:07", "remaining_time": "6:01:21"}
+{"current_steps": 1081, "total_steps": 3122, "loss": 1.9843, "learning_rate": 4.133114043338585e-05, "epoch": 0.34619695756605284, "percentage": 34.63, "elapsed_time": "3:11:17", "remaining_time": "6:01:10"}
+{"current_steps": 1082, "total_steps": 3122, "loss": 1.5984, "learning_rate": 4.130996037260482e-05, "epoch": 0.3465172137710168, "percentage": 34.66, "elapsed_time": "3:11:27", "remaining_time": "6:00:59"}
+{"current_steps": 1083, "total_steps": 3122, "loss": 2.2697, "learning_rate": 4.128875991093315e-05, "epoch": 0.3468374699759808, "percentage": 34.69, "elapsed_time": "3:11:38", "remaining_time": "6:00:48"}
+{"current_steps": 1084, "total_steps": 3122, "loss": 2.314, "learning_rate": 4.12675390748889e-05, "epoch": 0.34715772618094476, "percentage": 34.72, "elapsed_time": "3:11:48", "remaining_time": "6:00:37"}
+{"current_steps": 1085, "total_steps": 3122, "loss": 2.4867, "learning_rate": 4.12462978910156e-05, "epoch": 0.3474779823859087, "percentage": 34.75, "elapsed_time": "3:11:58", "remaining_time": "6:00:25"}
+{"current_steps": 1086, "total_steps": 3122, "loss": 1.9026, "learning_rate": 4.1225036385882235e-05, "epoch": 0.3477982385908727, "percentage": 34.79, "elapsed_time": "3:12:09", "remaining_time": "6:00:14"}
+{"current_steps": 1087, "total_steps": 3122, "loss": 2.6461, "learning_rate": 4.12037545860832e-05, "epoch": 0.3481184947958367, "percentage": 34.82, "elapsed_time": "3:12:19", "remaining_time": "6:00:03"}
+{"current_steps": 1088, "total_steps": 3122, "loss": 2.2835, "learning_rate": 4.118245251823829e-05, "epoch": 0.34843875100080063, "percentage": 34.85, "elapsed_time": "3:12:30", "remaining_time": "5:59:52"}
+{"current_steps": 1089, "total_steps": 3122, "loss": 2.3112, "learning_rate": 4.116113020899264e-05, "epoch": 0.34875900720576464, "percentage": 34.88, "elapsed_time": "3:12:40", "remaining_time": "5:59:41"}
+{"current_steps": 1090, "total_steps": 3122, "loss": 2.0939, "learning_rate": 4.1139787685016707e-05, "epoch": 0.3490792634107286, "percentage": 34.91, "elapsed_time": "3:12:50", "remaining_time": "5:59:30"}
+{"current_steps": 1091, "total_steps": 3122, "loss": 1.9811, "learning_rate": 4.1118424973006237e-05, "epoch": 0.34939951961569254, "percentage": 34.95, "elapsed_time": "3:13:01", "remaining_time": "5:59:19"}
+{"current_steps": 1092, "total_steps": 3122, "loss": 2.5208, "learning_rate": 4.1097042099682216e-05, "epoch": 0.3497197758206565, "percentage": 34.98, "elapsed_time": "3:13:11", "remaining_time": "5:59:08"}
+{"current_steps": 1093, "total_steps": 3122, "loss": 1.6477, "learning_rate": 4.107563909179087e-05, "epoch": 0.3500400320256205, "percentage": 35.01, "elapsed_time": "3:13:21", "remaining_time": "5:58:57"}
+{"current_steps": 1094, "total_steps": 3122, "loss": 2.1296, "learning_rate": 4.105421597610358e-05, "epoch": 0.35036028823058446, "percentage": 35.04, "elapsed_time": "3:13:32", "remaining_time": "5:58:45"}
+{"current_steps": 1095, "total_steps": 3122, "loss": 2.5322, "learning_rate": 4.1032772779416904e-05, "epoch": 0.3506805444355484, "percentage": 35.07, "elapsed_time": "3:13:42", "remaining_time": "5:58:34"}
+{"current_steps": 1096, "total_steps": 3122, "loss": 1.8264, "learning_rate": 4.10113095285525e-05, "epoch": 0.3510008006405124, "percentage": 35.11, "elapsed_time": "3:13:52", "remaining_time": "5:58:23"}
+{"current_steps": 1097, "total_steps": 3122, "loss": 2.2612, "learning_rate": 4.098982625035713e-05, "epoch": 0.3513210568454764, "percentage": 35.14, "elapsed_time": "3:14:03", "remaining_time": "5:58:12"}
+{"current_steps": 1098, "total_steps": 3122, "loss": 1.9801, "learning_rate": 4.096832297170259e-05, "epoch": 0.35164131305044033, "percentage": 35.17, "elapsed_time": "3:14:13", "remaining_time": "5:58:01"}
+{"current_steps": 1099, "total_steps": 3122, "loss": 2.2899, "learning_rate": 4.094679971948569e-05, "epoch": 0.35196156925540434, "percentage": 35.2, "elapsed_time": "3:14:23", "remaining_time": "5:57:50"}
+{"current_steps": 1100, "total_steps": 3122, "loss": 2.1428, "learning_rate": 4.0925256520628244e-05, "epoch": 0.3522818254603683, "percentage": 35.23, "elapsed_time": "3:14:34", "remaining_time": "5:57:39"}
+{"current_steps": 1101, "total_steps": 3122, "loss": 1.8895, "learning_rate": 4.090369340207699e-05, "epoch": 0.35260208166533225, "percentage": 35.27, "elapsed_time": "3:15:15", "remaining_time": "5:58:25"}
+{"current_steps": 1102, "total_steps": 3122, "loss": 2.3364, "learning_rate": 4.088211039080361e-05, "epoch": 0.35292233787029625, "percentage": 35.3, "elapsed_time": "3:15:25", "remaining_time": "5:58:14"}
+{"current_steps": 1103, "total_steps": 3122, "loss": 1.9986, "learning_rate": 4.086050751380464e-05, "epoch": 0.3532425940752602, "percentage": 35.33, "elapsed_time": "3:15:36", "remaining_time": "5:58:02"}
+{"current_steps": 1104, "total_steps": 3122, "loss": 2.2253, "learning_rate": 4.083888479810149e-05, "epoch": 0.35356285028022416, "percentage": 35.36, "elapsed_time": "3:15:46", "remaining_time": "5:57:51"}
+{"current_steps": 1105, "total_steps": 3122, "loss": 2.1126, "learning_rate": 4.081724227074036e-05, "epoch": 0.35388310648518817, "percentage": 35.39, "elapsed_time": "3:15:57", "remaining_time": "5:57:40"}
+{"current_steps": 1106, "total_steps": 3122, "loss": 2.427, "learning_rate": 4.079557995879225e-05, "epoch": 0.3542033626901521, "percentage": 35.43, "elapsed_time": "3:16:07", "remaining_time": "5:57:29"}
+{"current_steps": 1107, "total_steps": 3122, "loss": 2.4259, "learning_rate": 4.0773897889352913e-05, "epoch": 0.3545236188951161, "percentage": 35.46, "elapsed_time": "3:16:18", "remaining_time": "5:57:18"}
+{"current_steps": 1108, "total_steps": 3122, "loss": 2.0609, "learning_rate": 4.075219608954278e-05, "epoch": 0.3548438751000801, "percentage": 35.49, "elapsed_time": "3:16:28", "remaining_time": "5:57:07"}
+{"current_steps": 1109, "total_steps": 3122, "loss": 2.5113, "learning_rate": 4.073047458650699e-05, "epoch": 0.35516413130504404, "percentage": 35.52, "elapsed_time": "3:16:38", "remaining_time": "5:56:56"}
+{"current_steps": 1110, "total_steps": 3122, "loss": 2.1542, "learning_rate": 4.070873340741534e-05, "epoch": 0.355484387510008, "percentage": 35.55, "elapsed_time": "3:16:49", "remaining_time": "5:56:45"}
+{"current_steps": 1111, "total_steps": 3122, "loss": 2.0773, "learning_rate": 4.06869725794622e-05, "epoch": 0.355804643714972, "percentage": 35.59, "elapsed_time": "3:16:59", "remaining_time": "5:56:34"}
+{"current_steps": 1112, "total_steps": 3122, "loss": 1.5918, "learning_rate": 4.066519212986654e-05, "epoch": 0.35612489991993596, "percentage": 35.62, "elapsed_time": "3:17:10", "remaining_time": "5:56:23"}
+{"current_steps": 1113, "total_steps": 3122, "loss": 1.8691, "learning_rate": 4.064339208587187e-05, "epoch": 0.3564451561248999, "percentage": 35.65, "elapsed_time": "3:17:20", "remaining_time": "5:56:12"}
+{"current_steps": 1114, "total_steps": 3122, "loss": 2.0796, "learning_rate": 4.0621572474746227e-05, "epoch": 0.3567654123298639, "percentage": 35.68, "elapsed_time": "3:17:30", "remaining_time": "5:56:01"}
+{"current_steps": 1115, "total_steps": 3122, "loss": 2.437, "learning_rate": 4.059973332378207e-05, "epoch": 0.35708566853482787, "percentage": 35.71, "elapsed_time": "3:17:41", "remaining_time": "5:55:50"}
+{"current_steps": 1116, "total_steps": 3122, "loss": 2.6097, "learning_rate": 4.057787466029637e-05, "epoch": 0.3574059247397918, "percentage": 35.75, "elapsed_time": "3:17:51", "remaining_time": "5:55:39"}
+{"current_steps": 1117, "total_steps": 3122, "loss": 2.567, "learning_rate": 4.055599651163044e-05, "epoch": 0.3577261809447558, "percentage": 35.78, "elapsed_time": "3:18:02", "remaining_time": "5:55:28"}
+{"current_steps": 1118, "total_steps": 3122, "loss": 2.0911, "learning_rate": 4.053409890515002e-05, "epoch": 0.3580464371497198, "percentage": 35.81, "elapsed_time": "3:18:12", "remaining_time": "5:55:17"}
+{"current_steps": 1119, "total_steps": 3122, "loss": 2.3121, "learning_rate": 4.051218186824515e-05, "epoch": 0.35836669335468374, "percentage": 35.84, "elapsed_time": "3:18:22", "remaining_time": "5:55:05"}
+{"current_steps": 1120, "total_steps": 3122, "loss": 2.4189, "learning_rate": 4.049024542833018e-05, "epoch": 0.3586869495596477, "percentage": 35.87, "elapsed_time": "3:18:33", "remaining_time": "5:54:54"}
+{"current_steps": 1121, "total_steps": 3122, "loss": 2.6126, "learning_rate": 4.046828961284375e-05, "epoch": 0.3590072057646117, "percentage": 35.91, "elapsed_time": "3:18:43", "remaining_time": "5:54:43"}
+{"current_steps": 1122, "total_steps": 3122, "loss": 2.208, "learning_rate": 4.0446314449248716e-05, "epoch": 0.35932746196957566, "percentage": 35.94, "elapsed_time": "3:18:53", "remaining_time": "5:54:32"}
+{"current_steps": 1123, "total_steps": 3122, "loss": 1.7206, "learning_rate": 4.042431996503213e-05, "epoch": 0.3596477181745396, "percentage": 35.97, "elapsed_time": "3:19:04", "remaining_time": "5:54:21"}
+{"current_steps": 1124, "total_steps": 3122, "loss": 2.3154, "learning_rate": 4.040230618770524e-05, "epoch": 0.3599679743795036, "percentage": 36.0, "elapsed_time": "3:19:14", "remaining_time": "5:54:10"}
+{"current_steps": 1125, "total_steps": 3122, "loss": 2.3005, "learning_rate": 4.03802731448034e-05, "epoch": 0.3602882305844676, "percentage": 36.03, "elapsed_time": "3:19:24", "remaining_time": "5:53:59"}
+{"current_steps": 1126, "total_steps": 3122, "loss": 2.2069, "learning_rate": 4.0358220863886074e-05, "epoch": 0.3606084867894315, "percentage": 36.07, "elapsed_time": "3:19:35", "remaining_time": "5:53:47"}
+{"current_steps": 1127, "total_steps": 3122, "loss": 2.4196, "learning_rate": 4.033614937253678e-05, "epoch": 0.36092874299439553, "percentage": 36.1, "elapsed_time": "3:19:45", "remaining_time": "5:53:36"}
+{"current_steps": 1128, "total_steps": 3122, "loss": 2.4691, "learning_rate": 4.031405869836307e-05, "epoch": 0.3612489991993595, "percentage": 36.13, "elapsed_time": "3:19:55", "remaining_time": "5:53:25"}
+{"current_steps": 1129, "total_steps": 3122, "loss": 2.7772, "learning_rate": 4.0291948868996496e-05, "epoch": 0.36156925540432344, "percentage": 36.16, "elapsed_time": "3:20:06", "remaining_time": "5:53:14"}
+{"current_steps": 1130, "total_steps": 3122, "loss": 2.2456, "learning_rate": 4.026981991209256e-05, "epoch": 0.36188951160928745, "percentage": 36.19, "elapsed_time": "3:20:16", "remaining_time": "5:53:03"}
+{"current_steps": 1131, "total_steps": 3122, "loss": 2.1406, "learning_rate": 4.024767185533069e-05, "epoch": 0.3622097678142514, "percentage": 36.23, "elapsed_time": "3:20:27", "remaining_time": "5:52:52"}
+{"current_steps": 1132, "total_steps": 3122, "loss": 2.3268, "learning_rate": 4.022550472641422e-05, "epoch": 0.36253002401921536, "percentage": 36.26, "elapsed_time": "3:20:37", "remaining_time": "5:52:41"}
+{"current_steps": 1133, "total_steps": 3122, "loss": 2.2335, "learning_rate": 4.020331855307031e-05, "epoch": 0.36285028022417937, "percentage": 36.29, "elapsed_time": "3:20:47", "remaining_time": "5:52:30"}
+{"current_steps": 1134, "total_steps": 3122, "loss": 2.384, "learning_rate": 4.018111336304997e-05, "epoch": 0.3631705364291433, "percentage": 36.32, "elapsed_time": "3:20:58", "remaining_time": "5:52:18"}
+{"current_steps": 1135, "total_steps": 3122, "loss": 2.0399, "learning_rate": 4.015888918412799e-05, "epoch": 0.3634907926341073, "percentage": 36.35, "elapsed_time": "3:21:08", "remaining_time": "5:52:07"}
+{"current_steps": 1136, "total_steps": 3122, "loss": 2.2721, "learning_rate": 4.01366460441029e-05, "epoch": 0.3638110488390713, "percentage": 36.39, "elapsed_time": "3:21:18", "remaining_time": "5:51:56"}
+{"current_steps": 1137, "total_steps": 3122, "loss": 1.8505, "learning_rate": 4.011438397079696e-05, "epoch": 0.36413130504403524, "percentage": 36.42, "elapsed_time": "3:21:29", "remaining_time": "5:51:45"}
+{"current_steps": 1138, "total_steps": 3122, "loss": 1.8735, "learning_rate": 4.0092102992056095e-05, "epoch": 0.3644515612489992, "percentage": 36.45, "elapsed_time": "3:21:39", "remaining_time": "5:51:34"}
+{"current_steps": 1139, "total_steps": 3122, "loss": 2.2612, "learning_rate": 4.006980313574991e-05, "epoch": 0.36477181745396314, "percentage": 36.48, "elapsed_time": "3:21:49", "remaining_time": "5:51:23"}
+{"current_steps": 1140, "total_steps": 3122, "loss": 2.2203, "learning_rate": 4.004748442977158e-05, "epoch": 0.36509207365892715, "percentage": 36.52, "elapsed_time": "3:22:00", "remaining_time": "5:51:12"}
+{"current_steps": 1141, "total_steps": 3122, "loss": 2.1066, "learning_rate": 4.002514690203788e-05, "epoch": 0.3654123298638911, "percentage": 36.55, "elapsed_time": "3:22:10", "remaining_time": "5:51:01"}
+{"current_steps": 1142, "total_steps": 3122, "loss": 2.2341, "learning_rate": 4.000279058048915e-05, "epoch": 0.36573258606885506, "percentage": 36.58, "elapsed_time": "3:22:20", "remaining_time": "5:50:49"}
+{"current_steps": 1143, "total_steps": 3122, "loss": 2.4673, "learning_rate": 3.998041549308919e-05, "epoch": 0.36605284227381907, "percentage": 36.61, "elapsed_time": "3:22:31", "remaining_time": "5:50:38"}
+{"current_steps": 1144, "total_steps": 3122, "loss": 2.1514, "learning_rate": 3.995802166782531e-05, "epoch": 0.366373098478783, "percentage": 36.64, "elapsed_time": "3:22:41", "remaining_time": "5:50:27"}
+{"current_steps": 1145, "total_steps": 3122, "loss": 1.8712, "learning_rate": 3.993560913270823e-05, "epoch": 0.366693354683747, "percentage": 36.68, "elapsed_time": "3:22:52", "remaining_time": "5:50:16"}
+{"current_steps": 1146, "total_steps": 3122, "loss": 2.6296, "learning_rate": 3.991317791577212e-05, "epoch": 0.367013610888711, "percentage": 36.71, "elapsed_time": "3:23:02", "remaining_time": "5:50:05"}
+{"current_steps": 1147, "total_steps": 3122, "loss": 2.4734, "learning_rate": 3.989072804507444e-05, "epoch": 0.36733386709367494, "percentage": 36.74, "elapsed_time": "3:23:12", "remaining_time": "5:49:54"}
+{"current_steps": 1148, "total_steps": 3122, "loss": 2.5021, "learning_rate": 3.986825954869607e-05, "epoch": 0.3676541232986389, "percentage": 36.77, "elapsed_time": "3:23:23", "remaining_time": "5:49:43"}
+{"current_steps": 1149, "total_steps": 3122, "loss": 2.0079, "learning_rate": 3.9845772454741124e-05, "epoch": 0.3679743795036029, "percentage": 36.8, "elapsed_time": "3:23:33", "remaining_time": "5:49:32"}
+{"current_steps": 1150, "total_steps": 3122, "loss": 2.6182, "learning_rate": 3.982326679133701e-05, "epoch": 0.36829463570856685, "percentage": 36.84, "elapsed_time": "3:23:43", "remaining_time": "5:49:21"}
+{"current_steps": 1151, "total_steps": 3122, "loss": 1.8996, "learning_rate": 3.9800742586634346e-05, "epoch": 0.3686148919135308, "percentage": 36.87, "elapsed_time": "3:23:54", "remaining_time": "5:49:10"}
+{"current_steps": 1152, "total_steps": 3122, "loss": 2.4005, "learning_rate": 3.977819986880694e-05, "epoch": 0.3689351481184948, "percentage": 36.9, "elapsed_time": "3:24:04", "remaining_time": "5:48:59"}
+{"current_steps": 1153, "total_steps": 3122, "loss": 2.2208, "learning_rate": 3.9755638666051795e-05, "epoch": 0.36925540432345877, "percentage": 36.93, "elapsed_time": "3:24:14", "remaining_time": "5:48:47"}
+{"current_steps": 1154, "total_steps": 3122, "loss": 1.9195, "learning_rate": 3.973305900658897e-05, "epoch": 0.3695756605284227, "percentage": 36.96, "elapsed_time": "3:24:25", "remaining_time": "5:48:36"}
+{"current_steps": 1155, "total_steps": 3122, "loss": 1.4788, "learning_rate": 3.971046091866166e-05, "epoch": 0.36989591673338673, "percentage": 37.0, "elapsed_time": "3:24:35", "remaining_time": "5:48:25"}
+{"current_steps": 1156, "total_steps": 3122, "loss": 2.1755, "learning_rate": 3.968784443053612e-05, "epoch": 0.3702161729383507, "percentage": 37.03, "elapsed_time": "3:24:45", "remaining_time": "5:48:14"}
+{"current_steps": 1157, "total_steps": 3122, "loss": 2.3551, "learning_rate": 3.966520957050156e-05, "epoch": 0.37053642914331464, "percentage": 37.06, "elapsed_time": "3:24:56", "remaining_time": "5:48:03"}
+{"current_steps": 1158, "total_steps": 3122, "loss": 2.3383, "learning_rate": 3.964255636687023e-05, "epoch": 0.37085668534827865, "percentage": 37.09, "elapsed_time": "3:25:06", "remaining_time": "5:47:52"}
+{"current_steps": 1159, "total_steps": 3122, "loss": 1.8462, "learning_rate": 3.961988484797729e-05, "epoch": 0.3711769415532426, "percentage": 37.12, "elapsed_time": "3:25:17", "remaining_time": "5:47:41"}
+{"current_steps": 1160, "total_steps": 3122, "loss": 2.2438, "learning_rate": 3.959719504218083e-05, "epoch": 0.37149719775820655, "percentage": 37.16, "elapsed_time": "3:25:27", "remaining_time": "5:47:30"}
+{"current_steps": 1161, "total_steps": 3122, "loss": 2.2278, "learning_rate": 3.95744869778618e-05, "epoch": 0.37181745396317056, "percentage": 37.19, "elapsed_time": "3:25:37", "remaining_time": "5:47:19"}
+{"current_steps": 1162, "total_steps": 3122, "loss": 2.2491, "learning_rate": 3.9551760683424e-05, "epoch": 0.3721377101681345, "percentage": 37.22, "elapsed_time": "3:25:48", "remaining_time": "5:47:08"}
+{"current_steps": 1163, "total_steps": 3122, "loss": 1.8948, "learning_rate": 3.952901618729402e-05, "epoch": 0.37245796637309847, "percentage": 37.25, "elapsed_time": "3:25:58", "remaining_time": "5:46:57"}
+{"current_steps": 1164, "total_steps": 3122, "loss": 1.8903, "learning_rate": 3.950625351792122e-05, "epoch": 0.3727782225780624, "percentage": 37.28, "elapsed_time": "3:26:08", "remaining_time": "5:46:45"}
+{"current_steps": 1165, "total_steps": 3122, "loss": 1.2149, "learning_rate": 3.948347270377769e-05, "epoch": 0.37309847878302643, "percentage": 37.32, "elapsed_time": "3:26:19", "remaining_time": "5:46:34"}
+{"current_steps": 1166, "total_steps": 3122, "loss": 2.2527, "learning_rate": 3.946067377335824e-05, "epoch": 0.3734187349879904, "percentage": 37.35, "elapsed_time": "3:26:29", "remaining_time": "5:46:23"}
+{"current_steps": 1167, "total_steps": 3122, "loss": 1.5419, "learning_rate": 3.94378567551803e-05, "epoch": 0.37373899119295434, "percentage": 37.38, "elapsed_time": "3:26:39", "remaining_time": "5:46:12"}
+{"current_steps": 1168, "total_steps": 3122, "loss": 1.9236, "learning_rate": 3.941502167778395e-05, "epoch": 0.37405924739791835, "percentage": 37.41, "elapsed_time": "3:26:50", "remaining_time": "5:46:01"}
+{"current_steps": 1169, "total_steps": 3122, "loss": 2.3081, "learning_rate": 3.9392168569731854e-05, "epoch": 0.3743795036028823, "percentage": 37.44, "elapsed_time": "3:27:00", "remaining_time": "5:45:50"}
+{"current_steps": 1170, "total_steps": 3122, "loss": 2.1903, "learning_rate": 3.9369297459609247e-05, "epoch": 0.37469975980784626, "percentage": 37.48, "elapsed_time": "3:27:10", "remaining_time": "5:45:39"}
+{"current_steps": 1171, "total_steps": 3122, "loss": 2.5142, "learning_rate": 3.934640837602383e-05, "epoch": 0.37502001601281026, "percentage": 37.51, "elapsed_time": "3:27:21", "remaining_time": "5:45:28"}
+{"current_steps": 1172, "total_steps": 3122, "loss": 2.1751, "learning_rate": 3.932350134760585e-05, "epoch": 0.3753402722177742, "percentage": 37.54, "elapsed_time": "3:27:31", "remaining_time": "5:45:17"}
+{"current_steps": 1173, "total_steps": 3122, "loss": 2.3225, "learning_rate": 3.930057640300795e-05, "epoch": 0.37566052842273817, "percentage": 37.57, "elapsed_time": "3:27:41", "remaining_time": "5:45:06"}
+{"current_steps": 1174, "total_steps": 3122, "loss": 2.1874, "learning_rate": 3.92776335709052e-05, "epoch": 0.3759807846277022, "percentage": 37.6, "elapsed_time": "3:27:52", "remaining_time": "5:44:55"}
+{"current_steps": 1175, "total_steps": 3122, "loss": 2.1818, "learning_rate": 3.925467287999507e-05, "epoch": 0.37630104083266613, "percentage": 37.64, "elapsed_time": "3:28:02", "remaining_time": "5:44:44"}
+{"current_steps": 1176, "total_steps": 3122, "loss": 2.558, "learning_rate": 3.9231694358997326e-05, "epoch": 0.3766212970376301, "percentage": 37.67, "elapsed_time": "3:28:13", "remaining_time": "5:44:33"}
+{"current_steps": 1177, "total_steps": 3122, "loss": 2.0283, "learning_rate": 3.920869803665405e-05, "epoch": 0.3769415532425941, "percentage": 37.7, "elapsed_time": "3:28:23", "remaining_time": "5:44:21"}
+{"current_steps": 1178, "total_steps": 3122, "loss": 2.6307, "learning_rate": 3.91856839417296e-05, "epoch": 0.37726180944755805, "percentage": 37.73, "elapsed_time": "3:28:33", "remaining_time": "5:44:10"}
+{"current_steps": 1179, "total_steps": 3122, "loss": 1.9584, "learning_rate": 3.916265210301057e-05, "epoch": 0.377582065652522, "percentage": 37.76, "elapsed_time": "3:28:44", "remaining_time": "5:43:59"}
+{"current_steps": 1180, "total_steps": 3122, "loss": 1.7026, "learning_rate": 3.913960254930572e-05, "epoch": 0.377902321857486, "percentage": 37.8, "elapsed_time": "3:28:54", "remaining_time": "5:43:48"}
+{"current_steps": 1181, "total_steps": 3122, "loss": 2.0822, "learning_rate": 3.9116535309446e-05, "epoch": 0.37822257806244997, "percentage": 37.83, "elapsed_time": "3:29:04", "remaining_time": "5:43:37"}
+{"current_steps": 1182, "total_steps": 3122, "loss": 2.5519, "learning_rate": 3.909345041228447e-05, "epoch": 0.3785428342674139, "percentage": 37.86, "elapsed_time": "3:29:15", "remaining_time": "5:43:26"}
+{"current_steps": 1183, "total_steps": 3122, "loss": 2.2184, "learning_rate": 3.9070347886696254e-05, "epoch": 0.37886309047237793, "percentage": 37.89, "elapsed_time": "3:29:25", "remaining_time": "5:43:15"}
+{"current_steps": 1184, "total_steps": 3122, "loss": 1.765, "learning_rate": 3.9047227761578566e-05, "epoch": 0.3791833466773419, "percentage": 37.92, "elapsed_time": "3:29:35", "remaining_time": "5:43:04"}
+{"current_steps": 1185, "total_steps": 3122, "loss": 2.3076, "learning_rate": 3.902409006585061e-05, "epoch": 0.37950360288230583, "percentage": 37.96, "elapsed_time": "3:29:46", "remaining_time": "5:42:53"}
+{"current_steps": 1186, "total_steps": 3122, "loss": 2.0427, "learning_rate": 3.900093482845357e-05, "epoch": 0.3798238590872698, "percentage": 37.99, "elapsed_time": "3:29:56", "remaining_time": "5:42:42"}
+{"current_steps": 1187, "total_steps": 3122, "loss": 1.6712, "learning_rate": 3.8977762078350576e-05, "epoch": 0.3801441152922338, "percentage": 38.02, "elapsed_time": "3:30:06", "remaining_time": "5:42:31"}
+{"current_steps": 1188, "total_steps": 3122, "loss": 2.4834, "learning_rate": 3.895457184452665e-05, "epoch": 0.38046437149719775, "percentage": 38.05, "elapsed_time": "3:30:17", "remaining_time": "5:42:20"}
+{"current_steps": 1189, "total_steps": 3122, "loss": 2.2172, "learning_rate": 3.8931364155988726e-05, "epoch": 0.3807846277021617, "percentage": 38.08, "elapsed_time": "3:30:27", "remaining_time": "5:42:09"}
+{"current_steps": 1190, "total_steps": 3122, "loss": 2.2178, "learning_rate": 3.89081390417655e-05, "epoch": 0.3811048839071257, "percentage": 38.12, "elapsed_time": "3:30:37", "remaining_time": "5:41:58"}
+{"current_steps": 1191, "total_steps": 3122, "loss": 2.2411, "learning_rate": 3.888489653090752e-05, "epoch": 0.38142514011208967, "percentage": 38.15, "elapsed_time": "3:30:48", "remaining_time": "5:41:47"}
+{"current_steps": 1192, "total_steps": 3122, "loss": 2.7614, "learning_rate": 3.886163665248709e-05, "epoch": 0.3817453963170536, "percentage": 38.18, "elapsed_time": "3:30:58", "remaining_time": "5:41:36"}
+{"current_steps": 1193, "total_steps": 3122, "loss": 2.2614, "learning_rate": 3.8838359435598205e-05, "epoch": 0.38206565252201763, "percentage": 38.21, "elapsed_time": "3:31:09", "remaining_time": "5:41:25"}
+{"current_steps": 1194, "total_steps": 3122, "loss": 2.0497, "learning_rate": 3.881506490935657e-05, "epoch": 0.3823859087269816, "percentage": 38.24, "elapsed_time": "3:31:19", "remaining_time": "5:41:13"}
+{"current_steps": 1195, "total_steps": 3122, "loss": 2.3673, "learning_rate": 3.879175310289955e-05, "epoch": 0.38270616493194554, "percentage": 38.28, "elapsed_time": "3:31:29", "remaining_time": "5:41:02"}
+{"current_steps": 1196, "total_steps": 3122, "loss": 2.7132, "learning_rate": 3.876842404538611e-05, "epoch": 0.38302642113690955, "percentage": 38.31, "elapsed_time": "3:31:40", "remaining_time": "5:40:51"}
+{"current_steps": 1197, "total_steps": 3122, "loss": 2.1813, "learning_rate": 3.874507776599678e-05, "epoch": 0.3833466773418735, "percentage": 38.34, "elapsed_time": "3:31:50", "remaining_time": "5:40:40"}
+{"current_steps": 1198, "total_steps": 3122, "loss": 2.3327, "learning_rate": 3.872171429393368e-05, "epoch": 0.38366693354683745, "percentage": 38.37, "elapsed_time": "3:32:00", "remaining_time": "5:40:29"}
+{"current_steps": 1199, "total_steps": 3122, "loss": 1.5882, "learning_rate": 3.8698333658420366e-05, "epoch": 0.38398718975180146, "percentage": 38.4, "elapsed_time": "3:32:11", "remaining_time": "5:40:18"}
+{"current_steps": 1200, "total_steps": 3122, "loss": 2.0014, "learning_rate": 3.867493588870193e-05, "epoch": 0.3843074459567654, "percentage": 38.44, "elapsed_time": "3:32:21", "remaining_time": "5:40:07"}
+{"current_steps": 1201, "total_steps": 3122, "loss": 2.2738, "learning_rate": 3.865152101404485e-05, "epoch": 0.38462770216172937, "percentage": 38.47, "elapsed_time": "3:32:57", "remaining_time": "5:40:38"}
+{"current_steps": 1202, "total_steps": 3122, "loss": 2.3236, "learning_rate": 3.862808906373701e-05, "epoch": 0.3849479583666934, "percentage": 38.5, "elapsed_time": "3:33:08", "remaining_time": "5:40:27"}
+{"current_steps": 1203, "total_steps": 3122, "loss": 2.6712, "learning_rate": 3.860464006708766e-05, "epoch": 0.38526821457165733, "percentage": 38.53, "elapsed_time": "3:33:18", "remaining_time": "5:40:16"}
+{"current_steps": 1204, "total_steps": 3122, "loss": 1.9265, "learning_rate": 3.8581174053427374e-05, "epoch": 0.3855884707766213, "percentage": 38.57, "elapsed_time": "3:33:29", "remaining_time": "5:40:05"}
+{"current_steps": 1205, "total_steps": 3122, "loss": 2.5721, "learning_rate": 3.855769105210801e-05, "epoch": 0.3859087269815853, "percentage": 38.6, "elapsed_time": "3:33:39", "remaining_time": "5:39:54"}
+{"current_steps": 1206, "total_steps": 3122, "loss": 2.0682, "learning_rate": 3.8534191092502655e-05, "epoch": 0.38622898318654925, "percentage": 38.63, "elapsed_time": "3:33:49", "remaining_time": "5:39:43"}
+{"current_steps": 1207, "total_steps": 3122, "loss": 2.3802, "learning_rate": 3.851067420400564e-05, "epoch": 0.3865492393915132, "percentage": 38.66, "elapsed_time": "3:34:00", "remaining_time": "5:39:32"}
+{"current_steps": 1208, "total_steps": 3122, "loss": 2.3584, "learning_rate": 3.848714041603245e-05, "epoch": 0.3868694955964772, "percentage": 38.69, "elapsed_time": "3:34:10", "remaining_time": "5:39:21"}
+{"current_steps": 1209, "total_steps": 3122, "loss": 2.3271, "learning_rate": 3.846358975801971e-05, "epoch": 0.38718975180144116, "percentage": 38.73, "elapsed_time": "3:34:21", "remaining_time": "5:39:10"}
+{"current_steps": 1210, "total_steps": 3122, "loss": 2.2613, "learning_rate": 3.844002225942514e-05, "epoch": 0.3875100080064051, "percentage": 38.76, "elapsed_time": "3:34:31", "remaining_time": "5:38:59"}
+{"current_steps": 1211, "total_steps": 3122, "loss": 2.1979, "learning_rate": 3.8416437949727555e-05, "epoch": 0.38783026421136907, "percentage": 38.79, "elapsed_time": "3:34:41", "remaining_time": "5:38:48"}
+{"current_steps": 1212, "total_steps": 3122, "loss": 2.7155, "learning_rate": 3.839283685842676e-05, "epoch": 0.3881505204163331, "percentage": 38.82, "elapsed_time": "3:34:52", "remaining_time": "5:38:37"}
+{"current_steps": 1213, "total_steps": 3122, "loss": 1.9949, "learning_rate": 3.836921901504358e-05, "epoch": 0.38847077662129703, "percentage": 38.85, "elapsed_time": "3:35:02", "remaining_time": "5:38:26"}
+{"current_steps": 1214, "total_steps": 3122, "loss": 2.1843, "learning_rate": 3.8345584449119776e-05, "epoch": 0.388791032826261, "percentage": 38.89, "elapsed_time": "3:35:13", "remaining_time": "5:38:15"}
+{"current_steps": 1215, "total_steps": 3122, "loss": 2.2712, "learning_rate": 3.832193319021802e-05, "epoch": 0.389111289031225, "percentage": 38.92, "elapsed_time": "3:35:23", "remaining_time": "5:38:04"}
+{"current_steps": 1216, "total_steps": 3122, "loss": 2.1854, "learning_rate": 3.8298265267921884e-05, "epoch": 0.38943154523618895, "percentage": 38.95, "elapsed_time": "3:35:33", "remaining_time": "5:37:53"}
+{"current_steps": 1217, "total_steps": 3122, "loss": 2.5162, "learning_rate": 3.827458071183578e-05, "epoch": 0.3897518014411529, "percentage": 38.98, "elapsed_time": "3:35:44", "remaining_time": "5:37:42"}
+{"current_steps": 1218, "total_steps": 3122, "loss": 2.4592, "learning_rate": 3.825087955158492e-05, "epoch": 0.3900720576461169, "percentage": 39.01, "elapsed_time": "3:35:54", "remaining_time": "5:37:31"}
+{"current_steps": 1219, "total_steps": 3122, "loss": 1.9011, "learning_rate": 3.822716181681528e-05, "epoch": 0.39039231385108086, "percentage": 39.05, "elapsed_time": "3:36:05", "remaining_time": "5:37:20"}
+{"current_steps": 1220, "total_steps": 3122, "loss": 2.2409, "learning_rate": 3.820342753719357e-05, "epoch": 0.3907125700560448, "percentage": 39.08, "elapsed_time": "3:36:15", "remaining_time": "5:37:09"}
+{"current_steps": 1221, "total_steps": 3122, "loss": 1.9098, "learning_rate": 3.817967674240721e-05, "epoch": 0.3910328262610088, "percentage": 39.11, "elapsed_time": "3:36:25", "remaining_time": "5:36:58"}
+{"current_steps": 1222, "total_steps": 3122, "loss": 2.0723, "learning_rate": 3.815590946216425e-05, "epoch": 0.3913530824659728, "percentage": 39.14, "elapsed_time": "3:36:36", "remaining_time": "5:36:46"}
+{"current_steps": 1223, "total_steps": 3122, "loss": 2.3035, "learning_rate": 3.813212572619338e-05, "epoch": 0.39167333867093673, "percentage": 39.17, "elapsed_time": "3:36:46", "remaining_time": "5:36:35"}
+{"current_steps": 1224, "total_steps": 3122, "loss": 1.9079, "learning_rate": 3.810832556424388e-05, "epoch": 0.39199359487590074, "percentage": 39.21, "elapsed_time": "3:36:57", "remaining_time": "5:36:24"}
+{"current_steps": 1225, "total_steps": 3122, "loss": 1.7984, "learning_rate": 3.808450900608555e-05, "epoch": 0.3923138510808647, "percentage": 39.24, "elapsed_time": "3:37:07", "remaining_time": "5:36:13"}
+{"current_steps": 1226, "total_steps": 3122, "loss": 2.1234, "learning_rate": 3.806067608150872e-05, "epoch": 0.39263410728582865, "percentage": 39.27, "elapsed_time": "3:37:17", "remaining_time": "5:36:02"}
+{"current_steps": 1227, "total_steps": 3122, "loss": 2.2432, "learning_rate": 3.803682682032419e-05, "epoch": 0.39295436349079266, "percentage": 39.3, "elapsed_time": "3:37:28", "remaining_time": "5:35:51"}
+{"current_steps": 1228, "total_steps": 3122, "loss": 1.9167, "learning_rate": 3.8012961252363184e-05, "epoch": 0.3932746196957566, "percentage": 39.33, "elapsed_time": "3:37:38", "remaining_time": "5:35:40"}
+{"current_steps": 1229, "total_steps": 3122, "loss": 2.6162, "learning_rate": 3.798907940747732e-05, "epoch": 0.39359487590072056, "percentage": 39.37, "elapsed_time": "3:37:48", "remaining_time": "5:35:29"}
+{"current_steps": 1230, "total_steps": 3122, "loss": 2.239, "learning_rate": 3.79651813155386e-05, "epoch": 0.3939151321056846, "percentage": 39.4, "elapsed_time": "3:37:59", "remaining_time": "5:35:18"}
+{"current_steps": 1231, "total_steps": 3122, "loss": 1.7196, "learning_rate": 3.794126700643933e-05, "epoch": 0.3942353883106485, "percentage": 39.43, "elapsed_time": "3:38:09", "remaining_time": "5:35:07"}
+{"current_steps": 1232, "total_steps": 3122, "loss": 2.1263, "learning_rate": 3.791733651009209e-05, "epoch": 0.3945556445156125, "percentage": 39.46, "elapsed_time": "3:38:20", "remaining_time": "5:34:56"}
+{"current_steps": 1233, "total_steps": 3122, "loss": 2.0495, "learning_rate": 3.789338985642973e-05, "epoch": 0.39487590072057643, "percentage": 39.49, "elapsed_time": "3:38:30", "remaining_time": "5:34:45"}
+{"current_steps": 1234, "total_steps": 3122, "loss": 2.2755, "learning_rate": 3.786942707540529e-05, "epoch": 0.39519615692554044, "percentage": 39.53, "elapsed_time": "3:38:40", "remaining_time": "5:34:34"}
+{"current_steps": 1235, "total_steps": 3122, "loss": 2.5356, "learning_rate": 3.784544819699202e-05, "epoch": 0.3955164131305044, "percentage": 39.56, "elapsed_time": "3:38:51", "remaining_time": "5:34:23"}
+{"current_steps": 1236, "total_steps": 3122, "loss": 2.3301, "learning_rate": 3.7821453251183245e-05, "epoch": 0.39583666933546835, "percentage": 39.59, "elapsed_time": "3:39:01", "remaining_time": "5:34:12"}
+{"current_steps": 1237, "total_steps": 3122, "loss": 2.3236, "learning_rate": 3.7797442267992436e-05, "epoch": 0.39615692554043236, "percentage": 39.62, "elapsed_time": "3:39:12", "remaining_time": "5:34:01"}
+{"current_steps": 1238, "total_steps": 3122, "loss": 2.3126, "learning_rate": 3.7773415277453103e-05, "epoch": 0.3964771817453963, "percentage": 39.65, "elapsed_time": "3:39:22", "remaining_time": "5:33:50"}
+{"current_steps": 1239, "total_steps": 3122, "loss": 2.2927, "learning_rate": 3.77493723096188e-05, "epoch": 0.39679743795036027, "percentage": 39.69, "elapsed_time": "3:39:32", "remaining_time": "5:33:39"}
+{"current_steps": 1240, "total_steps": 3122, "loss": 1.9049, "learning_rate": 3.772531339456302e-05, "epoch": 0.3971176941553243, "percentage": 39.72, "elapsed_time": "3:39:43", "remaining_time": "5:33:28"}
+{"current_steps": 1241, "total_steps": 3122, "loss": 2.5726, "learning_rate": 3.770123856237925e-05, "epoch": 0.39743795036028823, "percentage": 39.75, "elapsed_time": "3:39:53", "remaining_time": "5:33:17"}
+{"current_steps": 1242, "total_steps": 3122, "loss": 2.2026, "learning_rate": 3.767714784318088e-05, "epoch": 0.3977582065652522, "percentage": 39.78, "elapsed_time": "3:40:03", "remaining_time": "5:33:06"}
+{"current_steps": 1243, "total_steps": 3122, "loss": 2.08, "learning_rate": 3.765304126710113e-05, "epoch": 0.3980784627702162, "percentage": 39.81, "elapsed_time": "3:40:14", "remaining_time": "5:32:55"}
+{"current_steps": 1244, "total_steps": 3122, "loss": 1.8371, "learning_rate": 3.762891886429312e-05, "epoch": 0.39839871897518014, "percentage": 39.85, "elapsed_time": "3:40:24", "remaining_time": "5:32:44"}
+{"current_steps": 1245, "total_steps": 3122, "loss": 2.2806, "learning_rate": 3.760478066492971e-05, "epoch": 0.3987189751801441, "percentage": 39.88, "elapsed_time": "3:40:35", "remaining_time": "5:32:33"}
+{"current_steps": 1246, "total_steps": 3122, "loss": 2.312, "learning_rate": 3.758062669920354e-05, "epoch": 0.3990392313851081, "percentage": 39.91, "elapsed_time": "3:40:45", "remaining_time": "5:32:22"}
+{"current_steps": 1247, "total_steps": 3122, "loss": 2.1427, "learning_rate": 3.7556456997326975e-05, "epoch": 0.39935948759007206, "percentage": 39.94, "elapsed_time": "3:40:55", "remaining_time": "5:32:11"}
+{"current_steps": 1248, "total_steps": 3122, "loss": 2.2062, "learning_rate": 3.7532271589532065e-05, "epoch": 0.399679743795036, "percentage": 39.97, "elapsed_time": "3:41:06", "remaining_time": "5:32:00"}
+{"current_steps": 1249, "total_steps": 3122, "loss": 2.4721, "learning_rate": 3.75080705060705e-05, "epoch": 0.4, "percentage": 40.01, "elapsed_time": "3:41:16", "remaining_time": "5:31:49"}
+{"current_steps": 1250, "total_steps": 3122, "loss": 2.5967, "learning_rate": 3.748385377721356e-05, "epoch": 0.400320256204964, "percentage": 40.04, "elapsed_time": "3:41:27", "remaining_time": "5:31:38"}
+{"current_steps": 1251, "total_steps": 3122, "loss": 2.1675, "learning_rate": 3.7459621433252135e-05, "epoch": 0.40064051240992793, "percentage": 40.07, "elapsed_time": "3:41:37", "remaining_time": "5:31:27"}
+{"current_steps": 1252, "total_steps": 3122, "loss": 1.9072, "learning_rate": 3.74353735044966e-05, "epoch": 0.40096076861489194, "percentage": 40.1, "elapsed_time": "3:41:47", "remaining_time": "5:31:16"}
+{"current_steps": 1253, "total_steps": 3122, "loss": 1.6543, "learning_rate": 3.741111002127688e-05, "epoch": 0.4012810248198559, "percentage": 40.13, "elapsed_time": "3:41:58", "remaining_time": "5:31:05"}
+{"current_steps": 1254, "total_steps": 3122, "loss": 1.8961, "learning_rate": 3.738683101394228e-05, "epoch": 0.40160128102481985, "percentage": 40.17, "elapsed_time": "3:42:08", "remaining_time": "5:30:54"}
+{"current_steps": 1255, "total_steps": 3122, "loss": 2.2844, "learning_rate": 3.73625365128616e-05, "epoch": 0.40192153722978385, "percentage": 40.2, "elapsed_time": "3:42:19", "remaining_time": "5:30:43"}
+{"current_steps": 1256, "total_steps": 3122, "loss": 2.2592, "learning_rate": 3.733822654842298e-05, "epoch": 0.4022417934347478, "percentage": 40.23, "elapsed_time": "3:42:29", "remaining_time": "5:30:32"}
+{"current_steps": 1257, "total_steps": 3122, "loss": 2.8168, "learning_rate": 3.73139011510339e-05, "epoch": 0.40256204963971176, "percentage": 40.26, "elapsed_time": "3:42:39", "remaining_time": "5:30:21"}
+{"current_steps": 1258, "total_steps": 3122, "loss": 1.9843, "learning_rate": 3.728956035112115e-05, "epoch": 0.4028823058446757, "percentage": 40.29, "elapsed_time": "3:42:50", "remaining_time": "5:30:10"}
+{"current_steps": 1259, "total_steps": 3122, "loss": 2.2555, "learning_rate": 3.72652041791308e-05, "epoch": 0.4032025620496397, "percentage": 40.33, "elapsed_time": "3:43:00", "remaining_time": "5:29:59"}
+{"current_steps": 1260, "total_steps": 3122, "loss": 2.3078, "learning_rate": 3.7240832665528124e-05, "epoch": 0.4035228182546037, "percentage": 40.36, "elapsed_time": "3:43:10", "remaining_time": "5:29:48"}
+{"current_steps": 1261, "total_steps": 3122, "loss": 1.7157, "learning_rate": 3.721644584079761e-05, "epoch": 0.40384307445956763, "percentage": 40.39, "elapsed_time": "3:43:21", "remaining_time": "5:29:37"}
+{"current_steps": 1262, "total_steps": 3122, "loss": 2.4214, "learning_rate": 3.7192043735442865e-05, "epoch": 0.40416333066453164, "percentage": 40.42, "elapsed_time": "3:43:31", "remaining_time": "5:29:26"}
+{"current_steps": 1263, "total_steps": 3122, "loss": 2.5919, "learning_rate": 3.7167626379986655e-05, "epoch": 0.4044835868694956, "percentage": 40.45, "elapsed_time": "3:43:42", "remaining_time": "5:29:15"}
+{"current_steps": 1264, "total_steps": 3122, "loss": 2.6869, "learning_rate": 3.714319380497077e-05, "epoch": 0.40480384307445955, "percentage": 40.49, "elapsed_time": "3:43:52", "remaining_time": "5:29:04"}
+{"current_steps": 1265, "total_steps": 3122, "loss": 2.0477, "learning_rate": 3.7118746040956076e-05, "epoch": 0.40512409927942356, "percentage": 40.52, "elapsed_time": "3:44:02", "remaining_time": "5:28:53"}
+{"current_steps": 1266, "total_steps": 3122, "loss": 1.8267, "learning_rate": 3.709428311852242e-05, "epoch": 0.4054443554843875, "percentage": 40.55, "elapsed_time": "3:44:13", "remaining_time": "5:28:42"}
+{"current_steps": 1267, "total_steps": 3122, "loss": 2.1828, "learning_rate": 3.706980506826863e-05, "epoch": 0.40576461168935146, "percentage": 40.58, "elapsed_time": "3:44:23", "remaining_time": "5:28:32"}
+{"current_steps": 1268, "total_steps": 3122, "loss": 2.2251, "learning_rate": 3.704531192081241e-05, "epoch": 0.40608486789431547, "percentage": 40.61, "elapsed_time": "3:44:34", "remaining_time": "5:28:21"}
+{"current_steps": 1269, "total_steps": 3122, "loss": 1.7606, "learning_rate": 3.70208037067904e-05, "epoch": 0.4064051240992794, "percentage": 40.65, "elapsed_time": "3:44:44", "remaining_time": "5:28:10"}
+{"current_steps": 1270, "total_steps": 3122, "loss": 2.4729, "learning_rate": 3.699628045685805e-05, "epoch": 0.4067253803042434, "percentage": 40.68, "elapsed_time": "3:44:54", "remaining_time": "5:27:59"}
+{"current_steps": 1271, "total_steps": 3122, "loss": 1.5516, "learning_rate": 3.697174220168965e-05, "epoch": 0.4070456365092074, "percentage": 40.71, "elapsed_time": "3:45:05", "remaining_time": "5:27:48"}
+{"current_steps": 1272, "total_steps": 3122, "loss": 2.0469, "learning_rate": 3.694718897197822e-05, "epoch": 0.40736589271417134, "percentage": 40.74, "elapsed_time": "3:45:15", "remaining_time": "5:27:37"}
+{"current_steps": 1273, "total_steps": 3122, "loss": 1.997, "learning_rate": 3.692262079843553e-05, "epoch": 0.4076861489191353, "percentage": 40.78, "elapsed_time": "3:45:26", "remaining_time": "5:27:26"}
+{"current_steps": 1274, "total_steps": 3122, "loss": 2.3182, "learning_rate": 3.689803771179207e-05, "epoch": 0.4080064051240993, "percentage": 40.81, "elapsed_time": "3:45:36", "remaining_time": "5:27:15"}
+{"current_steps": 1275, "total_steps": 3122, "loss": 2.4617, "learning_rate": 3.687343974279691e-05, "epoch": 0.40832666132906326, "percentage": 40.84, "elapsed_time": "3:45:46", "remaining_time": "5:27:04"}
+{"current_steps": 1276, "total_steps": 3122, "loss": 2.3608, "learning_rate": 3.684882692221782e-05, "epoch": 0.4086469175340272, "percentage": 40.87, "elapsed_time": "3:45:57", "remaining_time": "5:26:53"}
+{"current_steps": 1277, "total_steps": 3122, "loss": 2.1872, "learning_rate": 3.682419928084109e-05, "epoch": 0.4089671737389912, "percentage": 40.9, "elapsed_time": "3:46:07", "remaining_time": "5:26:42"}
+{"current_steps": 1278, "total_steps": 3122, "loss": 2.0972, "learning_rate": 3.679955684947158e-05, "epoch": 0.40928742994395517, "percentage": 40.94, "elapsed_time": "3:46:17", "remaining_time": "5:26:31"}
+{"current_steps": 1279, "total_steps": 3122, "loss": 2.086, "learning_rate": 3.6774899658932615e-05, "epoch": 0.4096076861489191, "percentage": 40.97, "elapsed_time": "3:46:28", "remaining_time": "5:26:20"}
+{"current_steps": 1280, "total_steps": 3122, "loss": 2.3214, "learning_rate": 3.6750227740066015e-05, "epoch": 0.4099279423538831, "percentage": 41.0, "elapsed_time": "3:46:38", "remaining_time": "5:26:09"}
+{"current_steps": 1281, "total_steps": 3122, "loss": 2.2449, "learning_rate": 3.6725541123732e-05, "epoch": 0.4102481985588471, "percentage": 41.03, "elapsed_time": "3:46:49", "remaining_time": "5:25:58"}
+{"current_steps": 1282, "total_steps": 3122, "loss": 1.619, "learning_rate": 3.6700839840809206e-05, "epoch": 0.41056845476381104, "percentage": 41.06, "elapsed_time": "3:46:59", "remaining_time": "5:25:47"}
+{"current_steps": 1283, "total_steps": 3122, "loss": 2.1188, "learning_rate": 3.6676123922194574e-05, "epoch": 0.410888710968775, "percentage": 41.1, "elapsed_time": "3:47:09", "remaining_time": "5:25:36"}
+{"current_steps": 1284, "total_steps": 3122, "loss": 2.6604, "learning_rate": 3.6651393398803366e-05, "epoch": 0.411208967173739, "percentage": 41.13, "elapsed_time": "3:47:20", "remaining_time": "5:25:25"}
+{"current_steps": 1285, "total_steps": 3122, "loss": 1.9312, "learning_rate": 3.6626648301569124e-05, "epoch": 0.41152922337870296, "percentage": 41.16, "elapsed_time": "3:47:30", "remaining_time": "5:25:14"}
+{"current_steps": 1286, "total_steps": 3122, "loss": 2.0071, "learning_rate": 3.6601888661443603e-05, "epoch": 0.4118494795836669, "percentage": 41.19, "elapsed_time": "3:47:41", "remaining_time": "5:25:03"}
+{"current_steps": 1287, "total_steps": 3122, "loss": 2.1451, "learning_rate": 3.657711450939676e-05, "epoch": 0.4121697357886309, "percentage": 41.22, "elapsed_time": "3:47:51", "remaining_time": "5:24:52"}
+{"current_steps": 1288, "total_steps": 3122, "loss": 2.6817, "learning_rate": 3.6552325876416704e-05, "epoch": 0.4124899919935949, "percentage": 41.26, "elapsed_time": "3:48:01", "remaining_time": "5:24:41"}
+{"current_steps": 1289, "total_steps": 3122, "loss": 2.2703, "learning_rate": 3.652752279350965e-05, "epoch": 0.4128102481985588, "percentage": 41.29, "elapsed_time": "3:48:12", "remaining_time": "5:24:30"}
+{"current_steps": 1290, "total_steps": 3122, "loss": 1.6399, "learning_rate": 3.65027052916999e-05, "epoch": 0.41313050440352284, "percentage": 41.32, "elapsed_time": "3:48:22", "remaining_time": "5:24:19"}
+{"current_steps": 1291, "total_steps": 3122, "loss": 2.139, "learning_rate": 3.647787340202975e-05, "epoch": 0.4134507606084868, "percentage": 41.35, "elapsed_time": "3:48:33", "remaining_time": "5:24:08"}
+{"current_steps": 1292, "total_steps": 3122, "loss": 2.0271, "learning_rate": 3.6453027155559565e-05, "epoch": 0.41377101681345074, "percentage": 41.38, "elapsed_time": "3:48:43", "remaining_time": "5:23:57"}
+{"current_steps": 1293, "total_steps": 3122, "loss": 2.1767, "learning_rate": 3.6428166583367615e-05, "epoch": 0.41409127301841475, "percentage": 41.42, "elapsed_time": "3:48:53", "remaining_time": "5:23:46"}
+{"current_steps": 1294, "total_steps": 3122, "loss": 1.9477, "learning_rate": 3.640329171655008e-05, "epoch": 0.4144115292233787, "percentage": 41.45, "elapsed_time": "3:49:04", "remaining_time": "5:23:36"}
+{"current_steps": 1295, "total_steps": 3122, "loss": 3.0508, "learning_rate": 3.637840258622106e-05, "epoch": 0.41473178542834266, "percentage": 41.48, "elapsed_time": "3:49:14", "remaining_time": "5:23:25"}
+{"current_steps": 1296, "total_steps": 3122, "loss": 2.6344, "learning_rate": 3.635349922351249e-05, "epoch": 0.41505204163330667, "percentage": 41.51, "elapsed_time": "3:49:24", "remaining_time": "5:23:14"}
+{"current_steps": 1297, "total_steps": 3122, "loss": 2.1484, "learning_rate": 3.632858165957407e-05, "epoch": 0.4153722978382706, "percentage": 41.54, "elapsed_time": "3:49:35", "remaining_time": "5:23:03"}
+{"current_steps": 1298, "total_steps": 3122, "loss": 2.0567, "learning_rate": 3.63036499255733e-05, "epoch": 0.4156925540432346, "percentage": 41.58, "elapsed_time": "3:49:45", "remaining_time": "5:22:52"}
+{"current_steps": 1299, "total_steps": 3122, "loss": 2.6683, "learning_rate": 3.627870405269539e-05, "epoch": 0.4160128102481986, "percentage": 41.61, "elapsed_time": "3:49:56", "remaining_time": "5:22:41"}
+{"current_steps": 1300, "total_steps": 3122, "loss": 2.0889, "learning_rate": 3.625374407214325e-05, "epoch": 0.41633306645316254, "percentage": 41.64, "elapsed_time": "3:50:06", "remaining_time": "5:22:30"}
+{"current_steps": 1301, "total_steps": 3122, "loss": 2.3849, "learning_rate": 3.62287700151374e-05, "epoch": 0.4166533226581265, "percentage": 41.67, "elapsed_time": "3:50:47", "remaining_time": "5:23:02"}
+{"current_steps": 1302, "total_steps": 3122, "loss": 2.5107, "learning_rate": 3.6203781912916e-05, "epoch": 0.4169735788630905, "percentage": 41.7, "elapsed_time": "3:50:57", "remaining_time": "5:22:51"}
+{"current_steps": 1303, "total_steps": 3122, "loss": 2.0597, "learning_rate": 3.6178779796734785e-05, "epoch": 0.41729383506805445, "percentage": 41.74, "elapsed_time": "3:51:08", "remaining_time": "5:22:40"}
+{"current_steps": 1304, "total_steps": 3122, "loss": 2.3948, "learning_rate": 3.615376369786699e-05, "epoch": 0.4176140912730184, "percentage": 41.77, "elapsed_time": "3:51:18", "remaining_time": "5:22:29"}
+{"current_steps": 1305, "total_steps": 3122, "loss": 2.1924, "learning_rate": 3.6128733647603345e-05, "epoch": 0.41793434747798236, "percentage": 41.8, "elapsed_time": "3:51:29", "remaining_time": "5:22:18"}
+{"current_steps": 1306, "total_steps": 3122, "loss": 2.1514, "learning_rate": 3.610368967725205e-05, "epoch": 0.41825460368294637, "percentage": 41.83, "elapsed_time": "3:51:39", "remaining_time": "5:22:07"}
+{"current_steps": 1307, "total_steps": 3122, "loss": 2.1708, "learning_rate": 3.607863181813871e-05, "epoch": 0.4185748598879103, "percentage": 41.86, "elapsed_time": "3:51:49", "remaining_time": "5:21:56"}
+{"current_steps": 1308, "total_steps": 3122, "loss": 2.4148, "learning_rate": 3.6053560101606285e-05, "epoch": 0.4188951160928743, "percentage": 41.9, "elapsed_time": "3:52:00", "remaining_time": "5:21:45"}
+{"current_steps": 1309, "total_steps": 3122, "loss": 2.3323, "learning_rate": 3.602847455901509e-05, "epoch": 0.4192153722978383, "percentage": 41.93, "elapsed_time": "3:52:10", "remaining_time": "5:21:34"}
+{"current_steps": 1310, "total_steps": 3122, "loss": 2.2687, "learning_rate": 3.600337522174272e-05, "epoch": 0.41953562850280224, "percentage": 41.96, "elapsed_time": "3:52:21", "remaining_time": "5:21:23"}
+{"current_steps": 1311, "total_steps": 3122, "loss": 2.5078, "learning_rate": 3.597826212118404e-05, "epoch": 0.4198558847077662, "percentage": 41.99, "elapsed_time": "3:52:31", "remaining_time": "5:21:12"}
+{"current_steps": 1312, "total_steps": 3122, "loss": 2.1704, "learning_rate": 3.5953135288751094e-05, "epoch": 0.4201761409127302, "percentage": 42.02, "elapsed_time": "3:52:42", "remaining_time": "5:21:01"}
+{"current_steps": 1313, "total_steps": 3122, "loss": 2.3606, "learning_rate": 3.5927994755873157e-05, "epoch": 0.42049639711769415, "percentage": 42.06, "elapsed_time": "3:52:52", "remaining_time": "5:20:50"}
+{"current_steps": 1314, "total_steps": 3122, "loss": 1.9514, "learning_rate": 3.5902840553996594e-05, "epoch": 0.4208166533226581, "percentage": 42.09, "elapsed_time": "3:53:02", "remaining_time": "5:20:39"}
+{"current_steps": 1315, "total_steps": 3122, "loss": 2.6369, "learning_rate": 3.58776727145849e-05, "epoch": 0.4211369095276221, "percentage": 42.12, "elapsed_time": "3:53:13", "remaining_time": "5:20:28"}
+{"current_steps": 1316, "total_steps": 3122, "loss": 2.2219, "learning_rate": 3.58524912691186e-05, "epoch": 0.42145716573258607, "percentage": 42.15, "elapsed_time": "3:53:23", "remaining_time": "5:20:17"}
+{"current_steps": 1317, "total_steps": 3122, "loss": 1.7456, "learning_rate": 3.5827296249095264e-05, "epoch": 0.42177742193755, "percentage": 42.18, "elapsed_time": "3:53:34", "remaining_time": "5:20:06"}
+{"current_steps": 1318, "total_steps": 3122, "loss": 2.2512, "learning_rate": 3.580208768602941e-05, "epoch": 0.42209767814251403, "percentage": 42.22, "elapsed_time": "3:53:44", "remaining_time": "5:19:55"}
+{"current_steps": 1319, "total_steps": 3122, "loss": 2.1483, "learning_rate": 3.577686561145254e-05, "epoch": 0.422417934347478, "percentage": 42.25, "elapsed_time": "3:53:54", "remaining_time": "5:19:44"}
+{"current_steps": 1320, "total_steps": 3122, "loss": 1.9452, "learning_rate": 3.575163005691302e-05, "epoch": 0.42273819055244194, "percentage": 42.28, "elapsed_time": "3:54:05", "remaining_time": "5:19:33"}
+{"current_steps": 1321, "total_steps": 3122, "loss": 2.1301, "learning_rate": 3.572638105397607e-05, "epoch": 0.42305844675740595, "percentage": 42.31, "elapsed_time": "3:54:15", "remaining_time": "5:19:22"}
+{"current_steps": 1322, "total_steps": 3122, "loss": 2.099, "learning_rate": 3.5701118634223785e-05, "epoch": 0.4233787029623699, "percentage": 42.34, "elapsed_time": "3:54:25", "remaining_time": "5:19:11"}
+{"current_steps": 1323, "total_steps": 3122, "loss": 2.2, "learning_rate": 3.567584282925498e-05, "epoch": 0.42369895916733386, "percentage": 42.38, "elapsed_time": "3:54:36", "remaining_time": "5:19:00"}
+{"current_steps": 1324, "total_steps": 3122, "loss": 2.4591, "learning_rate": 3.565055367068525e-05, "epoch": 0.42401921537229786, "percentage": 42.41, "elapsed_time": "3:54:46", "remaining_time": "5:18:49"}
+{"current_steps": 1325, "total_steps": 3122, "loss": 2.1612, "learning_rate": 3.562525119014688e-05, "epoch": 0.4243394715772618, "percentage": 42.44, "elapsed_time": "3:54:56", "remaining_time": "5:18:38"}
+{"current_steps": 1326, "total_steps": 3122, "loss": 1.9581, "learning_rate": 3.5599935419288824e-05, "epoch": 0.42465972778222577, "percentage": 42.47, "elapsed_time": "3:55:07", "remaining_time": "5:18:27"}
+{"current_steps": 1327, "total_steps": 3122, "loss": 2.4488, "learning_rate": 3.557460638977666e-05, "epoch": 0.4249799839871897, "percentage": 42.5, "elapsed_time": "3:55:17", "remaining_time": "5:18:16"}
+{"current_steps": 1328, "total_steps": 3122, "loss": 2.6207, "learning_rate": 3.554926413329254e-05, "epoch": 0.42530024019215373, "percentage": 42.54, "elapsed_time": "3:55:28", "remaining_time": "5:18:05"}
+{"current_steps": 1329, "total_steps": 3122, "loss": 2.0293, "learning_rate": 3.552390868153516e-05, "epoch": 0.4256204963971177, "percentage": 42.57, "elapsed_time": "3:55:38", "remaining_time": "5:17:54"}
+{"current_steps": 1330, "total_steps": 3122, "loss": 2.2195, "learning_rate": 3.549854006621976e-05, "epoch": 0.42594075260208164, "percentage": 42.6, "elapsed_time": "3:55:48", "remaining_time": "5:17:43"}
+{"current_steps": 1331, "total_steps": 3122, "loss": 2.9019, "learning_rate": 3.547315831907798e-05, "epoch": 0.42626100880704565, "percentage": 42.63, "elapsed_time": "3:55:59", "remaining_time": "5:17:32"}
+{"current_steps": 1332, "total_steps": 3122, "loss": 2.5745, "learning_rate": 3.544776347185793e-05, "epoch": 0.4265812650120096, "percentage": 42.66, "elapsed_time": "3:56:09", "remaining_time": "5:17:21"}
+{"current_steps": 1333, "total_steps": 3122, "loss": 2.6656, "learning_rate": 3.54223555563241e-05, "epoch": 0.42690152121697356, "percentage": 42.7, "elapsed_time": "3:56:19", "remaining_time": "5:17:10"}
+{"current_steps": 1334, "total_steps": 3122, "loss": 2.2501, "learning_rate": 3.5396934604257326e-05, "epoch": 0.42722177742193757, "percentage": 42.73, "elapsed_time": "3:56:30", "remaining_time": "5:16:59"}
+{"current_steps": 1335, "total_steps": 3122, "loss": 2.2139, "learning_rate": 3.537150064745474e-05, "epoch": 0.4275420336269015, "percentage": 42.76, "elapsed_time": "3:56:40", "remaining_time": "5:16:48"}
+{"current_steps": 1336, "total_steps": 3122, "loss": 1.9124, "learning_rate": 3.534605371772974e-05, "epoch": 0.42786228983186547, "percentage": 42.79, "elapsed_time": "3:56:50", "remaining_time": "5:16:37"}
+{"current_steps": 1337, "total_steps": 3122, "loss": 2.6009, "learning_rate": 3.5320593846911973e-05, "epoch": 0.4281825460368295, "percentage": 42.83, "elapsed_time": "3:57:01", "remaining_time": "5:16:26"}
+{"current_steps": 1338, "total_steps": 3122, "loss": 1.5908, "learning_rate": 3.529512106684724e-05, "epoch": 0.42850280224179343, "percentage": 42.86, "elapsed_time": "3:57:11", "remaining_time": "5:16:15"}
+{"current_steps": 1339, "total_steps": 3122, "loss": 2.011, "learning_rate": 3.526963540939752e-05, "epoch": 0.4288230584467574, "percentage": 42.89, "elapsed_time": "3:57:21", "remaining_time": "5:16:04"}
+{"current_steps": 1340, "total_steps": 3122, "loss": 2.0686, "learning_rate": 3.5244136906440886e-05, "epoch": 0.4291433146517214, "percentage": 42.92, "elapsed_time": "3:57:32", "remaining_time": "5:15:53"}
+{"current_steps": 1341, "total_steps": 3122, "loss": 1.9993, "learning_rate": 3.521862558987148e-05, "epoch": 0.42946357085668535, "percentage": 42.95, "elapsed_time": "3:57:42", "remaining_time": "5:15:42"}
+{"current_steps": 1342, "total_steps": 3122, "loss": 2.6751, "learning_rate": 3.5193101491599453e-05, "epoch": 0.4297838270616493, "percentage": 42.99, "elapsed_time": "3:57:53", "remaining_time": "5:15:31"}
+{"current_steps": 1343, "total_steps": 3122, "loss": 2.1176, "learning_rate": 3.5167564643550975e-05, "epoch": 0.4301040832666133, "percentage": 43.02, "elapsed_time": "3:58:03", "remaining_time": "5:15:20"}
+{"current_steps": 1344, "total_steps": 3122, "loss": 2.3972, "learning_rate": 3.5142015077668155e-05, "epoch": 0.43042433947157727, "percentage": 43.05, "elapsed_time": "3:58:13", "remaining_time": "5:15:09"}
+{"current_steps": 1345, "total_steps": 3122, "loss": 1.8073, "learning_rate": 3.5116452825909e-05, "epoch": 0.4307445956765412, "percentage": 43.08, "elapsed_time": "3:58:24", "remaining_time": "5:14:58"}
+{"current_steps": 1346, "total_steps": 3122, "loss": 2.6247, "learning_rate": 3.5090877920247375e-05, "epoch": 0.43106485188150523, "percentage": 43.11, "elapsed_time": "3:58:34", "remaining_time": "5:14:47"}
+{"current_steps": 1347, "total_steps": 3122, "loss": 1.8295, "learning_rate": 3.5065290392673e-05, "epoch": 0.4313851080864692, "percentage": 43.15, "elapsed_time": "3:58:44", "remaining_time": "5:14:36"}
+{"current_steps": 1348, "total_steps": 3122, "loss": 2.4511, "learning_rate": 3.503969027519137e-05, "epoch": 0.43170536429143314, "percentage": 43.18, "elapsed_time": "3:58:55", "remaining_time": "5:14:25"}
+{"current_steps": 1349, "total_steps": 3122, "loss": 2.578, "learning_rate": 3.501407759982372e-05, "epoch": 0.43202562049639714, "percentage": 43.21, "elapsed_time": "3:59:05", "remaining_time": "5:14:14"}
+{"current_steps": 1350, "total_steps": 3122, "loss": 2.1768, "learning_rate": 3.498845239860702e-05, "epoch": 0.4323458767013611, "percentage": 43.24, "elapsed_time": "3:59:15", "remaining_time": "5:14:03"}
+{"current_steps": 1351, "total_steps": 3122, "loss": 2.084, "learning_rate": 3.496281470359386e-05, "epoch": 0.43266613290632505, "percentage": 43.27, "elapsed_time": "3:59:26", "remaining_time": "5:13:52"}
+{"current_steps": 1352, "total_steps": 3122, "loss": 2.215, "learning_rate": 3.493716454685251e-05, "epoch": 0.432986389111289, "percentage": 43.31, "elapsed_time": "3:59:36", "remaining_time": "5:13:41"}
+{"current_steps": 1353, "total_steps": 3122, "loss": 2.1564, "learning_rate": 3.491150196046679e-05, "epoch": 0.433306645316253, "percentage": 43.34, "elapsed_time": "3:59:46", "remaining_time": "5:13:30"}
+{"current_steps": 1354, "total_steps": 3122, "loss": 2.0137, "learning_rate": 3.4885826976536074e-05, "epoch": 0.43362690152121697, "percentage": 43.37, "elapsed_time": "3:59:57", "remaining_time": "5:13:19"}
+{"current_steps": 1355, "total_steps": 3122, "loss": 1.9845, "learning_rate": 3.486013962717526e-05, "epoch": 0.4339471577261809, "percentage": 43.4, "elapsed_time": "4:00:07", "remaining_time": "5:13:08"}
+{"current_steps": 1356, "total_steps": 3122, "loss": 1.7616, "learning_rate": 3.483443994451471e-05, "epoch": 0.43426741393114493, "percentage": 43.43, "elapsed_time": "4:00:18", "remaining_time": "5:12:57"}
+{"current_steps": 1357, "total_steps": 3122, "loss": 2.5005, "learning_rate": 3.480872796070018e-05, "epoch": 0.4345876701361089, "percentage": 43.47, "elapsed_time": "4:00:28", "remaining_time": "5:12:46"}
+{"current_steps": 1358, "total_steps": 3122, "loss": 2.4385, "learning_rate": 3.478300370789286e-05, "epoch": 0.43490792634107284, "percentage": 43.5, "elapsed_time": "4:00:38", "remaining_time": "5:12:35"}
+{"current_steps": 1359, "total_steps": 3122, "loss": 2.3023, "learning_rate": 3.475726721826926e-05, "epoch": 0.43522818254603685, "percentage": 43.53, "elapsed_time": "4:00:49", "remaining_time": "5:12:24"}
+{"current_steps": 1360, "total_steps": 3122, "loss": 2.0413, "learning_rate": 3.473151852402119e-05, "epoch": 0.4355484387510008, "percentage": 43.56, "elapsed_time": "4:00:59", "remaining_time": "5:12:13"}
+{"current_steps": 1361, "total_steps": 3122, "loss": 2.4551, "learning_rate": 3.470575765735574e-05, "epoch": 0.43586869495596475, "percentage": 43.59, "elapsed_time": "4:01:09", "remaining_time": "5:12:02"}
+{"current_steps": 1362, "total_steps": 3122, "loss": 2.5011, "learning_rate": 3.4679984650495225e-05, "epoch": 0.43618895116092876, "percentage": 43.63, "elapsed_time": "4:01:20", "remaining_time": "5:11:51"}
+{"current_steps": 1363, "total_steps": 3122, "loss": 1.651, "learning_rate": 3.465419953567714e-05, "epoch": 0.4365092073658927, "percentage": 43.66, "elapsed_time": "4:01:30", "remaining_time": "5:11:40"}
+{"current_steps": 1364, "total_steps": 3122, "loss": 2.2163, "learning_rate": 3.4628402345154136e-05, "epoch": 0.43682946357085667, "percentage": 43.69, "elapsed_time": "4:01:40", "remaining_time": "5:11:29"}
+{"current_steps": 1365, "total_steps": 3122, "loss": 2.1722, "learning_rate": 3.4602593111193946e-05, "epoch": 0.4371497197758207, "percentage": 43.72, "elapsed_time": "4:01:51", "remaining_time": "5:11:18"}
+{"current_steps": 1366, "total_steps": 3122, "loss": 2.5205, "learning_rate": 3.457677186607938e-05, "epoch": 0.43746997598078463, "percentage": 43.75, "elapsed_time": "4:02:01", "remaining_time": "5:11:07"}
+{"current_steps": 1367, "total_steps": 3122, "loss": 2.0087, "learning_rate": 3.455093864210828e-05, "epoch": 0.4377902321857486, "percentage": 43.79, "elapsed_time": "4:02:12", "remaining_time": "5:10:56"}
+{"current_steps": 1368, "total_steps": 3122, "loss": 2.0194, "learning_rate": 3.452509347159346e-05, "epoch": 0.4381104883907126, "percentage": 43.82, "elapsed_time": "4:02:22", "remaining_time": "5:10:45"}
+{"current_steps": 1369, "total_steps": 3122, "loss": 2.6472, "learning_rate": 3.449923638686269e-05, "epoch": 0.43843074459567655, "percentage": 43.85, "elapsed_time": "4:02:32", "remaining_time": "5:10:34"}
+{"current_steps": 1370, "total_steps": 3122, "loss": 2.1153, "learning_rate": 3.447336742025862e-05, "epoch": 0.4387510008006405, "percentage": 43.88, "elapsed_time": "4:02:43", "remaining_time": "5:10:23"}
+{"current_steps": 1371, "total_steps": 3122, "loss": 2.0821, "learning_rate": 3.4447486604138776e-05, "epoch": 0.4390712570056045, "percentage": 43.91, "elapsed_time": "4:02:53", "remaining_time": "5:10:12"}
+{"current_steps": 1372, "total_steps": 3122, "loss": 2.3243, "learning_rate": 3.442159397087551e-05, "epoch": 0.43939151321056846, "percentage": 43.95, "elapsed_time": "4:03:03", "remaining_time": "5:10:01"}
+{"current_steps": 1373, "total_steps": 3122, "loss": 2.3805, "learning_rate": 3.4395689552855955e-05, "epoch": 0.4397117694155324, "percentage": 43.98, "elapsed_time": "4:03:14", "remaining_time": "5:09:50"}
+{"current_steps": 1374, "total_steps": 3122, "loss": 2.2077, "learning_rate": 3.436977338248197e-05, "epoch": 0.44003202562049637, "percentage": 44.01, "elapsed_time": "4:03:24", "remaining_time": "5:09:39"}
+{"current_steps": 1375, "total_steps": 3122, "loss": 2.3821, "learning_rate": 3.434384549217013e-05, "epoch": 0.4403522818254604, "percentage": 44.04, "elapsed_time": "4:03:34", "remaining_time": "5:09:28"}
+{"current_steps": 1376, "total_steps": 3122, "loss": 2.0472, "learning_rate": 3.431790591435167e-05, "epoch": 0.44067253803042433, "percentage": 44.07, "elapsed_time": "4:03:45", "remaining_time": "5:09:17"}
+{"current_steps": 1377, "total_steps": 3122, "loss": 1.6111, "learning_rate": 3.4291954681472427e-05, "epoch": 0.4409927942353883, "percentage": 44.11, "elapsed_time": "4:03:55", "remaining_time": "5:09:06"}
+{"current_steps": 1378, "total_steps": 3122, "loss": 2.5023, "learning_rate": 3.426599182599283e-05, "epoch": 0.4413130504403523, "percentage": 44.14, "elapsed_time": "4:04:05", "remaining_time": "5:08:55"}
+{"current_steps": 1379, "total_steps": 3122, "loss": 2.4245, "learning_rate": 3.424001738038784e-05, "epoch": 0.44163330664531625, "percentage": 44.17, "elapsed_time": "4:04:16", "remaining_time": "5:08:44"}
+{"current_steps": 1380, "total_steps": 3122, "loss": 2.2083, "learning_rate": 3.4214031377146915e-05, "epoch": 0.4419535628502802, "percentage": 44.2, "elapsed_time": "4:04:26", "remaining_time": "5:08:33"}
+{"current_steps": 1381, "total_steps": 3122, "loss": 2.5568, "learning_rate": 3.4188033848773995e-05, "epoch": 0.4422738190552442, "percentage": 44.23, "elapsed_time": "4:04:36", "remaining_time": "5:08:22"}
+{"current_steps": 1382, "total_steps": 3122, "loss": 2.4897, "learning_rate": 3.4162024827787384e-05, "epoch": 0.44259407526020816, "percentage": 44.27, "elapsed_time": "4:04:47", "remaining_time": "5:08:11"}
+{"current_steps": 1383, "total_steps": 3122, "loss": 2.2791, "learning_rate": 3.4136004346719815e-05, "epoch": 0.4429143314651721, "percentage": 44.3, "elapsed_time": "4:04:57", "remaining_time": "5:08:01"}
+{"current_steps": 1384, "total_steps": 3122, "loss": 1.5351, "learning_rate": 3.410997243811832e-05, "epoch": 0.4432345876701361, "percentage": 44.33, "elapsed_time": "4:05:08", "remaining_time": "5:07:50"}
+{"current_steps": 1385, "total_steps": 3122, "loss": 2.3915, "learning_rate": 3.408392913454423e-05, "epoch": 0.4435548438751001, "percentage": 44.36, "elapsed_time": "4:05:18", "remaining_time": "5:07:39"}
+{"current_steps": 1386, "total_steps": 3122, "loss": 1.9231, "learning_rate": 3.4057874468573145e-05, "epoch": 0.44387510008006403, "percentage": 44.39, "elapsed_time": "4:05:28", "remaining_time": "5:07:28"}
+{"current_steps": 1387, "total_steps": 3122, "loss": 2.1587, "learning_rate": 3.4031808472794875e-05, "epoch": 0.44419535628502804, "percentage": 44.43, "elapsed_time": "4:05:39", "remaining_time": "5:07:17"}
+{"current_steps": 1388, "total_steps": 3122, "loss": 1.8927, "learning_rate": 3.400573117981338e-05, "epoch": 0.444515612489992, "percentage": 44.46, "elapsed_time": "4:05:49", "remaining_time": "5:07:06"}
+{"current_steps": 1389, "total_steps": 3122, "loss": 1.9999, "learning_rate": 3.3979642622246765e-05, "epoch": 0.44483586869495595, "percentage": 44.49, "elapsed_time": "4:05:59", "remaining_time": "5:06:55"}
+{"current_steps": 1390, "total_steps": 3122, "loss": 1.7148, "learning_rate": 3.395354283272724e-05, "epoch": 0.44515612489991996, "percentage": 44.52, "elapsed_time": "4:06:10", "remaining_time": "5:06:44"}
+{"current_steps": 1391, "total_steps": 3122, "loss": 2.6938, "learning_rate": 3.3927431843901034e-05, "epoch": 0.4454763811048839, "percentage": 44.55, "elapsed_time": "4:06:20", "remaining_time": "5:06:33"}
+{"current_steps": 1392, "total_steps": 3122, "loss": 2.2425, "learning_rate": 3.39013096884284e-05, "epoch": 0.44579663730984787, "percentage": 44.59, "elapsed_time": "4:06:30", "remaining_time": "5:06:22"}
+{"current_steps": 1393, "total_steps": 3122, "loss": 2.3499, "learning_rate": 3.3875176398983565e-05, "epoch": 0.4461168935148119, "percentage": 44.62, "elapsed_time": "4:06:41", "remaining_time": "5:06:11"}
+{"current_steps": 1394, "total_steps": 3122, "loss": 2.2984, "learning_rate": 3.3849032008254676e-05, "epoch": 0.4464371497197758, "percentage": 44.65, "elapsed_time": "4:06:51", "remaining_time": "5:06:00"}
+{"current_steps": 1395, "total_steps": 3122, "loss": 1.9116, "learning_rate": 3.382287654894377e-05, "epoch": 0.4467574059247398, "percentage": 44.68, "elapsed_time": "4:07:01", "remaining_time": "5:05:49"}
+{"current_steps": 1396, "total_steps": 3122, "loss": 2.2836, "learning_rate": 3.379671005376671e-05, "epoch": 0.4470776621297038, "percentage": 44.71, "elapsed_time": "4:07:12", "remaining_time": "5:05:38"}
+{"current_steps": 1397, "total_steps": 3122, "loss": 1.6366, "learning_rate": 3.377053255545319e-05, "epoch": 0.44739791833466774, "percentage": 44.75, "elapsed_time": "4:07:22", "remaining_time": "5:05:27"}
+{"current_steps": 1398, "total_steps": 3122, "loss": 2.4968, "learning_rate": 3.374434408674665e-05, "epoch": 0.4477181745396317, "percentage": 44.78, "elapsed_time": "4:07:32", "remaining_time": "5:05:16"}
+{"current_steps": 1399, "total_steps": 3122, "loss": 2.4331, "learning_rate": 3.371814468040426e-05, "epoch": 0.44803843074459565, "percentage": 44.81, "elapsed_time": "4:07:43", "remaining_time": "5:05:05"}
+{"current_steps": 1400, "total_steps": 3122, "loss": 2.381, "learning_rate": 3.3691934369196855e-05, "epoch": 0.44835868694955966, "percentage": 44.84, "elapsed_time": "4:07:53", "remaining_time": "5:04:54"}
+{"current_steps": 1401, "total_steps": 3122, "loss": 1.7545, "learning_rate": 3.366571318590894e-05, "epoch": 0.4486789431545236, "percentage": 44.88, "elapsed_time": "4:08:30", "remaining_time": "5:05:16"}
+{"current_steps": 1402, "total_steps": 3122, "loss": 2.4128, "learning_rate": 3.3639481163338584e-05, "epoch": 0.44899919935948757, "percentage": 44.91, "elapsed_time": "4:08:40", "remaining_time": "5:05:05"}
+{"current_steps": 1403, "total_steps": 3122, "loss": 1.8779, "learning_rate": 3.3613238334297446e-05, "epoch": 0.4493194555644516, "percentage": 44.94, "elapsed_time": "4:08:51", "remaining_time": "5:04:54"}
+{"current_steps": 1404, "total_steps": 3122, "loss": 2.3488, "learning_rate": 3.358698473161068e-05, "epoch": 0.44963971176941553, "percentage": 44.97, "elapsed_time": "4:09:01", "remaining_time": "5:04:43"}
+{"current_steps": 1405, "total_steps": 3122, "loss": 1.6194, "learning_rate": 3.3560720388116934e-05, "epoch": 0.4499599679743795, "percentage": 45.0, "elapsed_time": "4:09:12", "remaining_time": "5:04:32"}
+{"current_steps": 1406, "total_steps": 3122, "loss": 2.0731, "learning_rate": 3.3534445336668266e-05, "epoch": 0.4502802241793435, "percentage": 45.04, "elapsed_time": "4:09:22", "remaining_time": "5:04:21"}
+{"current_steps": 1407, "total_steps": 3122, "loss": 2.0653, "learning_rate": 3.350815961013014e-05, "epoch": 0.45060048038430744, "percentage": 45.07, "elapsed_time": "4:09:32", "remaining_time": "5:04:10"}
+{"current_steps": 1408, "total_steps": 3122, "loss": 2.5686, "learning_rate": 3.348186324138139e-05, "epoch": 0.4509207365892714, "percentage": 45.1, "elapsed_time": "4:09:43", "remaining_time": "5:03:59"}
+{"current_steps": 1409, "total_steps": 3122, "loss": 2.0038, "learning_rate": 3.345555626331415e-05, "epoch": 0.4512409927942354, "percentage": 45.13, "elapsed_time": "4:09:53", "remaining_time": "5:03:48"}
+{"current_steps": 1410, "total_steps": 3122, "loss": 2.3573, "learning_rate": 3.34292387088338e-05, "epoch": 0.45156124899919936, "percentage": 45.16, "elapsed_time": "4:10:04", "remaining_time": "5:03:37"}
+{"current_steps": 1411, "total_steps": 3122, "loss": 2.2184, "learning_rate": 3.340291061085898e-05, "epoch": 0.4518815052041633, "percentage": 45.2, "elapsed_time": "4:10:14", "remaining_time": "5:03:26"}
+{"current_steps": 1412, "total_steps": 3122, "loss": 2.8585, "learning_rate": 3.3376572002321506e-05, "epoch": 0.4522017614091273, "percentage": 45.23, "elapsed_time": "4:10:24", "remaining_time": "5:03:15"}
+{"current_steps": 1413, "total_steps": 3122, "loss": 2.5615, "learning_rate": 3.335022291616635e-05, "epoch": 0.4525220176140913, "percentage": 45.26, "elapsed_time": "4:10:35", "remaining_time": "5:03:05"}
+{"current_steps": 1414, "total_steps": 3122, "loss": 2.1242, "learning_rate": 3.332386338535158e-05, "epoch": 0.45284227381905523, "percentage": 45.29, "elapsed_time": "4:10:45", "remaining_time": "5:02:54"}
+{"current_steps": 1415, "total_steps": 3122, "loss": 2.2279, "learning_rate": 3.329749344284832e-05, "epoch": 0.45316253002401924, "percentage": 45.32, "elapsed_time": "4:10:56", "remaining_time": "5:02:43"}
+{"current_steps": 1416, "total_steps": 3122, "loss": 2.3805, "learning_rate": 3.327111312164075e-05, "epoch": 0.4534827862289832, "percentage": 45.36, "elapsed_time": "4:11:06", "remaining_time": "5:02:32"}
+{"current_steps": 1417, "total_steps": 3122, "loss": 2.2084, "learning_rate": 3.324472245472598e-05, "epoch": 0.45380304243394715, "percentage": 45.39, "elapsed_time": "4:11:16", "remaining_time": "5:02:21"}
+{"current_steps": 1418, "total_steps": 3122, "loss": 2.6584, "learning_rate": 3.321832147511412e-05, "epoch": 0.45412329863891115, "percentage": 45.42, "elapsed_time": "4:11:27", "remaining_time": "5:02:10"}
+{"current_steps": 1419, "total_steps": 3122, "loss": 1.9955, "learning_rate": 3.319191021582814e-05, "epoch": 0.4544435548438751, "percentage": 45.45, "elapsed_time": "4:11:37", "remaining_time": "5:01:59"}
+{"current_steps": 1420, "total_steps": 3122, "loss": 2.1134, "learning_rate": 3.3165488709903876e-05, "epoch": 0.45476381104883906, "percentage": 45.48, "elapsed_time": "4:11:48", "remaining_time": "5:01:48"}
+{"current_steps": 1421, "total_steps": 3122, "loss": 2.4377, "learning_rate": 3.313905699038997e-05, "epoch": 0.455084067253803, "percentage": 45.52, "elapsed_time": "4:11:58", "remaining_time": "5:01:37"}
+{"current_steps": 1422, "total_steps": 3122, "loss": 2.3482, "learning_rate": 3.3112615090347875e-05, "epoch": 0.455404323458767, "percentage": 45.55, "elapsed_time": "4:12:08", "remaining_time": "5:01:26"}
+{"current_steps": 1423, "total_steps": 3122, "loss": 2.2396, "learning_rate": 3.3086163042851757e-05, "epoch": 0.455724579663731, "percentage": 45.58, "elapsed_time": "4:12:19", "remaining_time": "5:01:15"}
+{"current_steps": 1424, "total_steps": 3122, "loss": 1.9499, "learning_rate": 3.305970088098844e-05, "epoch": 0.45604483586869493, "percentage": 45.61, "elapsed_time": "4:12:29", "remaining_time": "5:01:04"}
+{"current_steps": 1425, "total_steps": 3122, "loss": 2.4442, "learning_rate": 3.303322863785747e-05, "epoch": 0.45636509207365894, "percentage": 45.64, "elapsed_time": "4:12:39", "remaining_time": "5:00:53"}
+{"current_steps": 1426, "total_steps": 3122, "loss": 2.0177, "learning_rate": 3.300674634657094e-05, "epoch": 0.4566853482786229, "percentage": 45.68, "elapsed_time": "4:12:50", "remaining_time": "5:00:42"}
+{"current_steps": 1427, "total_steps": 3122, "loss": 2.3229, "learning_rate": 3.2980254040253554e-05, "epoch": 0.45700560448358685, "percentage": 45.71, "elapsed_time": "4:13:00", "remaining_time": "5:00:31"}
+{"current_steps": 1428, "total_steps": 3122, "loss": 1.5711, "learning_rate": 3.2953751752042514e-05, "epoch": 0.45732586068855086, "percentage": 45.74, "elapsed_time": "4:13:10", "remaining_time": "5:00:20"}
+{"current_steps": 1429, "total_steps": 3122, "loss": 2.3031, "learning_rate": 3.2927239515087524e-05, "epoch": 0.4576461168935148, "percentage": 45.77, "elapsed_time": "4:13:21", "remaining_time": "5:00:09"}
+{"current_steps": 1430, "total_steps": 3122, "loss": 2.4136, "learning_rate": 3.290071736255073e-05, "epoch": 0.45796637309847876, "percentage": 45.8, "elapsed_time": "4:13:31", "remaining_time": "4:59:58"}
+{"current_steps": 1431, "total_steps": 3122, "loss": 2.4615, "learning_rate": 3.287418532760667e-05, "epoch": 0.45828662930344277, "percentage": 45.84, "elapsed_time": "4:13:41", "remaining_time": "4:59:47"}
+{"current_steps": 1432, "total_steps": 3122, "loss": 2.3343, "learning_rate": 3.284764344344226e-05, "epoch": 0.4586068855084067, "percentage": 45.87, "elapsed_time": "4:13:52", "remaining_time": "4:59:36"}
+{"current_steps": 1433, "total_steps": 3122, "loss": 2.6001, "learning_rate": 3.282109174325672e-05, "epoch": 0.4589271417133707, "percentage": 45.9, "elapsed_time": "4:14:02", "remaining_time": "4:59:25"}
+{"current_steps": 1434, "total_steps": 3122, "loss": 2.282, "learning_rate": 3.279453026026157e-05, "epoch": 0.4592473979183347, "percentage": 45.93, "elapsed_time": "4:14:12", "remaining_time": "4:59:14"}
+{"current_steps": 1435, "total_steps": 3122, "loss": 2.6124, "learning_rate": 3.2767959027680525e-05, "epoch": 0.45956765412329864, "percentage": 45.96, "elapsed_time": "4:14:23", "remaining_time": "4:59:03"}
+{"current_steps": 1436, "total_steps": 3122, "loss": 1.9807, "learning_rate": 3.2741378078749545e-05, "epoch": 0.4598879103282626, "percentage": 46.0, "elapsed_time": "4:14:33", "remaining_time": "4:58:52"}
+{"current_steps": 1437, "total_steps": 3122, "loss": 2.7701, "learning_rate": 3.271478744671672e-05, "epoch": 0.4602081665332266, "percentage": 46.03, "elapsed_time": "4:14:44", "remaining_time": "4:58:41"}
+{"current_steps": 1438, "total_steps": 3122, "loss": 2.2759, "learning_rate": 3.2688187164842235e-05, "epoch": 0.46052842273819056, "percentage": 46.06, "elapsed_time": "4:14:54", "remaining_time": "4:58:30"}
+{"current_steps": 1439, "total_steps": 3122, "loss": 2.1833, "learning_rate": 3.266157726639836e-05, "epoch": 0.4608486789431545, "percentage": 46.09, "elapsed_time": "4:15:04", "remaining_time": "4:58:19"}
+{"current_steps": 1440, "total_steps": 3122, "loss": 2.2356, "learning_rate": 3.263495778466942e-05, "epoch": 0.4611689351481185, "percentage": 46.12, "elapsed_time": "4:15:15", "remaining_time": "4:58:08"}
+{"current_steps": 1441, "total_steps": 3122, "loss": 2.2155, "learning_rate": 3.260832875295169e-05, "epoch": 0.4614891913530825, "percentage": 46.16, "elapsed_time": "4:15:25", "remaining_time": "4:57:57"}
+{"current_steps": 1442, "total_steps": 3122, "loss": 1.4778, "learning_rate": 3.25816902045534e-05, "epoch": 0.4618094475580464, "percentage": 46.19, "elapsed_time": "4:15:35", "remaining_time": "4:57:46"}
+{"current_steps": 1443, "total_steps": 3122, "loss": 1.7559, "learning_rate": 3.255504217279469e-05, "epoch": 0.46212970376301044, "percentage": 46.22, "elapsed_time": "4:15:46", "remaining_time": "4:57:35"}
+{"current_steps": 1444, "total_steps": 3122, "loss": 2.1804, "learning_rate": 3.2528384691007555e-05, "epoch": 0.4624499599679744, "percentage": 46.25, "elapsed_time": "4:15:56", "remaining_time": "4:57:24"}
+{"current_steps": 1445, "total_steps": 3122, "loss": 2.2981, "learning_rate": 3.250171779253583e-05, "epoch": 0.46277021617293834, "percentage": 46.28, "elapsed_time": "4:16:06", "remaining_time": "4:57:14"}
+{"current_steps": 1446, "total_steps": 3122, "loss": 2.4689, "learning_rate": 3.2475041510735086e-05, "epoch": 0.4630904723779023, "percentage": 46.32, "elapsed_time": "4:16:17", "remaining_time": "4:57:03"}
+{"current_steps": 1447, "total_steps": 3122, "loss": 2.397, "learning_rate": 3.244835587897268e-05, "epoch": 0.4634107285828663, "percentage": 46.35, "elapsed_time": "4:16:27", "remaining_time": "4:56:52"}
+{"current_steps": 1448, "total_steps": 3122, "loss": 2.2169, "learning_rate": 3.242166093062764e-05, "epoch": 0.46373098478783026, "percentage": 46.38, "elapsed_time": "4:16:37", "remaining_time": "4:56:41"}
+{"current_steps": 1449, "total_steps": 3122, "loss": 2.2407, "learning_rate": 3.239495669909064e-05, "epoch": 0.4640512409927942, "percentage": 46.41, "elapsed_time": "4:16:48", "remaining_time": "4:56:30"}
+{"current_steps": 1450, "total_steps": 3122, "loss": 2.1264, "learning_rate": 3.236824321776397e-05, "epoch": 0.4643714971977582, "percentage": 46.44, "elapsed_time": "4:16:58", "remaining_time": "4:56:19"}
+{"current_steps": 1451, "total_steps": 3122, "loss": 2.2125, "learning_rate": 3.2341520520061516e-05, "epoch": 0.4646917534027222, "percentage": 46.48, "elapsed_time": "4:17:08", "remaining_time": "4:56:08"}
+{"current_steps": 1452, "total_steps": 3122, "loss": 2.1495, "learning_rate": 3.2314788639408656e-05, "epoch": 0.4650120096076861, "percentage": 46.51, "elapsed_time": "4:17:19", "remaining_time": "4:55:57"}
+{"current_steps": 1453, "total_steps": 3122, "loss": 2.029, "learning_rate": 3.2288047609242266e-05, "epoch": 0.46533226581265014, "percentage": 46.54, "elapsed_time": "4:17:29", "remaining_time": "4:55:46"}
+{"current_steps": 1454, "total_steps": 3122, "loss": 1.9174, "learning_rate": 3.226129746301067e-05, "epoch": 0.4656525220176141, "percentage": 46.57, "elapsed_time": "4:17:40", "remaining_time": "4:55:35"}
+{"current_steps": 1455, "total_steps": 3122, "loss": 2.5737, "learning_rate": 3.223453823417362e-05, "epoch": 0.46597277822257804, "percentage": 46.6, "elapsed_time": "4:17:50", "remaining_time": "4:55:24"}
+{"current_steps": 1456, "total_steps": 3122, "loss": 2.2023, "learning_rate": 3.220776995620217e-05, "epoch": 0.46629303442754205, "percentage": 46.64, "elapsed_time": "4:18:00", "remaining_time": "4:55:13"}
+{"current_steps": 1457, "total_steps": 3122, "loss": 2.6245, "learning_rate": 3.218099266257874e-05, "epoch": 0.466613290632506, "percentage": 46.67, "elapsed_time": "4:18:11", "remaining_time": "4:55:02"}
+{"current_steps": 1458, "total_steps": 3122, "loss": 1.9389, "learning_rate": 3.2154206386797e-05, "epoch": 0.46693354683746996, "percentage": 46.7, "elapsed_time": "4:18:21", "remaining_time": "4:54:51"}
+{"current_steps": 1459, "total_steps": 3122, "loss": 2.0921, "learning_rate": 3.212741116236189e-05, "epoch": 0.46725380304243397, "percentage": 46.73, "elapsed_time": "4:18:31", "remaining_time": "4:54:40"}
+{"current_steps": 1460, "total_steps": 3122, "loss": 2.5264, "learning_rate": 3.210060702278951e-05, "epoch": 0.4675740592473979, "percentage": 46.76, "elapsed_time": "4:18:42", "remaining_time": "4:54:29"}
+{"current_steps": 1461, "total_steps": 3122, "loss": 1.9612, "learning_rate": 3.207379400160711e-05, "epoch": 0.4678943154523619, "percentage": 46.8, "elapsed_time": "4:18:52", "remaining_time": "4:54:18"}
+{"current_steps": 1462, "total_steps": 3122, "loss": 2.329, "learning_rate": 3.204697213235309e-05, "epoch": 0.4682145716573259, "percentage": 46.83, "elapsed_time": "4:19:02", "remaining_time": "4:54:07"}
+{"current_steps": 1463, "total_steps": 3122, "loss": 2.4217, "learning_rate": 3.2020141448576866e-05, "epoch": 0.46853482786228984, "percentage": 46.86, "elapsed_time": "4:19:13", "remaining_time": "4:53:56"}
+{"current_steps": 1464, "total_steps": 3122, "loss": 1.7458, "learning_rate": 3.1993301983838906e-05, "epoch": 0.4688550840672538, "percentage": 46.89, "elapsed_time": "4:19:23", "remaining_time": "4:53:45"}
+{"current_steps": 1465, "total_steps": 3122, "loss": 2.112, "learning_rate": 3.1966453771710655e-05, "epoch": 0.4691753402722178, "percentage": 46.93, "elapsed_time": "4:19:33", "remaining_time": "4:53:35"}
+{"current_steps": 1466, "total_steps": 3122, "loss": 2.4703, "learning_rate": 3.1939596845774525e-05, "epoch": 0.46949559647718175, "percentage": 46.96, "elapsed_time": "4:19:44", "remaining_time": "4:53:24"}
+{"current_steps": 1467, "total_steps": 3122, "loss": 2.4275, "learning_rate": 3.191273123962378e-05, "epoch": 0.4698158526821457, "percentage": 46.99, "elapsed_time": "4:19:54", "remaining_time": "4:53:13"}
+{"current_steps": 1468, "total_steps": 3122, "loss": 2.4174, "learning_rate": 3.188585698686257e-05, "epoch": 0.47013610888710966, "percentage": 47.02, "elapsed_time": "4:20:05", "remaining_time": "4:53:02"}
+{"current_steps": 1469, "total_steps": 3122, "loss": 2.2741, "learning_rate": 3.185897412110587e-05, "epoch": 0.47045636509207367, "percentage": 47.05, "elapsed_time": "4:20:15", "remaining_time": "4:52:51"}
+{"current_steps": 1470, "total_steps": 3122, "loss": 2.2359, "learning_rate": 3.1832082675979394e-05, "epoch": 0.4707766212970376, "percentage": 47.09, "elapsed_time": "4:20:25", "remaining_time": "4:52:40"}
+{"current_steps": 1471, "total_steps": 3122, "loss": 2.174, "learning_rate": 3.180518268511963e-05, "epoch": 0.4710968775020016, "percentage": 47.12, "elapsed_time": "4:20:36", "remaining_time": "4:52:29"}
+{"current_steps": 1472, "total_steps": 3122, "loss": 2.2126, "learning_rate": 3.1778274182173716e-05, "epoch": 0.4714171337069656, "percentage": 47.15, "elapsed_time": "4:20:46", "remaining_time": "4:52:18"}
+{"current_steps": 1473, "total_steps": 3122, "loss": 2.0206, "learning_rate": 3.175135720079947e-05, "epoch": 0.47173738991192954, "percentage": 47.18, "elapsed_time": "4:20:56", "remaining_time": "4:52:07"}
+{"current_steps": 1474, "total_steps": 3122, "loss": 2.4025, "learning_rate": 3.172443177466529e-05, "epoch": 0.4720576461168935, "percentage": 47.21, "elapsed_time": "4:21:07", "remaining_time": "4:51:56"}
+{"current_steps": 1475, "total_steps": 3122, "loss": 2.6801, "learning_rate": 3.169749793745014e-05, "epoch": 0.4723779023218575, "percentage": 47.25, "elapsed_time": "4:21:17", "remaining_time": "4:51:45"}
+{"current_steps": 1476, "total_steps": 3122, "loss": 2.2362, "learning_rate": 3.167055572284352e-05, "epoch": 0.47269815852682145, "percentage": 47.28, "elapsed_time": "4:21:27", "remaining_time": "4:51:34"}
+{"current_steps": 1477, "total_steps": 3122, "loss": 2.0306, "learning_rate": 3.164360516454541e-05, "epoch": 0.4730184147317854, "percentage": 47.31, "elapsed_time": "4:21:38", "remaining_time": "4:51:23"}
+{"current_steps": 1478, "total_steps": 3122, "loss": 2.1496, "learning_rate": 3.1616646296266196e-05, "epoch": 0.4733386709367494, "percentage": 47.34, "elapsed_time": "4:21:48", "remaining_time": "4:51:12"}
+{"current_steps": 1479, "total_steps": 3122, "loss": 2.6622, "learning_rate": 3.158967915172669e-05, "epoch": 0.47365892714171337, "percentage": 47.37, "elapsed_time": "4:21:58", "remaining_time": "4:51:01"}
+{"current_steps": 1480, "total_steps": 3122, "loss": 2.2467, "learning_rate": 3.1562703764658055e-05, "epoch": 0.4739791833466773, "percentage": 47.41, "elapsed_time": "4:22:09", "remaining_time": "4:50:51"}
+{"current_steps": 1481, "total_steps": 3122, "loss": 1.7394, "learning_rate": 3.1535720168801725e-05, "epoch": 0.47429943955164133, "percentage": 47.44, "elapsed_time": "4:22:19", "remaining_time": "4:50:40"}
+{"current_steps": 1482, "total_steps": 3122, "loss": 1.9964, "learning_rate": 3.150872839790946e-05, "epoch": 0.4746196957566053, "percentage": 47.47, "elapsed_time": "4:22:30", "remaining_time": "4:50:29"}
+{"current_steps": 1483, "total_steps": 3122, "loss": 2.3196, "learning_rate": 3.148172848574319e-05, "epoch": 0.47493995196156924, "percentage": 47.5, "elapsed_time": "4:22:40", "remaining_time": "4:50:18"}
+{"current_steps": 1484, "total_steps": 3122, "loss": 2.052, "learning_rate": 3.145472046607508e-05, "epoch": 0.47526020816653325, "percentage": 47.53, "elapsed_time": "4:22:50", "remaining_time": "4:50:07"}
+{"current_steps": 1485, "total_steps": 3122, "loss": 1.8644, "learning_rate": 3.142770437268739e-05, "epoch": 0.4755804643714972, "percentage": 47.57, "elapsed_time": "4:23:01", "remaining_time": "4:49:56"}
+{"current_steps": 1486, "total_steps": 3122, "loss": 2.1707, "learning_rate": 3.140068023937251e-05, "epoch": 0.47590072057646116, "percentage": 47.6, "elapsed_time": "4:23:11", "remaining_time": "4:49:45"}
+{"current_steps": 1487, "total_steps": 3122, "loss": 1.9486, "learning_rate": 3.137364809993288e-05, "epoch": 0.47622097678142516, "percentage": 47.63, "elapsed_time": "4:23:21", "remaining_time": "4:49:34"}
+{"current_steps": 1488, "total_steps": 3122, "loss": 1.5815, "learning_rate": 3.1346607988180933e-05, "epoch": 0.4765412329863891, "percentage": 47.66, "elapsed_time": "4:23:32", "remaining_time": "4:49:23"}
+{"current_steps": 1489, "total_steps": 3122, "loss": 2.0043, "learning_rate": 3.131955993793911e-05, "epoch": 0.47686148919135307, "percentage": 47.69, "elapsed_time": "4:23:42", "remaining_time": "4:49:12"}
+{"current_steps": 1490, "total_steps": 3122, "loss": 2.2674, "learning_rate": 3.129250398303975e-05, "epoch": 0.4771817453963171, "percentage": 47.73, "elapsed_time": "4:23:52", "remaining_time": "4:49:01"}
+{"current_steps": 1491, "total_steps": 3122, "loss": 2.037, "learning_rate": 3.12654401573251e-05, "epoch": 0.47750200160128103, "percentage": 47.76, "elapsed_time": "4:24:03", "remaining_time": "4:48:50"}
+{"current_steps": 1492, "total_steps": 3122, "loss": 1.7428, "learning_rate": 3.123836849464723e-05, "epoch": 0.477822257806245, "percentage": 47.79, "elapsed_time": "4:24:13", "remaining_time": "4:48:40"}
+{"current_steps": 1493, "total_steps": 3122, "loss": 2.6863, "learning_rate": 3.121128902886804e-05, "epoch": 0.47814251401120894, "percentage": 47.82, "elapsed_time": "4:24:24", "remaining_time": "4:48:29"}
+{"current_steps": 1494, "total_steps": 3122, "loss": 2.0104, "learning_rate": 3.118420179385919e-05, "epoch": 0.47846277021617295, "percentage": 47.85, "elapsed_time": "4:24:34", "remaining_time": "4:48:18"}
+{"current_steps": 1495, "total_steps": 3122, "loss": 2.1841, "learning_rate": 3.115710682350201e-05, "epoch": 0.4787830264211369, "percentage": 47.89, "elapsed_time": "4:24:44", "remaining_time": "4:48:07"}
+{"current_steps": 1496, "total_steps": 3122, "loss": 2.503, "learning_rate": 3.113000415168756e-05, "epoch": 0.47910328262610086, "percentage": 47.92, "elapsed_time": "4:24:55", "remaining_time": "4:47:56"}
+{"current_steps": 1497, "total_steps": 3122, "loss": 1.9073, "learning_rate": 3.110289381231651e-05, "epoch": 0.47942353883106487, "percentage": 47.95, "elapsed_time": "4:25:05", "remaining_time": "4:47:45"}
+{"current_steps": 1498, "total_steps": 3122, "loss": 1.9962, "learning_rate": 3.107577583929914e-05, "epoch": 0.4797437950360288, "percentage": 47.98, "elapsed_time": "4:25:15", "remaining_time": "4:47:34"}
+{"current_steps": 1499, "total_steps": 3122, "loss": 2.0423, "learning_rate": 3.104865026655525e-05, "epoch": 0.4800640512409928, "percentage": 48.01, "elapsed_time": "4:25:26", "remaining_time": "4:47:23"}
+{"current_steps": 1500, "total_steps": 3122, "loss": 2.1058, "learning_rate": 3.102151712801415e-05, "epoch": 0.4803843074459568, "percentage": 48.05, "elapsed_time": "4:25:36", "remaining_time": "4:47:12"}
+{"current_steps": 1501, "total_steps": 3122, "loss": 2.2794, "learning_rate": 3.0994376457614636e-05, "epoch": 0.48070456365092074, "percentage": 48.08, "elapsed_time": "4:26:12", "remaining_time": "4:47:29"}
+{"current_steps": 1502, "total_steps": 3122, "loss": 2.1654, "learning_rate": 3.09672282893049e-05, "epoch": 0.4810248198558847, "percentage": 48.11, "elapsed_time": "4:26:23", "remaining_time": "4:47:18"}
+{"current_steps": 1503, "total_steps": 3122, "loss": 1.8414, "learning_rate": 3.094007265704253e-05, "epoch": 0.4813450760608487, "percentage": 48.14, "elapsed_time": "4:26:33", "remaining_time": "4:47:07"}
+{"current_steps": 1504, "total_steps": 3122, "loss": 1.9365, "learning_rate": 3.091290959479444e-05, "epoch": 0.48166533226581265, "percentage": 48.17, "elapsed_time": "4:26:43", "remaining_time": "4:46:57"}
+{"current_steps": 1505, "total_steps": 3122, "loss": 2.2331, "learning_rate": 3.0885739136536854e-05, "epoch": 0.4819855884707766, "percentage": 48.21, "elapsed_time": "4:26:54", "remaining_time": "4:46:46"}
+{"current_steps": 1506, "total_steps": 3122, "loss": 1.8893, "learning_rate": 3.0858561316255224e-05, "epoch": 0.4823058446757406, "percentage": 48.24, "elapsed_time": "4:27:04", "remaining_time": "4:46:35"}
+{"current_steps": 1507, "total_steps": 3122, "loss": 1.8019, "learning_rate": 3.083137616794422e-05, "epoch": 0.48262610088070457, "percentage": 48.27, "elapsed_time": "4:27:15", "remaining_time": "4:46:24"}
+{"current_steps": 1508, "total_steps": 3122, "loss": 1.971, "learning_rate": 3.080418372560768e-05, "epoch": 0.4829463570856685, "percentage": 48.3, "elapsed_time": "4:27:25", "remaining_time": "4:46:13"}
+{"current_steps": 1509, "total_steps": 3122, "loss": 2.0729, "learning_rate": 3.077698402325857e-05, "epoch": 0.48326661329063253, "percentage": 48.33, "elapsed_time": "4:27:36", "remaining_time": "4:46:02"}
+{"current_steps": 1510, "total_steps": 3122, "loss": 2.444, "learning_rate": 3.0749777094918924e-05, "epoch": 0.4835868694955965, "percentage": 48.37, "elapsed_time": "4:27:46", "remaining_time": "4:45:51"}
+{"current_steps": 1511, "total_steps": 3122, "loss": 2.6036, "learning_rate": 3.072256297461983e-05, "epoch": 0.48390712570056044, "percentage": 48.4, "elapsed_time": "4:27:56", "remaining_time": "4:45:40"}
+{"current_steps": 1512, "total_steps": 3122, "loss": 2.5759, "learning_rate": 3.069534169640136e-05, "epoch": 0.48422738190552445, "percentage": 48.43, "elapsed_time": "4:28:07", "remaining_time": "4:45:30"}
+{"current_steps": 1513, "total_steps": 3122, "loss": 2.5265, "learning_rate": 3.066811329431254e-05, "epoch": 0.4845476381104884, "percentage": 48.46, "elapsed_time": "4:28:17", "remaining_time": "4:45:19"}
+{"current_steps": 1514, "total_steps": 3122, "loss": 2.5761, "learning_rate": 3.0640877802411316e-05, "epoch": 0.48486789431545235, "percentage": 48.49, "elapsed_time": "4:28:28", "remaining_time": "4:45:08"}
+{"current_steps": 1515, "total_steps": 3122, "loss": 1.9635, "learning_rate": 3.0613635254764495e-05, "epoch": 0.4851881505204163, "percentage": 48.53, "elapsed_time": "4:28:38", "remaining_time": "4:44:57"}
+{"current_steps": 1516, "total_steps": 3122, "loss": 1.9067, "learning_rate": 3.058638568544772e-05, "epoch": 0.4855084067253803, "percentage": 48.56, "elapsed_time": "4:28:48", "remaining_time": "4:44:46"}
+{"current_steps": 1517, "total_steps": 3122, "loss": 2.7006, "learning_rate": 3.055912912854538e-05, "epoch": 0.48582866293034427, "percentage": 48.59, "elapsed_time": "4:28:59", "remaining_time": "4:44:35"}
+{"current_steps": 1518, "total_steps": 3122, "loss": 2.7706, "learning_rate": 3.0531865618150654e-05, "epoch": 0.4861489191353082, "percentage": 48.62, "elapsed_time": "4:29:09", "remaining_time": "4:44:24"}
+{"current_steps": 1519, "total_steps": 3122, "loss": 2.2856, "learning_rate": 3.050459518836539e-05, "epoch": 0.48646917534027223, "percentage": 48.65, "elapsed_time": "4:29:20", "remaining_time": "4:44:13"}
+{"current_steps": 1520, "total_steps": 3122, "loss": 2.2043, "learning_rate": 3.0477317873300103e-05, "epoch": 0.4867894315452362, "percentage": 48.69, "elapsed_time": "4:29:30", "remaining_time": "4:44:02"}
+{"current_steps": 1521, "total_steps": 3122, "loss": 1.7819, "learning_rate": 3.045003370707391e-05, "epoch": 0.48710968775020014, "percentage": 48.72, "elapsed_time": "4:29:40", "remaining_time": "4:43:51"}
+{"current_steps": 1522, "total_steps": 3122, "loss": 2.2534, "learning_rate": 3.0422742723814503e-05, "epoch": 0.48742994395516415, "percentage": 48.75, "elapsed_time": "4:29:51", "remaining_time": "4:43:40"}
+{"current_steps": 1523, "total_steps": 3122, "loss": 1.9324, "learning_rate": 3.0395444957658097e-05, "epoch": 0.4877502001601281, "percentage": 48.78, "elapsed_time": "4:30:01", "remaining_time": "4:43:29"}
+{"current_steps": 1524, "total_steps": 3122, "loss": 2.167, "learning_rate": 3.0368140442749398e-05, "epoch": 0.48807045636509205, "percentage": 48.81, "elapsed_time": "4:30:11", "remaining_time": "4:43:18"}
+{"current_steps": 1525, "total_steps": 3122, "loss": 2.6054, "learning_rate": 3.034082921324155e-05, "epoch": 0.48839071257005606, "percentage": 48.85, "elapsed_time": "4:30:22", "remaining_time": "4:43:08"}
+{"current_steps": 1526, "total_steps": 3122, "loss": 2.4174, "learning_rate": 3.03135113032961e-05, "epoch": 0.48871096877502, "percentage": 48.88, "elapsed_time": "4:30:32", "remaining_time": "4:42:57"}
+{"current_steps": 1527, "total_steps": 3122, "loss": 2.3323, "learning_rate": 3.0286186747082934e-05, "epoch": 0.48903122497998397, "percentage": 48.91, "elapsed_time": "4:30:42", "remaining_time": "4:42:46"}
+{"current_steps": 1528, "total_steps": 3122, "loss": 2.1546, "learning_rate": 3.0258855578780265e-05, "epoch": 0.489351481184948, "percentage": 48.94, "elapsed_time": "4:30:53", "remaining_time": "4:42:35"}
+{"current_steps": 1529, "total_steps": 3122, "loss": 2.4691, "learning_rate": 3.023151783257459e-05, "epoch": 0.48967173738991193, "percentage": 48.98, "elapsed_time": "4:31:03", "remaining_time": "4:42:24"}
+{"current_steps": 1530, "total_steps": 3122, "loss": 2.0822, "learning_rate": 3.0204173542660613e-05, "epoch": 0.4899919935948759, "percentage": 49.01, "elapsed_time": "4:31:13", "remaining_time": "4:42:13"}
+{"current_steps": 1531, "total_steps": 3122, "loss": 2.6899, "learning_rate": 3.0176822743241222e-05, "epoch": 0.4903122497998399, "percentage": 49.04, "elapsed_time": "4:31:24", "remaining_time": "4:42:02"}
+{"current_steps": 1532, "total_steps": 3122, "loss": 2.5449, "learning_rate": 3.014946546852746e-05, "epoch": 0.49063250600480385, "percentage": 49.07, "elapsed_time": "4:31:34", "remaining_time": "4:41:51"}
+{"current_steps": 1533, "total_steps": 3122, "loss": 2.0894, "learning_rate": 3.0122101752738468e-05, "epoch": 0.4909527622097678, "percentage": 49.1, "elapsed_time": "4:31:44", "remaining_time": "4:41:40"}
+{"current_steps": 1534, "total_steps": 3122, "loss": 2.2903, "learning_rate": 3.0094731630101436e-05, "epoch": 0.4912730184147318, "percentage": 49.14, "elapsed_time": "4:31:55", "remaining_time": "4:41:29"}
+{"current_steps": 1535, "total_steps": 3122, "loss": 2.2904, "learning_rate": 3.0067355134851565e-05, "epoch": 0.49159327461969576, "percentage": 49.17, "elapsed_time": "4:32:05", "remaining_time": "4:41:18"}
+{"current_steps": 1536, "total_steps": 3122, "loss": 2.2971, "learning_rate": 3.0039972301232045e-05, "epoch": 0.4919135308246597, "percentage": 49.2, "elapsed_time": "4:32:15", "remaining_time": "4:41:07"}
+{"current_steps": 1537, "total_steps": 3122, "loss": 1.7656, "learning_rate": 3.001258316349398e-05, "epoch": 0.4922337870296237, "percentage": 49.23, "elapsed_time": "4:32:26", "remaining_time": "4:40:56"}
+{"current_steps": 1538, "total_steps": 3122, "loss": 2.0205, "learning_rate": 2.998518775589635e-05, "epoch": 0.4925540432345877, "percentage": 49.26, "elapsed_time": "4:32:36", "remaining_time": "4:40:45"}
+{"current_steps": 1539, "total_steps": 3122, "loss": 2.3737, "learning_rate": 2.9957786112706006e-05, "epoch": 0.49287429943955163, "percentage": 49.3, "elapsed_time": "4:32:47", "remaining_time": "4:40:34"}
+{"current_steps": 1540, "total_steps": 3122, "loss": 2.1592, "learning_rate": 2.9930378268197577e-05, "epoch": 0.4931945556445156, "percentage": 49.33, "elapsed_time": "4:32:57", "remaining_time": "4:40:24"}
+{"current_steps": 1541, "total_steps": 3122, "loss": 2.3567, "learning_rate": 2.990296425665345e-05, "epoch": 0.4935148118494796, "percentage": 49.36, "elapsed_time": "4:33:07", "remaining_time": "4:40:13"}
+{"current_steps": 1542, "total_steps": 3122, "loss": 2.3767, "learning_rate": 2.987554411236373e-05, "epoch": 0.49383506805444355, "percentage": 49.39, "elapsed_time": "4:33:18", "remaining_time": "4:40:02"}
+{"current_steps": 1543, "total_steps": 3122, "loss": 2.5746, "learning_rate": 2.9848117869626192e-05, "epoch": 0.4941553242594075, "percentage": 49.42, "elapsed_time": "4:33:28", "remaining_time": "4:39:51"}
+{"current_steps": 1544, "total_steps": 3122, "loss": 1.4638, "learning_rate": 2.9820685562746254e-05, "epoch": 0.4944755804643715, "percentage": 49.46, "elapsed_time": "4:33:38", "remaining_time": "4:39:40"}
+{"current_steps": 1545, "total_steps": 3122, "loss": 1.9633, "learning_rate": 2.9793247226036885e-05, "epoch": 0.49479583666933546, "percentage": 49.49, "elapsed_time": "4:33:49", "remaining_time": "4:39:29"}
+{"current_steps": 1546, "total_steps": 3122, "loss": 1.7408, "learning_rate": 2.9765802893818627e-05, "epoch": 0.4951160928742994, "percentage": 49.52, "elapsed_time": "4:33:59", "remaining_time": "4:39:18"}
+{"current_steps": 1547, "total_steps": 3122, "loss": 2.0108, "learning_rate": 2.9738352600419506e-05, "epoch": 0.4954363490792634, "percentage": 49.55, "elapsed_time": "4:34:09", "remaining_time": "4:39:07"}
+{"current_steps": 1548, "total_steps": 3122, "loss": 2.3077, "learning_rate": 2.9710896380175024e-05, "epoch": 0.4957566052842274, "percentage": 49.58, "elapsed_time": "4:34:20", "remaining_time": "4:38:56"}
+{"current_steps": 1549, "total_steps": 3122, "loss": 2.0489, "learning_rate": 2.9683434267428055e-05, "epoch": 0.49607686148919133, "percentage": 49.62, "elapsed_time": "4:34:30", "remaining_time": "4:38:45"}
+{"current_steps": 1550, "total_steps": 3122, "loss": 2.8007, "learning_rate": 2.9655966296528893e-05, "epoch": 0.49639711769415534, "percentage": 49.65, "elapsed_time": "4:34:40", "remaining_time": "4:38:34"}
+{"current_steps": 1551, "total_steps": 3122, "loss": 2.0005, "learning_rate": 2.962849250183513e-05, "epoch": 0.4967173738991193, "percentage": 49.68, "elapsed_time": "4:34:51", "remaining_time": "4:38:23"}
+{"current_steps": 1552, "total_steps": 3122, "loss": 1.5309, "learning_rate": 2.9601012917711646e-05, "epoch": 0.49703763010408325, "percentage": 49.71, "elapsed_time": "4:35:01", "remaining_time": "4:38:12"}
+{"current_steps": 1553, "total_steps": 3122, "loss": 2.4253, "learning_rate": 2.957352757853056e-05, "epoch": 0.49735788630904726, "percentage": 49.74, "elapsed_time": "4:35:11", "remaining_time": "4:38:02"}
+{"current_steps": 1554, "total_steps": 3122, "loss": 1.8466, "learning_rate": 2.9546036518671206e-05, "epoch": 0.4976781425140112, "percentage": 49.78, "elapsed_time": "4:35:22", "remaining_time": "4:37:51"}
+{"current_steps": 1555, "total_steps": 3122, "loss": 2.2555, "learning_rate": 2.9518539772520064e-05, "epoch": 0.49799839871897517, "percentage": 49.81, "elapsed_time": "4:35:32", "remaining_time": "4:37:40"}
+{"current_steps": 1556, "total_steps": 3122, "loss": 2.0387, "learning_rate": 2.9491037374470715e-05, "epoch": 0.4983186549239392, "percentage": 49.84, "elapsed_time": "4:35:43", "remaining_time": "4:37:29"}
+{"current_steps": 1557, "total_steps": 3122, "loss": 2.4217, "learning_rate": 2.9463529358923824e-05, "epoch": 0.49863891112890313, "percentage": 49.87, "elapsed_time": "4:35:53", "remaining_time": "4:37:18"}
+{"current_steps": 1558, "total_steps": 3122, "loss": 2.1835, "learning_rate": 2.9436015760287082e-05, "epoch": 0.4989591673338671, "percentage": 49.9, "elapsed_time": "4:36:03", "remaining_time": "4:37:07"}
+{"current_steps": 1559, "total_steps": 3122, "loss": 2.1866, "learning_rate": 2.9408496612975156e-05, "epoch": 0.4992794235388311, "percentage": 49.94, "elapsed_time": "4:36:14", "remaining_time": "4:36:56"}
+{"current_steps": 1560, "total_steps": 3122, "loss": 2.0304, "learning_rate": 2.9380971951409652e-05, "epoch": 0.49959967974379504, "percentage": 49.97, "elapsed_time": "4:36:24", "remaining_time": "4:36:45"}
+{"current_steps": 1561, "total_steps": 3122, "loss": 1.4819, "learning_rate": 2.9353441810019093e-05, "epoch": 0.499919935948759, "percentage": 50.0, "elapsed_time": "4:36:34", "remaining_time": "4:36:34"}
+{"current_steps": 1562, "total_steps": 3122, "loss": 1.8902, "learning_rate": 2.9325906223238836e-05, "epoch": 0.500240192153723, "percentage": 50.03, "elapsed_time": "4:36:45", "remaining_time": "4:36:23"}
+{"current_steps": 1563, "total_steps": 3122, "loss": 2.3322, "learning_rate": 2.929836522551104e-05, "epoch": 0.500560448358687, "percentage": 50.06, "elapsed_time": "4:36:55", "remaining_time": "4:36:12"}
+{"current_steps": 1564, "total_steps": 3122, "loss": 1.9023, "learning_rate": 2.927081885128467e-05, "epoch": 0.500880704563651, "percentage": 50.1, "elapsed_time": "4:37:05", "remaining_time": "4:36:02"}
+{"current_steps": 1565, "total_steps": 3122, "loss": 2.1684, "learning_rate": 2.9243267135015383e-05, "epoch": 0.5012009607686149, "percentage": 50.13, "elapsed_time": "4:37:16", "remaining_time": "4:35:51"}
+{"current_steps": 1566, "total_steps": 3122, "loss": 2.0673, "learning_rate": 2.921571011116552e-05, "epoch": 0.5015212169735789, "percentage": 50.16, "elapsed_time": "4:37:26", "remaining_time": "4:35:40"}
+{"current_steps": 1567, "total_steps": 3122, "loss": 2.5705, "learning_rate": 2.9188147814204086e-05, "epoch": 0.5018414731785429, "percentage": 50.19, "elapsed_time": "4:37:36", "remaining_time": "4:35:29"}
+{"current_steps": 1568, "total_steps": 3122, "loss": 2.6609, "learning_rate": 2.916058027860665e-05, "epoch": 0.5021617293835068, "percentage": 50.22, "elapsed_time": "4:37:47", "remaining_time": "4:35:18"}
+{"current_steps": 1569, "total_steps": 3122, "loss": 2.2706, "learning_rate": 2.913300753885536e-05, "epoch": 0.5024819855884708, "percentage": 50.26, "elapsed_time": "4:37:57", "remaining_time": "4:35:07"}
+{"current_steps": 1570, "total_steps": 3122, "loss": 2.5645, "learning_rate": 2.910542962943885e-05, "epoch": 0.5028022417934348, "percentage": 50.29, "elapsed_time": "4:38:07", "remaining_time": "4:34:56"}
+{"current_steps": 1571, "total_steps": 3122, "loss": 2.7824, "learning_rate": 2.907784658485225e-05, "epoch": 0.5031224979983987, "percentage": 50.32, "elapsed_time": "4:38:18", "remaining_time": "4:34:45"}
+{"current_steps": 1572, "total_steps": 3122, "loss": 1.5037, "learning_rate": 2.905025843959708e-05, "epoch": 0.5034427542033627, "percentage": 50.35, "elapsed_time": "4:38:28", "remaining_time": "4:34:34"}
+{"current_steps": 1573, "total_steps": 3122, "loss": 2.2413, "learning_rate": 2.902266522818125e-05, "epoch": 0.5037630104083266, "percentage": 50.38, "elapsed_time": "4:38:39", "remaining_time": "4:34:23"}
+{"current_steps": 1574, "total_steps": 3122, "loss": 2.5246, "learning_rate": 2.899506698511903e-05, "epoch": 0.5040832666132906, "percentage": 50.42, "elapsed_time": "4:38:49", "remaining_time": "4:34:13"}
+{"current_steps": 1575, "total_steps": 3122, "loss": 1.7726, "learning_rate": 2.8967463744930958e-05, "epoch": 0.5044035228182546, "percentage": 50.45, "elapsed_time": "4:38:59", "remaining_time": "4:34:02"}
+{"current_steps": 1576, "total_steps": 3122, "loss": 1.8297, "learning_rate": 2.8939855542143828e-05, "epoch": 0.5047237790232185, "percentage": 50.48, "elapsed_time": "4:39:10", "remaining_time": "4:33:51"}
+{"current_steps": 1577, "total_steps": 3122, "loss": 1.8675, "learning_rate": 2.8912242411290646e-05, "epoch": 0.5050440352281825, "percentage": 50.51, "elapsed_time": "4:39:20", "remaining_time": "4:33:40"}
+{"current_steps": 1578, "total_steps": 3122, "loss": 2.3941, "learning_rate": 2.8884624386910586e-05, "epoch": 0.5053642914331465, "percentage": 50.54, "elapsed_time": "4:39:30", "remaining_time": "4:33:29"}
+{"current_steps": 1579, "total_steps": 3122, "loss": 2.5356, "learning_rate": 2.8857001503548925e-05, "epoch": 0.5056845476381104, "percentage": 50.58, "elapsed_time": "4:39:41", "remaining_time": "4:33:18"}
+{"current_steps": 1580, "total_steps": 3122, "loss": 2.5708, "learning_rate": 2.882937379575704e-05, "epoch": 0.5060048038430744, "percentage": 50.61, "elapsed_time": "4:39:51", "remaining_time": "4:33:07"}
+{"current_steps": 1581, "total_steps": 3122, "loss": 2.1658, "learning_rate": 2.8801741298092332e-05, "epoch": 0.5063250600480385, "percentage": 50.64, "elapsed_time": "4:40:01", "remaining_time": "4:32:56"}
+{"current_steps": 1582, "total_steps": 3122, "loss": 1.7119, "learning_rate": 2.8774104045118183e-05, "epoch": 0.5066453162530024, "percentage": 50.67, "elapsed_time": "4:40:12", "remaining_time": "4:32:45"}
+{"current_steps": 1583, "total_steps": 3122, "loss": 1.936, "learning_rate": 2.8746462071403952e-05, "epoch": 0.5069655724579664, "percentage": 50.7, "elapsed_time": "4:40:22", "remaining_time": "4:32:34"}
+{"current_steps": 1584, "total_steps": 3122, "loss": 2.1219, "learning_rate": 2.8718815411524863e-05, "epoch": 0.5072858286629304, "percentage": 50.74, "elapsed_time": "4:40:32", "remaining_time": "4:32:24"}
+{"current_steps": 1585, "total_steps": 3122, "loss": 2.5705, "learning_rate": 2.8691164100062034e-05, "epoch": 0.5076060848678943, "percentage": 50.77, "elapsed_time": "4:40:43", "remaining_time": "4:32:13"}
+{"current_steps": 1586, "total_steps": 3122, "loss": 2.2458, "learning_rate": 2.8663508171602386e-05, "epoch": 0.5079263410728583, "percentage": 50.8, "elapsed_time": "4:40:53", "remaining_time": "4:32:02"}
+{"current_steps": 1587, "total_steps": 3122, "loss": 1.8396, "learning_rate": 2.8635847660738635e-05, "epoch": 0.5082465972778223, "percentage": 50.83, "elapsed_time": "4:41:03", "remaining_time": "4:31:51"}
+{"current_steps": 1588, "total_steps": 3122, "loss": 2.5934, "learning_rate": 2.8608182602069195e-05, "epoch": 0.5085668534827862, "percentage": 50.86, "elapsed_time": "4:41:14", "remaining_time": "4:31:40"}
+{"current_steps": 1589, "total_steps": 3122, "loss": 2.4622, "learning_rate": 2.8580513030198186e-05, "epoch": 0.5088871096877502, "percentage": 50.9, "elapsed_time": "4:41:24", "remaining_time": "4:31:29"}
+{"current_steps": 1590, "total_steps": 3122, "loss": 2.2395, "learning_rate": 2.8552838979735393e-05, "epoch": 0.5092073658927142, "percentage": 50.93, "elapsed_time": "4:41:34", "remaining_time": "4:31:18"}
+{"current_steps": 1591, "total_steps": 3122, "loss": 2.172, "learning_rate": 2.8525160485296167e-05, "epoch": 0.5095276220976781, "percentage": 50.96, "elapsed_time": "4:41:45", "remaining_time": "4:31:07"}
+{"current_steps": 1592, "total_steps": 3122, "loss": 2.4499, "learning_rate": 2.849747758150143e-05, "epoch": 0.5098478783026421, "percentage": 50.99, "elapsed_time": "4:41:55", "remaining_time": "4:30:56"}
+{"current_steps": 1593, "total_steps": 3122, "loss": 2.2869, "learning_rate": 2.846979030297764e-05, "epoch": 0.5101681345076061, "percentage": 51.02, "elapsed_time": "4:42:06", "remaining_time": "4:30:45"}
+{"current_steps": 1594, "total_steps": 3122, "loss": 1.8278, "learning_rate": 2.8442098684356707e-05, "epoch": 0.51048839071257, "percentage": 51.06, "elapsed_time": "4:42:16", "remaining_time": "4:30:35"}
+{"current_steps": 1595, "total_steps": 3122, "loss": 2.2451, "learning_rate": 2.841440276027596e-05, "epoch": 0.510808646917534, "percentage": 51.09, "elapsed_time": "4:42:26", "remaining_time": "4:30:24"}
+{"current_steps": 1596, "total_steps": 3122, "loss": 2.3676, "learning_rate": 2.8386702565378137e-05, "epoch": 0.511128903122498, "percentage": 51.12, "elapsed_time": "4:42:37", "remaining_time": "4:30:13"}
+{"current_steps": 1597, "total_steps": 3122, "loss": 2.4343, "learning_rate": 2.8358998134311316e-05, "epoch": 0.5114491593274619, "percentage": 51.15, "elapsed_time": "4:42:47", "remaining_time": "4:30:02"}
+{"current_steps": 1598, "total_steps": 3122, "loss": 2.516, "learning_rate": 2.8331289501728854e-05, "epoch": 0.5117694155324259, "percentage": 51.19, "elapsed_time": "4:42:57", "remaining_time": "4:29:51"}
+{"current_steps": 1599, "total_steps": 3122, "loss": 2.5648, "learning_rate": 2.830357670228937e-05, "epoch": 0.51208967173739, "percentage": 51.22, "elapsed_time": "4:43:08", "remaining_time": "4:29:40"}
+{"current_steps": 1600, "total_steps": 3122, "loss": 2.4266, "learning_rate": 2.8275859770656714e-05, "epoch": 0.5124099279423538, "percentage": 51.25, "elapsed_time": "4:43:18", "remaining_time": "4:29:29"}
+{"current_steps": 1601, "total_steps": 3122, "loss": 2.4382, "learning_rate": 2.8248138741499885e-05, "epoch": 0.5127301841473179, "percentage": 51.28, "elapsed_time": "4:44:04", "remaining_time": "4:29:52"}
+{"current_steps": 1602, "total_steps": 3122, "loss": 2.4932, "learning_rate": 2.822041364949301e-05, "epoch": 0.5130504403522819, "percentage": 51.31, "elapsed_time": "4:44:14", "remaining_time": "4:29:41"}
+{"current_steps": 1603, "total_steps": 3122, "loss": 2.121, "learning_rate": 2.8192684529315305e-05, "epoch": 0.5133706965572458, "percentage": 51.35, "elapsed_time": "4:44:24", "remaining_time": "4:29:30"}
+{"current_steps": 1604, "total_steps": 3122, "loss": 2.0563, "learning_rate": 2.816495141565102e-05, "epoch": 0.5136909527622098, "percentage": 51.38, "elapsed_time": "4:44:35", "remaining_time": "4:29:19"}
+{"current_steps": 1605, "total_steps": 3122, "loss": 2.4438, "learning_rate": 2.8137214343189395e-05, "epoch": 0.5140112089671738, "percentage": 51.41, "elapsed_time": "4:44:45", "remaining_time": "4:29:08"}
+{"current_steps": 1606, "total_steps": 3122, "loss": 2.3331, "learning_rate": 2.8109473346624627e-05, "epoch": 0.5143314651721377, "percentage": 51.44, "elapsed_time": "4:44:55", "remaining_time": "4:28:57"}
+{"current_steps": 1607, "total_steps": 3122, "loss": 2.2871, "learning_rate": 2.808172846065583e-05, "epoch": 0.5146517213771017, "percentage": 51.47, "elapsed_time": "4:45:06", "remaining_time": "4:28:47"}
+{"current_steps": 1608, "total_steps": 3122, "loss": 2.4588, "learning_rate": 2.8053979719986972e-05, "epoch": 0.5149719775820657, "percentage": 51.51, "elapsed_time": "4:45:16", "remaining_time": "4:28:36"}
+{"current_steps": 1609, "total_steps": 3122, "loss": 2.5462, "learning_rate": 2.802622715932684e-05, "epoch": 0.5152922337870296, "percentage": 51.54, "elapsed_time": "4:45:27", "remaining_time": "4:28:25"}
+{"current_steps": 1610, "total_steps": 3122, "loss": 1.7209, "learning_rate": 2.799847081338901e-05, "epoch": 0.5156124899919936, "percentage": 51.57, "elapsed_time": "4:45:37", "remaining_time": "4:28:14"}
+{"current_steps": 1611, "total_steps": 3122, "loss": 2.7945, "learning_rate": 2.7970710716891783e-05, "epoch": 0.5159327461969576, "percentage": 51.6, "elapsed_time": "4:45:48", "remaining_time": "4:28:03"}
+{"current_steps": 1612, "total_steps": 3122, "loss": 2.2602, "learning_rate": 2.7942946904558155e-05, "epoch": 0.5162530024019215, "percentage": 51.63, "elapsed_time": "4:45:58", "remaining_time": "4:27:52"}
+{"current_steps": 1613, "total_steps": 3122, "loss": 2.0592, "learning_rate": 2.791517941111577e-05, "epoch": 0.5165732586068855, "percentage": 51.67, "elapsed_time": "4:46:08", "remaining_time": "4:27:41"}
+{"current_steps": 1614, "total_steps": 3122, "loss": 2.1679, "learning_rate": 2.7887408271296883e-05, "epoch": 0.5168935148118495, "percentage": 51.7, "elapsed_time": "4:46:19", "remaining_time": "4:27:31"}
+{"current_steps": 1615, "total_steps": 3122, "loss": 2.5147, "learning_rate": 2.7859633519838296e-05, "epoch": 0.5172137710168134, "percentage": 51.73, "elapsed_time": "4:46:29", "remaining_time": "4:27:20"}
+{"current_steps": 1616, "total_steps": 3122, "loss": 2.471, "learning_rate": 2.7831855191481336e-05, "epoch": 0.5175340272217774, "percentage": 51.76, "elapsed_time": "4:46:40", "remaining_time": "4:27:09"}
+{"current_steps": 1617, "total_steps": 3122, "loss": 2.2137, "learning_rate": 2.7804073320971812e-05, "epoch": 0.5178542834267414, "percentage": 51.79, "elapsed_time": "4:46:50", "remaining_time": "4:26:58"}
+{"current_steps": 1618, "total_steps": 3122, "loss": 2.0848, "learning_rate": 2.777628794305995e-05, "epoch": 0.5181745396317053, "percentage": 51.83, "elapsed_time": "4:47:00", "remaining_time": "4:26:47"}
+{"current_steps": 1619, "total_steps": 3122, "loss": 2.0605, "learning_rate": 2.774849909250037e-05, "epoch": 0.5184947958366694, "percentage": 51.86, "elapsed_time": "4:47:11", "remaining_time": "4:26:36"}
+{"current_steps": 1620, "total_steps": 3122, "loss": 2.6878, "learning_rate": 2.7720706804052026e-05, "epoch": 0.5188150520416333, "percentage": 51.89, "elapsed_time": "4:47:21", "remaining_time": "4:26:25"}
+{"current_steps": 1621, "total_steps": 3122, "loss": 2.4631, "learning_rate": 2.7692911112478193e-05, "epoch": 0.5191353082465973, "percentage": 51.92, "elapsed_time": "4:47:31", "remaining_time": "4:26:14"}
+{"current_steps": 1622, "total_steps": 3122, "loss": 2.5574, "learning_rate": 2.7665112052546387e-05, "epoch": 0.5194555644515613, "percentage": 51.95, "elapsed_time": "4:47:42", "remaining_time": "4:26:03"}
+{"current_steps": 1623, "total_steps": 3122, "loss": 2.0565, "learning_rate": 2.763730965902834e-05, "epoch": 0.5197758206565252, "percentage": 51.99, "elapsed_time": "4:47:52", "remaining_time": "4:25:52"}
+{"current_steps": 1624, "total_steps": 3122, "loss": 1.9217, "learning_rate": 2.7609503966699945e-05, "epoch": 0.5200960768614892, "percentage": 52.02, "elapsed_time": "4:48:02", "remaining_time": "4:25:41"}
+{"current_steps": 1625, "total_steps": 3122, "loss": 2.049, "learning_rate": 2.7581695010341246e-05, "epoch": 0.5204163330664532, "percentage": 52.05, "elapsed_time": "4:48:13", "remaining_time": "4:25:31"}
+{"current_steps": 1626, "total_steps": 3122, "loss": 2.1618, "learning_rate": 2.7553882824736348e-05, "epoch": 0.5207365892714171, "percentage": 52.08, "elapsed_time": "4:48:23", "remaining_time": "4:25:20"}
+{"current_steps": 1627, "total_steps": 3122, "loss": 1.9671, "learning_rate": 2.7526067444673402e-05, "epoch": 0.5210568454763811, "percentage": 52.11, "elapsed_time": "4:48:33", "remaining_time": "4:25:09"}
+{"current_steps": 1628, "total_steps": 3122, "loss": 2.1159, "learning_rate": 2.749824890494455e-05, "epoch": 0.5213771016813451, "percentage": 52.15, "elapsed_time": "4:48:44", "remaining_time": "4:24:58"}
+{"current_steps": 1629, "total_steps": 3122, "loss": 1.5528, "learning_rate": 2.74704272403459e-05, "epoch": 0.521697357886309, "percentage": 52.18, "elapsed_time": "4:48:54", "remaining_time": "4:24:47"}
+{"current_steps": 1630, "total_steps": 3122, "loss": 2.162, "learning_rate": 2.744260248567745e-05, "epoch": 0.522017614091273, "percentage": 52.21, "elapsed_time": "4:49:04", "remaining_time": "4:24:36"}
+{"current_steps": 1631, "total_steps": 3122, "loss": 1.8618, "learning_rate": 2.741477467574307e-05, "epoch": 0.522337870296237, "percentage": 52.24, "elapsed_time": "4:49:15", "remaining_time": "4:24:25"}
+{"current_steps": 1632, "total_steps": 3122, "loss": 1.8943, "learning_rate": 2.738694384535046e-05, "epoch": 0.5226581265012009, "percentage": 52.27, "elapsed_time": "4:49:25", "remaining_time": "4:24:14"}
+{"current_steps": 1633, "total_steps": 3122, "loss": 2.0352, "learning_rate": 2.73591100293111e-05, "epoch": 0.5229783827061649, "percentage": 52.31, "elapsed_time": "4:49:35", "remaining_time": "4:24:03"}
+{"current_steps": 1634, "total_steps": 3122, "loss": 2.1791, "learning_rate": 2.7331273262440175e-05, "epoch": 0.5232986389111289, "percentage": 52.34, "elapsed_time": "4:49:46", "remaining_time": "4:23:52"}
+{"current_steps": 1635, "total_steps": 3122, "loss": 2.4775, "learning_rate": 2.7303433579556602e-05, "epoch": 0.5236188951160928, "percentage": 52.37, "elapsed_time": "4:49:56", "remaining_time": "4:23:41"}
+{"current_steps": 1636, "total_steps": 3122, "loss": 2.1351, "learning_rate": 2.727559101548292e-05, "epoch": 0.5239391513210568, "percentage": 52.4, "elapsed_time": "4:50:07", "remaining_time": "4:23:31"}
+{"current_steps": 1637, "total_steps": 3122, "loss": 2.3471, "learning_rate": 2.7247745605045277e-05, "epoch": 0.5242594075260208, "percentage": 52.43, "elapsed_time": "4:50:17", "remaining_time": "4:23:20"}
+{"current_steps": 1638, "total_steps": 3122, "loss": 1.6935, "learning_rate": 2.7219897383073373e-05, "epoch": 0.5245796637309847, "percentage": 52.47, "elapsed_time": "4:50:27", "remaining_time": "4:23:09"}
+{"current_steps": 1639, "total_steps": 3122, "loss": 2.4096, "learning_rate": 2.7192046384400444e-05, "epoch": 0.5248999199359488, "percentage": 52.5, "elapsed_time": "4:50:38", "remaining_time": "4:22:58"}
+{"current_steps": 1640, "total_steps": 3122, "loss": 2.2081, "learning_rate": 2.7164192643863196e-05, "epoch": 0.5252201761409128, "percentage": 52.53, "elapsed_time": "4:50:48", "remaining_time": "4:22:47"}
+{"current_steps": 1641, "total_steps": 3122, "loss": 2.1331, "learning_rate": 2.7136336196301737e-05, "epoch": 0.5255404323458767, "percentage": 52.56, "elapsed_time": "4:50:58", "remaining_time": "4:22:36"}
+{"current_steps": 1642, "total_steps": 3122, "loss": 2.1021, "learning_rate": 2.7108477076559595e-05, "epoch": 0.5258606885508407, "percentage": 52.59, "elapsed_time": "4:51:09", "remaining_time": "4:22:25"}
+{"current_steps": 1643, "total_steps": 3122, "loss": 2.491, "learning_rate": 2.7080615319483634e-05, "epoch": 0.5261809447558047, "percentage": 52.63, "elapsed_time": "4:51:19", "remaining_time": "4:22:14"}
+{"current_steps": 1644, "total_steps": 3122, "loss": 2.7152, "learning_rate": 2.705275095992399e-05, "epoch": 0.5265012009607686, "percentage": 52.66, "elapsed_time": "4:51:29", "remaining_time": "4:22:03"}
+{"current_steps": 1645, "total_steps": 3122, "loss": 2.138, "learning_rate": 2.7024884032734082e-05, "epoch": 0.5268214571657326, "percentage": 52.69, "elapsed_time": "4:51:40", "remaining_time": "4:21:52"}
+{"current_steps": 1646, "total_steps": 3122, "loss": 2.4889, "learning_rate": 2.6997014572770534e-05, "epoch": 0.5271417133706966, "percentage": 52.72, "elapsed_time": "4:51:50", "remaining_time": "4:21:42"}
+{"current_steps": 1647, "total_steps": 3122, "loss": 2.4738, "learning_rate": 2.696914261489315e-05, "epoch": 0.5274619695756605, "percentage": 52.75, "elapsed_time": "4:52:00", "remaining_time": "4:21:31"}
+{"current_steps": 1648, "total_steps": 3122, "loss": 2.4388, "learning_rate": 2.694126819396482e-05, "epoch": 0.5277822257806245, "percentage": 52.79, "elapsed_time": "4:52:11", "remaining_time": "4:21:20"}
+{"current_steps": 1649, "total_steps": 3122, "loss": 2.0395, "learning_rate": 2.6913391344851556e-05, "epoch": 0.5281024819855885, "percentage": 52.82, "elapsed_time": "4:52:21", "remaining_time": "4:21:09"}
+{"current_steps": 1650, "total_steps": 3122, "loss": 2.4296, "learning_rate": 2.688551210242239e-05, "epoch": 0.5284227381905524, "percentage": 52.85, "elapsed_time": "4:52:31", "remaining_time": "4:20:58"}
+{"current_steps": 1651, "total_steps": 3122, "loss": 2.1873, "learning_rate": 2.6857630501549347e-05, "epoch": 0.5287429943955164, "percentage": 52.88, "elapsed_time": "4:52:42", "remaining_time": "4:20:47"}
+{"current_steps": 1652, "total_steps": 3122, "loss": 2.5596, "learning_rate": 2.68297465771074e-05, "epoch": 0.5290632506004804, "percentage": 52.91, "elapsed_time": "4:52:52", "remaining_time": "4:20:36"}
+{"current_steps": 1653, "total_steps": 3122, "loss": 1.793, "learning_rate": 2.6801860363974434e-05, "epoch": 0.5293835068054443, "percentage": 52.95, "elapsed_time": "4:53:02", "remaining_time": "4:20:25"}
+{"current_steps": 1654, "total_steps": 3122, "loss": 2.0554, "learning_rate": 2.6773971897031207e-05, "epoch": 0.5297037630104083, "percentage": 52.98, "elapsed_time": "4:53:13", "remaining_time": "4:20:14"}
+{"current_steps": 1655, "total_steps": 3122, "loss": 1.7286, "learning_rate": 2.6746081211161268e-05, "epoch": 0.5300240192153723, "percentage": 53.01, "elapsed_time": "4:53:23", "remaining_time": "4:20:03"}
+{"current_steps": 1656, "total_steps": 3122, "loss": 2.0696, "learning_rate": 2.6718188341250955e-05, "epoch": 0.5303442754203362, "percentage": 53.04, "elapsed_time": "4:53:34", "remaining_time": "4:19:53"}
+{"current_steps": 1657, "total_steps": 3122, "loss": 1.9679, "learning_rate": 2.6690293322189353e-05, "epoch": 0.5306645316253003, "percentage": 53.07, "elapsed_time": "4:53:44", "remaining_time": "4:19:42"}
+{"current_steps": 1658, "total_steps": 3122, "loss": 2.3103, "learning_rate": 2.6662396188868228e-05, "epoch": 0.5309847878302643, "percentage": 53.11, "elapsed_time": "4:53:54", "remaining_time": "4:19:31"}
+{"current_steps": 1659, "total_steps": 3122, "loss": 2.3372, "learning_rate": 2.6634496976181968e-05, "epoch": 0.5313050440352282, "percentage": 53.14, "elapsed_time": "4:54:05", "remaining_time": "4:19:20"}
+{"current_steps": 1660, "total_steps": 3122, "loss": 2.3772, "learning_rate": 2.6606595719027583e-05, "epoch": 0.5316253002401922, "percentage": 53.17, "elapsed_time": "4:54:15", "remaining_time": "4:19:09"}
+{"current_steps": 1661, "total_steps": 3122, "loss": 2.5822, "learning_rate": 2.657869245230464e-05, "epoch": 0.5319455564451562, "percentage": 53.2, "elapsed_time": "4:54:25", "remaining_time": "4:18:58"}
+{"current_steps": 1662, "total_steps": 3122, "loss": 1.8052, "learning_rate": 2.6550787210915223e-05, "epoch": 0.5322658126501201, "percentage": 53.24, "elapsed_time": "4:54:36", "remaining_time": "4:18:47"}
+{"current_steps": 1663, "total_steps": 3122, "loss": 2.583, "learning_rate": 2.6522880029763862e-05, "epoch": 0.5325860688550841, "percentage": 53.27, "elapsed_time": "4:54:46", "remaining_time": "4:18:36"}
+{"current_steps": 1664, "total_steps": 3122, "loss": 2.0871, "learning_rate": 2.6494970943757548e-05, "epoch": 0.5329063250600481, "percentage": 53.3, "elapsed_time": "4:54:56", "remaining_time": "4:18:26"}
+{"current_steps": 1665, "total_steps": 3122, "loss": 2.2921, "learning_rate": 2.6467059987805633e-05, "epoch": 0.533226581265012, "percentage": 53.33, "elapsed_time": "4:55:07", "remaining_time": "4:18:15"}
+{"current_steps": 1666, "total_steps": 3122, "loss": 1.3349, "learning_rate": 2.6439147196819795e-05, "epoch": 0.533546837469976, "percentage": 53.36, "elapsed_time": "4:55:17", "remaining_time": "4:18:04"}
+{"current_steps": 1667, "total_steps": 3122, "loss": 2.4875, "learning_rate": 2.6411232605714043e-05, "epoch": 0.5338670936749399, "percentage": 53.4, "elapsed_time": "4:55:27", "remaining_time": "4:17:53"}
+{"current_steps": 1668, "total_steps": 3122, "loss": 1.9192, "learning_rate": 2.6383316249404615e-05, "epoch": 0.5341873498799039, "percentage": 53.43, "elapsed_time": "4:55:38", "remaining_time": "4:17:42"}
+{"current_steps": 1669, "total_steps": 3122, "loss": 2.4075, "learning_rate": 2.6355398162809957e-05, "epoch": 0.5345076060848679, "percentage": 53.46, "elapsed_time": "4:55:48", "remaining_time": "4:17:31"}
+{"current_steps": 1670, "total_steps": 3122, "loss": 2.5198, "learning_rate": 2.632747838085068e-05, "epoch": 0.5348278622898318, "percentage": 53.49, "elapsed_time": "4:55:58", "remaining_time": "4:17:20"}
+{"current_steps": 1671, "total_steps": 3122, "loss": 2.4702, "learning_rate": 2.6299556938449528e-05, "epoch": 0.5351481184947958, "percentage": 53.52, "elapsed_time": "4:56:09", "remaining_time": "4:17:09"}
+{"current_steps": 1672, "total_steps": 3122, "loss": 2.4223, "learning_rate": 2.627163387053131e-05, "epoch": 0.5354683746997598, "percentage": 53.56, "elapsed_time": "4:56:19", "remaining_time": "4:16:58"}
+{"current_steps": 1673, "total_steps": 3122, "loss": 2.0182, "learning_rate": 2.624370921202286e-05, "epoch": 0.5357886309047237, "percentage": 53.59, "elapsed_time": "4:56:30", "remaining_time": "4:16:48"}
+{"current_steps": 1674, "total_steps": 3122, "loss": 2.2894, "learning_rate": 2.6215782997853026e-05, "epoch": 0.5361088871096877, "percentage": 53.62, "elapsed_time": "4:56:40", "remaining_time": "4:16:37"}
+{"current_steps": 1675, "total_steps": 3122, "loss": 2.3239, "learning_rate": 2.6187855262952587e-05, "epoch": 0.5364291433146517, "percentage": 53.65, "elapsed_time": "4:56:50", "remaining_time": "4:16:26"}
+{"current_steps": 1676, "total_steps": 3122, "loss": 2.5619, "learning_rate": 2.615992604225422e-05, "epoch": 0.5367493995196156, "percentage": 53.68, "elapsed_time": "4:57:01", "remaining_time": "4:16:15"}
+{"current_steps": 1677, "total_steps": 3122, "loss": 1.886, "learning_rate": 2.6131995370692463e-05, "epoch": 0.5370696557245797, "percentage": 53.72, "elapsed_time": "4:57:11", "remaining_time": "4:16:04"}
+{"current_steps": 1678, "total_steps": 3122, "loss": 2.2598, "learning_rate": 2.6104063283203672e-05, "epoch": 0.5373899119295437, "percentage": 53.75, "elapsed_time": "4:57:21", "remaining_time": "4:15:53"}
+{"current_steps": 1679, "total_steps": 3122, "loss": 1.7341, "learning_rate": 2.607612981472599e-05, "epoch": 0.5377101681345076, "percentage": 53.78, "elapsed_time": "4:57:32", "remaining_time": "4:15:42"}
+{"current_steps": 1680, "total_steps": 3122, "loss": 1.8696, "learning_rate": 2.6048195000199248e-05, "epoch": 0.5380304243394716, "percentage": 53.81, "elapsed_time": "4:57:42", "remaining_time": "4:15:31"}
+{"current_steps": 1681, "total_steps": 3122, "loss": 2.6784, "learning_rate": 2.6020258874565002e-05, "epoch": 0.5383506805444356, "percentage": 53.84, "elapsed_time": "4:57:52", "remaining_time": "4:15:21"}
+{"current_steps": 1682, "total_steps": 3122, "loss": 1.9824, "learning_rate": 2.5992321472766418e-05, "epoch": 0.5386709367493995, "percentage": 53.88, "elapsed_time": "4:58:03", "remaining_time": "4:15:10"}
+{"current_steps": 1683, "total_steps": 3122, "loss": 2.1182, "learning_rate": 2.596438282974828e-05, "epoch": 0.5389911929543635, "percentage": 53.91, "elapsed_time": "4:58:13", "remaining_time": "4:14:59"}
+{"current_steps": 1684, "total_steps": 3122, "loss": 1.9854, "learning_rate": 2.59364429804569e-05, "epoch": 0.5393114491593275, "percentage": 53.94, "elapsed_time": "4:58:23", "remaining_time": "4:14:48"}
+{"current_steps": 1685, "total_steps": 3122, "loss": 2.27, "learning_rate": 2.5908501959840125e-05, "epoch": 0.5396317053642914, "percentage": 53.97, "elapsed_time": "4:58:34", "remaining_time": "4:14:37"}
+{"current_steps": 1686, "total_steps": 3122, "loss": 2.0739, "learning_rate": 2.588055980284725e-05, "epoch": 0.5399519615692554, "percentage": 54.0, "elapsed_time": "4:58:44", "remaining_time": "4:14:26"}
+{"current_steps": 1687, "total_steps": 3122, "loss": 2.2536, "learning_rate": 2.5852616544429008e-05, "epoch": 0.5402722177742194, "percentage": 54.04, "elapsed_time": "4:58:54", "remaining_time": "4:14:15"}
+{"current_steps": 1688, "total_steps": 3122, "loss": 2.2221, "learning_rate": 2.5824672219537483e-05, "epoch": 0.5405924739791833, "percentage": 54.07, "elapsed_time": "4:59:05", "remaining_time": "4:14:05"}
+{"current_steps": 1689, "total_steps": 3122, "loss": 2.7278, "learning_rate": 2.5796726863126113e-05, "epoch": 0.5409127301841473, "percentage": 54.1, "elapsed_time": "4:59:15", "remaining_time": "4:13:54"}
+{"current_steps": 1690, "total_steps": 3122, "loss": 2.2353, "learning_rate": 2.5768780510149633e-05, "epoch": 0.5412329863891113, "percentage": 54.13, "elapsed_time": "4:59:26", "remaining_time": "4:13:43"}
+{"current_steps": 1691, "total_steps": 3122, "loss": 1.9356, "learning_rate": 2.5740833195563996e-05, "epoch": 0.5415532425940752, "percentage": 54.16, "elapsed_time": "4:59:36", "remaining_time": "4:13:32"}
+{"current_steps": 1692, "total_steps": 3122, "loss": 1.7192, "learning_rate": 2.571288495432639e-05, "epoch": 0.5418734987990392, "percentage": 54.2, "elapsed_time": "4:59:46", "remaining_time": "4:13:21"}
+{"current_steps": 1693, "total_steps": 3122, "loss": 2.4505, "learning_rate": 2.5684935821395135e-05, "epoch": 0.5421937550040032, "percentage": 54.23, "elapsed_time": "4:59:57", "remaining_time": "4:13:10"}
+{"current_steps": 1694, "total_steps": 3122, "loss": 1.8894, "learning_rate": 2.5656985831729692e-05, "epoch": 0.5425140112089671, "percentage": 54.26, "elapsed_time": "5:00:07", "remaining_time": "4:12:59"}
+{"current_steps": 1695, "total_steps": 3122, "loss": 1.8297, "learning_rate": 2.5629035020290566e-05, "epoch": 0.5428342674139311, "percentage": 54.29, "elapsed_time": "5:00:17", "remaining_time": "4:12:48"}
+{"current_steps": 1696, "total_steps": 3122, "loss": 2.2753, "learning_rate": 2.5601083422039314e-05, "epoch": 0.5431545236188952, "percentage": 54.32, "elapsed_time": "5:00:28", "remaining_time": "4:12:38"}
+{"current_steps": 1697, "total_steps": 3122, "loss": 2.8383, "learning_rate": 2.5573131071938456e-05, "epoch": 0.543474779823859, "percentage": 54.36, "elapsed_time": "5:00:38", "remaining_time": "4:12:27"}
+{"current_steps": 1698, "total_steps": 3122, "loss": 2.4237, "learning_rate": 2.554517800495148e-05, "epoch": 0.5437950360288231, "percentage": 54.39, "elapsed_time": "5:00:48", "remaining_time": "4:12:16"}
+{"current_steps": 1699, "total_steps": 3122, "loss": 2.0334, "learning_rate": 2.5517224256042745e-05, "epoch": 0.5441152922337871, "percentage": 54.42, "elapsed_time": "5:00:59", "remaining_time": "4:12:05"}
+{"current_steps": 1700, "total_steps": 3122, "loss": 2.4893, "learning_rate": 2.5489269860177474e-05, "epoch": 0.544435548438751, "percentage": 54.45, "elapsed_time": "5:01:09", "remaining_time": "4:11:54"}
+{"current_steps": 1701, "total_steps": 3122, "loss": 2.0231, "learning_rate": 2.5461314852321694e-05, "epoch": 0.544755804643715, "percentage": 54.48, "elapsed_time": "5:01:51", "remaining_time": "4:12:09"}
+{"current_steps": 1702, "total_steps": 3122, "loss": 2.486, "learning_rate": 2.5433359267442204e-05, "epoch": 0.545076060848679, "percentage": 54.52, "elapsed_time": "5:02:01", "remaining_time": "4:11:58"}
+{"current_steps": 1703, "total_steps": 3122, "loss": 2.3233, "learning_rate": 2.5405403140506517e-05, "epoch": 0.5453963170536429, "percentage": 54.55, "elapsed_time": "5:02:11", "remaining_time": "4:11:48"}
+{"current_steps": 1704, "total_steps": 3122, "loss": 2.0646, "learning_rate": 2.5377446506482837e-05, "epoch": 0.5457165732586069, "percentage": 54.58, "elapsed_time": "5:02:22", "remaining_time": "4:11:37"}
+{"current_steps": 1705, "total_steps": 3122, "loss": 2.1051, "learning_rate": 2.5349489400339997e-05, "epoch": 0.5460368294635709, "percentage": 54.61, "elapsed_time": "5:02:32", "remaining_time": "4:11:26"}
+{"current_steps": 1706, "total_steps": 3122, "loss": 2.5043, "learning_rate": 2.5321531857047404e-05, "epoch": 0.5463570856685348, "percentage": 54.64, "elapsed_time": "5:02:43", "remaining_time": "4:11:15"}
+{"current_steps": 1707, "total_steps": 3122, "loss": 1.8195, "learning_rate": 2.5293573911575036e-05, "epoch": 0.5466773418734988, "percentage": 54.68, "elapsed_time": "5:02:53", "remaining_time": "4:11:04"}
+{"current_steps": 1708, "total_steps": 3122, "loss": 2.6448, "learning_rate": 2.5265615598893356e-05, "epoch": 0.5469975980784628, "percentage": 54.71, "elapsed_time": "5:03:03", "remaining_time": "4:10:53"}
+{"current_steps": 1709, "total_steps": 3122, "loss": 2.3232, "learning_rate": 2.5237656953973303e-05, "epoch": 0.5473178542834267, "percentage": 54.74, "elapsed_time": "5:03:14", "remaining_time": "4:10:43"}
+{"current_steps": 1710, "total_steps": 3122, "loss": 1.9998, "learning_rate": 2.5209698011786214e-05, "epoch": 0.5476381104883907, "percentage": 54.77, "elapsed_time": "5:03:24", "remaining_time": "4:10:32"}
+{"current_steps": 1711, "total_steps": 3122, "loss": 2.0763, "learning_rate": 2.5181738807303806e-05, "epoch": 0.5479583666933547, "percentage": 54.8, "elapsed_time": "5:03:35", "remaining_time": "4:10:21"}
+{"current_steps": 1712, "total_steps": 3122, "loss": 2.3951, "learning_rate": 2.5153779375498137e-05, "epoch": 0.5482786228983186, "percentage": 54.84, "elapsed_time": "5:03:45", "remaining_time": "4:10:10"}
+{"current_steps": 1713, "total_steps": 3122, "loss": 1.9252, "learning_rate": 2.5125819751341522e-05, "epoch": 0.5485988791032826, "percentage": 54.87, "elapsed_time": "5:03:56", "remaining_time": "4:09:59"}
+{"current_steps": 1714, "total_steps": 3122, "loss": 2.0553, "learning_rate": 2.509785996980653e-05, "epoch": 0.5489191353082465, "percentage": 54.9, "elapsed_time": "5:04:06", "remaining_time": "4:09:48"}
+{"current_steps": 1715, "total_steps": 3122, "loss": 2.1069, "learning_rate": 2.506990006586594e-05, "epoch": 0.5492393915132106, "percentage": 54.93, "elapsed_time": "5:04:16", "remaining_time": "4:09:38"}
+{"current_steps": 1716, "total_steps": 3122, "loss": 2.3812, "learning_rate": 2.5041940074492676e-05, "epoch": 0.5495596477181746, "percentage": 54.96, "elapsed_time": "5:04:27", "remaining_time": "4:09:27"}
+{"current_steps": 1717, "total_steps": 3122, "loss": 2.1561, "learning_rate": 2.5013980030659743e-05, "epoch": 0.5498799039231385, "percentage": 55.0, "elapsed_time": "5:04:37", "remaining_time": "4:09:16"}
+{"current_steps": 1718, "total_steps": 3122, "loss": 1.9662, "learning_rate": 2.498601996934026e-05, "epoch": 0.5502001601281025, "percentage": 55.03, "elapsed_time": "5:04:47", "remaining_time": "4:09:05"}
+{"current_steps": 1719, "total_steps": 3122, "loss": 1.932, "learning_rate": 2.4958059925507333e-05, "epoch": 0.5505204163330665, "percentage": 55.06, "elapsed_time": "5:04:58", "remaining_time": "4:08:54"}
+{"current_steps": 1720, "total_steps": 3122, "loss": 2.3476, "learning_rate": 2.4930099934134065e-05, "epoch": 0.5508406725380304, "percentage": 55.09, "elapsed_time": "5:05:08", "remaining_time": "4:08:43"}
+{"current_steps": 1721, "total_steps": 3122, "loss": 2.2002, "learning_rate": 2.490214003019347e-05, "epoch": 0.5511609287429944, "percentage": 55.12, "elapsed_time": "5:05:19", "remaining_time": "4:08:32"}
+{"current_steps": 1722, "total_steps": 3122, "loss": 2.3532, "learning_rate": 2.4874180248658484e-05, "epoch": 0.5514811849479584, "percentage": 55.16, "elapsed_time": "5:05:29", "remaining_time": "4:08:21"}
+{"current_steps": 1723, "total_steps": 3122, "loss": 2.258, "learning_rate": 2.4846220624501872e-05, "epoch": 0.5518014411529223, "percentage": 55.19, "elapsed_time": "5:05:39", "remaining_time": "4:08:11"}
+{"current_steps": 1724, "total_steps": 3122, "loss": 2.4362, "learning_rate": 2.48182611926962e-05, "epoch": 0.5521216973578863, "percentage": 55.22, "elapsed_time": "5:05:50", "remaining_time": "4:08:00"}
+{"current_steps": 1725, "total_steps": 3122, "loss": 1.7804, "learning_rate": 2.479030198821379e-05, "epoch": 0.5524419535628503, "percentage": 55.25, "elapsed_time": "5:06:00", "remaining_time": "4:07:49"}
+{"current_steps": 1726, "total_steps": 3122, "loss": 2.7527, "learning_rate": 2.4762343046026702e-05, "epoch": 0.5527622097678142, "percentage": 55.29, "elapsed_time": "5:06:10", "remaining_time": "4:07:38"}
+{"current_steps": 1727, "total_steps": 3122, "loss": 2.4608, "learning_rate": 2.473438440110665e-05, "epoch": 0.5530824659727782, "percentage": 55.32, "elapsed_time": "5:06:21", "remaining_time": "4:07:27"}
+{"current_steps": 1728, "total_steps": 3122, "loss": 1.8141, "learning_rate": 2.4706426088424973e-05, "epoch": 0.5534027221777422, "percentage": 55.35, "elapsed_time": "5:06:31", "remaining_time": "4:07:16"}
+{"current_steps": 1729, "total_steps": 3122, "loss": 2.2575, "learning_rate": 2.46784681429526e-05, "epoch": 0.5537229783827061, "percentage": 55.38, "elapsed_time": "5:06:41", "remaining_time": "4:07:05"}
+{"current_steps": 1730, "total_steps": 3122, "loss": 2.6203, "learning_rate": 2.4650510599660005e-05, "epoch": 0.5540432345876701, "percentage": 55.41, "elapsed_time": "5:06:52", "remaining_time": "4:06:54"}
+{"current_steps": 1731, "total_steps": 3122, "loss": 2.1001, "learning_rate": 2.4622553493517165e-05, "epoch": 0.5543634907926341, "percentage": 55.45, "elapsed_time": "5:07:02", "remaining_time": "4:06:44"}
+{"current_steps": 1732, "total_steps": 3122, "loss": 2.3472, "learning_rate": 2.4594596859493485e-05, "epoch": 0.554683746997598, "percentage": 55.48, "elapsed_time": "5:07:12", "remaining_time": "4:06:33"}
+{"current_steps": 1733, "total_steps": 3122, "loss": 2.0663, "learning_rate": 2.4566640732557802e-05, "epoch": 0.555004003202562, "percentage": 55.51, "elapsed_time": "5:07:23", "remaining_time": "4:06:22"}
+{"current_steps": 1734, "total_steps": 3122, "loss": 2.3392, "learning_rate": 2.4538685147678316e-05, "epoch": 0.555324259407526, "percentage": 55.54, "elapsed_time": "5:07:33", "remaining_time": "4:06:11"}
+{"current_steps": 1735, "total_steps": 3122, "loss": 2.1949, "learning_rate": 2.4510730139822535e-05, "epoch": 0.55564451561249, "percentage": 55.57, "elapsed_time": "5:07:43", "remaining_time": "4:06:00"}
+{"current_steps": 1736, "total_steps": 3122, "loss": 2.517, "learning_rate": 2.4482775743957258e-05, "epoch": 0.555964771817454, "percentage": 55.61, "elapsed_time": "5:07:54", "remaining_time": "4:05:49"}
+{"current_steps": 1737, "total_steps": 3122, "loss": 2.4129, "learning_rate": 2.4454821995048522e-05, "epoch": 0.556285028022418, "percentage": 55.64, "elapsed_time": "5:08:04", "remaining_time": "4:05:38"}
+{"current_steps": 1738, "total_steps": 3122, "loss": 2.5147, "learning_rate": 2.442686892806155e-05, "epoch": 0.5566052842273819, "percentage": 55.67, "elapsed_time": "5:08:14", "remaining_time": "4:05:27"}
+{"current_steps": 1739, "total_steps": 3122, "loss": 2.8204, "learning_rate": 2.4398916577960695e-05, "epoch": 0.5569255404323459, "percentage": 55.7, "elapsed_time": "5:08:25", "remaining_time": "4:05:17"}
+{"current_steps": 1740, "total_steps": 3122, "loss": 2.6784, "learning_rate": 2.437096497970944e-05, "epoch": 0.5572457966373099, "percentage": 55.73, "elapsed_time": "5:08:35", "remaining_time": "4:05:06"}
+{"current_steps": 1741, "total_steps": 3122, "loss": 2.1789, "learning_rate": 2.4343014168270314e-05, "epoch": 0.5575660528422738, "percentage": 55.77, "elapsed_time": "5:08:46", "remaining_time": "4:04:55"}
+{"current_steps": 1742, "total_steps": 3122, "loss": 2.8155, "learning_rate": 2.431506417860487e-05, "epoch": 0.5578863090472378, "percentage": 55.8, "elapsed_time": "5:08:56", "remaining_time": "4:04:44"}
+{"current_steps": 1743, "total_steps": 3122, "loss": 2.0444, "learning_rate": 2.4287115045673617e-05, "epoch": 0.5582065652522018, "percentage": 55.83, "elapsed_time": "5:09:06", "remaining_time": "4:04:33"}
+{"current_steps": 1744, "total_steps": 3122, "loss": 2.646, "learning_rate": 2.4259166804436006e-05, "epoch": 0.5585268214571657, "percentage": 55.86, "elapsed_time": "5:09:17", "remaining_time": "4:04:22"}
+{"current_steps": 1745, "total_steps": 3122, "loss": 2.2975, "learning_rate": 2.4231219489850376e-05, "epoch": 0.5588470776621297, "percentage": 55.89, "elapsed_time": "5:09:27", "remaining_time": "4:04:11"}
+{"current_steps": 1746, "total_steps": 3122, "loss": 2.1118, "learning_rate": 2.4203273136873892e-05, "epoch": 0.5591673338670937, "percentage": 55.93, "elapsed_time": "5:09:37", "remaining_time": "4:04:00"}
+{"current_steps": 1747, "total_steps": 3122, "loss": 2.1737, "learning_rate": 2.4175327780462523e-05, "epoch": 0.5594875900720576, "percentage": 55.96, "elapsed_time": "5:09:48", "remaining_time": "4:03:50"}
+{"current_steps": 1748, "total_steps": 3122, "loss": 2.2012, "learning_rate": 2.4147383455571004e-05, "epoch": 0.5598078462770216, "percentage": 55.99, "elapsed_time": "5:09:58", "remaining_time": "4:03:39"}
+{"current_steps": 1749, "total_steps": 3122, "loss": 1.4749, "learning_rate": 2.4119440197152754e-05, "epoch": 0.5601281024819856, "percentage": 56.02, "elapsed_time": "5:10:08", "remaining_time": "4:03:28"}
+{"current_steps": 1750, "total_steps": 3122, "loss": 2.1635, "learning_rate": 2.409149804015988e-05, "epoch": 0.5604483586869495, "percentage": 56.05, "elapsed_time": "5:10:19", "remaining_time": "4:03:17"}
+{"current_steps": 1751, "total_steps": 3122, "loss": 1.4912, "learning_rate": 2.4063557019543107e-05, "epoch": 0.5607686148919135, "percentage": 56.09, "elapsed_time": "5:10:29", "remaining_time": "4:03:06"}
+{"current_steps": 1752, "total_steps": 3122, "loss": 2.4878, "learning_rate": 2.403561717025173e-05, "epoch": 0.5610888710968776, "percentage": 56.12, "elapsed_time": "5:10:39", "remaining_time": "4:02:55"}
+{"current_steps": 1753, "total_steps": 3122, "loss": 2.3552, "learning_rate": 2.400767852723359e-05, "epoch": 0.5614091273018414, "percentage": 56.15, "elapsed_time": "5:10:50", "remaining_time": "4:02:44"}
+{"current_steps": 1754, "total_steps": 3122, "loss": 1.6363, "learning_rate": 2.3979741125435004e-05, "epoch": 0.5617293835068055, "percentage": 56.18, "elapsed_time": "5:11:00", "remaining_time": "4:02:34"}
+{"current_steps": 1755, "total_steps": 3122, "loss": 2.0071, "learning_rate": 2.3951804999800754e-05, "epoch": 0.5620496397117695, "percentage": 56.21, "elapsed_time": "5:11:11", "remaining_time": "4:02:23"}
+{"current_steps": 1756, "total_steps": 3122, "loss": 2.3637, "learning_rate": 2.3923870185274018e-05, "epoch": 0.5623698959167334, "percentage": 56.25, "elapsed_time": "5:11:21", "remaining_time": "4:02:12"}
+{"current_steps": 1757, "total_steps": 3122, "loss": 2.4539, "learning_rate": 2.389593671679633e-05, "epoch": 0.5626901521216974, "percentage": 56.28, "elapsed_time": "5:11:31", "remaining_time": "4:02:01"}
+{"current_steps": 1758, "total_steps": 3122, "loss": 2.087, "learning_rate": 2.3868004629307543e-05, "epoch": 0.5630104083266614, "percentage": 56.31, "elapsed_time": "5:11:42", "remaining_time": "4:01:50"}
+{"current_steps": 1759, "total_steps": 3122, "loss": 2.3264, "learning_rate": 2.3840073957745793e-05, "epoch": 0.5633306645316253, "percentage": 56.34, "elapsed_time": "5:11:52", "remaining_time": "4:01:39"}
+{"current_steps": 1760, "total_steps": 3122, "loss": 2.3831, "learning_rate": 2.381214473704742e-05, "epoch": 0.5636509207365893, "percentage": 56.37, "elapsed_time": "5:12:02", "remaining_time": "4:01:28"}
+{"current_steps": 1761, "total_steps": 3122, "loss": 2.5073, "learning_rate": 2.3784217002146976e-05, "epoch": 0.5639711769415532, "percentage": 56.41, "elapsed_time": "5:12:13", "remaining_time": "4:01:18"}
+{"current_steps": 1762, "total_steps": 3122, "loss": 2.3088, "learning_rate": 2.3756290787977147e-05, "epoch": 0.5642914331465172, "percentage": 56.44, "elapsed_time": "5:12:23", "remaining_time": "4:01:07"}
+{"current_steps": 1763, "total_steps": 3122, "loss": 2.3283, "learning_rate": 2.3728366129468696e-05, "epoch": 0.5646116893514812, "percentage": 56.47, "elapsed_time": "5:12:33", "remaining_time": "4:00:56"}
+{"current_steps": 1764, "total_steps": 3122, "loss": 2.4001, "learning_rate": 2.3700443061550478e-05, "epoch": 0.5649319455564451, "percentage": 56.5, "elapsed_time": "5:12:44", "remaining_time": "4:00:45"}
+{"current_steps": 1765, "total_steps": 3122, "loss": 2.3446, "learning_rate": 2.3672521619149322e-05, "epoch": 0.5652522017614091, "percentage": 56.53, "elapsed_time": "5:12:54", "remaining_time": "4:00:34"}
+{"current_steps": 1766, "total_steps": 3122, "loss": 2.1358, "learning_rate": 2.364460183719005e-05, "epoch": 0.5655724579663731, "percentage": 56.57, "elapsed_time": "5:13:04", "remaining_time": "4:00:23"}
+{"current_steps": 1767, "total_steps": 3122, "loss": 2.2924, "learning_rate": 2.3616683750595394e-05, "epoch": 0.565892714171337, "percentage": 56.6, "elapsed_time": "5:13:15", "remaining_time": "4:00:12"}
+{"current_steps": 1768, "total_steps": 3122, "loss": 1.6567, "learning_rate": 2.3588767394285963e-05, "epoch": 0.566212970376301, "percentage": 56.63, "elapsed_time": "5:13:25", "remaining_time": "4:00:02"}
+{"current_steps": 1769, "total_steps": 3122, "loss": 2.1492, "learning_rate": 2.356085280318021e-05, "epoch": 0.566533226581265, "percentage": 56.66, "elapsed_time": "5:13:35", "remaining_time": "3:59:51"}
+{"current_steps": 1770, "total_steps": 3122, "loss": 2.6153, "learning_rate": 2.3532940012194383e-05, "epoch": 0.5668534827862289, "percentage": 56.69, "elapsed_time": "5:13:46", "remaining_time": "3:59:40"}
+{"current_steps": 1771, "total_steps": 3122, "loss": 2.1282, "learning_rate": 2.3505029056242454e-05, "epoch": 0.5671737389911929, "percentage": 56.73, "elapsed_time": "5:13:56", "remaining_time": "3:59:29"}
+{"current_steps": 1772, "total_steps": 3122, "loss": 2.281, "learning_rate": 2.347711997023614e-05, "epoch": 0.567493995196157, "percentage": 56.76, "elapsed_time": "5:14:06", "remaining_time": "3:59:18"}
+{"current_steps": 1773, "total_steps": 3122, "loss": 2.5034, "learning_rate": 2.344921278908479e-05, "epoch": 0.5678142514011209, "percentage": 56.79, "elapsed_time": "5:14:17", "remaining_time": "3:59:07"}
+{"current_steps": 1774, "total_steps": 3122, "loss": 2.2516, "learning_rate": 2.342130754769536e-05, "epoch": 0.5681345076060849, "percentage": 56.82, "elapsed_time": "5:14:27", "remaining_time": "3:58:56"}
+{"current_steps": 1775, "total_steps": 3122, "loss": 2.1612, "learning_rate": 2.3393404280972426e-05, "epoch": 0.5684547638110489, "percentage": 56.85, "elapsed_time": "5:14:38", "remaining_time": "3:58:46"}
+{"current_steps": 1776, "total_steps": 3122, "loss": 2.4927, "learning_rate": 2.336550302381804e-05, "epoch": 0.5687750200160128, "percentage": 56.89, "elapsed_time": "5:14:48", "remaining_time": "3:58:35"}
+{"current_steps": 1777, "total_steps": 3122, "loss": 2.2154, "learning_rate": 2.333760381113178e-05, "epoch": 0.5690952762209768, "percentage": 56.92, "elapsed_time": "5:14:58", "remaining_time": "3:58:24"}
+{"current_steps": 1778, "total_steps": 3122, "loss": 1.8648, "learning_rate": 2.330970667781065e-05, "epoch": 0.5694155324259408, "percentage": 56.95, "elapsed_time": "5:15:09", "remaining_time": "3:58:13"}
+{"current_steps": 1779, "total_steps": 3122, "loss": 2.3315, "learning_rate": 2.328181165874905e-05, "epoch": 0.5697357886309047, "percentage": 56.98, "elapsed_time": "5:15:19", "remaining_time": "3:58:02"}
+{"current_steps": 1780, "total_steps": 3122, "loss": 2.1458, "learning_rate": 2.325391878883874e-05, "epoch": 0.5700560448358687, "percentage": 57.01, "elapsed_time": "5:15:29", "remaining_time": "3:57:51"}
+{"current_steps": 1781, "total_steps": 3122, "loss": 1.9153, "learning_rate": 2.3226028102968806e-05, "epoch": 0.5703763010408327, "percentage": 57.05, "elapsed_time": "5:15:40", "remaining_time": "3:57:40"}
+{"current_steps": 1782, "total_steps": 3122, "loss": 1.8971, "learning_rate": 2.3198139636025565e-05, "epoch": 0.5706965572457966, "percentage": 57.08, "elapsed_time": "5:15:50", "remaining_time": "3:57:30"}
+{"current_steps": 1783, "total_steps": 3122, "loss": 2.1762, "learning_rate": 2.3170253422892606e-05, "epoch": 0.5710168134507606, "percentage": 57.11, "elapsed_time": "5:16:00", "remaining_time": "3:57:19"}
+{"current_steps": 1784, "total_steps": 3122, "loss": 1.8368, "learning_rate": 2.3142369498450665e-05, "epoch": 0.5713370696557246, "percentage": 57.14, "elapsed_time": "5:16:11", "remaining_time": "3:57:08"}
+{"current_steps": 1785, "total_steps": 3122, "loss": 2.1639, "learning_rate": 2.3114487897577614e-05, "epoch": 0.5716573258606885, "percentage": 57.17, "elapsed_time": "5:16:21", "remaining_time": "3:56:57"}
+{"current_steps": 1786, "total_steps": 3122, "loss": 2.3979, "learning_rate": 2.3086608655148447e-05, "epoch": 0.5719775820656525, "percentage": 57.21, "elapsed_time": "5:16:31", "remaining_time": "3:56:46"}
+{"current_steps": 1787, "total_steps": 3122, "loss": 1.7269, "learning_rate": 2.305873180603519e-05, "epoch": 0.5722978382706165, "percentage": 57.24, "elapsed_time": "5:16:42", "remaining_time": "3:56:35"}
+{"current_steps": 1788, "total_steps": 3122, "loss": 2.2162, "learning_rate": 2.303085738510686e-05, "epoch": 0.5726180944755804, "percentage": 57.27, "elapsed_time": "5:16:52", "remaining_time": "3:56:25"}
+{"current_steps": 1789, "total_steps": 3122, "loss": 2.1375, "learning_rate": 2.3002985427229472e-05, "epoch": 0.5729383506805444, "percentage": 57.3, "elapsed_time": "5:17:02", "remaining_time": "3:56:14"}
+{"current_steps": 1790, "total_steps": 3122, "loss": 1.917, "learning_rate": 2.2975115967265924e-05, "epoch": 0.5732586068855084, "percentage": 57.34, "elapsed_time": "5:17:13", "remaining_time": "3:56:03"}
+{"current_steps": 1791, "total_steps": 3122, "loss": 2.2711, "learning_rate": 2.294724904007602e-05, "epoch": 0.5735788630904723, "percentage": 57.37, "elapsed_time": "5:17:23", "remaining_time": "3:55:52"}
+{"current_steps": 1792, "total_steps": 3122, "loss": 2.324, "learning_rate": 2.2919384680516382e-05, "epoch": 0.5738991192954364, "percentage": 57.4, "elapsed_time": "5:17:34", "remaining_time": "3:55:41"}
+{"current_steps": 1793, "total_steps": 3122, "loss": 2.2216, "learning_rate": 2.2891522923440408e-05, "epoch": 0.5742193755004004, "percentage": 57.43, "elapsed_time": "5:17:44", "remaining_time": "3:55:30"}
+{"current_steps": 1794, "total_steps": 3122, "loss": 1.962, "learning_rate": 2.286366380369827e-05, "epoch": 0.5745396317053643, "percentage": 57.46, "elapsed_time": "5:17:54", "remaining_time": "3:55:19"}
+{"current_steps": 1795, "total_steps": 3122, "loss": 2.2255, "learning_rate": 2.2835807356136817e-05, "epoch": 0.5748598879103283, "percentage": 57.5, "elapsed_time": "5:18:05", "remaining_time": "3:55:09"}
+{"current_steps": 1796, "total_steps": 3122, "loss": 1.8936, "learning_rate": 2.2807953615599552e-05, "epoch": 0.5751801441152923, "percentage": 57.53, "elapsed_time": "5:18:15", "remaining_time": "3:54:58"}
+{"current_steps": 1797, "total_steps": 3122, "loss": 1.6788, "learning_rate": 2.2780102616926633e-05, "epoch": 0.5755004003202562, "percentage": 57.56, "elapsed_time": "5:18:25", "remaining_time": "3:54:47"}
+{"current_steps": 1798, "total_steps": 3122, "loss": 2.1119, "learning_rate": 2.2752254394954736e-05, "epoch": 0.5758206565252202, "percentage": 57.59, "elapsed_time": "5:18:36", "remaining_time": "3:54:36"}
+{"current_steps": 1799, "total_steps": 3122, "loss": 2.2388, "learning_rate": 2.272440898451708e-05, "epoch": 0.5761409127301842, "percentage": 57.62, "elapsed_time": "5:18:46", "remaining_time": "3:54:25"}
+{"current_steps": 1800, "total_steps": 3122, "loss": 2.1596, "learning_rate": 2.2696566420443403e-05, "epoch": 0.5764611689351481, "percentage": 57.66, "elapsed_time": "5:18:56", "remaining_time": "3:54:14"}
+{"current_steps": 1801, "total_steps": 3122, "loss": 2.5837, "learning_rate": 2.266872673755983e-05, "epoch": 0.5767814251401121, "percentage": 57.69, "elapsed_time": "5:19:47", "remaining_time": "3:54:33"}
+{"current_steps": 1802, "total_steps": 3122, "loss": 1.9443, "learning_rate": 2.2640889970688904e-05, "epoch": 0.5771016813450761, "percentage": 57.72, "elapsed_time": "5:19:57", "remaining_time": "3:54:22"}
+{"current_steps": 1803, "total_steps": 3122, "loss": 2.2111, "learning_rate": 2.2613056154649542e-05, "epoch": 0.57742193755004, "percentage": 57.75, "elapsed_time": "5:20:07", "remaining_time": "3:54:11"}
+{"current_steps": 1804, "total_steps": 3122, "loss": 2.4131, "learning_rate": 2.2585225324256928e-05, "epoch": 0.577742193755004, "percentage": 57.78, "elapsed_time": "5:20:18", "remaining_time": "3:54:00"}
+{"current_steps": 1805, "total_steps": 3122, "loss": 2.4771, "learning_rate": 2.255739751432256e-05, "epoch": 0.578062449959968, "percentage": 57.82, "elapsed_time": "5:20:28", "remaining_time": "3:53:49"}
+{"current_steps": 1806, "total_steps": 3122, "loss": 2.0832, "learning_rate": 2.252957275965411e-05, "epoch": 0.5783827061649319, "percentage": 57.85, "elapsed_time": "5:20:39", "remaining_time": "3:53:39"}
+{"current_steps": 1807, "total_steps": 3122, "loss": 2.2442, "learning_rate": 2.2501751095055448e-05, "epoch": 0.5787029623698959, "percentage": 57.88, "elapsed_time": "5:20:49", "remaining_time": "3:53:28"}
+{"current_steps": 1808, "total_steps": 3122, "loss": 2.3033, "learning_rate": 2.2473932555326604e-05, "epoch": 0.5790232185748598, "percentage": 57.91, "elapsed_time": "5:20:59", "remaining_time": "3:53:17"}
+{"current_steps": 1809, "total_steps": 3122, "loss": 2.1901, "learning_rate": 2.2446117175263658e-05, "epoch": 0.5793434747798238, "percentage": 57.94, "elapsed_time": "5:21:10", "remaining_time": "3:53:06"}
+{"current_steps": 1810, "total_steps": 3122, "loss": 2.1636, "learning_rate": 2.2418304989658757e-05, "epoch": 0.5796637309847879, "percentage": 57.98, "elapsed_time": "5:21:20", "remaining_time": "3:52:55"}
+{"current_steps": 1811, "total_steps": 3122, "loss": 2.5267, "learning_rate": 2.239049603330006e-05, "epoch": 0.5799839871897517, "percentage": 58.01, "elapsed_time": "5:21:31", "remaining_time": "3:52:45"}
+{"current_steps": 1812, "total_steps": 3122, "loss": 1.9348, "learning_rate": 2.2362690340971678e-05, "epoch": 0.5803042433947158, "percentage": 58.04, "elapsed_time": "5:21:41", "remaining_time": "3:52:34"}
+{"current_steps": 1813, "total_steps": 3122, "loss": 2.3273, "learning_rate": 2.233488794745362e-05, "epoch": 0.5806244995996798, "percentage": 58.07, "elapsed_time": "5:21:52", "remaining_time": "3:52:23"}
+{"current_steps": 1814, "total_steps": 3122, "loss": 1.9374, "learning_rate": 2.2307088887521816e-05, "epoch": 0.5809447558046437, "percentage": 58.1, "elapsed_time": "5:22:02", "remaining_time": "3:52:12"}
+{"current_steps": 1815, "total_steps": 3122, "loss": 2.5428, "learning_rate": 2.2279293195947977e-05, "epoch": 0.5812650120096077, "percentage": 58.14, "elapsed_time": "5:22:12", "remaining_time": "3:52:01"}
+{"current_steps": 1816, "total_steps": 3122, "loss": 1.9329, "learning_rate": 2.225150090749964e-05, "epoch": 0.5815852682145717, "percentage": 58.17, "elapsed_time": "5:22:23", "remaining_time": "3:51:50"}
+{"current_steps": 1817, "total_steps": 3122, "loss": 2.0871, "learning_rate": 2.222371205694006e-05, "epoch": 0.5819055244195356, "percentage": 58.2, "elapsed_time": "5:22:33", "remaining_time": "3:51:40"}
+{"current_steps": 1818, "total_steps": 3122, "loss": 2.1848, "learning_rate": 2.219592667902819e-05, "epoch": 0.5822257806244996, "percentage": 58.23, "elapsed_time": "5:22:43", "remaining_time": "3:51:29"}
+{"current_steps": 1819, "total_steps": 3122, "loss": 1.9535, "learning_rate": 2.2168144808518667e-05, "epoch": 0.5825460368294636, "percentage": 58.26, "elapsed_time": "5:22:54", "remaining_time": "3:51:18"}
+{"current_steps": 1820, "total_steps": 3122, "loss": 2.2323, "learning_rate": 2.2140366480161713e-05, "epoch": 0.5828662930344275, "percentage": 58.3, "elapsed_time": "5:23:04", "remaining_time": "3:51:07"}
+{"current_steps": 1821, "total_steps": 3122, "loss": 2.3016, "learning_rate": 2.211259172870312e-05, "epoch": 0.5831865492393915, "percentage": 58.33, "elapsed_time": "5:23:15", "remaining_time": "3:50:56"}
+{"current_steps": 1822, "total_steps": 3122, "loss": 1.6852, "learning_rate": 2.2084820588884234e-05, "epoch": 0.5835068054443555, "percentage": 58.36, "elapsed_time": "5:23:25", "remaining_time": "3:50:45"}
+{"current_steps": 1823, "total_steps": 3122, "loss": 2.3596, "learning_rate": 2.2057053095441854e-05, "epoch": 0.5838270616493194, "percentage": 58.39, "elapsed_time": "5:23:35", "remaining_time": "3:50:34"}
+{"current_steps": 1824, "total_steps": 3122, "loss": 1.8076, "learning_rate": 2.202928928310822e-05, "epoch": 0.5841473178542834, "percentage": 58.42, "elapsed_time": "5:23:46", "remaining_time": "3:50:24"}
+{"current_steps": 1825, "total_steps": 3122, "loss": 2.6958, "learning_rate": 2.2001529186610996e-05, "epoch": 0.5844675740592474, "percentage": 58.46, "elapsed_time": "5:23:56", "remaining_time": "3:50:13"}
+{"current_steps": 1826, "total_steps": 3122, "loss": 2.3731, "learning_rate": 2.197377284067317e-05, "epoch": 0.5847878302642113, "percentage": 58.49, "elapsed_time": "5:24:06", "remaining_time": "3:50:02"}
+{"current_steps": 1827, "total_steps": 3122, "loss": 2.4798, "learning_rate": 2.194602028001303e-05, "epoch": 0.5851080864691753, "percentage": 58.52, "elapsed_time": "5:24:17", "remaining_time": "3:49:51"}
+{"current_steps": 1828, "total_steps": 3122, "loss": 2.7211, "learning_rate": 2.1918271539344177e-05, "epoch": 0.5854283426741393, "percentage": 58.55, "elapsed_time": "5:24:27", "remaining_time": "3:49:40"}
+{"current_steps": 1829, "total_steps": 3122, "loss": 2.6734, "learning_rate": 2.1890526653375372e-05, "epoch": 0.5857485988791032, "percentage": 58.58, "elapsed_time": "5:24:37", "remaining_time": "3:49:29"}
+{"current_steps": 1830, "total_steps": 3122, "loss": 2.3266, "learning_rate": 2.186278565681061e-05, "epoch": 0.5860688550840673, "percentage": 58.62, "elapsed_time": "5:24:48", "remaining_time": "3:49:18"}
+{"current_steps": 1831, "total_steps": 3122, "loss": 2.572, "learning_rate": 2.183504858434899e-05, "epoch": 0.5863891112890313, "percentage": 58.65, "elapsed_time": "5:24:58", "remaining_time": "3:49:07"}
+{"current_steps": 1832, "total_steps": 3122, "loss": 2.4207, "learning_rate": 2.1807315470684697e-05, "epoch": 0.5867093674939952, "percentage": 58.68, "elapsed_time": "5:25:08", "remaining_time": "3:48:57"}
+{"current_steps": 1833, "total_steps": 3122, "loss": 2.1545, "learning_rate": 2.1779586350506996e-05, "epoch": 0.5870296236989592, "percentage": 58.71, "elapsed_time": "5:25:19", "remaining_time": "3:48:46"}
+{"current_steps": 1834, "total_steps": 3122, "loss": 2.287, "learning_rate": 2.175186125850012e-05, "epoch": 0.5873498799039232, "percentage": 58.74, "elapsed_time": "5:25:29", "remaining_time": "3:48:35"}
+{"current_steps": 1835, "total_steps": 3122, "loss": 2.3484, "learning_rate": 2.1724140229343288e-05, "epoch": 0.5876701361088871, "percentage": 58.78, "elapsed_time": "5:25:39", "remaining_time": "3:48:24"}
+{"current_steps": 1836, "total_steps": 3122, "loss": 2.0906, "learning_rate": 2.169642329771063e-05, "epoch": 0.5879903923138511, "percentage": 58.81, "elapsed_time": "5:25:50", "remaining_time": "3:48:13"}
+{"current_steps": 1837, "total_steps": 3122, "loss": 2.4591, "learning_rate": 2.1668710498271162e-05, "epoch": 0.5883106485188151, "percentage": 58.84, "elapsed_time": "5:26:00", "remaining_time": "3:48:02"}
+{"current_steps": 1838, "total_steps": 3122, "loss": 1.9441, "learning_rate": 2.1641001865688686e-05, "epoch": 0.588630904723779, "percentage": 58.87, "elapsed_time": "5:26:10", "remaining_time": "3:47:51"}
+{"current_steps": 1839, "total_steps": 3122, "loss": 2.4205, "learning_rate": 2.1613297434621865e-05, "epoch": 0.588951160928743, "percentage": 58.9, "elapsed_time": "5:26:21", "remaining_time": "3:47:41"}
+{"current_steps": 1840, "total_steps": 3122, "loss": 2.1306, "learning_rate": 2.158559723972404e-05, "epoch": 0.589271417133707, "percentage": 58.94, "elapsed_time": "5:26:31", "remaining_time": "3:47:30"}
+{"current_steps": 1841, "total_steps": 3122, "loss": 1.831, "learning_rate": 2.15579013156433e-05, "epoch": 0.5895916733386709, "percentage": 58.97, "elapsed_time": "5:26:41", "remaining_time": "3:47:19"}
+{"current_steps": 1842, "total_steps": 3122, "loss": 1.9654, "learning_rate": 2.1530209697022366e-05, "epoch": 0.5899119295436349, "percentage": 59.0, "elapsed_time": "5:26:52", "remaining_time": "3:47:08"}
+{"current_steps": 1843, "total_steps": 3122, "loss": 2.4949, "learning_rate": 2.150252241849857e-05, "epoch": 0.5902321857485989, "percentage": 59.03, "elapsed_time": "5:27:02", "remaining_time": "3:46:57"}
+{"current_steps": 1844, "total_steps": 3122, "loss": 1.785, "learning_rate": 2.1474839514703843e-05, "epoch": 0.5905524419535628, "percentage": 59.06, "elapsed_time": "5:27:12", "remaining_time": "3:46:46"}
+{"current_steps": 1845, "total_steps": 3122, "loss": 1.4549, "learning_rate": 2.1447161020264616e-05, "epoch": 0.5908726981585268, "percentage": 59.1, "elapsed_time": "5:27:23", "remaining_time": "3:46:35"}
+{"current_steps": 1846, "total_steps": 3122, "loss": 2.0587, "learning_rate": 2.141948696980181e-05, "epoch": 0.5911929543634908, "percentage": 59.13, "elapsed_time": "5:27:33", "remaining_time": "3:46:25"}
+{"current_steps": 1847, "total_steps": 3122, "loss": 1.8139, "learning_rate": 2.1391817397930814e-05, "epoch": 0.5915132105684547, "percentage": 59.16, "elapsed_time": "5:27:44", "remaining_time": "3:46:14"}
+{"current_steps": 1848, "total_steps": 3122, "loss": 2.3478, "learning_rate": 2.1364152339261374e-05, "epoch": 0.5918334667734187, "percentage": 59.19, "elapsed_time": "5:27:54", "remaining_time": "3:46:03"}
+{"current_steps": 1849, "total_steps": 3122, "loss": 1.9641, "learning_rate": 2.133649182839761e-05, "epoch": 0.5921537229783828, "percentage": 59.22, "elapsed_time": "5:28:04", "remaining_time": "3:45:52"}
+{"current_steps": 1850, "total_steps": 3122, "loss": 2.3559, "learning_rate": 2.1308835899937972e-05, "epoch": 0.5924739791833467, "percentage": 59.26, "elapsed_time": "5:28:15", "remaining_time": "3:45:41"}
+{"current_steps": 1851, "total_steps": 3122, "loss": 2.3271, "learning_rate": 2.128118458847515e-05, "epoch": 0.5927942353883107, "percentage": 59.29, "elapsed_time": "5:28:25", "remaining_time": "3:45:30"}
+{"current_steps": 1852, "total_steps": 3122, "loss": 2.0447, "learning_rate": 2.1253537928596057e-05, "epoch": 0.5931144915932747, "percentage": 59.32, "elapsed_time": "5:28:35", "remaining_time": "3:45:20"}
+{"current_steps": 1853, "total_steps": 3122, "loss": 2.2835, "learning_rate": 2.1225895954881823e-05, "epoch": 0.5934347477982386, "percentage": 59.35, "elapsed_time": "5:28:46", "remaining_time": "3:45:09"}
+{"current_steps": 1854, "total_steps": 3122, "loss": 1.9083, "learning_rate": 2.119825870190767e-05, "epoch": 0.5937550040032026, "percentage": 59.39, "elapsed_time": "5:28:56", "remaining_time": "3:44:58"}
+{"current_steps": 1855, "total_steps": 3122, "loss": 2.0059, "learning_rate": 2.1170626204242962e-05, "epoch": 0.5940752602081665, "percentage": 59.42, "elapsed_time": "5:29:06", "remaining_time": "3:44:47"}
+{"current_steps": 1856, "total_steps": 3122, "loss": 2.408, "learning_rate": 2.114299849645108e-05, "epoch": 0.5943955164131305, "percentage": 59.45, "elapsed_time": "5:29:17", "remaining_time": "3:44:36"}
+{"current_steps": 1857, "total_steps": 3122, "loss": 2.1296, "learning_rate": 2.1115375613089416e-05, "epoch": 0.5947157726180945, "percentage": 59.48, "elapsed_time": "5:29:27", "remaining_time": "3:44:25"}
+{"current_steps": 1858, "total_steps": 3122, "loss": 2.2477, "learning_rate": 2.1087757588709356e-05, "epoch": 0.5950360288230584, "percentage": 59.51, "elapsed_time": "5:29:37", "remaining_time": "3:44:14"}
+{"current_steps": 1859, "total_steps": 3122, "loss": 2.5451, "learning_rate": 2.106014445785618e-05, "epoch": 0.5953562850280224, "percentage": 59.55, "elapsed_time": "5:29:48", "remaining_time": "3:44:04"}
+{"current_steps": 1860, "total_steps": 3122, "loss": 1.9078, "learning_rate": 2.1032536255069045e-05, "epoch": 0.5956765412329864, "percentage": 59.58, "elapsed_time": "5:29:58", "remaining_time": "3:43:53"}
+{"current_steps": 1861, "total_steps": 3122, "loss": 2.3821, "learning_rate": 2.1004933014880976e-05, "epoch": 0.5959967974379503, "percentage": 59.61, "elapsed_time": "5:30:09", "remaining_time": "3:43:42"}
+{"current_steps": 1862, "total_steps": 3122, "loss": 1.7438, "learning_rate": 2.097733477181876e-05, "epoch": 0.5963170536429143, "percentage": 59.64, "elapsed_time": "5:30:19", "remaining_time": "3:43:31"}
+{"current_steps": 1863, "total_steps": 3122, "loss": 1.9844, "learning_rate": 2.094974156040293e-05, "epoch": 0.5966373098478783, "percentage": 59.67, "elapsed_time": "5:30:29", "remaining_time": "3:43:20"}
+{"current_steps": 1864, "total_steps": 3122, "loss": 2.3406, "learning_rate": 2.092215341514776e-05, "epoch": 0.5969575660528422, "percentage": 59.71, "elapsed_time": "5:30:40", "remaining_time": "3:43:09"}
+{"current_steps": 1865, "total_steps": 3122, "loss": 2.2888, "learning_rate": 2.0894570370561156e-05, "epoch": 0.5972778222578062, "percentage": 59.74, "elapsed_time": "5:30:50", "remaining_time": "3:42:59"}
+{"current_steps": 1866, "total_steps": 3122, "loss": 2.4423, "learning_rate": 2.0866992461144645e-05, "epoch": 0.5975980784627702, "percentage": 59.77, "elapsed_time": "5:31:00", "remaining_time": "3:42:48"}
+{"current_steps": 1867, "total_steps": 3122, "loss": 2.4976, "learning_rate": 2.0839419721393354e-05, "epoch": 0.5979183346677341, "percentage": 59.8, "elapsed_time": "5:31:11", "remaining_time": "3:42:37"}
+{"current_steps": 1868, "total_steps": 3122, "loss": 2.1009, "learning_rate": 2.0811852185795916e-05, "epoch": 0.5982385908726982, "percentage": 59.83, "elapsed_time": "5:31:21", "remaining_time": "3:42:26"}
+{"current_steps": 1869, "total_steps": 3122, "loss": 2.1664, "learning_rate": 2.078428988883448e-05, "epoch": 0.5985588470776622, "percentage": 59.87, "elapsed_time": "5:31:31", "remaining_time": "3:42:15"}
+{"current_steps": 1870, "total_steps": 3122, "loss": 2.3979, "learning_rate": 2.075673286498463e-05, "epoch": 0.5988791032826261, "percentage": 59.9, "elapsed_time": "5:31:42", "remaining_time": "3:42:04"}
+{"current_steps": 1871, "total_steps": 3122, "loss": 1.8152, "learning_rate": 2.0729181148715332e-05, "epoch": 0.5991993594875901, "percentage": 59.93, "elapsed_time": "5:31:52", "remaining_time": "3:41:54"}
+{"current_steps": 1872, "total_steps": 3122, "loss": 2.2508, "learning_rate": 2.070163477448896e-05, "epoch": 0.5995196156925541, "percentage": 59.96, "elapsed_time": "5:32:02", "remaining_time": "3:41:43"}
+{"current_steps": 1873, "total_steps": 3122, "loss": 2.1103, "learning_rate": 2.0674093776761176e-05, "epoch": 0.599839871897518, "percentage": 59.99, "elapsed_time": "5:32:13", "remaining_time": "3:41:32"}
+{"current_steps": 1874, "total_steps": 3122, "loss": 2.4928, "learning_rate": 2.064655818998091e-05, "epoch": 0.600160128102482, "percentage": 60.03, "elapsed_time": "5:32:23", "remaining_time": "3:41:21"}
+{"current_steps": 1875, "total_steps": 3122, "loss": 2.1205, "learning_rate": 2.061902804859035e-05, "epoch": 0.600480384307446, "percentage": 60.06, "elapsed_time": "5:32:33", "remaining_time": "3:41:10"}
+{"current_steps": 1876, "total_steps": 3122, "loss": 2.2769, "learning_rate": 2.0591503387024853e-05, "epoch": 0.6008006405124099, "percentage": 60.09, "elapsed_time": "5:32:44", "remaining_time": "3:40:59"}
+{"current_steps": 1877, "total_steps": 3122, "loss": 2.2979, "learning_rate": 2.056398423971292e-05, "epoch": 0.6011208967173739, "percentage": 60.12, "elapsed_time": "5:32:54", "remaining_time": "3:40:49"}
+{"current_steps": 1878, "total_steps": 3122, "loss": 1.9518, "learning_rate": 2.053647064107618e-05, "epoch": 0.6014411529223379, "percentage": 60.15, "elapsed_time": "5:33:05", "remaining_time": "3:40:38"}
+{"current_steps": 1879, "total_steps": 3122, "loss": 2.1684, "learning_rate": 2.0508962625529284e-05, "epoch": 0.6017614091273018, "percentage": 60.19, "elapsed_time": "5:33:15", "remaining_time": "3:40:27"}
+{"current_steps": 1880, "total_steps": 3122, "loss": 2.4742, "learning_rate": 2.0481460227479942e-05, "epoch": 0.6020816653322658, "percentage": 60.22, "elapsed_time": "5:33:25", "remaining_time": "3:40:16"}
+{"current_steps": 1881, "total_steps": 3122, "loss": 2.1223, "learning_rate": 2.0453963481328796e-05, "epoch": 0.6024019215372298, "percentage": 60.25, "elapsed_time": "5:33:36", "remaining_time": "3:40:05"}
+{"current_steps": 1882, "total_steps": 3122, "loss": 1.8289, "learning_rate": 2.042647242146944e-05, "epoch": 0.6027221777421937, "percentage": 60.28, "elapsed_time": "5:33:46", "remaining_time": "3:39:54"}
+{"current_steps": 1883, "total_steps": 3122, "loss": 2.206, "learning_rate": 2.0398987082288363e-05, "epoch": 0.6030424339471577, "percentage": 60.31, "elapsed_time": "5:33:56", "remaining_time": "3:39:44"}
+{"current_steps": 1884, "total_steps": 3122, "loss": 1.9582, "learning_rate": 2.037150749816488e-05, "epoch": 0.6033626901521217, "percentage": 60.35, "elapsed_time": "5:34:07", "remaining_time": "3:39:33"}
+{"current_steps": 1885, "total_steps": 3122, "loss": 2.1088, "learning_rate": 2.0344033703471106e-05, "epoch": 0.6036829463570856, "percentage": 60.38, "elapsed_time": "5:34:17", "remaining_time": "3:39:22"}
+{"current_steps": 1886, "total_steps": 3122, "loss": 1.6995, "learning_rate": 2.0316565732571947e-05, "epoch": 0.6040032025620496, "percentage": 60.41, "elapsed_time": "5:34:27", "remaining_time": "3:39:11"}
+{"current_steps": 1887, "total_steps": 3122, "loss": 2.3343, "learning_rate": 2.028910361982499e-05, "epoch": 0.6043234587670137, "percentage": 60.44, "elapsed_time": "5:34:38", "remaining_time": "3:39:00"}
+{"current_steps": 1888, "total_steps": 3122, "loss": 2.5429, "learning_rate": 2.0261647399580493e-05, "epoch": 0.6046437149719776, "percentage": 60.47, "elapsed_time": "5:34:48", "remaining_time": "3:38:49"}
+{"current_steps": 1889, "total_steps": 3122, "loss": 2.6612, "learning_rate": 2.023419710618138e-05, "epoch": 0.6049639711769416, "percentage": 60.51, "elapsed_time": "5:34:58", "remaining_time": "3:38:39"}
+{"current_steps": 1890, "total_steps": 3122, "loss": 2.0385, "learning_rate": 2.0206752773963128e-05, "epoch": 0.6052842273819056, "percentage": 60.54, "elapsed_time": "5:35:09", "remaining_time": "3:38:28"}
+{"current_steps": 1891, "total_steps": 3122, "loss": 1.9074, "learning_rate": 2.0179314437253756e-05, "epoch": 0.6056044835868695, "percentage": 60.57, "elapsed_time": "5:35:19", "remaining_time": "3:38:17"}
+{"current_steps": 1892, "total_steps": 3122, "loss": 2.1805, "learning_rate": 2.015188213037381e-05, "epoch": 0.6059247397918335, "percentage": 60.6, "elapsed_time": "5:35:30", "remaining_time": "3:38:06"}
+{"current_steps": 1893, "total_steps": 3122, "loss": 2.714, "learning_rate": 2.012445588763627e-05, "epoch": 0.6062449959967975, "percentage": 60.63, "elapsed_time": "5:35:40", "remaining_time": "3:37:55"}
+{"current_steps": 1894, "total_steps": 3122, "loss": 2.5523, "learning_rate": 2.009703574334656e-05, "epoch": 0.6065652522017614, "percentage": 60.67, "elapsed_time": "5:35:50", "remaining_time": "3:37:44"}
+{"current_steps": 1895, "total_steps": 3122, "loss": 2.4568, "learning_rate": 2.0069621731802435e-05, "epoch": 0.6068855084067254, "percentage": 60.7, "elapsed_time": "5:36:01", "remaining_time": "3:37:34"}
+{"current_steps": 1896, "total_steps": 3122, "loss": 2.021, "learning_rate": 2.0042213887293994e-05, "epoch": 0.6072057646116894, "percentage": 60.73, "elapsed_time": "5:36:11", "remaining_time": "3:37:23"}
+{"current_steps": 1897, "total_steps": 3122, "loss": 2.636, "learning_rate": 2.0014812244103653e-05, "epoch": 0.6075260208166533, "percentage": 60.76, "elapsed_time": "5:36:21", "remaining_time": "3:37:12"}
+{"current_steps": 1898, "total_steps": 3122, "loss": 1.8559, "learning_rate": 1.9987416836506034e-05, "epoch": 0.6078462770216173, "percentage": 60.79, "elapsed_time": "5:36:32", "remaining_time": "3:37:01"}
+{"current_steps": 1899, "total_steps": 3122, "loss": 1.9964, "learning_rate": 1.9960027698767957e-05, "epoch": 0.6081665332265813, "percentage": 60.83, "elapsed_time": "5:36:42", "remaining_time": "3:36:50"}
+{"current_steps": 1900, "total_steps": 3122, "loss": 2.045, "learning_rate": 1.993264486514844e-05, "epoch": 0.6084867894315452, "percentage": 60.86, "elapsed_time": "5:36:52", "remaining_time": "3:36:40"}
+{"current_steps": 1901, "total_steps": 3122, "loss": 2.0631, "learning_rate": 1.9905268369898576e-05, "epoch": 0.6088070456365092, "percentage": 60.89, "elapsed_time": "5:37:30", "remaining_time": "3:36:46"}
+{"current_steps": 1902, "total_steps": 3122, "loss": 1.8805, "learning_rate": 1.9877898247261534e-05, "epoch": 0.6091273018414731, "percentage": 60.92, "elapsed_time": "5:37:40", "remaining_time": "3:36:35"}
+{"current_steps": 1903, "total_steps": 3122, "loss": 2.0472, "learning_rate": 1.9850534531472546e-05, "epoch": 0.6094475580464371, "percentage": 60.95, "elapsed_time": "5:37:51", "remaining_time": "3:36:25"}
+{"current_steps": 1904, "total_steps": 3122, "loss": 2.5672, "learning_rate": 1.9823177256758787e-05, "epoch": 0.6097678142514011, "percentage": 60.99, "elapsed_time": "5:38:01", "remaining_time": "3:36:14"}
+{"current_steps": 1905, "total_steps": 3122, "loss": 1.8286, "learning_rate": 1.9795826457339393e-05, "epoch": 0.610088070456365, "percentage": 61.02, "elapsed_time": "5:38:12", "remaining_time": "3:36:03"}
+{"current_steps": 1906, "total_steps": 3122, "loss": 1.6787, "learning_rate": 1.9768482167425413e-05, "epoch": 0.610408326661329, "percentage": 61.05, "elapsed_time": "5:38:22", "remaining_time": "3:35:52"}
+{"current_steps": 1907, "total_steps": 3122, "loss": 2.3295, "learning_rate": 1.974114442121973e-05, "epoch": 0.6107285828662931, "percentage": 61.08, "elapsed_time": "5:38:32", "remaining_time": "3:35:41"}
+{"current_steps": 1908, "total_steps": 3122, "loss": 2.6286, "learning_rate": 1.9713813252917075e-05, "epoch": 0.611048839071257, "percentage": 61.11, "elapsed_time": "5:38:43", "remaining_time": "3:35:31"}
+{"current_steps": 1909, "total_steps": 3122, "loss": 2.2819, "learning_rate": 1.9686488696703914e-05, "epoch": 0.611369095276221, "percentage": 61.15, "elapsed_time": "5:38:53", "remaining_time": "3:35:20"}
+{"current_steps": 1910, "total_steps": 3122, "loss": 2.2437, "learning_rate": 1.965917078675845e-05, "epoch": 0.611689351481185, "percentage": 61.18, "elapsed_time": "5:39:04", "remaining_time": "3:35:09"}
+{"current_steps": 1911, "total_steps": 3122, "loss": 2.1633, "learning_rate": 1.9631859557250605e-05, "epoch": 0.6120096076861489, "percentage": 61.21, "elapsed_time": "5:39:14", "remaining_time": "3:34:58"}
+{"current_steps": 1912, "total_steps": 3122, "loss": 2.1793, "learning_rate": 1.960455504234191e-05, "epoch": 0.6123298638911129, "percentage": 61.24, "elapsed_time": "5:39:24", "remaining_time": "3:34:47"}
+{"current_steps": 1913, "total_steps": 3122, "loss": 2.4874, "learning_rate": 1.95772572761855e-05, "epoch": 0.6126501200960769, "percentage": 61.27, "elapsed_time": "5:39:35", "remaining_time": "3:34:37"}
+{"current_steps": 1914, "total_steps": 3122, "loss": 2.1151, "learning_rate": 1.9549966292926095e-05, "epoch": 0.6129703763010408, "percentage": 61.31, "elapsed_time": "5:39:45", "remaining_time": "3:34:26"}
+{"current_steps": 1915, "total_steps": 3122, "loss": 2.0204, "learning_rate": 1.9522682126699903e-05, "epoch": 0.6132906325060048, "percentage": 61.34, "elapsed_time": "5:39:56", "remaining_time": "3:34:15"}
+{"current_steps": 1916, "total_steps": 3122, "loss": 2.5082, "learning_rate": 1.949540481163461e-05, "epoch": 0.6136108887109688, "percentage": 61.37, "elapsed_time": "5:40:06", "remaining_time": "3:34:04"}
+{"current_steps": 1917, "total_steps": 3122, "loss": 2.2812, "learning_rate": 1.9468134381849355e-05, "epoch": 0.6139311449159327, "percentage": 61.4, "elapsed_time": "5:40:16", "remaining_time": "3:33:53"}
+{"current_steps": 1918, "total_steps": 3122, "loss": 2.2605, "learning_rate": 1.944087087145462e-05, "epoch": 0.6142514011208967, "percentage": 61.43, "elapsed_time": "5:40:27", "remaining_time": "3:33:42"}
+{"current_steps": 1919, "total_steps": 3122, "loss": 1.7432, "learning_rate": 1.9413614314552293e-05, "epoch": 0.6145716573258607, "percentage": 61.47, "elapsed_time": "5:40:37", "remaining_time": "3:33:32"}
+{"current_steps": 1920, "total_steps": 3122, "loss": 2.4423, "learning_rate": 1.938636474523551e-05, "epoch": 0.6148919135308246, "percentage": 61.5, "elapsed_time": "5:40:48", "remaining_time": "3:33:21"}
+{"current_steps": 1921, "total_steps": 3122, "loss": 2.3166, "learning_rate": 1.935912219758868e-05, "epoch": 0.6152121697357886, "percentage": 61.53, "elapsed_time": "5:40:58", "remaining_time": "3:33:10"}
+{"current_steps": 1922, "total_steps": 3122, "loss": 1.7659, "learning_rate": 1.9331886705687464e-05, "epoch": 0.6155324259407526, "percentage": 61.56, "elapsed_time": "5:41:08", "remaining_time": "3:32:59"}
+{"current_steps": 1923, "total_steps": 3122, "loss": 2.425, "learning_rate": 1.9304658303598648e-05, "epoch": 0.6158526821457165, "percentage": 61.6, "elapsed_time": "5:41:19", "remaining_time": "3:32:48"}
+{"current_steps": 1924, "total_steps": 3122, "loss": 1.8974, "learning_rate": 1.927743702538017e-05, "epoch": 0.6161729383506805, "percentage": 61.63, "elapsed_time": "5:41:29", "remaining_time": "3:32:38"}
+{"current_steps": 1925, "total_steps": 3122, "loss": 1.9298, "learning_rate": 1.925022290508108e-05, "epoch": 0.6164931945556446, "percentage": 61.66, "elapsed_time": "5:41:39", "remaining_time": "3:32:27"}
+{"current_steps": 1926, "total_steps": 3122, "loss": 2.4168, "learning_rate": 1.922301597674144e-05, "epoch": 0.6168134507606085, "percentage": 61.69, "elapsed_time": "5:41:50", "remaining_time": "3:32:16"}
+{"current_steps": 1927, "total_steps": 3122, "loss": 2.331, "learning_rate": 1.919581627439232e-05, "epoch": 0.6171337069655725, "percentage": 61.72, "elapsed_time": "5:42:00", "remaining_time": "3:32:05"}
+{"current_steps": 1928, "total_steps": 3122, "loss": 1.7454, "learning_rate": 1.9168623832055786e-05, "epoch": 0.6174539631705365, "percentage": 61.76, "elapsed_time": "5:42:11", "remaining_time": "3:31:54"}
+{"current_steps": 1929, "total_steps": 3122, "loss": 2.4372, "learning_rate": 1.9141438683744785e-05, "epoch": 0.6177742193755004, "percentage": 61.79, "elapsed_time": "5:42:21", "remaining_time": "3:31:44"}
+{"current_steps": 1930, "total_steps": 3122, "loss": 2.159, "learning_rate": 1.9114260863463145e-05, "epoch": 0.6180944755804644, "percentage": 61.82, "elapsed_time": "5:42:31", "remaining_time": "3:31:33"}
+{"current_steps": 1931, "total_steps": 3122, "loss": 2.2052, "learning_rate": 1.908709040520556e-05, "epoch": 0.6184147317854284, "percentage": 61.85, "elapsed_time": "5:42:42", "remaining_time": "3:31:22"}
+{"current_steps": 1932, "total_steps": 3122, "loss": 2.6305, "learning_rate": 1.9059927342957468e-05, "epoch": 0.6187349879903923, "percentage": 61.88, "elapsed_time": "5:42:52", "remaining_time": "3:31:11"}
+{"current_steps": 1933, "total_steps": 3122, "loss": 2.5403, "learning_rate": 1.9032771710695106e-05, "epoch": 0.6190552441953563, "percentage": 61.92, "elapsed_time": "5:43:03", "remaining_time": "3:31:00"}
+{"current_steps": 1934, "total_steps": 3122, "loss": 1.5766, "learning_rate": 1.9005623542385377e-05, "epoch": 0.6193755004003203, "percentage": 61.95, "elapsed_time": "5:43:13", "remaining_time": "3:30:49"}
+{"current_steps": 1935, "total_steps": 3122, "loss": 2.1659, "learning_rate": 1.8978482871985852e-05, "epoch": 0.6196957566052842, "percentage": 61.98, "elapsed_time": "5:43:23", "remaining_time": "3:30:39"}
+{"current_steps": 1936, "total_steps": 3122, "loss": 1.9693, "learning_rate": 1.895134973344476e-05, "epoch": 0.6200160128102482, "percentage": 62.01, "elapsed_time": "5:43:34", "remaining_time": "3:30:28"}
+{"current_steps": 1937, "total_steps": 3122, "loss": 2.5216, "learning_rate": 1.8924224160700866e-05, "epoch": 0.6203362690152122, "percentage": 62.04, "elapsed_time": "5:43:44", "remaining_time": "3:30:17"}
+{"current_steps": 1938, "total_steps": 3122, "loss": 1.6666, "learning_rate": 1.8897106187683482e-05, "epoch": 0.6206565252201761, "percentage": 62.08, "elapsed_time": "5:43:54", "remaining_time": "3:30:06"}
+{"current_steps": 1939, "total_steps": 3122, "loss": 2.3252, "learning_rate": 1.8869995848312445e-05, "epoch": 0.6209767814251401, "percentage": 62.11, "elapsed_time": "5:44:05", "remaining_time": "3:29:55"}
+{"current_steps": 1940, "total_steps": 3122, "loss": 2.1655, "learning_rate": 1.8842893176498003e-05, "epoch": 0.6212970376301041, "percentage": 62.14, "elapsed_time": "5:44:15", "remaining_time": "3:29:45"}
+{"current_steps": 1941, "total_steps": 3122, "loss": 2.7821, "learning_rate": 1.881579820614082e-05, "epoch": 0.621617293835068, "percentage": 62.17, "elapsed_time": "5:44:26", "remaining_time": "3:29:34"}
+{"current_steps": 1942, "total_steps": 3122, "loss": 2.2319, "learning_rate": 1.878871097113196e-05, "epoch": 0.621937550040032, "percentage": 62.2, "elapsed_time": "5:44:36", "remaining_time": "3:29:23"}
+{"current_steps": 1943, "total_steps": 3122, "loss": 2.2277, "learning_rate": 1.876163150535277e-05, "epoch": 0.622257806244996, "percentage": 62.24, "elapsed_time": "5:44:46", "remaining_time": "3:29:12"}
+{"current_steps": 1944, "total_steps": 3122, "loss": 1.8544, "learning_rate": 1.8734559842674908e-05, "epoch": 0.62257806244996, "percentage": 62.27, "elapsed_time": "5:44:57", "remaining_time": "3:29:01"}
+{"current_steps": 1945, "total_steps": 3122, "loss": 2.4545, "learning_rate": 1.8707496016960262e-05, "epoch": 0.622898318654924, "percentage": 62.3, "elapsed_time": "5:45:07", "remaining_time": "3:28:51"}
+{"current_steps": 1946, "total_steps": 3122, "loss": 2.2949, "learning_rate": 1.8680440062060895e-05, "epoch": 0.623218574859888, "percentage": 62.33, "elapsed_time": "5:45:18", "remaining_time": "3:28:40"}
+{"current_steps": 1947, "total_steps": 3122, "loss": 2.4566, "learning_rate": 1.8653392011819072e-05, "epoch": 0.6235388310648519, "percentage": 62.36, "elapsed_time": "5:45:28", "remaining_time": "3:28:29"}
+{"current_steps": 1948, "total_steps": 3122, "loss": 1.9222, "learning_rate": 1.8626351900067135e-05, "epoch": 0.6238590872698159, "percentage": 62.4, "elapsed_time": "5:45:38", "remaining_time": "3:28:18"}
+{"current_steps": 1949, "total_steps": 3122, "loss": 2.7594, "learning_rate": 1.8599319760627494e-05, "epoch": 0.6241793434747798, "percentage": 62.43, "elapsed_time": "5:45:49", "remaining_time": "3:28:07"}
+{"current_steps": 1950, "total_steps": 3122, "loss": 2.2509, "learning_rate": 1.8572295627312616e-05, "epoch": 0.6244995996797438, "percentage": 62.46, "elapsed_time": "5:45:59", "remaining_time": "3:27:57"}
+{"current_steps": 1951, "total_steps": 3122, "loss": 2.6185, "learning_rate": 1.8545279533924934e-05, "epoch": 0.6248198558847078, "percentage": 62.49, "elapsed_time": "5:46:10", "remaining_time": "3:27:46"}
+{"current_steps": 1952, "total_steps": 3122, "loss": 2.1968, "learning_rate": 1.8518271514256812e-05, "epoch": 0.6251401120896717, "percentage": 62.52, "elapsed_time": "5:46:20", "remaining_time": "3:27:35"}
+{"current_steps": 1953, "total_steps": 3122, "loss": 2.1392, "learning_rate": 1.8491271602090552e-05, "epoch": 0.6254603682946357, "percentage": 62.56, "elapsed_time": "5:46:30", "remaining_time": "3:27:24"}
+{"current_steps": 1954, "total_steps": 3122, "loss": 2.3392, "learning_rate": 1.8464279831198288e-05, "epoch": 0.6257806244995997, "percentage": 62.59, "elapsed_time": "5:46:41", "remaining_time": "3:27:13"}
+{"current_steps": 1955, "total_steps": 3122, "loss": 2.3781, "learning_rate": 1.8437296235341954e-05, "epoch": 0.6261008807045636, "percentage": 62.62, "elapsed_time": "5:46:51", "remaining_time": "3:27:03"}
+{"current_steps": 1956, "total_steps": 3122, "loss": 2.1818, "learning_rate": 1.8410320848273315e-05, "epoch": 0.6264211369095276, "percentage": 62.65, "elapsed_time": "5:47:01", "remaining_time": "3:26:52"}
+{"current_steps": 1957, "total_steps": 3122, "loss": 2.3265, "learning_rate": 1.8383353703733803e-05, "epoch": 0.6267413931144916, "percentage": 62.68, "elapsed_time": "5:47:12", "remaining_time": "3:26:41"}
+{"current_steps": 1958, "total_steps": 3122, "loss": 2.1143, "learning_rate": 1.8356394835454596e-05, "epoch": 0.6270616493194555, "percentage": 62.72, "elapsed_time": "5:47:22", "remaining_time": "3:26:30"}
+{"current_steps": 1959, "total_steps": 3122, "loss": 1.686, "learning_rate": 1.8329444277156483e-05, "epoch": 0.6273819055244195, "percentage": 62.75, "elapsed_time": "5:47:33", "remaining_time": "3:26:19"}
+{"current_steps": 1960, "total_steps": 3122, "loss": 2.2293, "learning_rate": 1.8302502062549858e-05, "epoch": 0.6277021617293835, "percentage": 62.78, "elapsed_time": "5:47:43", "remaining_time": "3:26:09"}
+{"current_steps": 1961, "total_steps": 3122, "loss": 2.3718, "learning_rate": 1.8275568225334722e-05, "epoch": 0.6280224179343474, "percentage": 62.81, "elapsed_time": "5:47:53", "remaining_time": "3:25:58"}
+{"current_steps": 1962, "total_steps": 3122, "loss": 2.0935, "learning_rate": 1.824864279920054e-05, "epoch": 0.6283426741393114, "percentage": 62.84, "elapsed_time": "5:48:04", "remaining_time": "3:25:47"}
+{"current_steps": 1963, "total_steps": 3122, "loss": 2.1848, "learning_rate": 1.8221725817826286e-05, "epoch": 0.6286629303442755, "percentage": 62.88, "elapsed_time": "5:48:14", "remaining_time": "3:25:36"}
+{"current_steps": 1964, "total_steps": 3122, "loss": 2.5737, "learning_rate": 1.819481731488038e-05, "epoch": 0.6289831865492393, "percentage": 62.91, "elapsed_time": "5:48:25", "remaining_time": "3:25:25"}
+{"current_steps": 1965, "total_steps": 3122, "loss": 2.2572, "learning_rate": 1.8167917324020615e-05, "epoch": 0.6293034427542034, "percentage": 62.94, "elapsed_time": "5:48:35", "remaining_time": "3:25:15"}
+{"current_steps": 1966, "total_steps": 3122, "loss": 2.2202, "learning_rate": 1.814102587889414e-05, "epoch": 0.6296236989591674, "percentage": 62.97, "elapsed_time": "5:48:45", "remaining_time": "3:25:04"}
+{"current_steps": 1967, "total_steps": 3122, "loss": 2.5762, "learning_rate": 1.8114143013137434e-05, "epoch": 0.6299439551641313, "percentage": 63.0, "elapsed_time": "5:48:56", "remaining_time": "3:24:53"}
+{"current_steps": 1968, "total_steps": 3122, "loss": 2.2381, "learning_rate": 1.8087268760376237e-05, "epoch": 0.6302642113690953, "percentage": 63.04, "elapsed_time": "5:49:06", "remaining_time": "3:24:42"}
+{"current_steps": 1969, "total_steps": 3122, "loss": 2.179, "learning_rate": 1.806040315422548e-05, "epoch": 0.6305844675740593, "percentage": 63.07, "elapsed_time": "5:49:17", "remaining_time": "3:24:31"}
+{"current_steps": 1970, "total_steps": 3122, "loss": 2.1213, "learning_rate": 1.8033546228289347e-05, "epoch": 0.6309047237790232, "percentage": 63.1, "elapsed_time": "5:49:27", "remaining_time": "3:24:21"}
+{"current_steps": 1971, "total_steps": 3122, "loss": 1.9795, "learning_rate": 1.8006698016161097e-05, "epoch": 0.6312249799839872, "percentage": 63.13, "elapsed_time": "5:49:37", "remaining_time": "3:24:10"}
+{"current_steps": 1972, "total_steps": 3122, "loss": 2.1043, "learning_rate": 1.7979858551423147e-05, "epoch": 0.6315452361889512, "percentage": 63.16, "elapsed_time": "5:49:48", "remaining_time": "3:23:59"}
+{"current_steps": 1973, "total_steps": 3122, "loss": 1.9355, "learning_rate": 1.795302786764692e-05, "epoch": 0.6318654923939151, "percentage": 63.2, "elapsed_time": "5:49:58", "remaining_time": "3:23:48"}
+{"current_steps": 1974, "total_steps": 3122, "loss": 2.4791, "learning_rate": 1.7926205998392888e-05, "epoch": 0.6321857485988791, "percentage": 63.23, "elapsed_time": "5:50:08", "remaining_time": "3:23:37"}
+{"current_steps": 1975, "total_steps": 3122, "loss": 2.5029, "learning_rate": 1.7899392977210498e-05, "epoch": 0.6325060048038431, "percentage": 63.26, "elapsed_time": "5:50:19", "remaining_time": "3:23:27"}
+{"current_steps": 1976, "total_steps": 3122, "loss": 2.1131, "learning_rate": 1.787258883763812e-05, "epoch": 0.632826261008807, "percentage": 63.29, "elapsed_time": "5:50:29", "remaining_time": "3:23:16"}
+{"current_steps": 1977, "total_steps": 3122, "loss": 2.3818, "learning_rate": 1.7845793613203e-05, "epoch": 0.633146517213771, "percentage": 63.32, "elapsed_time": "5:50:40", "remaining_time": "3:23:05"}
+{"current_steps": 1978, "total_steps": 3122, "loss": 2.3837, "learning_rate": 1.7819007337421272e-05, "epoch": 0.633466773418735, "percentage": 63.36, "elapsed_time": "5:50:50", "remaining_time": "3:22:54"}
+{"current_steps": 1979, "total_steps": 3122, "loss": 2.3031, "learning_rate": 1.7792230043797845e-05, "epoch": 0.6337870296236989, "percentage": 63.39, "elapsed_time": "5:51:00", "remaining_time": "3:22:44"}
+{"current_steps": 1980, "total_steps": 3122, "loss": 2.1035, "learning_rate": 1.776546176582639e-05, "epoch": 0.6341072858286629, "percentage": 63.42, "elapsed_time": "5:51:11", "remaining_time": "3:22:33"}
+{"current_steps": 1981, "total_steps": 3122, "loss": 2.4333, "learning_rate": 1.773870253698933e-05, "epoch": 0.634427542033627, "percentage": 63.45, "elapsed_time": "5:51:21", "remaining_time": "3:22:22"}
+{"current_steps": 1982, "total_steps": 3122, "loss": 2.0962, "learning_rate": 1.7711952390757736e-05, "epoch": 0.6347477982385908, "percentage": 63.48, "elapsed_time": "5:51:32", "remaining_time": "3:22:11"}
+{"current_steps": 1983, "total_steps": 3122, "loss": 2.0404, "learning_rate": 1.7685211360591353e-05, "epoch": 0.6350680544435549, "percentage": 63.52, "elapsed_time": "5:51:42", "remaining_time": "3:22:00"}
+{"current_steps": 1984, "total_steps": 3122, "loss": 1.8208, "learning_rate": 1.7658479479938493e-05, "epoch": 0.6353883106485189, "percentage": 63.55, "elapsed_time": "5:51:52", "remaining_time": "3:21:50"}
+{"current_steps": 1985, "total_steps": 3122, "loss": 1.9733, "learning_rate": 1.7631756782236024e-05, "epoch": 0.6357085668534828, "percentage": 63.58, "elapsed_time": "5:52:03", "remaining_time": "3:21:39"}
+{"current_steps": 1986, "total_steps": 3122, "loss": 2.1959, "learning_rate": 1.760504330090937e-05, "epoch": 0.6360288230584468, "percentage": 63.61, "elapsed_time": "5:52:13", "remaining_time": "3:21:28"}
+{"current_steps": 1987, "total_steps": 3122, "loss": 2.3309, "learning_rate": 1.757833906937237e-05, "epoch": 0.6363490792634108, "percentage": 63.65, "elapsed_time": "5:52:24", "remaining_time": "3:21:17"}
+{"current_steps": 1988, "total_steps": 3122, "loss": 2.45, "learning_rate": 1.7551644121027317e-05, "epoch": 0.6366693354683747, "percentage": 63.68, "elapsed_time": "5:52:34", "remaining_time": "3:21:06"}
+{"current_steps": 1989, "total_steps": 3122, "loss": 2.2078, "learning_rate": 1.7524958489264913e-05, "epoch": 0.6369895916733387, "percentage": 63.71, "elapsed_time": "5:52:44", "remaining_time": "3:20:56"}
+{"current_steps": 1990, "total_steps": 3122, "loss": 2.45, "learning_rate": 1.7498282207464185e-05, "epoch": 0.6373098478783027, "percentage": 63.74, "elapsed_time": "5:52:55", "remaining_time": "3:20:45"}
+{"current_steps": 1991, "total_steps": 3122, "loss": 2.5175, "learning_rate": 1.7471615308992444e-05, "epoch": 0.6376301040832666, "percentage": 63.77, "elapsed_time": "5:53:05", "remaining_time": "3:20:34"}
+{"current_steps": 1992, "total_steps": 3122, "loss": 1.9297, "learning_rate": 1.7444957827205318e-05, "epoch": 0.6379503602882306, "percentage": 63.81, "elapsed_time": "5:53:15", "remaining_time": "3:20:23"}
+{"current_steps": 1993, "total_steps": 3122, "loss": 2.3512, "learning_rate": 1.741830979544661e-05, "epoch": 0.6382706164931946, "percentage": 63.84, "elapsed_time": "5:53:26", "remaining_time": "3:20:13"}
+{"current_steps": 1994, "total_steps": 3122, "loss": 2.4583, "learning_rate": 1.7391671247048315e-05, "epoch": 0.6385908726981585, "percentage": 63.87, "elapsed_time": "5:53:36", "remaining_time": "3:20:02"}
+{"current_steps": 1995, "total_steps": 3122, "loss": 2.1487, "learning_rate": 1.7365042215330584e-05, "epoch": 0.6389111289031225, "percentage": 63.9, "elapsed_time": "5:53:47", "remaining_time": "3:19:51"}
+{"current_steps": 1996, "total_steps": 3122, "loss": 1.959, "learning_rate": 1.7338422733601636e-05, "epoch": 0.6392313851080864, "percentage": 63.93, "elapsed_time": "5:53:57", "remaining_time": "3:19:40"}
+{"current_steps": 1997, "total_steps": 3122, "loss": 2.6023, "learning_rate": 1.7311812835157774e-05, "epoch": 0.6395516413130504, "percentage": 63.97, "elapsed_time": "5:54:07", "remaining_time": "3:19:29"}
+{"current_steps": 1998, "total_steps": 3122, "loss": 2.2752, "learning_rate": 1.7285212553283295e-05, "epoch": 0.6398718975180144, "percentage": 64.0, "elapsed_time": "5:54:18", "remaining_time": "3:19:19"}
+{"current_steps": 1999, "total_steps": 3122, "loss": 1.882, "learning_rate": 1.7258621921250454e-05, "epoch": 0.6401921537229783, "percentage": 64.03, "elapsed_time": "5:54:28", "remaining_time": "3:19:08"}
+{"current_steps": 2000, "total_steps": 3122, "loss": 2.0141, "learning_rate": 1.7232040972319474e-05, "epoch": 0.6405124099279423, "percentage": 64.06, "elapsed_time": "5:54:39", "remaining_time": "3:18:57"}
+{"current_steps": 2001, "total_steps": 3122, "loss": 1.99, "learning_rate": 1.7205469739738442e-05, "epoch": 0.6408326661329063, "percentage": 64.09, "elapsed_time": "5:55:15", "remaining_time": "3:19:01"}
+{"current_steps": 2002, "total_steps": 3122, "loss": 1.6528, "learning_rate": 1.7178908256743277e-05, "epoch": 0.6411529223378702, "percentage": 64.13, "elapsed_time": "5:55:25", "remaining_time": "3:18:50"}
+{"current_steps": 2003, "total_steps": 3122, "loss": 2.0187, "learning_rate": 1.7152356556557745e-05, "epoch": 0.6414731785428343, "percentage": 64.16, "elapsed_time": "5:55:36", "remaining_time": "3:18:39"}
+{"current_steps": 2004, "total_steps": 3122, "loss": 2.4054, "learning_rate": 1.7125814672393337e-05, "epoch": 0.6417934347477983, "percentage": 64.19, "elapsed_time": "5:55:46", "remaining_time": "3:18:28"}
+{"current_steps": 2005, "total_steps": 3122, "loss": 1.9533, "learning_rate": 1.7099282637449273e-05, "epoch": 0.6421136909527622, "percentage": 64.22, "elapsed_time": "5:55:56", "remaining_time": "3:18:18"}
+{"current_steps": 2006, "total_steps": 3122, "loss": 2.1352, "learning_rate": 1.7072760484912482e-05, "epoch": 0.6424339471577262, "percentage": 64.25, "elapsed_time": "5:56:07", "remaining_time": "3:18:07"}
+{"current_steps": 2007, "total_steps": 3122, "loss": 2.5819, "learning_rate": 1.70462482479575e-05, "epoch": 0.6427542033626902, "percentage": 64.29, "elapsed_time": "5:56:17", "remaining_time": "3:17:56"}
+{"current_steps": 2008, "total_steps": 3122, "loss": 2.4939, "learning_rate": 1.701974595974645e-05, "epoch": 0.6430744595676541, "percentage": 64.32, "elapsed_time": "5:56:28", "remaining_time": "3:17:45"}
+{"current_steps": 2009, "total_steps": 3122, "loss": 2.0688, "learning_rate": 1.6993253653429063e-05, "epoch": 0.6433947157726181, "percentage": 64.35, "elapsed_time": "5:56:38", "remaining_time": "3:17:34"}
+{"current_steps": 2010, "total_steps": 3122, "loss": 2.3022, "learning_rate": 1.6966771362142532e-05, "epoch": 0.6437149719775821, "percentage": 64.38, "elapsed_time": "5:56:49", "remaining_time": "3:17:24"}
+{"current_steps": 2011, "total_steps": 3122, "loss": 2.4128, "learning_rate": 1.694029911901156e-05, "epoch": 0.644035228182546, "percentage": 64.41, "elapsed_time": "5:56:59", "remaining_time": "3:17:13"}
+{"current_steps": 2012, "total_steps": 3122, "loss": 1.9259, "learning_rate": 1.691383695714826e-05, "epoch": 0.64435548438751, "percentage": 64.45, "elapsed_time": "5:57:09", "remaining_time": "3:17:02"}
+{"current_steps": 2013, "total_steps": 3122, "loss": 2.2305, "learning_rate": 1.688738490965212e-05, "epoch": 0.644675740592474, "percentage": 64.48, "elapsed_time": "5:57:20", "remaining_time": "3:16:51"}
+{"current_steps": 2014, "total_steps": 3122, "loss": 1.9657, "learning_rate": 1.686094300961003e-05, "epoch": 0.6449959967974379, "percentage": 64.51, "elapsed_time": "5:57:30", "remaining_time": "3:16:41"}
+{"current_steps": 2015, "total_steps": 3122, "loss": 2.2175, "learning_rate": 1.683451129009614e-05, "epoch": 0.6453162530024019, "percentage": 64.54, "elapsed_time": "5:57:41", "remaining_time": "3:16:30"}
+{"current_steps": 2016, "total_steps": 3122, "loss": 2.3302, "learning_rate": 1.6808089784171863e-05, "epoch": 0.6456365092073659, "percentage": 64.57, "elapsed_time": "5:57:51", "remaining_time": "3:16:19"}
+{"current_steps": 2017, "total_steps": 3122, "loss": 1.7276, "learning_rate": 1.6781678524885882e-05, "epoch": 0.6459567654123298, "percentage": 64.61, "elapsed_time": "5:58:01", "remaining_time": "3:16:08"}
+{"current_steps": 2018, "total_steps": 3122, "loss": 1.9889, "learning_rate": 1.6755277545274023e-05, "epoch": 0.6462770216172938, "percentage": 64.64, "elapsed_time": "5:58:12", "remaining_time": "3:15:57"}
+{"current_steps": 2019, "total_steps": 3122, "loss": 2.0543, "learning_rate": 1.6728886878359258e-05, "epoch": 0.6465972778222578, "percentage": 64.67, "elapsed_time": "5:58:22", "remaining_time": "3:15:47"}
+{"current_steps": 2020, "total_steps": 3122, "loss": 2.6313, "learning_rate": 1.670250655715168e-05, "epoch": 0.6469175340272217, "percentage": 64.7, "elapsed_time": "5:58:32", "remaining_time": "3:15:36"}
+{"current_steps": 2021, "total_steps": 3122, "loss": 2.2489, "learning_rate": 1.667613661464842e-05, "epoch": 0.6472377902321858, "percentage": 64.73, "elapsed_time": "5:58:43", "remaining_time": "3:15:25"}
+{"current_steps": 2022, "total_steps": 3122, "loss": 2.7663, "learning_rate": 1.664977708383365e-05, "epoch": 0.6475580464371498, "percentage": 64.77, "elapsed_time": "5:58:53", "remaining_time": "3:15:14"}
+{"current_steps": 2023, "total_steps": 3122, "loss": 2.5957, "learning_rate": 1.6623427997678497e-05, "epoch": 0.6478783026421137, "percentage": 64.8, "elapsed_time": "5:59:03", "remaining_time": "3:15:03"}
+{"current_steps": 2024, "total_steps": 3122, "loss": 2.0438, "learning_rate": 1.659708938914102e-05, "epoch": 0.6481985588470777, "percentage": 64.83, "elapsed_time": "5:59:14", "remaining_time": "3:14:52"}
+{"current_steps": 2025, "total_steps": 3122, "loss": 2.1817, "learning_rate": 1.6570761291166207e-05, "epoch": 0.6485188150520417, "percentage": 64.86, "elapsed_time": "5:59:24", "remaining_time": "3:14:42"}
+{"current_steps": 2026, "total_steps": 3122, "loss": 2.3496, "learning_rate": 1.654444373668586e-05, "epoch": 0.6488390712570056, "percentage": 64.89, "elapsed_time": "5:59:34", "remaining_time": "3:14:31"}
+{"current_steps": 2027, "total_steps": 3122, "loss": 2.2006, "learning_rate": 1.6518136758618607e-05, "epoch": 0.6491593274619696, "percentage": 64.93, "elapsed_time": "5:59:45", "remaining_time": "3:14:20"}
+{"current_steps": 2028, "total_steps": 3122, "loss": 1.8331, "learning_rate": 1.649184038986986e-05, "epoch": 0.6494795836669336, "percentage": 64.96, "elapsed_time": "5:59:55", "remaining_time": "3:14:09"}
+{"current_steps": 2029, "total_steps": 3122, "loss": 2.3697, "learning_rate": 1.6465554663331746e-05, "epoch": 0.6497998398718975, "percentage": 64.99, "elapsed_time": "6:00:06", "remaining_time": "3:13:58"}
+{"current_steps": 2030, "total_steps": 3122, "loss": 2.2204, "learning_rate": 1.6439279611883075e-05, "epoch": 0.6501200960768615, "percentage": 65.02, "elapsed_time": "6:00:16", "remaining_time": "3:13:48"}
+{"current_steps": 2031, "total_steps": 3122, "loss": 2.3094, "learning_rate": 1.6413015268389323e-05, "epoch": 0.6504403522818255, "percentage": 65.05, "elapsed_time": "6:00:26", "remaining_time": "3:13:37"}
+{"current_steps": 2032, "total_steps": 3122, "loss": 2.6854, "learning_rate": 1.6386761665702564e-05, "epoch": 0.6507606084867894, "percentage": 65.09, "elapsed_time": "6:00:37", "remaining_time": "3:13:26"}
+{"current_steps": 2033, "total_steps": 3122, "loss": 2.6873, "learning_rate": 1.6360518836661418e-05, "epoch": 0.6510808646917534, "percentage": 65.12, "elapsed_time": "6:00:47", "remaining_time": "3:13:15"}
+{"current_steps": 2034, "total_steps": 3122, "loss": 2.2687, "learning_rate": 1.6334286814091072e-05, "epoch": 0.6514011208967174, "percentage": 65.15, "elapsed_time": "6:00:57", "remaining_time": "3:13:04"}
+{"current_steps": 2035, "total_steps": 3122, "loss": 2.0965, "learning_rate": 1.6308065630803144e-05, "epoch": 0.6517213771016813, "percentage": 65.18, "elapsed_time": "6:01:08", "remaining_time": "3:12:54"}
+{"current_steps": 2036, "total_steps": 3122, "loss": 2.6411, "learning_rate": 1.6281855319595747e-05, "epoch": 0.6520416333066453, "percentage": 65.21, "elapsed_time": "6:01:18", "remaining_time": "3:12:43"}
+{"current_steps": 2037, "total_steps": 3122, "loss": 2.0638, "learning_rate": 1.6255655913253357e-05, "epoch": 0.6523618895116093, "percentage": 65.25, "elapsed_time": "6:01:28", "remaining_time": "3:12:32"}
+{"current_steps": 2038, "total_steps": 3122, "loss": 2.3375, "learning_rate": 1.622946744454681e-05, "epoch": 0.6526821457165732, "percentage": 65.28, "elapsed_time": "6:01:39", "remaining_time": "3:12:21"}
+{"current_steps": 2039, "total_steps": 3122, "loss": 2.0346, "learning_rate": 1.620328994623329e-05, "epoch": 0.6530024019215372, "percentage": 65.31, "elapsed_time": "6:01:49", "remaining_time": "3:12:10"}
+{"current_steps": 2040, "total_steps": 3122, "loss": 2.1022, "learning_rate": 1.617712345105624e-05, "epoch": 0.6533226581265013, "percentage": 65.34, "elapsed_time": "6:02:00", "remaining_time": "3:12:00"}
+{"current_steps": 2041, "total_steps": 3122, "loss": 2.2443, "learning_rate": 1.6150967991745323e-05, "epoch": 0.6536429143314652, "percentage": 65.37, "elapsed_time": "6:02:10", "remaining_time": "3:11:49"}
+{"current_steps": 2042, "total_steps": 3122, "loss": 1.8261, "learning_rate": 1.6124823601016437e-05, "epoch": 0.6539631705364292, "percentage": 65.41, "elapsed_time": "6:02:20", "remaining_time": "3:11:38"}
+{"current_steps": 2043, "total_steps": 3122, "loss": 1.3938, "learning_rate": 1.6098690311571608e-05, "epoch": 0.6542834267413931, "percentage": 65.44, "elapsed_time": "6:02:31", "remaining_time": "3:11:27"}
+{"current_steps": 2044, "total_steps": 3122, "loss": 2.2079, "learning_rate": 1.6072568156098972e-05, "epoch": 0.6546036829463571, "percentage": 65.47, "elapsed_time": "6:02:41", "remaining_time": "3:11:16"}
+{"current_steps": 2045, "total_steps": 3122, "loss": 1.7936, "learning_rate": 1.6046457167272773e-05, "epoch": 0.6549239391513211, "percentage": 65.5, "elapsed_time": "6:02:51", "remaining_time": "3:11:06"}
+{"current_steps": 2046, "total_steps": 3122, "loss": 2.3265, "learning_rate": 1.6020357377753237e-05, "epoch": 0.655244195356285, "percentage": 65.53, "elapsed_time": "6:03:02", "remaining_time": "3:10:55"}
+{"current_steps": 2047, "total_steps": 3122, "loss": 2.1049, "learning_rate": 1.5994268820186624e-05, "epoch": 0.655564451561249, "percentage": 65.57, "elapsed_time": "6:03:12", "remaining_time": "3:10:44"}
+{"current_steps": 2048, "total_steps": 3122, "loss": 2.2532, "learning_rate": 1.5968191527205134e-05, "epoch": 0.655884707766213, "percentage": 65.6, "elapsed_time": "6:03:22", "remaining_time": "3:10:33"}
+{"current_steps": 2049, "total_steps": 3122, "loss": 2.5682, "learning_rate": 1.5942125531426848e-05, "epoch": 0.6562049639711769, "percentage": 65.63, "elapsed_time": "6:03:33", "remaining_time": "3:10:22"}
+{"current_steps": 2050, "total_steps": 3122, "loss": 2.6043, "learning_rate": 1.591607086545577e-05, "epoch": 0.6565252201761409, "percentage": 65.66, "elapsed_time": "6:03:43", "remaining_time": "3:10:12"}
+{"current_steps": 2051, "total_steps": 3122, "loss": 1.8284, "learning_rate": 1.589002756188169e-05, "epoch": 0.6568454763811049, "percentage": 65.7, "elapsed_time": "6:03:54", "remaining_time": "3:10:01"}
+{"current_steps": 2052, "total_steps": 3122, "loss": 2.0559, "learning_rate": 1.5863995653280187e-05, "epoch": 0.6571657325860688, "percentage": 65.73, "elapsed_time": "6:04:04", "remaining_time": "3:09:50"}
+{"current_steps": 2053, "total_steps": 3122, "loss": 2.0543, "learning_rate": 1.5837975172212615e-05, "epoch": 0.6574859887910328, "percentage": 65.76, "elapsed_time": "6:04:14", "remaining_time": "3:09:39"}
+{"current_steps": 2054, "total_steps": 3122, "loss": 2.0767, "learning_rate": 1.5811966151226014e-05, "epoch": 0.6578062449959968, "percentage": 65.79, "elapsed_time": "6:04:25", "remaining_time": "3:09:28"}
+{"current_steps": 2055, "total_steps": 3122, "loss": 2.3316, "learning_rate": 1.578596862285308e-05, "epoch": 0.6581265012009607, "percentage": 65.82, "elapsed_time": "6:04:35", "remaining_time": "3:09:18"}
+{"current_steps": 2056, "total_steps": 3122, "loss": 2.4229, "learning_rate": 1.575998261961217e-05, "epoch": 0.6584467574059247, "percentage": 65.86, "elapsed_time": "6:04:45", "remaining_time": "3:09:07"}
+{"current_steps": 2057, "total_steps": 3122, "loss": 2.3858, "learning_rate": 1.5734008174007182e-05, "epoch": 0.6587670136108887, "percentage": 65.89, "elapsed_time": "6:04:56", "remaining_time": "3:08:56"}
+{"current_steps": 2058, "total_steps": 3122, "loss": 2.5705, "learning_rate": 1.5708045318527583e-05, "epoch": 0.6590872698158526, "percentage": 65.92, "elapsed_time": "6:05:06", "remaining_time": "3:08:45"}
+{"current_steps": 2059, "total_steps": 3122, "loss": 2.8622, "learning_rate": 1.568209408564834e-05, "epoch": 0.6594075260208166, "percentage": 65.95, "elapsed_time": "6:05:16", "remaining_time": "3:08:35"}
+{"current_steps": 2060, "total_steps": 3122, "loss": 2.4677, "learning_rate": 1.5656154507829867e-05, "epoch": 0.6597277822257807, "percentage": 65.98, "elapsed_time": "6:05:27", "remaining_time": "3:08:24"}
+{"current_steps": 2061, "total_steps": 3122, "loss": 2.4751, "learning_rate": 1.5630226617518033e-05, "epoch": 0.6600480384307446, "percentage": 66.02, "elapsed_time": "6:05:37", "remaining_time": "3:08:13"}
+{"current_steps": 2062, "total_steps": 3122, "loss": 2.2698, "learning_rate": 1.560431044714405e-05, "epoch": 0.6603682946357086, "percentage": 66.05, "elapsed_time": "6:05:48", "remaining_time": "3:08:02"}
+{"current_steps": 2063, "total_steps": 3122, "loss": 2.0726, "learning_rate": 1.5578406029124485e-05, "epoch": 0.6606885508406726, "percentage": 66.08, "elapsed_time": "6:05:58", "remaining_time": "3:07:51"}
+{"current_steps": 2064, "total_steps": 3122, "loss": 1.9642, "learning_rate": 1.555251339586123e-05, "epoch": 0.6610088070456365, "percentage": 66.11, "elapsed_time": "6:06:08", "remaining_time": "3:07:41"}
+{"current_steps": 2065, "total_steps": 3122, "loss": 1.9934, "learning_rate": 1.5526632579741386e-05, "epoch": 0.6613290632506005, "percentage": 66.14, "elapsed_time": "6:06:19", "remaining_time": "3:07:30"}
+{"current_steps": 2066, "total_steps": 3122, "loss": 2.7078, "learning_rate": 1.5500763613137316e-05, "epoch": 0.6616493194555645, "percentage": 66.18, "elapsed_time": "6:06:29", "remaining_time": "3:07:19"}
+{"current_steps": 2067, "total_steps": 3122, "loss": 2.3785, "learning_rate": 1.5474906528406542e-05, "epoch": 0.6619695756605284, "percentage": 66.21, "elapsed_time": "6:06:39", "remaining_time": "3:07:08"}
+{"current_steps": 2068, "total_steps": 3122, "loss": 2.1679, "learning_rate": 1.544906135789172e-05, "epoch": 0.6622898318654924, "percentage": 66.24, "elapsed_time": "6:06:50", "remaining_time": "3:06:57"}
+{"current_steps": 2069, "total_steps": 3122, "loss": 2.3335, "learning_rate": 1.542322813392062e-05, "epoch": 0.6626100880704564, "percentage": 66.27, "elapsed_time": "6:07:00", "remaining_time": "3:06:47"}
+{"current_steps": 2070, "total_steps": 3122, "loss": 2.1106, "learning_rate": 1.5397406888806063e-05, "epoch": 0.6629303442754203, "percentage": 66.3, "elapsed_time": "6:07:10", "remaining_time": "3:06:36"}
+{"current_steps": 2071, "total_steps": 3122, "loss": 1.8888, "learning_rate": 1.537159765484587e-05, "epoch": 0.6632506004803843, "percentage": 66.34, "elapsed_time": "6:07:21", "remaining_time": "3:06:25"}
+{"current_steps": 2072, "total_steps": 3122, "loss": 2.4113, "learning_rate": 1.5345800464322856e-05, "epoch": 0.6635708566853483, "percentage": 66.37, "elapsed_time": "6:07:31", "remaining_time": "3:06:14"}
+{"current_steps": 2073, "total_steps": 3122, "loss": 1.6792, "learning_rate": 1.5320015349504778e-05, "epoch": 0.6638911128903122, "percentage": 66.4, "elapsed_time": "6:07:42", "remaining_time": "3:06:04"}
+{"current_steps": 2074, "total_steps": 3122, "loss": 2.4077, "learning_rate": 1.529424234264426e-05, "epoch": 0.6642113690952762, "percentage": 66.43, "elapsed_time": "6:07:52", "remaining_time": "3:05:53"}
+{"current_steps": 2075, "total_steps": 3122, "loss": 2.5355, "learning_rate": 1.5268481475978817e-05, "epoch": 0.6645316253002402, "percentage": 66.46, "elapsed_time": "6:08:02", "remaining_time": "3:05:42"}
+{"current_steps": 2076, "total_steps": 3122, "loss": 2.0814, "learning_rate": 1.5242732781730749e-05, "epoch": 0.6648518815052041, "percentage": 66.5, "elapsed_time": "6:08:13", "remaining_time": "3:05:31"}
+{"current_steps": 2077, "total_steps": 3122, "loss": 2.5232, "learning_rate": 1.5216996292107144e-05, "epoch": 0.6651721377101681, "percentage": 66.53, "elapsed_time": "6:08:23", "remaining_time": "3:05:20"}
+{"current_steps": 2078, "total_steps": 3122, "loss": 2.3116, "learning_rate": 1.5191272039299825e-05, "epoch": 0.6654923939151322, "percentage": 66.56, "elapsed_time": "6:08:33", "remaining_time": "3:05:10"}
+{"current_steps": 2079, "total_steps": 3122, "loss": 1.9626, "learning_rate": 1.5165560055485301e-05, "epoch": 0.665812650120096, "percentage": 66.59, "elapsed_time": "6:08:44", "remaining_time": "3:04:59"}
+{"current_steps": 2080, "total_steps": 3122, "loss": 1.8281, "learning_rate": 1.5139860372824741e-05, "epoch": 0.6661329063250601, "percentage": 66.62, "elapsed_time": "6:08:54", "remaining_time": "3:04:48"}
+{"current_steps": 2081, "total_steps": 3122, "loss": 2.2899, "learning_rate": 1.5114173023463932e-05, "epoch": 0.6664531625300241, "percentage": 66.66, "elapsed_time": "6:09:04", "remaining_time": "3:04:37"}
+{"current_steps": 2082, "total_steps": 3122, "loss": 1.9186, "learning_rate": 1.5088498039533219e-05, "epoch": 0.666773418734988, "percentage": 66.69, "elapsed_time": "6:09:15", "remaining_time": "3:04:27"}
+{"current_steps": 2083, "total_steps": 3122, "loss": 2.5786, "learning_rate": 1.5062835453147495e-05, "epoch": 0.667093674939952, "percentage": 66.72, "elapsed_time": "6:09:25", "remaining_time": "3:04:16"}
+{"current_steps": 2084, "total_steps": 3122, "loss": 2.3842, "learning_rate": 1.5037185296406142e-05, "epoch": 0.667413931144916, "percentage": 66.75, "elapsed_time": "6:09:36", "remaining_time": "3:04:05"}
+{"current_steps": 2085, "total_steps": 3122, "loss": 2.313, "learning_rate": 1.5011547601392983e-05, "epoch": 0.6677341873498799, "percentage": 66.78, "elapsed_time": "6:09:46", "remaining_time": "3:03:54"}
+{"current_steps": 2086, "total_steps": 3122, "loss": 2.6968, "learning_rate": 1.4985922400176278e-05, "epoch": 0.6680544435548439, "percentage": 66.82, "elapsed_time": "6:09:56", "remaining_time": "3:03:43"}
+{"current_steps": 2087, "total_steps": 3122, "loss": 1.9038, "learning_rate": 1.4960309724808633e-05, "epoch": 0.6683746997598079, "percentage": 66.85, "elapsed_time": "6:10:07", "remaining_time": "3:03:33"}
+{"current_steps": 2088, "total_steps": 3122, "loss": 1.8091, "learning_rate": 1.4934709607327001e-05, "epoch": 0.6686949559647718, "percentage": 66.88, "elapsed_time": "6:10:17", "remaining_time": "3:03:22"}
+{"current_steps": 2089, "total_steps": 3122, "loss": 2.426, "learning_rate": 1.4909122079752632e-05, "epoch": 0.6690152121697358, "percentage": 66.91, "elapsed_time": "6:10:27", "remaining_time": "3:03:11"}
+{"current_steps": 2090, "total_steps": 3122, "loss": 1.9204, "learning_rate": 1.4883547174091011e-05, "epoch": 0.6693354683746997, "percentage": 66.94, "elapsed_time": "6:10:38", "remaining_time": "3:03:00"}
+{"current_steps": 2091, "total_steps": 3122, "loss": 2.1271, "learning_rate": 1.4857984922331847e-05, "epoch": 0.6696557245796637, "percentage": 66.98, "elapsed_time": "6:10:48", "remaining_time": "3:02:49"}
+{"current_steps": 2092, "total_steps": 3122, "loss": 2.5165, "learning_rate": 1.4832435356449026e-05, "epoch": 0.6699759807846277, "percentage": 67.01, "elapsed_time": "6:10:58", "remaining_time": "3:02:39"}
+{"current_steps": 2093, "total_steps": 3122, "loss": 1.994, "learning_rate": 1.4806898508400552e-05, "epoch": 0.6702962369895916, "percentage": 67.04, "elapsed_time": "6:11:09", "remaining_time": "3:02:28"}
+{"current_steps": 2094, "total_steps": 3122, "loss": 2.0746, "learning_rate": 1.478137441012853e-05, "epoch": 0.6706164931945556, "percentage": 67.07, "elapsed_time": "6:11:19", "remaining_time": "3:02:17"}
+{"current_steps": 2095, "total_steps": 3122, "loss": 1.7466, "learning_rate": 1.4755863093559118e-05, "epoch": 0.6709367493995196, "percentage": 67.1, "elapsed_time": "6:11:30", "remaining_time": "3:02:06"}
+{"current_steps": 2096, "total_steps": 3122, "loss": 2.247, "learning_rate": 1.473036459060248e-05, "epoch": 0.6712570056044835, "percentage": 67.14, "elapsed_time": "6:11:40", "remaining_time": "3:01:56"}
+{"current_steps": 2097, "total_steps": 3122, "loss": 2.4396, "learning_rate": 1.4704878933152761e-05, "epoch": 0.6715772618094475, "percentage": 67.17, "elapsed_time": "6:11:50", "remaining_time": "3:01:45"}
+{"current_steps": 2098, "total_steps": 3122, "loss": 2.3092, "learning_rate": 1.4679406153088032e-05, "epoch": 0.6718975180144116, "percentage": 67.2, "elapsed_time": "6:12:01", "remaining_time": "3:01:34"}
+{"current_steps": 2099, "total_steps": 3122, "loss": 2.0661, "learning_rate": 1.4653946282270258e-05, "epoch": 0.6722177742193755, "percentage": 67.23, "elapsed_time": "6:12:11", "remaining_time": "3:01:23"}
+{"current_steps": 2100, "total_steps": 3122, "loss": 2.3798, "learning_rate": 1.4628499352545266e-05, "epoch": 0.6725380304243395, "percentage": 67.26, "elapsed_time": "6:12:21", "remaining_time": "3:01:13"}
+{"current_steps": 2101, "total_steps": 3122, "loss": 2.1861, "learning_rate": 1.4603065395742677e-05, "epoch": 0.6728582866293035, "percentage": 67.3, "elapsed_time": "6:12:58", "remaining_time": "3:01:15"}
+{"current_steps": 2102, "total_steps": 3122, "loss": 1.6774, "learning_rate": 1.4577644443675895e-05, "epoch": 0.6731785428342674, "percentage": 67.33, "elapsed_time": "6:13:08", "remaining_time": "3:01:04"}
+{"current_steps": 2103, "total_steps": 3122, "loss": 2.7617, "learning_rate": 1.4552236528142078e-05, "epoch": 0.6734987990392314, "percentage": 67.36, "elapsed_time": "6:13:19", "remaining_time": "3:00:53"}
+{"current_steps": 2104, "total_steps": 3122, "loss": 2.9759, "learning_rate": 1.452684168092203e-05, "epoch": 0.6738190552441954, "percentage": 67.39, "elapsed_time": "6:13:29", "remaining_time": "3:00:42"}
+{"current_steps": 2105, "total_steps": 3122, "loss": 2.4151, "learning_rate": 1.4501459933780249e-05, "epoch": 0.6741393114491593, "percentage": 67.42, "elapsed_time": "6:13:39", "remaining_time": "3:00:31"}
+{"current_steps": 2106, "total_steps": 3122, "loss": 2.0188, "learning_rate": 1.4476091318464836e-05, "epoch": 0.6744595676541233, "percentage": 67.46, "elapsed_time": "6:13:50", "remaining_time": "3:00:21"}
+{"current_steps": 2107, "total_steps": 3122, "loss": 2.5587, "learning_rate": 1.4450735866707474e-05, "epoch": 0.6747798238590873, "percentage": 67.49, "elapsed_time": "6:14:00", "remaining_time": "3:00:10"}
+{"current_steps": 2108, "total_steps": 3122, "loss": 2.2319, "learning_rate": 1.4425393610223342e-05, "epoch": 0.6751000800640512, "percentage": 67.52, "elapsed_time": "6:14:11", "remaining_time": "2:59:59"}
+{"current_steps": 2109, "total_steps": 3122, "loss": 2.3308, "learning_rate": 1.4400064580711182e-05, "epoch": 0.6754203362690152, "percentage": 67.55, "elapsed_time": "6:14:21", "remaining_time": "2:59:48"}
+{"current_steps": 2110, "total_steps": 3122, "loss": 1.9952, "learning_rate": 1.4374748809853125e-05, "epoch": 0.6757405924739792, "percentage": 67.58, "elapsed_time": "6:14:32", "remaining_time": "2:59:38"}
+{"current_steps": 2111, "total_steps": 3122, "loss": 2.4647, "learning_rate": 1.4349446329314756e-05, "epoch": 0.6760608486789431, "percentage": 67.62, "elapsed_time": "6:14:42", "remaining_time": "2:59:27"}
+{"current_steps": 2112, "total_steps": 3122, "loss": 2.0062, "learning_rate": 1.4324157170745025e-05, "epoch": 0.6763811048839071, "percentage": 67.65, "elapsed_time": "6:14:52", "remaining_time": "2:59:16"}
+{"current_steps": 2113, "total_steps": 3122, "loss": 2.5416, "learning_rate": 1.429888136577622e-05, "epoch": 0.6767013610888711, "percentage": 67.68, "elapsed_time": "6:15:03", "remaining_time": "2:59:05"}
+{"current_steps": 2114, "total_steps": 3122, "loss": 2.4491, "learning_rate": 1.4273618946023925e-05, "epoch": 0.677021617293835, "percentage": 67.71, "elapsed_time": "6:15:13", "remaining_time": "2:58:55"}
+{"current_steps": 2115, "total_steps": 3122, "loss": 2.3076, "learning_rate": 1.4248369943086998e-05, "epoch": 0.677341873498799, "percentage": 67.75, "elapsed_time": "6:15:24", "remaining_time": "2:58:44"}
+{"current_steps": 2116, "total_steps": 3122, "loss": 2.4278, "learning_rate": 1.422313438854746e-05, "epoch": 0.677662129703763, "percentage": 67.78, "elapsed_time": "6:15:34", "remaining_time": "2:58:33"}
+{"current_steps": 2117, "total_steps": 3122, "loss": 2.1202, "learning_rate": 1.419791231397059e-05, "epoch": 0.677982385908727, "percentage": 67.81, "elapsed_time": "6:15:44", "remaining_time": "2:58:22"}
+{"current_steps": 2118, "total_steps": 3122, "loss": 1.8748, "learning_rate": 1.4172703750904746e-05, "epoch": 0.678302642113691, "percentage": 67.84, "elapsed_time": "6:15:55", "remaining_time": "2:58:11"}
+{"current_steps": 2119, "total_steps": 3122, "loss": 2.3358, "learning_rate": 1.4147508730881403e-05, "epoch": 0.678622898318655, "percentage": 67.87, "elapsed_time": "6:16:05", "remaining_time": "2:58:01"}
+{"current_steps": 2120, "total_steps": 3122, "loss": 2.2464, "learning_rate": 1.4122327285415105e-05, "epoch": 0.6789431545236189, "percentage": 67.91, "elapsed_time": "6:16:15", "remaining_time": "2:57:50"}
+{"current_steps": 2121, "total_steps": 3122, "loss": 2.0882, "learning_rate": 1.4097159446003417e-05, "epoch": 0.6792634107285829, "percentage": 67.94, "elapsed_time": "6:16:26", "remaining_time": "2:57:39"}
+{"current_steps": 2122, "total_steps": 3122, "loss": 1.9614, "learning_rate": 1.4072005244126846e-05, "epoch": 0.6795836669335469, "percentage": 67.97, "elapsed_time": "6:16:36", "remaining_time": "2:57:28"}
+{"current_steps": 2123, "total_steps": 3122, "loss": 2.0258, "learning_rate": 1.4046864711248913e-05, "epoch": 0.6799039231385108, "percentage": 68.0, "elapsed_time": "6:16:47", "remaining_time": "2:57:17"}
+{"current_steps": 2124, "total_steps": 3122, "loss": 1.9489, "learning_rate": 1.4021737878815966e-05, "epoch": 0.6802241793434748, "percentage": 68.03, "elapsed_time": "6:16:57", "remaining_time": "2:57:07"}
+{"current_steps": 2125, "total_steps": 3122, "loss": 2.5073, "learning_rate": 1.3996624778257287e-05, "epoch": 0.6805444355484388, "percentage": 68.07, "elapsed_time": "6:17:07", "remaining_time": "2:56:56"}
+{"current_steps": 2126, "total_steps": 3122, "loss": 1.9678, "learning_rate": 1.3971525440984914e-05, "epoch": 0.6808646917534027, "percentage": 68.1, "elapsed_time": "6:17:18", "remaining_time": "2:56:45"}
+{"current_steps": 2127, "total_steps": 3122, "loss": 2.1684, "learning_rate": 1.3946439898393718e-05, "epoch": 0.6811849479583667, "percentage": 68.13, "elapsed_time": "6:17:28", "remaining_time": "2:56:34"}
+{"current_steps": 2128, "total_steps": 3122, "loss": 2.5053, "learning_rate": 1.3921368181861293e-05, "epoch": 0.6815052041633307, "percentage": 68.16, "elapsed_time": "6:17:38", "remaining_time": "2:56:24"}
+{"current_steps": 2129, "total_steps": 3122, "loss": 2.5186, "learning_rate": 1.3896310322747957e-05, "epoch": 0.6818254603682946, "percentage": 68.19, "elapsed_time": "6:17:49", "remaining_time": "2:56:13"}
+{"current_steps": 2130, "total_steps": 3122, "loss": 2.1431, "learning_rate": 1.3871266352396656e-05, "epoch": 0.6821457165732586, "percentage": 68.23, "elapsed_time": "6:17:59", "remaining_time": "2:56:02"}
+{"current_steps": 2131, "total_steps": 3122, "loss": 2.2754, "learning_rate": 1.3846236302133023e-05, "epoch": 0.6824659727782226, "percentage": 68.26, "elapsed_time": "6:18:09", "remaining_time": "2:55:51"}
+{"current_steps": 2132, "total_steps": 3122, "loss": 2.122, "learning_rate": 1.3821220203265223e-05, "epoch": 0.6827862289831865, "percentage": 68.29, "elapsed_time": "6:18:20", "remaining_time": "2:55:40"}
+{"current_steps": 2133, "total_steps": 3122, "loss": 2.2143, "learning_rate": 1.3796218087084e-05, "epoch": 0.6831064851881505, "percentage": 68.32, "elapsed_time": "6:18:30", "remaining_time": "2:55:30"}
+{"current_steps": 2134, "total_steps": 3122, "loss": 2.6696, "learning_rate": 1.3771229984862608e-05, "epoch": 0.6834267413931145, "percentage": 68.35, "elapsed_time": "6:18:40", "remaining_time": "2:55:19"}
+{"current_steps": 2135, "total_steps": 3122, "loss": 2.481, "learning_rate": 1.374625592785677e-05, "epoch": 0.6837469975980784, "percentage": 68.39, "elapsed_time": "6:18:51", "remaining_time": "2:55:08"}
+{"current_steps": 2136, "total_steps": 3122, "loss": 2.4655, "learning_rate": 1.3721295947304607e-05, "epoch": 0.6840672538030425, "percentage": 68.42, "elapsed_time": "6:19:01", "remaining_time": "2:54:57"}
+{"current_steps": 2137, "total_steps": 3122, "loss": 2.3388, "learning_rate": 1.3696350074426708e-05, "epoch": 0.6843875100080064, "percentage": 68.45, "elapsed_time": "6:19:12", "remaining_time": "2:54:47"}
+{"current_steps": 2138, "total_steps": 3122, "loss": 2.2813, "learning_rate": 1.3671418340425928e-05, "epoch": 0.6847077662129704, "percentage": 68.48, "elapsed_time": "6:19:22", "remaining_time": "2:54:36"}
+{"current_steps": 2139, "total_steps": 3122, "loss": 2.7145, "learning_rate": 1.3646500776487519e-05, "epoch": 0.6850280224179344, "percentage": 68.51, "elapsed_time": "6:19:32", "remaining_time": "2:54:25"}
+{"current_steps": 2140, "total_steps": 3122, "loss": 2.4922, "learning_rate": 1.3621597413778939e-05, "epoch": 0.6853482786228983, "percentage": 68.55, "elapsed_time": "6:19:43", "remaining_time": "2:54:14"}
+{"current_steps": 2141, "total_steps": 3122, "loss": 2.0813, "learning_rate": 1.3596708283449921e-05, "epoch": 0.6856685348278623, "percentage": 68.58, "elapsed_time": "6:19:53", "remaining_time": "2:54:03"}
+{"current_steps": 2142, "total_steps": 3122, "loss": 1.8429, "learning_rate": 1.3571833416632396e-05, "epoch": 0.6859887910328263, "percentage": 68.61, "elapsed_time": "6:20:03", "remaining_time": "2:53:53"}
+{"current_steps": 2143, "total_steps": 3122, "loss": 2.3635, "learning_rate": 1.3546972844440441e-05, "epoch": 0.6863090472377902, "percentage": 68.64, "elapsed_time": "6:20:14", "remaining_time": "2:53:42"}
+{"current_steps": 2144, "total_steps": 3122, "loss": 2.161, "learning_rate": 1.3522126597970244e-05, "epoch": 0.6866293034427542, "percentage": 68.67, "elapsed_time": "6:20:24", "remaining_time": "2:53:31"}
+{"current_steps": 2145, "total_steps": 3122, "loss": 2.2284, "learning_rate": 1.3497294708300118e-05, "epoch": 0.6869495596477182, "percentage": 68.71, "elapsed_time": "6:20:34", "remaining_time": "2:53:20"}
+{"current_steps": 2146, "total_steps": 3122, "loss": 2.4539, "learning_rate": 1.3472477206490355e-05, "epoch": 0.6872698158526821, "percentage": 68.74, "elapsed_time": "6:20:45", "remaining_time": "2:53:10"}
+{"current_steps": 2147, "total_steps": 3122, "loss": 2.5645, "learning_rate": 1.34476741235833e-05, "epoch": 0.6875900720576461, "percentage": 68.77, "elapsed_time": "6:20:55", "remaining_time": "2:52:59"}
+{"current_steps": 2148, "total_steps": 3122, "loss": 2.0052, "learning_rate": 1.3422885490603244e-05, "epoch": 0.6879103282626101, "percentage": 68.8, "elapsed_time": "6:21:05", "remaining_time": "2:52:48"}
+{"current_steps": 2149, "total_steps": 3122, "loss": 1.8642, "learning_rate": 1.3398111338556412e-05, "epoch": 0.688230584467574, "percentage": 68.83, "elapsed_time": "6:21:16", "remaining_time": "2:52:37"}
+{"current_steps": 2150, "total_steps": 3122, "loss": 2.543, "learning_rate": 1.3373351698430884e-05, "epoch": 0.688550840672538, "percentage": 68.87, "elapsed_time": "6:21:26", "remaining_time": "2:52:26"}
+{"current_steps": 2151, "total_steps": 3122, "loss": 2.08, "learning_rate": 1.3348606601196648e-05, "epoch": 0.688871096877502, "percentage": 68.9, "elapsed_time": "6:21:37", "remaining_time": "2:52:16"}
+{"current_steps": 2152, "total_steps": 3122, "loss": 1.7781, "learning_rate": 1.332387607780543e-05, "epoch": 0.6891913530824659, "percentage": 68.93, "elapsed_time": "6:21:47", "remaining_time": "2:52:05"}
+{"current_steps": 2153, "total_steps": 3122, "loss": 2.3629, "learning_rate": 1.3299160159190801e-05, "epoch": 0.6895116092874299, "percentage": 68.96, "elapsed_time": "6:21:57", "remaining_time": "2:51:54"}
+{"current_steps": 2154, "total_steps": 3122, "loss": 2.1964, "learning_rate": 1.3274458876267998e-05, "epoch": 0.689831865492394, "percentage": 68.99, "elapsed_time": "6:22:08", "remaining_time": "2:51:43"}
+{"current_steps": 2155, "total_steps": 3122, "loss": 1.7751, "learning_rate": 1.324977225993399e-05, "epoch": 0.6901521216973578, "percentage": 69.03, "elapsed_time": "6:22:18", "remaining_time": "2:51:33"}
+{"current_steps": 2156, "total_steps": 3122, "loss": 1.352, "learning_rate": 1.3225100341067393e-05, "epoch": 0.6904723779023219, "percentage": 69.06, "elapsed_time": "6:22:28", "remaining_time": "2:51:22"}
+{"current_steps": 2157, "total_steps": 3122, "loss": 1.7647, "learning_rate": 1.3200443150528438e-05, "epoch": 0.6907926341072859, "percentage": 69.09, "elapsed_time": "6:22:39", "remaining_time": "2:51:11"}
+{"current_steps": 2158, "total_steps": 3122, "loss": 1.7487, "learning_rate": 1.317580071915891e-05, "epoch": 0.6911128903122498, "percentage": 69.12, "elapsed_time": "6:22:49", "remaining_time": "2:51:00"}
+{"current_steps": 2159, "total_steps": 3122, "loss": 2.8391, "learning_rate": 1.3151173077782192e-05, "epoch": 0.6914331465172138, "percentage": 69.15, "elapsed_time": "6:22:59", "remaining_time": "2:50:49"}
+{"current_steps": 2160, "total_steps": 3122, "loss": 2.3178, "learning_rate": 1.3126560257203097e-05, "epoch": 0.6917534027221778, "percentage": 69.19, "elapsed_time": "6:23:10", "remaining_time": "2:50:39"}
+{"current_steps": 2161, "total_steps": 3122, "loss": 1.708, "learning_rate": 1.3101962288207948e-05, "epoch": 0.6920736589271417, "percentage": 69.22, "elapsed_time": "6:23:20", "remaining_time": "2:50:28"}
+{"current_steps": 2162, "total_steps": 3122, "loss": 1.5599, "learning_rate": 1.3077379201564472e-05, "epoch": 0.6923939151321057, "percentage": 69.25, "elapsed_time": "6:23:30", "remaining_time": "2:50:17"}
+{"current_steps": 2163, "total_steps": 3122, "loss": 2.1572, "learning_rate": 1.3052811028021788e-05, "epoch": 0.6927141713370697, "percentage": 69.28, "elapsed_time": "6:23:41", "remaining_time": "2:50:06"}
+{"current_steps": 2164, "total_steps": 3122, "loss": 2.1006, "learning_rate": 1.3028257798310356e-05, "epoch": 0.6930344275420336, "percentage": 69.31, "elapsed_time": "6:23:51", "remaining_time": "2:49:56"}
+{"current_steps": 2165, "total_steps": 3122, "loss": 2.0096, "learning_rate": 1.3003719543141957e-05, "epoch": 0.6933546837469976, "percentage": 69.35, "elapsed_time": "6:24:02", "remaining_time": "2:49:45"}
+{"current_steps": 2166, "total_steps": 3122, "loss": 2.0032, "learning_rate": 1.29791962932096e-05, "epoch": 0.6936749399519616, "percentage": 69.38, "elapsed_time": "6:24:12", "remaining_time": "2:49:34"}
+{"current_steps": 2167, "total_steps": 3122, "loss": 2.5821, "learning_rate": 1.29546880791876e-05, "epoch": 0.6939951961569255, "percentage": 69.41, "elapsed_time": "6:24:22", "remaining_time": "2:49:23"}
+{"current_steps": 2168, "total_steps": 3122, "loss": 2.3261, "learning_rate": 1.2930194931731382e-05, "epoch": 0.6943154523618895, "percentage": 69.44, "elapsed_time": "6:24:33", "remaining_time": "2:49:13"}
+{"current_steps": 2169, "total_steps": 3122, "loss": 2.4759, "learning_rate": 1.290571688147758e-05, "epoch": 0.6946357085668535, "percentage": 69.47, "elapsed_time": "6:24:43", "remaining_time": "2:49:02"}
+{"current_steps": 2170, "total_steps": 3122, "loss": 2.61, "learning_rate": 1.2881253959043926e-05, "epoch": 0.6949559647718174, "percentage": 69.51, "elapsed_time": "6:24:53", "remaining_time": "2:48:51"}
+{"current_steps": 2171, "total_steps": 3122, "loss": 2.443, "learning_rate": 1.2856806195029241e-05, "epoch": 0.6952762209767814, "percentage": 69.54, "elapsed_time": "6:25:04", "remaining_time": "2:48:40"}
+{"current_steps": 2172, "total_steps": 3122, "loss": 2.3406, "learning_rate": 1.2832373620013352e-05, "epoch": 0.6955964771817454, "percentage": 69.57, "elapsed_time": "6:25:14", "remaining_time": "2:48:29"}
+{"current_steps": 2173, "total_steps": 3122, "loss": 2.389, "learning_rate": 1.280795626455714e-05, "epoch": 0.6959167333867093, "percentage": 69.6, "elapsed_time": "6:25:24", "remaining_time": "2:48:19"}
+{"current_steps": 2174, "total_steps": 3122, "loss": 2.4067, "learning_rate": 1.2783554159202404e-05, "epoch": 0.6962369895916733, "percentage": 69.63, "elapsed_time": "6:25:35", "remaining_time": "2:48:08"}
+{"current_steps": 2175, "total_steps": 3122, "loss": 2.178, "learning_rate": 1.2759167334471884e-05, "epoch": 0.6965572457966374, "percentage": 69.67, "elapsed_time": "6:25:45", "remaining_time": "2:47:57"}
+{"current_steps": 2176, "total_steps": 3122, "loss": 2.0938, "learning_rate": 1.2734795820869208e-05, "epoch": 0.6968775020016013, "percentage": 69.7, "elapsed_time": "6:25:56", "remaining_time": "2:47:46"}
+{"current_steps": 2177, "total_steps": 3122, "loss": 1.9665, "learning_rate": 1.2710439648878855e-05, "epoch": 0.6971977582065653, "percentage": 69.73, "elapsed_time": "6:26:06", "remaining_time": "2:47:36"}
+{"current_steps": 2178, "total_steps": 3122, "loss": 2.3108, "learning_rate": 1.2686098848966107e-05, "epoch": 0.6975180144115293, "percentage": 69.76, "elapsed_time": "6:26:16", "remaining_time": "2:47:25"}
+{"current_steps": 2179, "total_steps": 3122, "loss": 1.9203, "learning_rate": 1.2661773451577036e-05, "epoch": 0.6978382706164932, "percentage": 69.8, "elapsed_time": "6:26:27", "remaining_time": "2:47:14"}
+{"current_steps": 2180, "total_steps": 3122, "loss": 2.6032, "learning_rate": 1.2637463487138398e-05, "epoch": 0.6981585268214572, "percentage": 69.83, "elapsed_time": "6:26:37", "remaining_time": "2:47:03"}
+{"current_steps": 2181, "total_steps": 3122, "loss": 2.3923, "learning_rate": 1.2613168986057728e-05, "epoch": 0.6984787830264212, "percentage": 69.86, "elapsed_time": "6:26:47", "remaining_time": "2:46:53"}
+{"current_steps": 2182, "total_steps": 3122, "loss": 1.8835, "learning_rate": 1.2588889978723134e-05, "epoch": 0.6987990392313851, "percentage": 69.89, "elapsed_time": "6:26:58", "remaining_time": "2:46:42"}
+{"current_steps": 2183, "total_steps": 3122, "loss": 1.7873, "learning_rate": 1.2564626495503401e-05, "epoch": 0.6991192954363491, "percentage": 69.92, "elapsed_time": "6:27:08", "remaining_time": "2:46:31"}
+{"current_steps": 2184, "total_steps": 3122, "loss": 1.8807, "learning_rate": 1.2540378566747874e-05, "epoch": 0.699439551641313, "percentage": 69.96, "elapsed_time": "6:27:18", "remaining_time": "2:46:20"}
+{"current_steps": 2185, "total_steps": 3122, "loss": 2.3201, "learning_rate": 1.2516146222786451e-05, "epoch": 0.699759807846277, "percentage": 69.99, "elapsed_time": "6:27:29", "remaining_time": "2:46:10"}
+{"current_steps": 2186, "total_steps": 3122, "loss": 1.9649, "learning_rate": 1.2491929493929508e-05, "epoch": 0.700080064051241, "percentage": 70.02, "elapsed_time": "6:27:39", "remaining_time": "2:45:59"}
+{"current_steps": 2187, "total_steps": 3122, "loss": 1.8792, "learning_rate": 1.2467728410467944e-05, "epoch": 0.7004003202562049, "percentage": 70.05, "elapsed_time": "6:27:49", "remaining_time": "2:45:48"}
+{"current_steps": 2188, "total_steps": 3122, "loss": 2.3325, "learning_rate": 1.2443543002673022e-05, "epoch": 0.7007205764611689, "percentage": 70.08, "elapsed_time": "6:28:00", "remaining_time": "2:45:37"}
+{"current_steps": 2189, "total_steps": 3122, "loss": 2.6154, "learning_rate": 1.241937330079647e-05, "epoch": 0.7010408326661329, "percentage": 70.12, "elapsed_time": "6:28:10", "remaining_time": "2:45:27"}
+{"current_steps": 2190, "total_steps": 3122, "loss": 2.442, "learning_rate": 1.2395219335070301e-05, "epoch": 0.7013610888710968, "percentage": 70.15, "elapsed_time": "6:28:21", "remaining_time": "2:45:16"}
+{"current_steps": 2191, "total_steps": 3122, "loss": 2.3294, "learning_rate": 1.2371081135706888e-05, "epoch": 0.7016813450760608, "percentage": 70.18, "elapsed_time": "6:28:31", "remaining_time": "2:45:05"}
+{"current_steps": 2192, "total_steps": 3122, "loss": 2.4601, "learning_rate": 1.234695873289887e-05, "epoch": 0.7020016012810248, "percentage": 70.21, "elapsed_time": "6:28:41", "remaining_time": "2:44:54"}
+{"current_steps": 2193, "total_steps": 3122, "loss": 2.0798, "learning_rate": 1.2322852156819137e-05, "epoch": 0.7023218574859887, "percentage": 70.24, "elapsed_time": "6:28:52", "remaining_time": "2:44:43"}
+{"current_steps": 2194, "total_steps": 3122, "loss": 2.283, "learning_rate": 1.2298761437620748e-05, "epoch": 0.7026421136909528, "percentage": 70.28, "elapsed_time": "6:29:02", "remaining_time": "2:44:33"}
+{"current_steps": 2195, "total_steps": 3122, "loss": 2.3894, "learning_rate": 1.2274686605436989e-05, "epoch": 0.7029623698959168, "percentage": 70.31, "elapsed_time": "6:29:12", "remaining_time": "2:44:22"}
+{"current_steps": 2196, "total_steps": 3122, "loss": 2.4578, "learning_rate": 1.2250627690381213e-05, "epoch": 0.7032826261008807, "percentage": 70.34, "elapsed_time": "6:29:23", "remaining_time": "2:44:11"}
+{"current_steps": 2197, "total_steps": 3122, "loss": 2.2, "learning_rate": 1.2226584722546899e-05, "epoch": 0.7036028823058447, "percentage": 70.37, "elapsed_time": "6:29:33", "remaining_time": "2:44:00"}
+{"current_steps": 2198, "total_steps": 3122, "loss": 1.6341, "learning_rate": 1.2202557732007569e-05, "epoch": 0.7039231385108087, "percentage": 70.4, "elapsed_time": "6:29:43", "remaining_time": "2:43:50"}
+{"current_steps": 2199, "total_steps": 3122, "loss": 2.0122, "learning_rate": 1.217854674881677e-05, "epoch": 0.7042433947157726, "percentage": 70.44, "elapsed_time": "6:29:54", "remaining_time": "2:43:39"}
+{"current_steps": 2200, "total_steps": 3122, "loss": 2.0305, "learning_rate": 1.2154551803007986e-05, "epoch": 0.7045636509207366, "percentage": 70.47, "elapsed_time": "6:30:04", "remaining_time": "2:43:28"}
+{"current_steps": 2201, "total_steps": 3122, "loss": 1.7452, "learning_rate": 1.2130572924594713e-05, "epoch": 0.7048839071257006, "percentage": 70.5, "elapsed_time": "6:30:42", "remaining_time": "2:43:29"}
+{"current_steps": 2202, "total_steps": 3122, "loss": 1.9185, "learning_rate": 1.2106610143570271e-05, "epoch": 0.7052041633306645, "percentage": 70.53, "elapsed_time": "6:30:52", "remaining_time": "2:43:18"}
+{"current_steps": 2203, "total_steps": 3122, "loss": 2.1781, "learning_rate": 1.208266348990792e-05, "epoch": 0.7055244195356285, "percentage": 70.56, "elapsed_time": "6:31:02", "remaining_time": "2:43:07"}
+{"current_steps": 2204, "total_steps": 3122, "loss": 2.6887, "learning_rate": 1.2058732993560678e-05, "epoch": 0.7058446757405925, "percentage": 70.6, "elapsed_time": "6:31:13", "remaining_time": "2:42:57"}
+{"current_steps": 2205, "total_steps": 3122, "loss": 2.3117, "learning_rate": 1.2034818684461402e-05, "epoch": 0.7061649319455564, "percentage": 70.63, "elapsed_time": "6:31:23", "remaining_time": "2:42:46"}
+{"current_steps": 2206, "total_steps": 3122, "loss": 2.0872, "learning_rate": 1.2010920592522681e-05, "epoch": 0.7064851881505204, "percentage": 70.66, "elapsed_time": "6:31:34", "remaining_time": "2:42:35"}
+{"current_steps": 2207, "total_steps": 3122, "loss": 2.1383, "learning_rate": 1.198703874763683e-05, "epoch": 0.7068054443554844, "percentage": 70.69, "elapsed_time": "6:31:44", "remaining_time": "2:42:24"}
+{"current_steps": 2208, "total_steps": 3122, "loss": 2.1324, "learning_rate": 1.1963173179675812e-05, "epoch": 0.7071257005604483, "percentage": 70.72, "elapsed_time": "6:31:55", "remaining_time": "2:42:14"}
+{"current_steps": 2209, "total_steps": 3122, "loss": 2.2598, "learning_rate": 1.1939323918491288e-05, "epoch": 0.7074459567654123, "percentage": 70.76, "elapsed_time": "6:32:05", "remaining_time": "2:42:03"}
+{"current_steps": 2210, "total_steps": 3122, "loss": 2.0589, "learning_rate": 1.1915490993914458e-05, "epoch": 0.7077662129703763, "percentage": 70.79, "elapsed_time": "6:32:15", "remaining_time": "2:41:52"}
+{"current_steps": 2211, "total_steps": 3122, "loss": 2.522, "learning_rate": 1.1891674435756129e-05, "epoch": 0.7080864691753402, "percentage": 70.82, "elapsed_time": "6:32:26", "remaining_time": "2:41:41"}
+{"current_steps": 2212, "total_steps": 3122, "loss": 2.4149, "learning_rate": 1.1867874273806623e-05, "epoch": 0.7084067253803042, "percentage": 70.85, "elapsed_time": "6:32:36", "remaining_time": "2:41:31"}
+{"current_steps": 2213, "total_steps": 3122, "loss": 2.5084, "learning_rate": 1.1844090537835764e-05, "epoch": 0.7087269815852683, "percentage": 70.88, "elapsed_time": "6:32:47", "remaining_time": "2:41:20"}
+{"current_steps": 2214, "total_steps": 3122, "loss": 2.5254, "learning_rate": 1.1820323257592796e-05, "epoch": 0.7090472377902322, "percentage": 70.92, "elapsed_time": "6:32:57", "remaining_time": "2:41:09"}
+{"current_steps": 2215, "total_steps": 3122, "loss": 2.2132, "learning_rate": 1.1796572462806437e-05, "epoch": 0.7093674939951962, "percentage": 70.95, "elapsed_time": "6:33:07", "remaining_time": "2:40:58"}
+{"current_steps": 2216, "total_steps": 3122, "loss": 2.0243, "learning_rate": 1.177283818318472e-05, "epoch": 0.7096877502001602, "percentage": 70.98, "elapsed_time": "6:33:18", "remaining_time": "2:40:48"}
+{"current_steps": 2217, "total_steps": 3122, "loss": 2.1482, "learning_rate": 1.1749120448415085e-05, "epoch": 0.7100080064051241, "percentage": 71.01, "elapsed_time": "6:33:28", "remaining_time": "2:40:37"}
+{"current_steps": 2218, "total_steps": 3122, "loss": 1.9561, "learning_rate": 1.1725419288164222e-05, "epoch": 0.7103282626100881, "percentage": 71.04, "elapsed_time": "6:33:39", "remaining_time": "2:40:26"}
+{"current_steps": 2219, "total_steps": 3122, "loss": 2.4484, "learning_rate": 1.1701734732078118e-05, "epoch": 0.7106485188150521, "percentage": 71.08, "elapsed_time": "6:33:49", "remaining_time": "2:40:15"}
+{"current_steps": 2220, "total_steps": 3122, "loss": 2.4673, "learning_rate": 1.1678066809781988e-05, "epoch": 0.710968775020016, "percentage": 71.11, "elapsed_time": "6:33:59", "remaining_time": "2:40:04"}
+{"current_steps": 2221, "total_steps": 3122, "loss": 2.1008, "learning_rate": 1.1654415550880243e-05, "epoch": 0.71128903122498, "percentage": 71.14, "elapsed_time": "6:34:10", "remaining_time": "2:39:54"}
+{"current_steps": 2222, "total_steps": 3122, "loss": 2.556, "learning_rate": 1.163078098495642e-05, "epoch": 0.711609287429944, "percentage": 71.17, "elapsed_time": "6:34:20", "remaining_time": "2:39:43"}
+{"current_steps": 2223, "total_steps": 3122, "loss": 2.6396, "learning_rate": 1.1607163141573246e-05, "epoch": 0.7119295436349079, "percentage": 71.2, "elapsed_time": "6:34:30", "remaining_time": "2:39:32"}
+{"current_steps": 2224, "total_steps": 3122, "loss": 2.5558, "learning_rate": 1.158356205027245e-05, "epoch": 0.7122497998398719, "percentage": 71.24, "elapsed_time": "6:34:41", "remaining_time": "2:39:21"}
+{"current_steps": 2225, "total_steps": 3122, "loss": 2.4041, "learning_rate": 1.1559977740574861e-05, "epoch": 0.7125700560448359, "percentage": 71.27, "elapsed_time": "6:34:51", "remaining_time": "2:39:11"}
+{"current_steps": 2226, "total_steps": 3122, "loss": 2.3616, "learning_rate": 1.1536410241980297e-05, "epoch": 0.7128903122497998, "percentage": 71.3, "elapsed_time": "6:35:01", "remaining_time": "2:39:00"}
+{"current_steps": 2227, "total_steps": 3122, "loss": 2.4075, "learning_rate": 1.1512859583967552e-05, "epoch": 0.7132105684547638, "percentage": 71.33, "elapsed_time": "6:35:12", "remaining_time": "2:38:49"}
+{"current_steps": 2228, "total_steps": 3122, "loss": 2.4303, "learning_rate": 1.148932579599436e-05, "epoch": 0.7135308246597278, "percentage": 71.36, "elapsed_time": "6:35:22", "remaining_time": "2:38:38"}
+{"current_steps": 2229, "total_steps": 3122, "loss": 2.5852, "learning_rate": 1.1465808907497352e-05, "epoch": 0.7138510808646917, "percentage": 71.4, "elapsed_time": "6:35:32", "remaining_time": "2:38:28"}
+{"current_steps": 2230, "total_steps": 3122, "loss": 2.5451, "learning_rate": 1.1442308947891992e-05, "epoch": 0.7141713370696557, "percentage": 71.43, "elapsed_time": "6:35:43", "remaining_time": "2:38:17"}
+{"current_steps": 2231, "total_steps": 3122, "loss": 1.6112, "learning_rate": 1.141882594657263e-05, "epoch": 0.7144915932746196, "percentage": 71.46, "elapsed_time": "6:35:53", "remaining_time": "2:38:06"}
+{"current_steps": 2232, "total_steps": 3122, "loss": 2.3431, "learning_rate": 1.1395359932912348e-05, "epoch": 0.7148118494795836, "percentage": 71.49, "elapsed_time": "6:36:03", "remaining_time": "2:37:55"}
+{"current_steps": 2233, "total_steps": 3122, "loss": 2.2054, "learning_rate": 1.1371910936263e-05, "epoch": 0.7151321056845477, "percentage": 71.52, "elapsed_time": "6:36:14", "remaining_time": "2:37:44"}
+{"current_steps": 2234, "total_steps": 3122, "loss": 1.7845, "learning_rate": 1.1348478985955161e-05, "epoch": 0.7154523618895116, "percentage": 71.56, "elapsed_time": "6:36:24", "remaining_time": "2:37:34"}
+{"current_steps": 2235, "total_steps": 3122, "loss": 2.5106, "learning_rate": 1.1325064111298087e-05, "epoch": 0.7157726180944756, "percentage": 71.59, "elapsed_time": "6:36:34", "remaining_time": "2:37:23"}
+{"current_steps": 2236, "total_steps": 3122, "loss": 2.3032, "learning_rate": 1.1301666341579633e-05, "epoch": 0.7160928742994396, "percentage": 71.62, "elapsed_time": "6:36:45", "remaining_time": "2:37:12"}
+{"current_steps": 2237, "total_steps": 3122, "loss": 2.0377, "learning_rate": 1.1278285706066335e-05, "epoch": 0.7164131305044035, "percentage": 71.65, "elapsed_time": "6:36:55", "remaining_time": "2:37:01"}
+{"current_steps": 2238, "total_steps": 3122, "loss": 2.2911, "learning_rate": 1.1254922234003224e-05, "epoch": 0.7167333867093675, "percentage": 71.68, "elapsed_time": "6:37:06", "remaining_time": "2:36:51"}
+{"current_steps": 2239, "total_steps": 3122, "loss": 1.9858, "learning_rate": 1.1231575954613902e-05, "epoch": 0.7170536429143315, "percentage": 71.72, "elapsed_time": "6:37:16", "remaining_time": "2:36:40"}
+{"current_steps": 2240, "total_steps": 3122, "loss": 2.2628, "learning_rate": 1.1208246897100458e-05, "epoch": 0.7173738991192954, "percentage": 71.75, "elapsed_time": "6:37:26", "remaining_time": "2:36:29"}
+{"current_steps": 2241, "total_steps": 3122, "loss": 1.7735, "learning_rate": 1.1184935090643433e-05, "epoch": 0.7176941553242594, "percentage": 71.78, "elapsed_time": "6:37:37", "remaining_time": "2:36:18"}
+{"current_steps": 2242, "total_steps": 3122, "loss": 1.6539, "learning_rate": 1.1161640564401805e-05, "epoch": 0.7180144115292234, "percentage": 71.81, "elapsed_time": "6:37:47", "remaining_time": "2:36:08"}
+{"current_steps": 2243, "total_steps": 3122, "loss": 2.1595, "learning_rate": 1.1138363347512926e-05, "epoch": 0.7183346677341873, "percentage": 71.84, "elapsed_time": "6:37:57", "remaining_time": "2:35:57"}
+{"current_steps": 2244, "total_steps": 3122, "loss": 1.9965, "learning_rate": 1.1115103469092475e-05, "epoch": 0.7186549239391513, "percentage": 71.88, "elapsed_time": "6:38:08", "remaining_time": "2:35:46"}
+{"current_steps": 2245, "total_steps": 3122, "loss": 2.3327, "learning_rate": 1.1091860958234508e-05, "epoch": 0.7189751801441153, "percentage": 71.91, "elapsed_time": "6:38:18", "remaining_time": "2:35:35"}
+{"current_steps": 2246, "total_steps": 3122, "loss": 2.1586, "learning_rate": 1.1068635844011286e-05, "epoch": 0.7192954363490792, "percentage": 71.94, "elapsed_time": "6:38:28", "remaining_time": "2:35:25"}
+{"current_steps": 2247, "total_steps": 3122, "loss": 1.9614, "learning_rate": 1.1045428155473347e-05, "epoch": 0.7196156925540432, "percentage": 71.97, "elapsed_time": "6:38:39", "remaining_time": "2:35:14"}
+{"current_steps": 2248, "total_steps": 3122, "loss": 1.8978, "learning_rate": 1.1022237921649429e-05, "epoch": 0.7199359487590072, "percentage": 72.01, "elapsed_time": "6:38:49", "remaining_time": "2:35:03"}
+{"current_steps": 2249, "total_steps": 3122, "loss": 2.1097, "learning_rate": 1.0999065171546432e-05, "epoch": 0.7202562049639711, "percentage": 72.04, "elapsed_time": "6:38:59", "remaining_time": "2:34:52"}
+{"current_steps": 2250, "total_steps": 3122, "loss": 2.1752, "learning_rate": 1.0975909934149392e-05, "epoch": 0.7205764611689351, "percentage": 72.07, "elapsed_time": "6:39:10", "remaining_time": "2:34:42"}
+{"current_steps": 2251, "total_steps": 3122, "loss": 2.2443, "learning_rate": 1.0952772238421444e-05, "epoch": 0.7208967173738992, "percentage": 72.1, "elapsed_time": "6:39:20", "remaining_time": "2:34:31"}
+{"current_steps": 2252, "total_steps": 3122, "loss": 2.4343, "learning_rate": 1.0929652113303754e-05, "epoch": 0.721216973578863, "percentage": 72.13, "elapsed_time": "6:39:31", "remaining_time": "2:34:20"}
+{"current_steps": 2253, "total_steps": 3122, "loss": 2.1622, "learning_rate": 1.0906549587715546e-05, "epoch": 0.7215372297838271, "percentage": 72.17, "elapsed_time": "6:39:41", "remaining_time": "2:34:09"}
+{"current_steps": 2254, "total_steps": 3122, "loss": 2.4342, "learning_rate": 1.0883464690554005e-05, "epoch": 0.7218574859887911, "percentage": 72.2, "elapsed_time": "6:39:51", "remaining_time": "2:33:59"}
+{"current_steps": 2255, "total_steps": 3122, "loss": 2.6058, "learning_rate": 1.0860397450694285e-05, "epoch": 0.722177742193755, "percentage": 72.23, "elapsed_time": "6:40:02", "remaining_time": "2:33:48"}
+{"current_steps": 2256, "total_steps": 3122, "loss": 2.2438, "learning_rate": 1.0837347896989437e-05, "epoch": 0.722497998398719, "percentage": 72.26, "elapsed_time": "6:40:12", "remaining_time": "2:33:37"}
+{"current_steps": 2257, "total_steps": 3122, "loss": 2.1936, "learning_rate": 1.081431605827041e-05, "epoch": 0.722818254603683, "percentage": 72.29, "elapsed_time": "6:40:22", "remaining_time": "2:33:26"}
+{"current_steps": 2258, "total_steps": 3122, "loss": 2.4717, "learning_rate": 1.0791301963345954e-05, "epoch": 0.7231385108086469, "percentage": 72.33, "elapsed_time": "6:40:33", "remaining_time": "2:33:16"}
+{"current_steps": 2259, "total_steps": 3122, "loss": 2.1485, "learning_rate": 1.0768305641002688e-05, "epoch": 0.7234587670136109, "percentage": 72.36, "elapsed_time": "6:40:43", "remaining_time": "2:33:05"}
+{"current_steps": 2260, "total_steps": 3122, "loss": 2.4316, "learning_rate": 1.0745327120004935e-05, "epoch": 0.7237790232185749, "percentage": 72.39, "elapsed_time": "6:40:53", "remaining_time": "2:32:54"}
+{"current_steps": 2261, "total_steps": 3122, "loss": 1.7809, "learning_rate": 1.0722366429094798e-05, "epoch": 0.7240992794235388, "percentage": 72.42, "elapsed_time": "6:41:04", "remaining_time": "2:32:43"}
+{"current_steps": 2262, "total_steps": 3122, "loss": 2.3482, "learning_rate": 1.0699423596992056e-05, "epoch": 0.7244195356285028, "percentage": 72.45, "elapsed_time": "6:41:14", "remaining_time": "2:32:33"}
+{"current_steps": 2263, "total_steps": 3122, "loss": 2.037, "learning_rate": 1.0676498652394157e-05, "epoch": 0.7247397918334668, "percentage": 72.49, "elapsed_time": "6:41:24", "remaining_time": "2:32:22"}
+{"current_steps": 2264, "total_steps": 3122, "loss": 2.3973, "learning_rate": 1.065359162397617e-05, "epoch": 0.7250600480384307, "percentage": 72.52, "elapsed_time": "6:41:35", "remaining_time": "2:32:11"}
+{"current_steps": 2265, "total_steps": 3122, "loss": 2.2461, "learning_rate": 1.0630702540390766e-05, "epoch": 0.7253803042433947, "percentage": 72.55, "elapsed_time": "6:41:45", "remaining_time": "2:32:00"}
+{"current_steps": 2266, "total_steps": 3122, "loss": 2.4446, "learning_rate": 1.060783143026814e-05, "epoch": 0.7257005604483587, "percentage": 72.58, "elapsed_time": "6:41:56", "remaining_time": "2:31:50"}
+{"current_steps": 2267, "total_steps": 3122, "loss": 1.8983, "learning_rate": 1.0584978322216057e-05, "epoch": 0.7260208166533226, "percentage": 72.61, "elapsed_time": "6:42:06", "remaining_time": "2:31:39"}
+{"current_steps": 2268, "total_steps": 3122, "loss": 1.9454, "learning_rate": 1.0562143244819707e-05, "epoch": 0.7263410728582866, "percentage": 72.65, "elapsed_time": "6:42:16", "remaining_time": "2:31:28"}
+{"current_steps": 2269, "total_steps": 3122, "loss": 2.2344, "learning_rate": 1.0539326226641768e-05, "epoch": 0.7266613290632506, "percentage": 72.68, "elapsed_time": "6:42:27", "remaining_time": "2:31:17"}
+{"current_steps": 2270, "total_steps": 3122, "loss": 2.0809, "learning_rate": 1.0516527296222308e-05, "epoch": 0.7269815852682145, "percentage": 72.71, "elapsed_time": "6:42:37", "remaining_time": "2:31:07"}
+{"current_steps": 2271, "total_steps": 3122, "loss": 1.7608, "learning_rate": 1.0493746482078783e-05, "epoch": 0.7273018414731786, "percentage": 72.74, "elapsed_time": "6:42:47", "remaining_time": "2:30:56"}
+{"current_steps": 2272, "total_steps": 3122, "loss": 2.4922, "learning_rate": 1.0470983812705984e-05, "epoch": 0.7276220976781426, "percentage": 72.77, "elapsed_time": "6:42:58", "remaining_time": "2:30:45"}
+{"current_steps": 2273, "total_steps": 3122, "loss": 1.822, "learning_rate": 1.0448239316576009e-05, "epoch": 0.7279423538831065, "percentage": 72.81, "elapsed_time": "6:43:08", "remaining_time": "2:30:34"}
+{"current_steps": 2274, "total_steps": 3122, "loss": 2.2417, "learning_rate": 1.0425513022138203e-05, "epoch": 0.7282626100880705, "percentage": 72.84, "elapsed_time": "6:43:18", "remaining_time": "2:30:24"}
+{"current_steps": 2275, "total_steps": 3122, "loss": 1.8278, "learning_rate": 1.0402804957819174e-05, "epoch": 0.7285828662930345, "percentage": 72.87, "elapsed_time": "6:43:29", "remaining_time": "2:30:13"}
+{"current_steps": 2276, "total_steps": 3122, "loss": 2.0429, "learning_rate": 1.0380115152022716e-05, "epoch": 0.7289031224979984, "percentage": 72.9, "elapsed_time": "6:43:39", "remaining_time": "2:30:02"}
+{"current_steps": 2277, "total_steps": 3122, "loss": 2.1444, "learning_rate": 1.0357443633129777e-05, "epoch": 0.7292233787029624, "percentage": 72.93, "elapsed_time": "6:43:49", "remaining_time": "2:29:51"}
+{"current_steps": 2278, "total_steps": 3122, "loss": 2.5259, "learning_rate": 1.0334790429498445e-05, "epoch": 0.7295436349079263, "percentage": 72.97, "elapsed_time": "6:44:00", "remaining_time": "2:29:41"}
+{"current_steps": 2279, "total_steps": 3122, "loss": 2.4972, "learning_rate": 1.0312155569463897e-05, "epoch": 0.7298638911128903, "percentage": 73.0, "elapsed_time": "6:44:10", "remaining_time": "2:29:30"}
+{"current_steps": 2280, "total_steps": 3122, "loss": 1.7737, "learning_rate": 1.0289539081338335e-05, "epoch": 0.7301841473178543, "percentage": 73.03, "elapsed_time": "6:44:20", "remaining_time": "2:29:19"}
+{"current_steps": 2281, "total_steps": 3122, "loss": 2.4937, "learning_rate": 1.026694099341104e-05, "epoch": 0.7305044035228182, "percentage": 73.06, "elapsed_time": "6:44:31", "remaining_time": "2:29:08"}
+{"current_steps": 2282, "total_steps": 3122, "loss": 1.7839, "learning_rate": 1.024436133394822e-05, "epoch": 0.7308246597277822, "percentage": 73.09, "elapsed_time": "6:44:41", "remaining_time": "2:28:58"}
+{"current_steps": 2283, "total_steps": 3122, "loss": 2.5823, "learning_rate": 1.022180013119306e-05, "epoch": 0.7311449159327462, "percentage": 73.13, "elapsed_time": "6:44:52", "remaining_time": "2:28:47"}
+{"current_steps": 2284, "total_steps": 3122, "loss": 2.5663, "learning_rate": 1.0199257413365663e-05, "epoch": 0.7314651721377101, "percentage": 73.16, "elapsed_time": "6:45:02", "remaining_time": "2:28:36"}
+{"current_steps": 2285, "total_steps": 3122, "loss": 2.738, "learning_rate": 1.0176733208662993e-05, "epoch": 0.7317854283426741, "percentage": 73.19, "elapsed_time": "6:45:12", "remaining_time": "2:28:25"}
+{"current_steps": 2286, "total_steps": 3122, "loss": 2.3974, "learning_rate": 1.0154227545258873e-05, "epoch": 0.7321056845476381, "percentage": 73.22, "elapsed_time": "6:45:23", "remaining_time": "2:28:15"}
+{"current_steps": 2287, "total_steps": 3122, "loss": 2.6672, "learning_rate": 1.0131740451303936e-05, "epoch": 0.732425940752602, "percentage": 73.25, "elapsed_time": "6:45:33", "remaining_time": "2:28:04"}
+{"current_steps": 2288, "total_steps": 3122, "loss": 1.7195, "learning_rate": 1.0109271954925562e-05, "epoch": 0.732746196957566, "percentage": 73.29, "elapsed_time": "6:45:43", "remaining_time": "2:27:53"}
+{"current_steps": 2289, "total_steps": 3122, "loss": 2.2517, "learning_rate": 1.0086822084227896e-05, "epoch": 0.73306645316253, "percentage": 73.32, "elapsed_time": "6:45:54", "remaining_time": "2:27:42"}
+{"current_steps": 2290, "total_steps": 3122, "loss": 2.5776, "learning_rate": 1.0064390867291774e-05, "epoch": 0.733386709367494, "percentage": 73.35, "elapsed_time": "6:46:04", "remaining_time": "2:27:32"}
+{"current_steps": 2291, "total_steps": 3122, "loss": 2.0832, "learning_rate": 1.00419783321747e-05, "epoch": 0.733706965572458, "percentage": 73.38, "elapsed_time": "6:46:14", "remaining_time": "2:27:21"}
+{"current_steps": 2292, "total_steps": 3122, "loss": 1.78, "learning_rate": 1.0019584506910817e-05, "epoch": 0.734027221777422, "percentage": 73.41, "elapsed_time": "6:46:25", "remaining_time": "2:27:10"}
+{"current_steps": 2293, "total_steps": 3122, "loss": 2.3546, "learning_rate": 9.99720941951086e-06, "epoch": 0.7343474779823859, "percentage": 73.45, "elapsed_time": "6:46:35", "remaining_time": "2:26:59"}
+{"current_steps": 2294, "total_steps": 3122, "loss": 2.3111, "learning_rate": 9.974853097962116e-06, "epoch": 0.7346677341873499, "percentage": 73.48, "elapsed_time": "6:46:45", "remaining_time": "2:26:49"}
+{"current_steps": 2295, "total_steps": 3122, "loss": 1.9775, "learning_rate": 9.952515570228432e-06, "epoch": 0.7349879903923139, "percentage": 73.51, "elapsed_time": "6:46:56", "remaining_time": "2:26:38"}
+{"current_steps": 2296, "total_steps": 3122, "loss": 2.029, "learning_rate": 9.930196864250102e-06, "epoch": 0.7353082465972778, "percentage": 73.54, "elapsed_time": "6:47:06", "remaining_time": "2:26:27"}
+{"current_steps": 2297, "total_steps": 3122, "loss": 2.0413, "learning_rate": 9.90789700794391e-06, "epoch": 0.7356285028022418, "percentage": 73.57, "elapsed_time": "6:47:17", "remaining_time": "2:26:16"}
+{"current_steps": 2298, "total_steps": 3122, "loss": 1.8798, "learning_rate": 9.885616029203046e-06, "epoch": 0.7359487590072058, "percentage": 73.61, "elapsed_time": "6:47:27", "remaining_time": "2:26:06"}
+{"current_steps": 2299, "total_steps": 3122, "loss": 1.7159, "learning_rate": 9.8633539558971e-06, "epoch": 0.7362690152121697, "percentage": 73.64, "elapsed_time": "6:47:37", "remaining_time": "2:25:55"}
+{"current_steps": 2300, "total_steps": 3122, "loss": 2.5267, "learning_rate": 9.84111081587201e-06, "epoch": 0.7365892714171337, "percentage": 73.67, "elapsed_time": "6:47:48", "remaining_time": "2:25:44"}
+{"current_steps": 2301, "total_steps": 3122, "loss": 2.7178, "learning_rate": 9.818886636950037e-06, "epoch": 0.7369095276220977, "percentage": 73.7, "elapsed_time": "6:48:24", "remaining_time": "2:25:43"}
+{"current_steps": 2302, "total_steps": 3122, "loss": 2.4225, "learning_rate": 9.796681446929698e-06, "epoch": 0.7372297838270616, "percentage": 73.73, "elapsed_time": "6:48:34", "remaining_time": "2:25:32"}
+{"current_steps": 2303, "total_steps": 3122, "loss": 2.337, "learning_rate": 9.77449527358579e-06, "epoch": 0.7375500400320256, "percentage": 73.77, "elapsed_time": "6:48:44", "remaining_time": "2:25:21"}
+{"current_steps": 2304, "total_steps": 3122, "loss": 2.5408, "learning_rate": 9.752328144669316e-06, "epoch": 0.7378702962369896, "percentage": 73.8, "elapsed_time": "6:48:55", "remaining_time": "2:25:10"}
+{"current_steps": 2305, "total_steps": 3122, "loss": 1.9689, "learning_rate": 9.730180087907445e-06, "epoch": 0.7381905524419535, "percentage": 73.83, "elapsed_time": "6:49:05", "remaining_time": "2:25:00"}
+{"current_steps": 2306, "total_steps": 3122, "loss": 2.0099, "learning_rate": 9.708051131003507e-06, "epoch": 0.7385108086469175, "percentage": 73.86, "elapsed_time": "6:49:16", "remaining_time": "2:24:49"}
+{"current_steps": 2307, "total_steps": 3122, "loss": 2.1473, "learning_rate": 9.685941301636927e-06, "epoch": 0.7388310648518815, "percentage": 73.89, "elapsed_time": "6:49:26", "remaining_time": "2:24:38"}
+{"current_steps": 2308, "total_steps": 3122, "loss": 1.9139, "learning_rate": 9.663850627463219e-06, "epoch": 0.7391513210568454, "percentage": 73.93, "elapsed_time": "6:49:36", "remaining_time": "2:24:27"}
+{"current_steps": 2309, "total_steps": 3122, "loss": 2.5305, "learning_rate": 9.641779136113931e-06, "epoch": 0.7394715772618095, "percentage": 73.96, "elapsed_time": "6:49:47", "remaining_time": "2:24:17"}
+{"current_steps": 2310, "total_steps": 3122, "loss": 2.4336, "learning_rate": 9.619726855196603e-06, "epoch": 0.7397918334667735, "percentage": 73.99, "elapsed_time": "6:49:57", "remaining_time": "2:24:06"}
+{"current_steps": 2311, "total_steps": 3122, "loss": 2.3245, "learning_rate": 9.597693812294761e-06, "epoch": 0.7401120896717374, "percentage": 74.02, "elapsed_time": "6:50:08", "remaining_time": "2:23:55"}
+{"current_steps": 2312, "total_steps": 3122, "loss": 2.3801, "learning_rate": 9.57568003496787e-06, "epoch": 0.7404323458767014, "percentage": 74.06, "elapsed_time": "6:50:18", "remaining_time": "2:23:45"}
+{"current_steps": 2313, "total_steps": 3122, "loss": 2.4653, "learning_rate": 9.553685550751294e-06, "epoch": 0.7407526020816654, "percentage": 74.09, "elapsed_time": "6:50:29", "remaining_time": "2:23:34"}
+{"current_steps": 2314, "total_steps": 3122, "loss": 2.639, "learning_rate": 9.531710387156254e-06, "epoch": 0.7410728582866293, "percentage": 74.12, "elapsed_time": "6:50:39", "remaining_time": "2:23:23"}
+{"current_steps": 2315, "total_steps": 3122, "loss": 2.0894, "learning_rate": 9.509754571669821e-06, "epoch": 0.7413931144915933, "percentage": 74.15, "elapsed_time": "6:50:49", "remaining_time": "2:23:12"}
+{"current_steps": 2316, "total_steps": 3122, "loss": 1.8972, "learning_rate": 9.48781813175486e-06, "epoch": 0.7417133706965573, "percentage": 74.18, "elapsed_time": "6:51:00", "remaining_time": "2:23:02"}
+{"current_steps": 2317, "total_steps": 3122, "loss": 1.8963, "learning_rate": 9.465901094849985e-06, "epoch": 0.7420336269015212, "percentage": 74.22, "elapsed_time": "6:51:10", "remaining_time": "2:22:51"}
+{"current_steps": 2318, "total_steps": 3122, "loss": 2.1828, "learning_rate": 9.44400348836956e-06, "epoch": 0.7423538831064852, "percentage": 74.25, "elapsed_time": "6:51:20", "remaining_time": "2:22:40"}
+{"current_steps": 2319, "total_steps": 3122, "loss": 1.7612, "learning_rate": 9.422125339703635e-06, "epoch": 0.7426741393114492, "percentage": 74.28, "elapsed_time": "6:51:31", "remaining_time": "2:22:29"}
+{"current_steps": 2320, "total_steps": 3122, "loss": 2.154, "learning_rate": 9.400266676217927e-06, "epoch": 0.7429943955164131, "percentage": 74.31, "elapsed_time": "6:51:41", "remaining_time": "2:22:19"}
+{"current_steps": 2321, "total_steps": 3122, "loss": 2.6834, "learning_rate": 9.378427525253781e-06, "epoch": 0.7433146517213771, "percentage": 74.34, "elapsed_time": "6:51:52", "remaining_time": "2:22:08"}
+{"current_steps": 2322, "total_steps": 3122, "loss": 1.8765, "learning_rate": 9.356607914128126e-06, "epoch": 0.7436349079263411, "percentage": 74.38, "elapsed_time": "6:52:02", "remaining_time": "2:21:57"}
+{"current_steps": 2323, "total_steps": 3122, "loss": 2.3637, "learning_rate": 9.33480787013346e-06, "epoch": 0.743955164131305, "percentage": 74.41, "elapsed_time": "6:52:12", "remaining_time": "2:21:46"}
+{"current_steps": 2324, "total_steps": 3122, "loss": 2.5115, "learning_rate": 9.313027420537809e-06, "epoch": 0.744275420336269, "percentage": 74.44, "elapsed_time": "6:52:23", "remaining_time": "2:21:36"}
+{"current_steps": 2325, "total_steps": 3122, "loss": 1.9597, "learning_rate": 9.291266592584666e-06, "epoch": 0.7445956765412329, "percentage": 74.47, "elapsed_time": "6:52:33", "remaining_time": "2:21:25"}
+{"current_steps": 2326, "total_steps": 3122, "loss": 2.3502, "learning_rate": 9.269525413493008e-06, "epoch": 0.7449159327461969, "percentage": 74.5, "elapsed_time": "6:52:44", "remaining_time": "2:21:14"}
+{"current_steps": 2327, "total_steps": 3122, "loss": 2.5435, "learning_rate": 9.247803910457226e-06, "epoch": 0.745236188951161, "percentage": 74.54, "elapsed_time": "6:52:54", "remaining_time": "2:21:03"}
+{"current_steps": 2328, "total_steps": 3122, "loss": 2.3085, "learning_rate": 9.226102110647092e-06, "epoch": 0.7455564451561248, "percentage": 74.57, "elapsed_time": "6:53:04", "remaining_time": "2:20:53"}
+{"current_steps": 2329, "total_steps": 3122, "loss": 2.0914, "learning_rate": 9.204420041207746e-06, "epoch": 0.7458767013610889, "percentage": 74.6, "elapsed_time": "6:53:15", "remaining_time": "2:20:42"}
+{"current_steps": 2330, "total_steps": 3122, "loss": 1.7195, "learning_rate": 9.182757729259638e-06, "epoch": 0.7461969575660529, "percentage": 74.63, "elapsed_time": "6:53:25", "remaining_time": "2:20:31"}
+{"current_steps": 2331, "total_steps": 3122, "loss": 2.1269, "learning_rate": 9.161115201898518e-06, "epoch": 0.7465172137710168, "percentage": 74.66, "elapsed_time": "6:53:35", "remaining_time": "2:20:21"}
+{"current_steps": 2332, "total_steps": 3122, "loss": 2.4199, "learning_rate": 9.139492486195364e-06, "epoch": 0.7468374699759808, "percentage": 74.7, "elapsed_time": "6:53:46", "remaining_time": "2:20:10"}
+{"current_steps": 2333, "total_steps": 3122, "loss": 2.0749, "learning_rate": 9.117889609196395e-06, "epoch": 0.7471577261809448, "percentage": 74.73, "elapsed_time": "6:53:56", "remaining_time": "2:19:59"}
+{"current_steps": 2334, "total_steps": 3122, "loss": 2.6966, "learning_rate": 9.09630659792301e-06, "epoch": 0.7474779823859087, "percentage": 74.76, "elapsed_time": "6:54:07", "remaining_time": "2:19:48"}
+{"current_steps": 2335, "total_steps": 3122, "loss": 1.7836, "learning_rate": 9.074743479371761e-06, "epoch": 0.7477982385908727, "percentage": 74.79, "elapsed_time": "6:54:17", "remaining_time": "2:19:38"}
+{"current_steps": 2336, "total_steps": 3122, "loss": 2.27, "learning_rate": 9.05320028051431e-06, "epoch": 0.7481184947958367, "percentage": 74.82, "elapsed_time": "6:54:27", "remaining_time": "2:19:27"}
+{"current_steps": 2337, "total_steps": 3122, "loss": 1.792, "learning_rate": 9.031677028297413e-06, "epoch": 0.7484387510008006, "percentage": 74.86, "elapsed_time": "6:54:38", "remaining_time": "2:19:16"}
+{"current_steps": 2338, "total_steps": 3122, "loss": 2.2518, "learning_rate": 9.010173749642878e-06, "epoch": 0.7487590072057646, "percentage": 74.89, "elapsed_time": "6:54:48", "remaining_time": "2:19:05"}
+{"current_steps": 2339, "total_steps": 3122, "loss": 1.1478, "learning_rate": 8.988690471447503e-06, "epoch": 0.7490792634107286, "percentage": 74.92, "elapsed_time": "6:54:59", "remaining_time": "2:18:55"}
+{"current_steps": 2340, "total_steps": 3122, "loss": 2.3766, "learning_rate": 8.967227220583102e-06, "epoch": 0.7493995196156925, "percentage": 74.95, "elapsed_time": "6:55:09", "remaining_time": "2:18:44"}
+{"current_steps": 2341, "total_steps": 3122, "loss": 1.8921, "learning_rate": 8.945784023896425e-06, "epoch": 0.7497197758206565, "percentage": 74.98, "elapsed_time": "6:55:19", "remaining_time": "2:18:33"}
+{"current_steps": 2342, "total_steps": 3122, "loss": 1.6513, "learning_rate": 8.924360908209137e-06, "epoch": 0.7500400320256205, "percentage": 75.02, "elapsed_time": "6:55:30", "remaining_time": "2:18:22"}
+{"current_steps": 2343, "total_steps": 3122, "loss": 1.5818, "learning_rate": 8.902957900317783e-06, "epoch": 0.7503602882305844, "percentage": 75.05, "elapsed_time": "6:55:40", "remaining_time": "2:18:12"}
+{"current_steps": 2344, "total_steps": 3122, "loss": 2.2554, "learning_rate": 8.881575026993766e-06, "epoch": 0.7506805444355484, "percentage": 75.08, "elapsed_time": "6:55:50", "remaining_time": "2:18:01"}
+{"current_steps": 2345, "total_steps": 3122, "loss": 2.2229, "learning_rate": 8.860212314983292e-06, "epoch": 0.7510008006405124, "percentage": 75.11, "elapsed_time": "6:56:01", "remaining_time": "2:17:50"}
+{"current_steps": 2346, "total_steps": 3122, "loss": 2.2565, "learning_rate": 8.838869791007367e-06, "epoch": 0.7513210568454763, "percentage": 75.14, "elapsed_time": "6:56:11", "remaining_time": "2:17:40"}
+{"current_steps": 2347, "total_steps": 3122, "loss": 2.5122, "learning_rate": 8.817547481761717e-06, "epoch": 0.7516413130504404, "percentage": 75.18, "elapsed_time": "6:56:22", "remaining_time": "2:17:29"}
+{"current_steps": 2348, "total_steps": 3122, "loss": 2.6242, "learning_rate": 8.796245413916807e-06, "epoch": 0.7519615692554044, "percentage": 75.21, "elapsed_time": "6:56:32", "remaining_time": "2:17:18"}
+{"current_steps": 2349, "total_steps": 3122, "loss": 2.2074, "learning_rate": 8.774963614117773e-06, "epoch": 0.7522818254603683, "percentage": 75.24, "elapsed_time": "6:56:42", "remaining_time": "2:17:07"}
+{"current_steps": 2350, "total_steps": 3122, "loss": 2.5946, "learning_rate": 8.753702108984405e-06, "epoch": 0.7526020816653323, "percentage": 75.27, "elapsed_time": "6:56:53", "remaining_time": "2:16:57"}
+{"current_steps": 2351, "total_steps": 3122, "loss": 2.4789, "learning_rate": 8.732460925111105e-06, "epoch": 0.7529223378702963, "percentage": 75.3, "elapsed_time": "6:57:03", "remaining_time": "2:16:46"}
+{"current_steps": 2352, "total_steps": 3122, "loss": 2.1403, "learning_rate": 8.711240089066863e-06, "epoch": 0.7532425940752602, "percentage": 75.34, "elapsed_time": "6:57:14", "remaining_time": "2:16:35"}
+{"current_steps": 2353, "total_steps": 3122, "loss": 2.0411, "learning_rate": 8.690039627395195e-06, "epoch": 0.7535628502802242, "percentage": 75.37, "elapsed_time": "6:57:24", "remaining_time": "2:16:24"}
+{"current_steps": 2354, "total_steps": 3122, "loss": 2.4965, "learning_rate": 8.668859566614154e-06, "epoch": 0.7538831064851882, "percentage": 75.4, "elapsed_time": "6:57:34", "remaining_time": "2:16:14"}
+{"current_steps": 2355, "total_steps": 3122, "loss": 2.275, "learning_rate": 8.647699933216274e-06, "epoch": 0.7542033626901521, "percentage": 75.43, "elapsed_time": "6:57:45", "remaining_time": "2:16:03"}
+{"current_steps": 2356, "total_steps": 3122, "loss": 2.3405, "learning_rate": 8.626560753668531e-06, "epoch": 0.7545236188951161, "percentage": 75.46, "elapsed_time": "6:57:55", "remaining_time": "2:15:52"}
+{"current_steps": 2357, "total_steps": 3122, "loss": 2.0917, "learning_rate": 8.605442054412318e-06, "epoch": 0.7548438751000801, "percentage": 75.5, "elapsed_time": "6:58:06", "remaining_time": "2:15:42"}
+{"current_steps": 2358, "total_steps": 3122, "loss": 2.1474, "learning_rate": 8.584343861863418e-06, "epoch": 0.755164131305044, "percentage": 75.53, "elapsed_time": "6:58:16", "remaining_time": "2:15:31"}
+{"current_steps": 2359, "total_steps": 3122, "loss": 2.2758, "learning_rate": 8.563266202411948e-06, "epoch": 0.755484387510008, "percentage": 75.56, "elapsed_time": "6:58:26", "remaining_time": "2:15:20"}
+{"current_steps": 2360, "total_steps": 3122, "loss": 2.5798, "learning_rate": 8.542209102422366e-06, "epoch": 0.755804643714972, "percentage": 75.59, "elapsed_time": "6:58:37", "remaining_time": "2:15:09"}
+{"current_steps": 2361, "total_steps": 3122, "loss": 2.485, "learning_rate": 8.521172588233378e-06, "epoch": 0.7561248999199359, "percentage": 75.62, "elapsed_time": "6:58:47", "remaining_time": "2:14:59"}
+{"current_steps": 2362, "total_steps": 3122, "loss": 2.354, "learning_rate": 8.500156686157975e-06, "epoch": 0.7564451561248999, "percentage": 75.66, "elapsed_time": "6:58:57", "remaining_time": "2:14:48"}
+{"current_steps": 2363, "total_steps": 3122, "loss": 1.9641, "learning_rate": 8.479161422483353e-06, "epoch": 0.7567654123298639, "percentage": 75.69, "elapsed_time": "6:59:08", "remaining_time": "2:14:37"}
+{"current_steps": 2364, "total_steps": 3122, "loss": 2.5159, "learning_rate": 8.458186823470888e-06, "epoch": 0.7570856685348278, "percentage": 75.72, "elapsed_time": "6:59:18", "remaining_time": "2:14:26"}
+{"current_steps": 2365, "total_steps": 3122, "loss": 2.1078, "learning_rate": 8.437232915356114e-06, "epoch": 0.7574059247397918, "percentage": 75.75, "elapsed_time": "6:59:29", "remaining_time": "2:14:16"}
+{"current_steps": 2366, "total_steps": 3122, "loss": 2.3243, "learning_rate": 8.416299724348695e-06, "epoch": 0.7577261809447559, "percentage": 75.78, "elapsed_time": "6:59:39", "remaining_time": "2:14:05"}
+{"current_steps": 2367, "total_steps": 3122, "loss": 1.7567, "learning_rate": 8.395387276632338e-06, "epoch": 0.7580464371497198, "percentage": 75.82, "elapsed_time": "6:59:49", "remaining_time": "2:13:54"}
+{"current_steps": 2368, "total_steps": 3122, "loss": 2.1981, "learning_rate": 8.374495598364876e-06, "epoch": 0.7583666933546838, "percentage": 75.85, "elapsed_time": "7:00:00", "remaining_time": "2:13:44"}
+{"current_steps": 2369, "total_steps": 3122, "loss": 2.1722, "learning_rate": 8.353624715678093e-06, "epoch": 0.7586869495596478, "percentage": 75.88, "elapsed_time": "7:00:10", "remaining_time": "2:13:33"}
+{"current_steps": 2370, "total_steps": 3122, "loss": 2.2055, "learning_rate": 8.332774654677802e-06, "epoch": 0.7590072057646117, "percentage": 75.91, "elapsed_time": "7:00:21", "remaining_time": "2:13:22"}
+{"current_steps": 2371, "total_steps": 3122, "loss": 2.5394, "learning_rate": 8.311945441443759e-06, "epoch": 0.7593274619695757, "percentage": 75.94, "elapsed_time": "7:00:31", "remaining_time": "2:13:11"}
+{"current_steps": 2372, "total_steps": 3122, "loss": 2.7369, "learning_rate": 8.291137102029644e-06, "epoch": 0.7596477181745396, "percentage": 75.98, "elapsed_time": "7:00:41", "remaining_time": "2:13:01"}
+{"current_steps": 2373, "total_steps": 3122, "loss": 2.2094, "learning_rate": 8.270349662463032e-06, "epoch": 0.7599679743795036, "percentage": 76.01, "elapsed_time": "7:00:52", "remaining_time": "2:12:50"}
+{"current_steps": 2374, "total_steps": 3122, "loss": 2.7189, "learning_rate": 8.249583148745357e-06, "epoch": 0.7602882305844676, "percentage": 76.04, "elapsed_time": "7:01:02", "remaining_time": "2:12:39"}
+{"current_steps": 2375, "total_steps": 3122, "loss": 2.4148, "learning_rate": 8.228837586851859e-06, "epoch": 0.7606084867894315, "percentage": 76.07, "elapsed_time": "7:01:13", "remaining_time": "2:12:29"}
+{"current_steps": 2376, "total_steps": 3122, "loss": 2.1258, "learning_rate": 8.20811300273159e-06, "epoch": 0.7609287429943955, "percentage": 76.11, "elapsed_time": "7:01:23", "remaining_time": "2:12:18"}
+{"current_steps": 2377, "total_steps": 3122, "loss": 1.9111, "learning_rate": 8.187409422307365e-06, "epoch": 0.7612489991993595, "percentage": 76.14, "elapsed_time": "7:01:33", "remaining_time": "2:12:07"}
+{"current_steps": 2378, "total_steps": 3122, "loss": 2.2352, "learning_rate": 8.166726871475713e-06, "epoch": 0.7615692554043234, "percentage": 76.17, "elapsed_time": "7:01:44", "remaining_time": "2:11:56"}
+{"current_steps": 2379, "total_steps": 3122, "loss": 2.1225, "learning_rate": 8.146065376106873e-06, "epoch": 0.7618895116092874, "percentage": 76.2, "elapsed_time": "7:01:54", "remaining_time": "2:11:46"}
+{"current_steps": 2380, "total_steps": 3122, "loss": 2.1848, "learning_rate": 8.125424962044742e-06, "epoch": 0.7622097678142514, "percentage": 76.23, "elapsed_time": "7:02:04", "remaining_time": "2:11:35"}
+{"current_steps": 2381, "total_steps": 3122, "loss": 2.2108, "learning_rate": 8.10480565510683e-06, "epoch": 0.7625300240192153, "percentage": 76.27, "elapsed_time": "7:02:15", "remaining_time": "2:11:24"}
+{"current_steps": 2382, "total_steps": 3122, "loss": 2.359, "learning_rate": 8.084207481084282e-06, "epoch": 0.7628502802241793, "percentage": 76.3, "elapsed_time": "7:02:25", "remaining_time": "2:11:13"}
+{"current_steps": 2383, "total_steps": 3122, "loss": 1.9673, "learning_rate": 8.063630465741775e-06, "epoch": 0.7631705364291433, "percentage": 76.33, "elapsed_time": "7:02:36", "remaining_time": "2:11:03"}
+{"current_steps": 2384, "total_steps": 3122, "loss": 2.294, "learning_rate": 8.043074634817541e-06, "epoch": 0.7634907926341072, "percentage": 76.36, "elapsed_time": "7:02:46", "remaining_time": "2:10:52"}
+{"current_steps": 2385, "total_steps": 3122, "loss": 2.1543, "learning_rate": 8.022540014023306e-06, "epoch": 0.7638110488390712, "percentage": 76.39, "elapsed_time": "7:02:56", "remaining_time": "2:10:41"}
+{"current_steps": 2386, "total_steps": 3122, "loss": 2.2717, "learning_rate": 8.002026629044268e-06, "epoch": 0.7641313050440353, "percentage": 76.43, "elapsed_time": "7:03:07", "remaining_time": "2:10:31"}
+{"current_steps": 2387, "total_steps": 3122, "loss": 2.7924, "learning_rate": 7.981534505539063e-06, "epoch": 0.7644515612489992, "percentage": 76.46, "elapsed_time": "7:03:17", "remaining_time": "2:10:20"}
+{"current_steps": 2388, "total_steps": 3122, "loss": 2.4514, "learning_rate": 7.961063669139738e-06, "epoch": 0.7647718174539632, "percentage": 76.49, "elapsed_time": "7:03:28", "remaining_time": "2:10:09"}
+{"current_steps": 2389, "total_steps": 3122, "loss": 2.3244, "learning_rate": 7.940614145451683e-06, "epoch": 0.7650920736589272, "percentage": 76.52, "elapsed_time": "7:03:38", "remaining_time": "2:09:58"}
+{"current_steps": 2390, "total_steps": 3122, "loss": 1.8777, "learning_rate": 7.920185960053688e-06, "epoch": 0.7654123298638911, "percentage": 76.55, "elapsed_time": "7:03:48", "remaining_time": "2:09:48"}
+{"current_steps": 2391, "total_steps": 3122, "loss": 2.4442, "learning_rate": 7.899779138497796e-06, "epoch": 0.7657325860688551, "percentage": 76.59, "elapsed_time": "7:03:59", "remaining_time": "2:09:37"}
+{"current_steps": 2392, "total_steps": 3122, "loss": 2.174, "learning_rate": 7.879393706309354e-06, "epoch": 0.7660528422738191, "percentage": 76.62, "elapsed_time": "7:04:09", "remaining_time": "2:09:26"}
+{"current_steps": 2393, "total_steps": 3122, "loss": 1.5029, "learning_rate": 7.859029688986952e-06, "epoch": 0.766373098478783, "percentage": 76.65, "elapsed_time": "7:04:20", "remaining_time": "2:09:16"}
+{"current_steps": 2394, "total_steps": 3122, "loss": 2.0569, "learning_rate": 7.838687112002397e-06, "epoch": 0.766693354683747, "percentage": 76.68, "elapsed_time": "7:04:30", "remaining_time": "2:09:05"}
+{"current_steps": 2395, "total_steps": 3122, "loss": 2.0224, "learning_rate": 7.818366000800666e-06, "epoch": 0.767013610888711, "percentage": 76.71, "elapsed_time": "7:04:40", "remaining_time": "2:08:54"}
+{"current_steps": 2396, "total_steps": 3122, "loss": 2.3784, "learning_rate": 7.798066380799907e-06, "epoch": 0.7673338670936749, "percentage": 76.75, "elapsed_time": "7:04:51", "remaining_time": "2:08:43"}
+{"current_steps": 2397, "total_steps": 3122, "loss": 2.0502, "learning_rate": 7.777788277391348e-06, "epoch": 0.7676541232986389, "percentage": 76.78, "elapsed_time": "7:05:01", "remaining_time": "2:08:33"}
+{"current_steps": 2398, "total_steps": 3122, "loss": 1.6753, "learning_rate": 7.757531715939358e-06, "epoch": 0.7679743795036029, "percentage": 76.81, "elapsed_time": "7:05:11", "remaining_time": "2:08:22"}
+{"current_steps": 2399, "total_steps": 3122, "loss": 2.408, "learning_rate": 7.73729672178131e-06, "epoch": 0.7682946357085668, "percentage": 76.84, "elapsed_time": "7:05:22", "remaining_time": "2:08:11"}
+{"current_steps": 2400, "total_steps": 3122, "loss": 2.0858, "learning_rate": 7.717083320227627e-06, "epoch": 0.7686148919135308, "percentage": 76.87, "elapsed_time": "7:05:32", "remaining_time": "2:08:01"}
+{"current_steps": 2401, "total_steps": 3122, "loss": 2.4706, "learning_rate": 7.69689153656172e-06, "epoch": 0.7689351481184948, "percentage": 76.91, "elapsed_time": "7:06:09", "remaining_time": "2:07:58"}
+{"current_steps": 2402, "total_steps": 3122, "loss": 2.2135, "learning_rate": 7.676721396039963e-06, "epoch": 0.7692554043234587, "percentage": 76.94, "elapsed_time": "7:06:20", "remaining_time": "2:07:47"}
+{"current_steps": 2403, "total_steps": 3122, "loss": 2.5483, "learning_rate": 7.65657292389163e-06, "epoch": 0.7695756605284227, "percentage": 76.97, "elapsed_time": "7:06:30", "remaining_time": "2:07:36"}
+{"current_steps": 2404, "total_steps": 3122, "loss": 2.4565, "learning_rate": 7.636446145318945e-06, "epoch": 0.7698959167333868, "percentage": 77.0, "elapsed_time": "7:06:40", "remaining_time": "2:07:26"}
+{"current_steps": 2405, "total_steps": 3122, "loss": 2.0011, "learning_rate": 7.6163410854969476e-06, "epoch": 0.7702161729383507, "percentage": 77.03, "elapsed_time": "7:06:51", "remaining_time": "2:07:15"}
+{"current_steps": 2406, "total_steps": 3122, "loss": 2.4179, "learning_rate": 7.596257769573534e-06, "epoch": 0.7705364291433147, "percentage": 77.07, "elapsed_time": "7:07:01", "remaining_time": "2:07:04"}
+{"current_steps": 2407, "total_steps": 3122, "loss": 2.2249, "learning_rate": 7.576196222669396e-06, "epoch": 0.7708566853482787, "percentage": 77.1, "elapsed_time": "7:07:12", "remaining_time": "2:06:54"}
+{"current_steps": 2408, "total_steps": 3122, "loss": 2.3321, "learning_rate": 7.5561564698780065e-06, "epoch": 0.7711769415532426, "percentage": 77.13, "elapsed_time": "7:07:22", "remaining_time": "2:06:43"}
+{"current_steps": 2409, "total_steps": 3122, "loss": 2.2056, "learning_rate": 7.536138536265563e-06, "epoch": 0.7714971977582066, "percentage": 77.16, "elapsed_time": "7:07:33", "remaining_time": "2:06:32"}
+{"current_steps": 2410, "total_steps": 3122, "loss": 2.3361, "learning_rate": 7.516142446870989e-06, "epoch": 0.7718174539631706, "percentage": 77.19, "elapsed_time": "7:07:43", "remaining_time": "2:06:21"}
+{"current_steps": 2411, "total_steps": 3122, "loss": 1.8415, "learning_rate": 7.496168226705852e-06, "epoch": 0.7721377101681345, "percentage": 77.23, "elapsed_time": "7:07:53", "remaining_time": "2:06:11"}
+{"current_steps": 2412, "total_steps": 3122, "loss": 2.214, "learning_rate": 7.476215900754413e-06, "epoch": 0.7724579663730985, "percentage": 77.26, "elapsed_time": "7:08:04", "remaining_time": "2:06:00"}
+{"current_steps": 2413, "total_steps": 3122, "loss": 2.1685, "learning_rate": 7.456285493973506e-06, "epoch": 0.7727782225780625, "percentage": 77.29, "elapsed_time": "7:08:14", "remaining_time": "2:05:49"}
+{"current_steps": 2414, "total_steps": 3122, "loss": 1.6529, "learning_rate": 7.4363770312925625e-06, "epoch": 0.7730984787830264, "percentage": 77.32, "elapsed_time": "7:08:25", "remaining_time": "2:05:39"}
+{"current_steps": 2415, "total_steps": 3122, "loss": 2.5159, "learning_rate": 7.416490537613571e-06, "epoch": 0.7734187349879904, "percentage": 77.35, "elapsed_time": "7:08:35", "remaining_time": "2:05:28"}
+{"current_steps": 2416, "total_steps": 3122, "loss": 1.9631, "learning_rate": 7.396626037811042e-06, "epoch": 0.7737389911929544, "percentage": 77.39, "elapsed_time": "7:08:45", "remaining_time": "2:05:17"}
+{"current_steps": 2417, "total_steps": 3122, "loss": 2.3239, "learning_rate": 7.376783556731948e-06, "epoch": 0.7740592473979183, "percentage": 77.42, "elapsed_time": "7:08:56", "remaining_time": "2:05:06"}
+{"current_steps": 2418, "total_steps": 3122, "loss": 1.8956, "learning_rate": 7.35696311919577e-06, "epoch": 0.7743795036028823, "percentage": 77.45, "elapsed_time": "7:09:06", "remaining_time": "2:04:56"}
+{"current_steps": 2419, "total_steps": 3122, "loss": 2.2789, "learning_rate": 7.337164749994368e-06, "epoch": 0.7746997598078462, "percentage": 77.48, "elapsed_time": "7:09:17", "remaining_time": "2:04:45"}
+{"current_steps": 2420, "total_steps": 3122, "loss": 2.1517, "learning_rate": 7.317388473892023e-06, "epoch": 0.7750200160128102, "percentage": 77.51, "elapsed_time": "7:09:27", "remaining_time": "2:04:34"}
+{"current_steps": 2421, "total_steps": 3122, "loss": 1.8434, "learning_rate": 7.297634315625377e-06, "epoch": 0.7753402722177742, "percentage": 77.55, "elapsed_time": "7:09:37", "remaining_time": "2:04:23"}
+{"current_steps": 2422, "total_steps": 3122, "loss": 2.4362, "learning_rate": 7.277902299903405e-06, "epoch": 0.7756605284227381, "percentage": 77.58, "elapsed_time": "7:09:48", "remaining_time": "2:04:13"}
+{"current_steps": 2423, "total_steps": 3122, "loss": 2.2693, "learning_rate": 7.2581924514073916e-06, "epoch": 0.7759807846277021, "percentage": 77.61, "elapsed_time": "7:09:58", "remaining_time": "2:04:02"}
+{"current_steps": 2424, "total_steps": 3122, "loss": 2.4455, "learning_rate": 7.238504794790893e-06, "epoch": 0.7763010408326662, "percentage": 77.64, "elapsed_time": "7:10:08", "remaining_time": "2:03:51"}
+{"current_steps": 2425, "total_steps": 3122, "loss": 2.5956, "learning_rate": 7.218839354679683e-06, "epoch": 0.77662129703763, "percentage": 77.67, "elapsed_time": "7:10:19", "remaining_time": "2:03:41"}
+{"current_steps": 2426, "total_steps": 3122, "loss": 2.187, "learning_rate": 7.199196155671795e-06, "epoch": 0.7769415532425941, "percentage": 77.71, "elapsed_time": "7:10:29", "remaining_time": "2:03:30"}
+{"current_steps": 2427, "total_steps": 3122, "loss": 2.5182, "learning_rate": 7.179575222337393e-06, "epoch": 0.7772618094475581, "percentage": 77.74, "elapsed_time": "7:10:39", "remaining_time": "2:03:19"}
+{"current_steps": 2428, "total_steps": 3122, "loss": 1.9639, "learning_rate": 7.159976579218819e-06, "epoch": 0.777582065652522, "percentage": 77.77, "elapsed_time": "7:10:50", "remaining_time": "2:03:08"}
+{"current_steps": 2429, "total_steps": 3122, "loss": 2.2367, "learning_rate": 7.140400250830529e-06, "epoch": 0.777902321857486, "percentage": 77.8, "elapsed_time": "7:11:00", "remaining_time": "2:02:58"}
+{"current_steps": 2430, "total_steps": 3122, "loss": 2.4143, "learning_rate": 7.12084626165907e-06, "epoch": 0.77822257806245, "percentage": 77.83, "elapsed_time": "7:11:10", "remaining_time": "2:02:47"}
+{"current_steps": 2431, "total_steps": 3122, "loss": 1.9487, "learning_rate": 7.10131463616302e-06, "epoch": 0.7785428342674139, "percentage": 77.87, "elapsed_time": "7:11:21", "remaining_time": "2:02:36"}
+{"current_steps": 2432, "total_steps": 3122, "loss": 2.0972, "learning_rate": 7.0818053987730395e-06, "epoch": 0.7788630904723779, "percentage": 77.9, "elapsed_time": "7:11:31", "remaining_time": "2:02:25"}
+{"current_steps": 2433, "total_steps": 3122, "loss": 2.4615, "learning_rate": 7.062318573891716e-06, "epoch": 0.7791833466773419, "percentage": 77.93, "elapsed_time": "7:11:41", "remaining_time": "2:02:15"}
+{"current_steps": 2434, "total_steps": 3122, "loss": 2.0897, "learning_rate": 7.042854185893674e-06, "epoch": 0.7795036028823058, "percentage": 77.96, "elapsed_time": "7:11:52", "remaining_time": "2:02:04"}
+{"current_steps": 2435, "total_steps": 3122, "loss": 2.435, "learning_rate": 7.023412259125414e-06, "epoch": 0.7798238590872698, "percentage": 77.99, "elapsed_time": "7:12:02", "remaining_time": "2:01:53"}
+{"current_steps": 2436, "total_steps": 3122, "loss": 2.3402, "learning_rate": 7.00399281790537e-06, "epoch": 0.7801441152922338, "percentage": 78.03, "elapsed_time": "7:12:13", "remaining_time": "2:01:42"}
+{"current_steps": 2437, "total_steps": 3122, "loss": 2.1758, "learning_rate": 6.984595886523848e-06, "epoch": 0.7804643714971977, "percentage": 78.06, "elapsed_time": "7:12:23", "remaining_time": "2:01:32"}
+{"current_steps": 2438, "total_steps": 3122, "loss": 2.3811, "learning_rate": 6.965221489243007e-06, "epoch": 0.7807846277021617, "percentage": 78.09, "elapsed_time": "7:12:33", "remaining_time": "2:01:21"}
+{"current_steps": 2439, "total_steps": 3122, "loss": 1.8303, "learning_rate": 6.94586965029678e-06, "epoch": 0.7811048839071257, "percentage": 78.12, "elapsed_time": "7:12:44", "remaining_time": "2:01:10"}
+{"current_steps": 2440, "total_steps": 3122, "loss": 2.0528, "learning_rate": 6.926540393890948e-06, "epoch": 0.7814251401120896, "percentage": 78.16, "elapsed_time": "7:12:54", "remaining_time": "2:01:00"}
+{"current_steps": 2441, "total_steps": 3122, "loss": 2.1735, "learning_rate": 6.907233744202985e-06, "epoch": 0.7817453963170536, "percentage": 78.19, "elapsed_time": "7:13:04", "remaining_time": "2:00:49"}
+{"current_steps": 2442, "total_steps": 3122, "loss": 2.369, "learning_rate": 6.887949725382117e-06, "epoch": 0.7820656525220177, "percentage": 78.22, "elapsed_time": "7:13:15", "remaining_time": "2:00:38"}
+{"current_steps": 2443, "total_steps": 3122, "loss": 2.4711, "learning_rate": 6.8686883615492666e-06, "epoch": 0.7823859087269815, "percentage": 78.25, "elapsed_time": "7:13:25", "remaining_time": "2:00:27"}
+{"current_steps": 2444, "total_steps": 3122, "loss": 2.5019, "learning_rate": 6.84944967679701e-06, "epoch": 0.7827061649319456, "percentage": 78.28, "elapsed_time": "7:13:35", "remaining_time": "2:00:17"}
+{"current_steps": 2445, "total_steps": 3122, "loss": 2.4643, "learning_rate": 6.830233695189539e-06, "epoch": 0.7830264211369096, "percentage": 78.32, "elapsed_time": "7:13:46", "remaining_time": "2:00:06"}
+{"current_steps": 2446, "total_steps": 3122, "loss": 1.7722, "learning_rate": 6.8110404407626946e-06, "epoch": 0.7833466773418735, "percentage": 78.35, "elapsed_time": "7:13:56", "remaining_time": "1:59:55"}
+{"current_steps": 2447, "total_steps": 3122, "loss": 1.7393, "learning_rate": 6.791869937523831e-06, "epoch": 0.7836669335468375, "percentage": 78.38, "elapsed_time": "7:14:07", "remaining_time": "1:59:45"}
+{"current_steps": 2448, "total_steps": 3122, "loss": 1.9059, "learning_rate": 6.772722209451904e-06, "epoch": 0.7839871897518015, "percentage": 78.41, "elapsed_time": "7:14:17", "remaining_time": "1:59:34"}
+{"current_steps": 2449, "total_steps": 3122, "loss": 1.9944, "learning_rate": 6.753597280497329e-06, "epoch": 0.7843074459567654, "percentage": 78.44, "elapsed_time": "7:14:27", "remaining_time": "1:59:23"}
+{"current_steps": 2450, "total_steps": 3122, "loss": 2.2997, "learning_rate": 6.734495174582037e-06, "epoch": 0.7846277021617294, "percentage": 78.48, "elapsed_time": "7:14:38", "remaining_time": "1:59:12"}
+{"current_steps": 2451, "total_steps": 3122, "loss": 2.5738, "learning_rate": 6.715415915599399e-06, "epoch": 0.7849479583666934, "percentage": 78.51, "elapsed_time": "7:14:48", "remaining_time": "1:59:02"}
+{"current_steps": 2452, "total_steps": 3122, "loss": 2.5298, "learning_rate": 6.69635952741422e-06, "epoch": 0.7852682145716573, "percentage": 78.54, "elapsed_time": "7:14:58", "remaining_time": "1:58:51"}
+{"current_steps": 2453, "total_steps": 3122, "loss": 2.172, "learning_rate": 6.677326033862666e-06, "epoch": 0.7855884707766213, "percentage": 78.57, "elapsed_time": "7:15:09", "remaining_time": "1:58:40"}
+{"current_steps": 2454, "total_steps": 3122, "loss": 1.9617, "learning_rate": 6.658315458752315e-06, "epoch": 0.7859087269815853, "percentage": 78.6, "elapsed_time": "7:15:19", "remaining_time": "1:58:29"}
+{"current_steps": 2455, "total_steps": 3122, "loss": 2.0634, "learning_rate": 6.639327825862035e-06, "epoch": 0.7862289831865492, "percentage": 78.64, "elapsed_time": "7:15:29", "remaining_time": "1:58:19"}
+{"current_steps": 2456, "total_steps": 3122, "loss": 2.2057, "learning_rate": 6.620363158942016e-06, "epoch": 0.7865492393915132, "percentage": 78.67, "elapsed_time": "7:15:40", "remaining_time": "1:58:08"}
+{"current_steps": 2457, "total_steps": 3122, "loss": 2.4316, "learning_rate": 6.601421481713724e-06, "epoch": 0.7868694955964772, "percentage": 78.7, "elapsed_time": "7:15:50", "remaining_time": "1:57:57"}
+{"current_steps": 2458, "total_steps": 3122, "loss": 2.2507, "learning_rate": 6.582502817869868e-06, "epoch": 0.7871897518014411, "percentage": 78.73, "elapsed_time": "7:16:01", "remaining_time": "1:57:47"}
+{"current_steps": 2459, "total_steps": 3122, "loss": 2.264, "learning_rate": 6.563607191074345e-06, "epoch": 0.7875100080064051, "percentage": 78.76, "elapsed_time": "7:16:11", "remaining_time": "1:57:36"}
+{"current_steps": 2460, "total_steps": 3122, "loss": 2.4022, "learning_rate": 6.5447346249622926e-06, "epoch": 0.7878302642113691, "percentage": 78.8, "elapsed_time": "7:16:21", "remaining_time": "1:57:25"}
+{"current_steps": 2461, "total_steps": 3122, "loss": 2.6929, "learning_rate": 6.52588514313994e-06, "epoch": 0.788150520416333, "percentage": 78.83, "elapsed_time": "7:16:32", "remaining_time": "1:57:14"}
+{"current_steps": 2462, "total_steps": 3122, "loss": 2.1782, "learning_rate": 6.507058769184699e-06, "epoch": 0.788470776621297, "percentage": 78.86, "elapsed_time": "7:16:42", "remaining_time": "1:57:04"}
+{"current_steps": 2463, "total_steps": 3122, "loss": 1.8834, "learning_rate": 6.488255526645029e-06, "epoch": 0.7887910328262611, "percentage": 78.89, "elapsed_time": "7:16:52", "remaining_time": "1:56:53"}
+{"current_steps": 2464, "total_steps": 3122, "loss": 2.4088, "learning_rate": 6.46947543904049e-06, "epoch": 0.789111289031225, "percentage": 78.92, "elapsed_time": "7:17:03", "remaining_time": "1:56:42"}
+{"current_steps": 2465, "total_steps": 3122, "loss": 2.7434, "learning_rate": 6.450718529861663e-06, "epoch": 0.789431545236189, "percentage": 78.96, "elapsed_time": "7:17:13", "remaining_time": "1:56:32"}
+{"current_steps": 2466, "total_steps": 3122, "loss": 2.0478, "learning_rate": 6.431984822570147e-06, "epoch": 0.7897518014411529, "percentage": 78.99, "elapsed_time": "7:17:23", "remaining_time": "1:56:21"}
+{"current_steps": 2467, "total_steps": 3122, "loss": 2.5495, "learning_rate": 6.413274340598496e-06, "epoch": 0.7900720576461169, "percentage": 79.02, "elapsed_time": "7:17:34", "remaining_time": "1:56:10"}
+{"current_steps": 2468, "total_steps": 3122, "loss": 1.9307, "learning_rate": 6.394587107350258e-06, "epoch": 0.7903923138510809, "percentage": 79.05, "elapsed_time": "7:17:44", "remaining_time": "1:55:59"}
+{"current_steps": 2469, "total_steps": 3122, "loss": 1.8534, "learning_rate": 6.3759231461998525e-06, "epoch": 0.7907125700560448, "percentage": 79.08, "elapsed_time": "7:17:55", "remaining_time": "1:55:49"}
+{"current_steps": 2470, "total_steps": 3122, "loss": 1.9793, "learning_rate": 6.357282480492616e-06, "epoch": 0.7910328262610088, "percentage": 79.12, "elapsed_time": "7:18:05", "remaining_time": "1:55:38"}
+{"current_steps": 2471, "total_steps": 3122, "loss": 2.3047, "learning_rate": 6.338665133544744e-06, "epoch": 0.7913530824659728, "percentage": 79.15, "elapsed_time": "7:18:15", "remaining_time": "1:55:27"}
+{"current_steps": 2472, "total_steps": 3122, "loss": 2.4341, "learning_rate": 6.32007112864326e-06, "epoch": 0.7916733386709367, "percentage": 79.18, "elapsed_time": "7:18:26", "remaining_time": "1:55:17"}
+{"current_steps": 2473, "total_steps": 3122, "loss": 1.6601, "learning_rate": 6.3015004890459915e-06, "epoch": 0.7919935948759007, "percentage": 79.21, "elapsed_time": "7:18:36", "remaining_time": "1:55:06"}
+{"current_steps": 2474, "total_steps": 3122, "loss": 2.1922, "learning_rate": 6.282953237981551e-06, "epoch": 0.7923138510808647, "percentage": 79.24, "elapsed_time": "7:18:46", "remaining_time": "1:54:55"}
+{"current_steps": 2475, "total_steps": 3122, "loss": 1.6936, "learning_rate": 6.264429398649263e-06, "epoch": 0.7926341072858286, "percentage": 79.28, "elapsed_time": "7:18:57", "remaining_time": "1:54:44"}
+{"current_steps": 2476, "total_steps": 3122, "loss": 1.8489, "learning_rate": 6.245928994219222e-06, "epoch": 0.7929543634907926, "percentage": 79.31, "elapsed_time": "7:19:07", "remaining_time": "1:54:34"}
+{"current_steps": 2477, "total_steps": 3122, "loss": 2.7892, "learning_rate": 6.227452047832155e-06, "epoch": 0.7932746196957566, "percentage": 79.34, "elapsed_time": "7:19:17", "remaining_time": "1:54:23"}
+{"current_steps": 2478, "total_steps": 3122, "loss": 2.4221, "learning_rate": 6.208998582599476e-06, "epoch": 0.7935948759007205, "percentage": 79.37, "elapsed_time": "7:19:28", "remaining_time": "1:54:12"}
+{"current_steps": 2479, "total_steps": 3122, "loss": 2.2199, "learning_rate": 6.1905686216032264e-06, "epoch": 0.7939151321056845, "percentage": 79.4, "elapsed_time": "7:19:38", "remaining_time": "1:54:02"}
+{"current_steps": 2480, "total_steps": 3122, "loss": 2.4266, "learning_rate": 6.1721621878960526e-06, "epoch": 0.7942353883106485, "percentage": 79.44, "elapsed_time": "7:19:49", "remaining_time": "1:53:51"}
+{"current_steps": 2481, "total_steps": 3122, "loss": 1.9723, "learning_rate": 6.153779304501139e-06, "epoch": 0.7945556445156124, "percentage": 79.47, "elapsed_time": "7:19:59", "remaining_time": "1:53:40"}
+{"current_steps": 2482, "total_steps": 3122, "loss": 2.4696, "learning_rate": 6.135419994412272e-06, "epoch": 0.7948759007205765, "percentage": 79.5, "elapsed_time": "7:20:09", "remaining_time": "1:53:29"}
+{"current_steps": 2483, "total_steps": 3122, "loss": 2.081, "learning_rate": 6.1170842805936905e-06, "epoch": 0.7951961569255405, "percentage": 79.53, "elapsed_time": "7:20:20", "remaining_time": "1:53:19"}
+{"current_steps": 2484, "total_steps": 3122, "loss": 2.4716, "learning_rate": 6.098772185980159e-06, "epoch": 0.7955164131305044, "percentage": 79.56, "elapsed_time": "7:20:30", "remaining_time": "1:53:08"}
+{"current_steps": 2485, "total_steps": 3122, "loss": 1.9128, "learning_rate": 6.080483733476883e-06, "epoch": 0.7958366693354684, "percentage": 79.6, "elapsed_time": "7:20:40", "remaining_time": "1:52:57"}
+{"current_steps": 2486, "total_steps": 3122, "loss": 2.4175, "learning_rate": 6.062218945959497e-06, "epoch": 0.7961569255404324, "percentage": 79.63, "elapsed_time": "7:20:51", "remaining_time": "1:52:47"}
+{"current_steps": 2487, "total_steps": 3122, "loss": 2.0246, "learning_rate": 6.04397784627404e-06, "epoch": 0.7964771817453963, "percentage": 79.66, "elapsed_time": "7:21:01", "remaining_time": "1:52:36"}
+{"current_steps": 2488, "total_steps": 3122, "loss": 2.3537, "learning_rate": 6.025760457236926e-06, "epoch": 0.7967974379503603, "percentage": 79.69, "elapsed_time": "7:21:11", "remaining_time": "1:52:25"}
+{"current_steps": 2489, "total_steps": 3122, "loss": 2.7204, "learning_rate": 6.007566801634876e-06, "epoch": 0.7971176941553243, "percentage": 79.72, "elapsed_time": "7:21:22", "remaining_time": "1:52:14"}
+{"current_steps": 2490, "total_steps": 3122, "loss": 2.1869, "learning_rate": 5.989396902224986e-06, "epoch": 0.7974379503602882, "percentage": 79.76, "elapsed_time": "7:21:32", "remaining_time": "1:52:04"}
+{"current_steps": 2491, "total_steps": 3122, "loss": 2.5756, "learning_rate": 5.97125078173458e-06, "epoch": 0.7977582065652522, "percentage": 79.79, "elapsed_time": "7:21:42", "remaining_time": "1:51:53"}
+{"current_steps": 2492, "total_steps": 3122, "loss": 2.2436, "learning_rate": 5.953128462861268e-06, "epoch": 0.7980784627702162, "percentage": 79.82, "elapsed_time": "7:21:53", "remaining_time": "1:51:42"}
+{"current_steps": 2493, "total_steps": 3122, "loss": 1.6643, "learning_rate": 5.935029968272885e-06, "epoch": 0.7983987189751801, "percentage": 79.85, "elapsed_time": "7:22:03", "remaining_time": "1:51:32"}
+{"current_steps": 2494, "total_steps": 3122, "loss": 2.1245, "learning_rate": 5.916955320607465e-06, "epoch": 0.7987189751801441, "percentage": 79.88, "elapsed_time": "7:22:14", "remaining_time": "1:51:21"}
+{"current_steps": 2495, "total_steps": 3122, "loss": 2.1199, "learning_rate": 5.898904542473197e-06, "epoch": 0.7990392313851081, "percentage": 79.92, "elapsed_time": "7:22:24", "remaining_time": "1:51:10"}
+{"current_steps": 2496, "total_steps": 3122, "loss": 2.4544, "learning_rate": 5.8808776564484524e-06, "epoch": 0.799359487590072, "percentage": 79.95, "elapsed_time": "7:22:34", "remaining_time": "1:50:59"}
+{"current_steps": 2497, "total_steps": 3122, "loss": 2.386, "learning_rate": 5.862874685081673e-06, "epoch": 0.799679743795036, "percentage": 79.98, "elapsed_time": "7:22:45", "remaining_time": "1:50:49"}
+{"current_steps": 2498, "total_steps": 3122, "loss": 2.2664, "learning_rate": 5.844895650891416e-06, "epoch": 0.8, "percentage": 80.01, "elapsed_time": "7:22:55", "remaining_time": "1:50:38"}
+{"current_steps": 2499, "total_steps": 3122, "loss": 2.2293, "learning_rate": 5.826940576366291e-06, "epoch": 0.8003202562049639, "percentage": 80.04, "elapsed_time": "7:23:05", "remaining_time": "1:50:27"}
+{"current_steps": 2500, "total_steps": 3122, "loss": 1.8299, "learning_rate": 5.809009483964936e-06, "epoch": 0.800640512409928, "percentage": 80.08, "elapsed_time": "7:23:16", "remaining_time": "1:50:17"}
+{"current_steps": 2501, "total_steps": 3122, "loss": 2.4019, "learning_rate": 5.791102396115991e-06, "epoch": 0.800960768614892, "percentage": 80.11, "elapsed_time": "7:23:52", "remaining_time": "1:50:12"}
+{"current_steps": 2502, "total_steps": 3122, "loss": 2.5534, "learning_rate": 5.773219335218083e-06, "epoch": 0.8012810248198559, "percentage": 80.14, "elapsed_time": "7:24:02", "remaining_time": "1:50:02"}
+{"current_steps": 2503, "total_steps": 3122, "loss": 2.1044, "learning_rate": 5.75536032363975e-06, "epoch": 0.8016012810248199, "percentage": 80.17, "elapsed_time": "7:24:13", "remaining_time": "1:49:51"}
+{"current_steps": 2504, "total_steps": 3122, "loss": 1.7572, "learning_rate": 5.737525383719499e-06, "epoch": 0.8019215372297839, "percentage": 80.2, "elapsed_time": "7:24:23", "remaining_time": "1:49:40"}
+{"current_steps": 2505, "total_steps": 3122, "loss": 2.5762, "learning_rate": 5.719714537765688e-06, "epoch": 0.8022417934347478, "percentage": 80.24, "elapsed_time": "7:24:34", "remaining_time": "1:49:30"}
+{"current_steps": 2506, "total_steps": 3122, "loss": 2.3808, "learning_rate": 5.7019278080565535e-06, "epoch": 0.8025620496397118, "percentage": 80.27, "elapsed_time": "7:24:44", "remaining_time": "1:49:19"}
+{"current_steps": 2507, "total_steps": 3122, "loss": 2.4309, "learning_rate": 5.684165216840165e-06, "epoch": 0.8028823058446758, "percentage": 80.3, "elapsed_time": "7:24:54", "remaining_time": "1:49:08"}
+{"current_steps": 2508, "total_steps": 3122, "loss": 2.4435, "learning_rate": 5.666426786334405e-06, "epoch": 0.8032025620496397, "percentage": 80.33, "elapsed_time": "7:25:05", "remaining_time": "1:48:57"}
+{"current_steps": 2509, "total_steps": 3122, "loss": 2.1253, "learning_rate": 5.648712538726911e-06, "epoch": 0.8035228182546037, "percentage": 80.37, "elapsed_time": "7:25:15", "remaining_time": "1:48:47"}
+{"current_steps": 2510, "total_steps": 3122, "loss": 2.5646, "learning_rate": 5.631022496175115e-06, "epoch": 0.8038430744595677, "percentage": 80.4, "elapsed_time": "7:25:26", "remaining_time": "1:48:36"}
+{"current_steps": 2511, "total_steps": 3122, "loss": 2.106, "learning_rate": 5.61335668080612e-06, "epoch": 0.8041633306645316, "percentage": 80.43, "elapsed_time": "7:25:36", "remaining_time": "1:48:25"}
+{"current_steps": 2512, "total_steps": 3122, "loss": 2.2236, "learning_rate": 5.595715114716782e-06, "epoch": 0.8044835868694956, "percentage": 80.46, "elapsed_time": "7:25:47", "remaining_time": "1:48:15"}
+{"current_steps": 2513, "total_steps": 3122, "loss": 2.451, "learning_rate": 5.578097819973577e-06, "epoch": 0.8048038430744595, "percentage": 80.49, "elapsed_time": "7:25:57", "remaining_time": "1:48:04"}
+{"current_steps": 2514, "total_steps": 3122, "loss": 2.1605, "learning_rate": 5.560504818612641e-06, "epoch": 0.8051240992794235, "percentage": 80.53, "elapsed_time": "7:26:07", "remaining_time": "1:47:53"}
+{"current_steps": 2515, "total_steps": 3122, "loss": 2.5384, "learning_rate": 5.5429361326397285e-06, "epoch": 0.8054443554843875, "percentage": 80.56, "elapsed_time": "7:26:18", "remaining_time": "1:47:42"}
+{"current_steps": 2516, "total_steps": 3122, "loss": 2.0079, "learning_rate": 5.525391784030182e-06, "epoch": 0.8057646116893514, "percentage": 80.59, "elapsed_time": "7:26:28", "remaining_time": "1:47:32"}
+{"current_steps": 2517, "total_steps": 3122, "loss": 1.5529, "learning_rate": 5.507871794728872e-06, "epoch": 0.8060848678943154, "percentage": 80.62, "elapsed_time": "7:26:39", "remaining_time": "1:47:21"}
+{"current_steps": 2518, "total_steps": 3122, "loss": 2.1881, "learning_rate": 5.4903761866502475e-06, "epoch": 0.8064051240992794, "percentage": 80.65, "elapsed_time": "7:26:49", "remaining_time": "1:47:10"}
+{"current_steps": 2519, "total_steps": 3122, "loss": 2.1702, "learning_rate": 5.47290498167822e-06, "epoch": 0.8067253803042433, "percentage": 80.69, "elapsed_time": "7:26:59", "remaining_time": "1:47:00"}
+{"current_steps": 2520, "total_steps": 3122, "loss": 2.2788, "learning_rate": 5.455458201666197e-06, "epoch": 0.8070456365092074, "percentage": 80.72, "elapsed_time": "7:27:10", "remaining_time": "1:46:49"}
+{"current_steps": 2521, "total_steps": 3122, "loss": 2.2958, "learning_rate": 5.43803586843703e-06, "epoch": 0.8073658927141714, "percentage": 80.75, "elapsed_time": "7:27:20", "remaining_time": "1:46:38"}
+{"current_steps": 2522, "total_steps": 3122, "loss": 2.4007, "learning_rate": 5.420638003783002e-06, "epoch": 0.8076861489191353, "percentage": 80.78, "elapsed_time": "7:27:30", "remaining_time": "1:46:27"}
+{"current_steps": 2523, "total_steps": 3122, "loss": 2.1257, "learning_rate": 5.403264629465757e-06, "epoch": 0.8080064051240993, "percentage": 80.81, "elapsed_time": "7:27:41", "remaining_time": "1:46:17"}
+{"current_steps": 2524, "total_steps": 3122, "loss": 2.2356, "learning_rate": 5.3859157672163564e-06, "epoch": 0.8083266613290633, "percentage": 80.85, "elapsed_time": "7:27:51", "remaining_time": "1:46:06"}
+{"current_steps": 2525, "total_steps": 3122, "loss": 2.5254, "learning_rate": 5.368591438735149e-06, "epoch": 0.8086469175340272, "percentage": 80.88, "elapsed_time": "7:28:01", "remaining_time": "1:45:55"}
+{"current_steps": 2526, "total_steps": 3122, "loss": 2.1586, "learning_rate": 5.3512916656918485e-06, "epoch": 0.8089671737389912, "percentage": 80.91, "elapsed_time": "7:28:12", "remaining_time": "1:45:45"}
+{"current_steps": 2527, "total_steps": 3122, "loss": 2.3058, "learning_rate": 5.334016469725409e-06, "epoch": 0.8092874299439552, "percentage": 80.94, "elapsed_time": "7:28:22", "remaining_time": "1:45:34"}
+{"current_steps": 2528, "total_steps": 3122, "loss": 2.061, "learning_rate": 5.31676587244406e-06, "epoch": 0.8096076861489191, "percentage": 80.97, "elapsed_time": "7:28:33", "remaining_time": "1:45:23"}
+{"current_steps": 2529, "total_steps": 3122, "loss": 2.6985, "learning_rate": 5.299539895425271e-06, "epoch": 0.8099279423538831, "percentage": 81.01, "elapsed_time": "7:28:43", "remaining_time": "1:45:13"}
+{"current_steps": 2530, "total_steps": 3122, "loss": 1.9756, "learning_rate": 5.282338560215711e-06, "epoch": 0.8102481985588471, "percentage": 81.04, "elapsed_time": "7:28:53", "remaining_time": "1:45:02"}
+{"current_steps": 2531, "total_steps": 3122, "loss": 2.1155, "learning_rate": 5.265161888331205e-06, "epoch": 0.810568454763811, "percentage": 81.07, "elapsed_time": "7:29:04", "remaining_time": "1:44:51"}
+{"current_steps": 2532, "total_steps": 3122, "loss": 2.2378, "learning_rate": 5.248009901256776e-06, "epoch": 0.810888710968775, "percentage": 81.1, "elapsed_time": "7:29:14", "remaining_time": "1:44:40"}
+{"current_steps": 2533, "total_steps": 3122, "loss": 2.1956, "learning_rate": 5.230882620446517e-06, "epoch": 0.811208967173739, "percentage": 81.13, "elapsed_time": "7:29:24", "remaining_time": "1:44:30"}
+{"current_steps": 2534, "total_steps": 3122, "loss": 2.4922, "learning_rate": 5.213780067323654e-06, "epoch": 0.8115292233787029, "percentage": 81.17, "elapsed_time": "7:29:35", "remaining_time": "1:44:19"}
+{"current_steps": 2535, "total_steps": 3122, "loss": 2.0935, "learning_rate": 5.19670226328047e-06, "epoch": 0.8118494795836669, "percentage": 81.2, "elapsed_time": "7:29:45", "remaining_time": "1:44:08"}
+{"current_steps": 2536, "total_steps": 3122, "loss": 1.7568, "learning_rate": 5.1796492296782905e-06, "epoch": 0.8121697357886309, "percentage": 81.23, "elapsed_time": "7:29:55", "remaining_time": "1:43:58"}
+{"current_steps": 2537, "total_steps": 3122, "loss": 2.527, "learning_rate": 5.162620987847466e-06, "epoch": 0.8124899919935948, "percentage": 81.26, "elapsed_time": "7:30:06", "remaining_time": "1:43:47"}
+{"current_steps": 2538, "total_steps": 3122, "loss": 2.5302, "learning_rate": 5.145617559087332e-06, "epoch": 0.8128102481985588, "percentage": 81.29, "elapsed_time": "7:30:16", "remaining_time": "1:43:36"}
+{"current_steps": 2539, "total_steps": 3122, "loss": 2.2782, "learning_rate": 5.128638964666166e-06, "epoch": 0.8131305044035229, "percentage": 81.33, "elapsed_time": "7:30:27", "remaining_time": "1:43:25"}
+{"current_steps": 2540, "total_steps": 3122, "loss": 2.4849, "learning_rate": 5.111685225821233e-06, "epoch": 0.8134507606084868, "percentage": 81.36, "elapsed_time": "7:30:37", "remaining_time": "1:43:15"}
+{"current_steps": 2541, "total_steps": 3122, "loss": 2.1828, "learning_rate": 5.0947563637586545e-06, "epoch": 0.8137710168134508, "percentage": 81.39, "elapsed_time": "7:30:47", "remaining_time": "1:43:04"}
+{"current_steps": 2542, "total_steps": 3122, "loss": 2.3564, "learning_rate": 5.077852399653463e-06, "epoch": 0.8140912730184148, "percentage": 81.42, "elapsed_time": "7:30:58", "remaining_time": "1:42:53"}
+{"current_steps": 2543, "total_steps": 3122, "loss": 1.8303, "learning_rate": 5.060973354649548e-06, "epoch": 0.8144115292233787, "percentage": 81.45, "elapsed_time": "7:31:08", "remaining_time": "1:42:43"}
+{"current_steps": 2544, "total_steps": 3122, "loss": 2.3438, "learning_rate": 5.044119249859627e-06, "epoch": 0.8147317854283427, "percentage": 81.49, "elapsed_time": "7:31:18", "remaining_time": "1:42:32"}
+{"current_steps": 2545, "total_steps": 3122, "loss": 1.9135, "learning_rate": 5.027290106365204e-06, "epoch": 0.8150520416333067, "percentage": 81.52, "elapsed_time": "7:31:29", "remaining_time": "1:42:21"}
+{"current_steps": 2546, "total_steps": 3122, "loss": 2.1691, "learning_rate": 5.010485945216601e-06, "epoch": 0.8153722978382706, "percentage": 81.55, "elapsed_time": "7:31:39", "remaining_time": "1:42:10"}
+{"current_steps": 2547, "total_steps": 3122, "loss": 2.5787, "learning_rate": 4.993706787432844e-06, "epoch": 0.8156925540432346, "percentage": 81.58, "elapsed_time": "7:31:49", "remaining_time": "1:42:00"}
+{"current_steps": 2548, "total_steps": 3122, "loss": 2.1237, "learning_rate": 4.976952654001718e-06, "epoch": 0.8160128102481986, "percentage": 81.61, "elapsed_time": "7:32:00", "remaining_time": "1:41:49"}
+{"current_steps": 2549, "total_steps": 3122, "loss": 2.3624, "learning_rate": 4.960223565879696e-06, "epoch": 0.8163330664531625, "percentage": 81.65, "elapsed_time": "7:32:10", "remaining_time": "1:41:38"}
+{"current_steps": 2550, "total_steps": 3122, "loss": 1.776, "learning_rate": 4.94351954399192e-06, "epoch": 0.8166533226581265, "percentage": 81.68, "elapsed_time": "7:32:21", "remaining_time": "1:41:28"}
+{"current_steps": 2551, "total_steps": 3122, "loss": 2.3213, "learning_rate": 4.926840609232183e-06, "epoch": 0.8169735788630905, "percentage": 81.71, "elapsed_time": "7:32:31", "remaining_time": "1:41:17"}
+{"current_steps": 2552, "total_steps": 3122, "loss": 2.7406, "learning_rate": 4.910186782462908e-06, "epoch": 0.8172938350680544, "percentage": 81.74, "elapsed_time": "7:32:41", "remaining_time": "1:41:06"}
+{"current_steps": 2553, "total_steps": 3122, "loss": 2.2117, "learning_rate": 4.8935580845150765e-06, "epoch": 0.8176140912730184, "percentage": 81.77, "elapsed_time": "7:32:52", "remaining_time": "1:40:55"}
+{"current_steps": 2554, "total_steps": 3122, "loss": 1.6675, "learning_rate": 4.876954536188297e-06, "epoch": 0.8179343474779824, "percentage": 81.81, "elapsed_time": "7:33:02", "remaining_time": "1:40:45"}
+{"current_steps": 2555, "total_steps": 3122, "loss": 2.0331, "learning_rate": 4.860376158250659e-06, "epoch": 0.8182546036829463, "percentage": 81.84, "elapsed_time": "7:33:12", "remaining_time": "1:40:34"}
+{"current_steps": 2556, "total_steps": 3122, "loss": 2.0956, "learning_rate": 4.84382297143881e-06, "epoch": 0.8185748598879103, "percentage": 81.87, "elapsed_time": "7:33:23", "remaining_time": "1:40:23"}
+{"current_steps": 2557, "total_steps": 3122, "loss": 2.4513, "learning_rate": 4.827294996457873e-06, "epoch": 0.8188951160928744, "percentage": 81.9, "elapsed_time": "7:33:33", "remaining_time": "1:40:13"}
+{"current_steps": 2558, "total_steps": 3122, "loss": 2.3092, "learning_rate": 4.810792253981439e-06, "epoch": 0.8192153722978383, "percentage": 81.93, "elapsed_time": "7:33:43", "remaining_time": "1:40:02"}
+{"current_steps": 2559, "total_steps": 3122, "loss": 1.9795, "learning_rate": 4.79431476465152e-06, "epoch": 0.8195356285028023, "percentage": 81.97, "elapsed_time": "7:33:54", "remaining_time": "1:39:51"}
+{"current_steps": 2560, "total_steps": 3122, "loss": 2.2858, "learning_rate": 4.777862549078579e-06, "epoch": 0.8198558847077662, "percentage": 82.0, "elapsed_time": "7:34:04", "remaining_time": "1:39:41"}
+{"current_steps": 2561, "total_steps": 3122, "loss": 2.7803, "learning_rate": 4.7614356278414235e-06, "epoch": 0.8201761409127302, "percentage": 82.03, "elapsed_time": "7:34:15", "remaining_time": "1:39:30"}
+{"current_steps": 2562, "total_steps": 3122, "loss": 2.0644, "learning_rate": 4.745034021487252e-06, "epoch": 0.8204963971176942, "percentage": 82.06, "elapsed_time": "7:34:25", "remaining_time": "1:39:19"}
+{"current_steps": 2563, "total_steps": 3122, "loss": 1.9754, "learning_rate": 4.728657750531581e-06, "epoch": 0.8208166533226581, "percentage": 82.09, "elapsed_time": "7:34:35", "remaining_time": "1:39:08"}
+{"current_steps": 2564, "total_steps": 3122, "loss": 2.4305, "learning_rate": 4.712306835458249e-06, "epoch": 0.8211369095276221, "percentage": 82.13, "elapsed_time": "7:34:46", "remaining_time": "1:38:58"}
+{"current_steps": 2565, "total_steps": 3122, "loss": 2.0684, "learning_rate": 4.695981296719376e-06, "epoch": 0.8214571657325861, "percentage": 82.16, "elapsed_time": "7:34:56", "remaining_time": "1:38:47"}
+{"current_steps": 2566, "total_steps": 3122, "loss": 2.2563, "learning_rate": 4.679681154735341e-06, "epoch": 0.82177742193755, "percentage": 82.19, "elapsed_time": "7:35:06", "remaining_time": "1:38:36"}
+{"current_steps": 2567, "total_steps": 3122, "loss": 2.162, "learning_rate": 4.6634064298947315e-06, "epoch": 0.822097678142514, "percentage": 82.22, "elapsed_time": "7:35:17", "remaining_time": "1:38:26"}
+{"current_steps": 2568, "total_steps": 3122, "loss": 2.3221, "learning_rate": 4.647157142554396e-06, "epoch": 0.822417934347478, "percentage": 82.25, "elapsed_time": "7:35:27", "remaining_time": "1:38:15"}
+{"current_steps": 2569, "total_steps": 3122, "loss": 2.307, "learning_rate": 4.6309333130393125e-06, "epoch": 0.8227381905524419, "percentage": 82.29, "elapsed_time": "7:35:38", "remaining_time": "1:38:04"}
+{"current_steps": 2570, "total_steps": 3122, "loss": 2.0686, "learning_rate": 4.614734961642644e-06, "epoch": 0.8230584467574059, "percentage": 82.32, "elapsed_time": "7:35:48", "remaining_time": "1:37:54"}
+{"current_steps": 2571, "total_steps": 3122, "loss": 2.1714, "learning_rate": 4.598562108625676e-06, "epoch": 0.8233787029623699, "percentage": 82.35, "elapsed_time": "7:35:58", "remaining_time": "1:37:43"}
+{"current_steps": 2572, "total_steps": 3122, "loss": 2.3787, "learning_rate": 4.582414774217811e-06, "epoch": 0.8236989591673338, "percentage": 82.38, "elapsed_time": "7:36:09", "remaining_time": "1:37:32"}
+{"current_steps": 2573, "total_steps": 3122, "loss": 2.2512, "learning_rate": 4.5662929786165014e-06, "epoch": 0.8240192153722978, "percentage": 82.42, "elapsed_time": "7:36:19", "remaining_time": "1:37:21"}
+{"current_steps": 2574, "total_steps": 3122, "loss": 2.0636, "learning_rate": 4.550196741987306e-06, "epoch": 0.8243394715772618, "percentage": 82.45, "elapsed_time": "7:36:29", "remaining_time": "1:37:11"}
+{"current_steps": 2575, "total_steps": 3122, "loss": 1.9996, "learning_rate": 4.534126084463755e-06, "epoch": 0.8246597277822257, "percentage": 82.48, "elapsed_time": "7:36:40", "remaining_time": "1:37:00"}
+{"current_steps": 2576, "total_steps": 3122, "loss": 1.8507, "learning_rate": 4.518081026147439e-06, "epoch": 0.8249799839871897, "percentage": 82.51, "elapsed_time": "7:36:50", "remaining_time": "1:36:49"}
+{"current_steps": 2577, "total_steps": 3122, "loss": 2.1717, "learning_rate": 4.502061587107889e-06, "epoch": 0.8253002401921538, "percentage": 82.54, "elapsed_time": "7:37:00", "remaining_time": "1:36:39"}
+{"current_steps": 2578, "total_steps": 3122, "loss": 2.3655, "learning_rate": 4.4860677873826025e-06, "epoch": 0.8256204963971177, "percentage": 82.58, "elapsed_time": "7:37:11", "remaining_time": "1:36:28"}
+{"current_steps": 2579, "total_steps": 3122, "loss": 2.014, "learning_rate": 4.4700996469770165e-06, "epoch": 0.8259407526020817, "percentage": 82.61, "elapsed_time": "7:37:21", "remaining_time": "1:36:17"}
+{"current_steps": 2580, "total_steps": 3122, "loss": 2.4824, "learning_rate": 4.454157185864469e-06, "epoch": 0.8262610088070457, "percentage": 82.64, "elapsed_time": "7:37:32", "remaining_time": "1:36:07"}
+{"current_steps": 2581, "total_steps": 3122, "loss": 2.2044, "learning_rate": 4.438240423986154e-06, "epoch": 0.8265812650120096, "percentage": 82.67, "elapsed_time": "7:37:42", "remaining_time": "1:35:56"}
+{"current_steps": 2582, "total_steps": 3122, "loss": 2.2686, "learning_rate": 4.422349381251162e-06, "epoch": 0.8269015212169736, "percentage": 82.7, "elapsed_time": "7:37:52", "remaining_time": "1:35:45"}
+{"current_steps": 2583, "total_steps": 3122, "loss": 2.5848, "learning_rate": 4.406484077536377e-06, "epoch": 0.8272217774219376, "percentage": 82.74, "elapsed_time": "7:38:03", "remaining_time": "1:35:34"}
+{"current_steps": 2584, "total_steps": 3122, "loss": 1.95, "learning_rate": 4.3906445326865085e-06, "epoch": 0.8275420336269015, "percentage": 82.77, "elapsed_time": "7:38:13", "remaining_time": "1:35:24"}
+{"current_steps": 2585, "total_steps": 3122, "loss": 1.8195, "learning_rate": 4.374830766514037e-06, "epoch": 0.8278622898318655, "percentage": 82.8, "elapsed_time": "7:38:23", "remaining_time": "1:35:13"}
+{"current_steps": 2586, "total_steps": 3122, "loss": 1.9135, "learning_rate": 4.3590427987992126e-06, "epoch": 0.8281825460368295, "percentage": 82.83, "elapsed_time": "7:38:34", "remaining_time": "1:35:02"}
+{"current_steps": 2587, "total_steps": 3122, "loss": 2.2409, "learning_rate": 4.3432806492899826e-06, "epoch": 0.8285028022417934, "percentage": 82.86, "elapsed_time": "7:38:44", "remaining_time": "1:34:52"}
+{"current_steps": 2588, "total_steps": 3122, "loss": 1.7218, "learning_rate": 4.327544337702047e-06, "epoch": 0.8288230584467574, "percentage": 82.9, "elapsed_time": "7:38:54", "remaining_time": "1:34:41"}
+{"current_steps": 2589, "total_steps": 3122, "loss": 2.4292, "learning_rate": 4.3118338837187415e-06, "epoch": 0.8291433146517214, "percentage": 82.93, "elapsed_time": "7:39:05", "remaining_time": "1:34:30"}
+{"current_steps": 2590, "total_steps": 3122, "loss": 2.1419, "learning_rate": 4.296149306991098e-06, "epoch": 0.8294635708566853, "percentage": 82.96, "elapsed_time": "7:39:15", "remaining_time": "1:34:20"}
+{"current_steps": 2591, "total_steps": 3122, "loss": 2.5364, "learning_rate": 4.280490627137751e-06, "epoch": 0.8297838270616493, "percentage": 82.99, "elapsed_time": "7:39:26", "remaining_time": "1:34:09"}
+{"current_steps": 2592, "total_steps": 3122, "loss": 2.121, "learning_rate": 4.264857863744956e-06, "epoch": 0.8301040832666133, "percentage": 83.02, "elapsed_time": "7:39:36", "remaining_time": "1:33:58"}
+{"current_steps": 2593, "total_steps": 3122, "loss": 2.5428, "learning_rate": 4.24925103636655e-06, "epoch": 0.8304243394715772, "percentage": 83.06, "elapsed_time": "7:39:46", "remaining_time": "1:33:47"}
+{"current_steps": 2594, "total_steps": 3122, "loss": 2.0423, "learning_rate": 4.233670164523937e-06, "epoch": 0.8307445956765412, "percentage": 83.09, "elapsed_time": "7:39:57", "remaining_time": "1:33:37"}
+{"current_steps": 2595, "total_steps": 3122, "loss": 2.4526, "learning_rate": 4.218115267706021e-06, "epoch": 0.8310648518815053, "percentage": 83.12, "elapsed_time": "7:40:07", "remaining_time": "1:33:26"}
+{"current_steps": 2596, "total_steps": 3122, "loss": 2.3808, "learning_rate": 4.2025863653692706e-06, "epoch": 0.8313851080864691, "percentage": 83.15, "elapsed_time": "7:40:17", "remaining_time": "1:33:15"}
+{"current_steps": 2597, "total_steps": 3122, "loss": 2.3936, "learning_rate": 4.1870834769375925e-06, "epoch": 0.8317053642914332, "percentage": 83.18, "elapsed_time": "7:40:28", "remaining_time": "1:33:05"}
+{"current_steps": 2598, "total_steps": 3122, "loss": 2.443, "learning_rate": 4.171606621802377e-06, "epoch": 0.8320256204963972, "percentage": 83.22, "elapsed_time": "7:40:38", "remaining_time": "1:32:54"}
+{"current_steps": 2599, "total_steps": 3122, "loss": 2.0169, "learning_rate": 4.1561558193224435e-06, "epoch": 0.8323458767013611, "percentage": 83.25, "elapsed_time": "7:40:48", "remaining_time": "1:32:43"}
+{"current_steps": 2600, "total_steps": 3122, "loss": 2.1607, "learning_rate": 4.14073108882404e-06, "epoch": 0.8326661329063251, "percentage": 83.28, "elapsed_time": "7:40:59", "remaining_time": "1:32:33"}
+{"current_steps": 2601, "total_steps": 3122, "loss": 2.3544, "learning_rate": 4.125332449600766e-06, "epoch": 0.8329863891112891, "percentage": 83.31, "elapsed_time": "7:41:38", "remaining_time": "1:32:28"}
+{"current_steps": 2602, "total_steps": 3122, "loss": 2.0641, "learning_rate": 4.109959920913637e-06, "epoch": 0.833306645316253, "percentage": 83.34, "elapsed_time": "7:41:48", "remaining_time": "1:32:17"}
+{"current_steps": 2603, "total_steps": 3122, "loss": 2.1128, "learning_rate": 4.094613521990956e-06, "epoch": 0.833626901521217, "percentage": 83.38, "elapsed_time": "7:41:59", "remaining_time": "1:32:06"}
+{"current_steps": 2604, "total_steps": 3122, "loss": 1.7678, "learning_rate": 4.079293272028395e-06, "epoch": 0.833947157726181, "percentage": 83.41, "elapsed_time": "7:42:09", "remaining_time": "1:31:56"}
+{"current_steps": 2605, "total_steps": 3122, "loss": 2.2154, "learning_rate": 4.063999190188869e-06, "epoch": 0.8342674139311449, "percentage": 83.44, "elapsed_time": "7:42:20", "remaining_time": "1:31:45"}
+{"current_steps": 2606, "total_steps": 3122, "loss": 2.4884, "learning_rate": 4.04873129560259e-06, "epoch": 0.8345876701361089, "percentage": 83.47, "elapsed_time": "7:42:30", "remaining_time": "1:31:34"}
+{"current_steps": 2607, "total_steps": 3122, "loss": 2.6735, "learning_rate": 4.033489607367011e-06, "epoch": 0.8349079263410728, "percentage": 83.5, "elapsed_time": "7:42:41", "remaining_time": "1:31:24"}
+{"current_steps": 2608, "total_steps": 3122, "loss": 2.579, "learning_rate": 4.018274144546802e-06, "epoch": 0.8352281825460368, "percentage": 83.54, "elapsed_time": "7:42:51", "remaining_time": "1:31:13"}
+{"current_steps": 2609, "total_steps": 3122, "loss": 2.5984, "learning_rate": 4.003084926173819e-06, "epoch": 0.8355484387510008, "percentage": 83.57, "elapsed_time": "7:43:01", "remaining_time": "1:31:02"}
+{"current_steps": 2610, "total_steps": 3122, "loss": 2.7333, "learning_rate": 3.987921971247122e-06, "epoch": 0.8358686949559647, "percentage": 83.6, "elapsed_time": "7:43:12", "remaining_time": "1:30:51"}
+{"current_steps": 2611, "total_steps": 3122, "loss": 2.0657, "learning_rate": 3.972785298732881e-06, "epoch": 0.8361889511609287, "percentage": 83.63, "elapsed_time": "7:43:22", "remaining_time": "1:30:41"}
+{"current_steps": 2612, "total_steps": 3122, "loss": 2.1598, "learning_rate": 3.9576749275644175e-06, "epoch": 0.8365092073658927, "percentage": 83.66, "elapsed_time": "7:43:33", "remaining_time": "1:30:30"}
+{"current_steps": 2613, "total_steps": 3122, "loss": 2.1292, "learning_rate": 3.942590876642146e-06, "epoch": 0.8368294635708566, "percentage": 83.7, "elapsed_time": "7:43:43", "remaining_time": "1:30:19"}
+{"current_steps": 2614, "total_steps": 3122, "loss": 2.3755, "learning_rate": 3.927533164833561e-06, "epoch": 0.8371497197758206, "percentage": 83.73, "elapsed_time": "7:43:53", "remaining_time": "1:30:09"}
+{"current_steps": 2615, "total_steps": 3122, "loss": 2.1559, "learning_rate": 3.91250181097321e-06, "epoch": 0.8374699759807847, "percentage": 83.76, "elapsed_time": "7:44:04", "remaining_time": "1:29:58"}
+{"current_steps": 2616, "total_steps": 3122, "loss": 2.4086, "learning_rate": 3.897496833862677e-06, "epoch": 0.8377902321857486, "percentage": 83.79, "elapsed_time": "7:44:14", "remaining_time": "1:29:47"}
+{"current_steps": 2617, "total_steps": 3122, "loss": 2.1332, "learning_rate": 3.882518252270531e-06, "epoch": 0.8381104883907126, "percentage": 83.82, "elapsed_time": "7:44:25", "remaining_time": "1:29:37"}
+{"current_steps": 2618, "total_steps": 3122, "loss": 1.9732, "learning_rate": 3.867566084932367e-06, "epoch": 0.8384307445956766, "percentage": 83.86, "elapsed_time": "7:44:35", "remaining_time": "1:29:26"}
+{"current_steps": 2619, "total_steps": 3122, "loss": 2.4946, "learning_rate": 3.852640350550696e-06, "epoch": 0.8387510008006405, "percentage": 83.89, "elapsed_time": "7:44:45", "remaining_time": "1:29:15"}
+{"current_steps": 2620, "total_steps": 3122, "loss": 2.6402, "learning_rate": 3.837741067794992e-06, "epoch": 0.8390712570056045, "percentage": 83.92, "elapsed_time": "7:44:56", "remaining_time": "1:29:04"}
+{"current_steps": 2621, "total_steps": 3122, "loss": 2.6491, "learning_rate": 3.822868255301637e-06, "epoch": 0.8393915132105685, "percentage": 83.95, "elapsed_time": "7:45:06", "remaining_time": "1:28:54"}
+{"current_steps": 2622, "total_steps": 3122, "loss": 2.4719, "learning_rate": 3.808021931673905e-06, "epoch": 0.8397117694155324, "percentage": 83.98, "elapsed_time": "7:45:16", "remaining_time": "1:28:43"}
+{"current_steps": 2623, "total_steps": 3122, "loss": 1.9543, "learning_rate": 3.7932021154819225e-06, "epoch": 0.8400320256204964, "percentage": 84.02, "elapsed_time": "7:45:27", "remaining_time": "1:28:32"}
+{"current_steps": 2624, "total_steps": 3122, "loss": 1.8275, "learning_rate": 3.7784088252626914e-06, "epoch": 0.8403522818254604, "percentage": 84.05, "elapsed_time": "7:45:37", "remaining_time": "1:28:22"}
+{"current_steps": 2625, "total_steps": 3122, "loss": 1.8942, "learning_rate": 3.7636420795199996e-06, "epoch": 0.8406725380304243, "percentage": 84.08, "elapsed_time": "7:45:47", "remaining_time": "1:28:11"}
+{"current_steps": 2626, "total_steps": 3122, "loss": 1.9354, "learning_rate": 3.7489018967244494e-06, "epoch": 0.8409927942353883, "percentage": 84.11, "elapsed_time": "7:45:58", "remaining_time": "1:28:00"}
+{"current_steps": 2627, "total_steps": 3122, "loss": 1.8982, "learning_rate": 3.7341882953134206e-06, "epoch": 0.8413130504403523, "percentage": 84.14, "elapsed_time": "7:46:08", "remaining_time": "1:27:50"}
+{"current_steps": 2628, "total_steps": 3122, "loss": 2.8696, "learning_rate": 3.7195012936910383e-06, "epoch": 0.8416333066453162, "percentage": 84.18, "elapsed_time": "7:46:19", "remaining_time": "1:27:39"}
+{"current_steps": 2629, "total_steps": 3122, "loss": 2.3575, "learning_rate": 3.7048409102281577e-06, "epoch": 0.8419535628502802, "percentage": 84.21, "elapsed_time": "7:46:29", "remaining_time": "1:27:28"}
+{"current_steps": 2630, "total_steps": 3122, "loss": 2.4408, "learning_rate": 3.690207163262341e-06, "epoch": 0.8422738190552442, "percentage": 84.24, "elapsed_time": "7:46:39", "remaining_time": "1:27:17"}
+{"current_steps": 2631, "total_steps": 3122, "loss": 2.1077, "learning_rate": 3.675600071097818e-06, "epoch": 0.8425940752602081, "percentage": 84.27, "elapsed_time": "7:46:50", "remaining_time": "1:27:07"}
+{"current_steps": 2632, "total_steps": 3122, "loss": 2.1918, "learning_rate": 3.6610196520055124e-06, "epoch": 0.8429143314651721, "percentage": 84.3, "elapsed_time": "7:47:00", "remaining_time": "1:26:56"}
+{"current_steps": 2633, "total_steps": 3122, "loss": 2.4826, "learning_rate": 3.646465924222947e-06, "epoch": 0.8432345876701361, "percentage": 84.34, "elapsed_time": "7:47:10", "remaining_time": "1:26:45"}
+{"current_steps": 2634, "total_steps": 3122, "loss": 2.3311, "learning_rate": 3.631938905954277e-06, "epoch": 0.8435548438751, "percentage": 84.37, "elapsed_time": "7:47:21", "remaining_time": "1:26:35"}
+{"current_steps": 2635, "total_steps": 3122, "loss": 2.4787, "learning_rate": 3.6174386153702473e-06, "epoch": 0.8438751000800641, "percentage": 84.4, "elapsed_time": "7:47:31", "remaining_time": "1:26:24"}
+{"current_steps": 2636, "total_steps": 3122, "loss": 1.9944, "learning_rate": 3.6029650706081775e-06, "epoch": 0.8441953562850281, "percentage": 84.43, "elapsed_time": "7:47:41", "remaining_time": "1:26:13"}
+{"current_steps": 2637, "total_steps": 3122, "loss": 2.4228, "learning_rate": 3.588518289771908e-06, "epoch": 0.844515612489992, "percentage": 84.47, "elapsed_time": "7:47:52", "remaining_time": "1:26:03"}
+{"current_steps": 2638, "total_steps": 3122, "loss": 2.4106, "learning_rate": 3.5740982909318406e-06, "epoch": 0.844835868694956, "percentage": 84.5, "elapsed_time": "7:48:02", "remaining_time": "1:25:52"}
+{"current_steps": 2639, "total_steps": 3122, "loss": 2.4529, "learning_rate": 3.5597050921248347e-06, "epoch": 0.84515612489992, "percentage": 84.53, "elapsed_time": "7:48:13", "remaining_time": "1:25:41"}
+{"current_steps": 2640, "total_steps": 3122, "loss": 2.5682, "learning_rate": 3.5453387113542737e-06, "epoch": 0.8454763811048839, "percentage": 84.56, "elapsed_time": "7:48:23", "remaining_time": "1:25:31"}
+{"current_steps": 2641, "total_steps": 3122, "loss": 2.0301, "learning_rate": 3.5309991665899545e-06, "epoch": 0.8457966373098479, "percentage": 84.59, "elapsed_time": "7:48:33", "remaining_time": "1:25:20"}
+{"current_steps": 2642, "total_steps": 3122, "loss": 2.1756, "learning_rate": 3.516686475768127e-06, "epoch": 0.8461168935148119, "percentage": 84.63, "elapsed_time": "7:48:44", "remaining_time": "1:25:09"}
+{"current_steps": 2643, "total_steps": 3122, "loss": 1.9134, "learning_rate": 3.502400656791455e-06, "epoch": 0.8464371497197758, "percentage": 84.66, "elapsed_time": "7:48:54", "remaining_time": "1:24:58"}
+{"current_steps": 2644, "total_steps": 3122, "loss": 2.3704, "learning_rate": 3.4881417275289847e-06, "epoch": 0.8467574059247398, "percentage": 84.69, "elapsed_time": "7:49:04", "remaining_time": "1:24:48"}
+{"current_steps": 2645, "total_steps": 3122, "loss": 2.5802, "learning_rate": 3.4739097058161114e-06, "epoch": 0.8470776621297038, "percentage": 84.72, "elapsed_time": "7:49:15", "remaining_time": "1:24:37"}
+{"current_steps": 2646, "total_steps": 3122, "loss": 1.5905, "learning_rate": 3.459704609454614e-06, "epoch": 0.8473979183346677, "percentage": 84.75, "elapsed_time": "7:49:25", "remaining_time": "1:24:26"}
+{"current_steps": 2647, "total_steps": 3122, "loss": 2.2604, "learning_rate": 3.445526456212553e-06, "epoch": 0.8477181745396317, "percentage": 84.79, "elapsed_time": "7:49:35", "remaining_time": "1:24:16"}
+{"current_steps": 2648, "total_steps": 3122, "loss": 2.3032, "learning_rate": 3.4313752638243075e-06, "epoch": 0.8480384307445957, "percentage": 84.82, "elapsed_time": "7:49:46", "remaining_time": "1:24:05"}
+{"current_steps": 2649, "total_steps": 3122, "loss": 2.215, "learning_rate": 3.41725104999053e-06, "epoch": 0.8483586869495596, "percentage": 84.85, "elapsed_time": "7:49:56", "remaining_time": "1:23:54"}
+{"current_steps": 2650, "total_steps": 3122, "loss": 2.3237, "learning_rate": 3.4031538323781254e-06, "epoch": 0.8486789431545236, "percentage": 84.88, "elapsed_time": "7:50:07", "remaining_time": "1:23:44"}
+{"current_steps": 2651, "total_steps": 3122, "loss": 1.5601, "learning_rate": 3.389083628620235e-06, "epoch": 0.8489991993594876, "percentage": 84.91, "elapsed_time": "7:50:17", "remaining_time": "1:23:33"}
+{"current_steps": 2652, "total_steps": 3122, "loss": 2.3487, "learning_rate": 3.3750404563162085e-06, "epoch": 0.8493194555644515, "percentage": 84.95, "elapsed_time": "7:50:27", "remaining_time": "1:23:22"}
+{"current_steps": 2653, "total_steps": 3122, "loss": 1.9077, "learning_rate": 3.3610243330315733e-06, "epoch": 0.8496397117694156, "percentage": 84.98, "elapsed_time": "7:50:38", "remaining_time": "1:23:11"}
+{"current_steps": 2654, "total_steps": 3122, "loss": 1.879, "learning_rate": 3.347035276298052e-06, "epoch": 0.8499599679743794, "percentage": 85.01, "elapsed_time": "7:50:48", "remaining_time": "1:23:01"}
+{"current_steps": 2655, "total_steps": 3122, "loss": 2.0285, "learning_rate": 3.3330733036134765e-06, "epoch": 0.8502802241793435, "percentage": 85.04, "elapsed_time": "7:50:58", "remaining_time": "1:22:50"}
+{"current_steps": 2656, "total_steps": 3122, "loss": 2.5377, "learning_rate": 3.3191384324418236e-06, "epoch": 0.8506004803843075, "percentage": 85.07, "elapsed_time": "7:51:09", "remaining_time": "1:22:39"}
+{"current_steps": 2657, "total_steps": 3122, "loss": 1.8052, "learning_rate": 3.3052306802131644e-06, "epoch": 0.8509207365892714, "percentage": 85.11, "elapsed_time": "7:51:19", "remaining_time": "1:22:29"}
+{"current_steps": 2658, "total_steps": 3122, "loss": 1.8514, "learning_rate": 3.291350064323659e-06, "epoch": 0.8512409927942354, "percentage": 85.14, "elapsed_time": "7:51:29", "remaining_time": "1:22:18"}
+{"current_steps": 2659, "total_steps": 3122, "loss": 2.2399, "learning_rate": 3.277496602135496e-06, "epoch": 0.8515612489991994, "percentage": 85.17, "elapsed_time": "7:51:40", "remaining_time": "1:22:07"}
+{"current_steps": 2660, "total_steps": 3122, "loss": 2.274, "learning_rate": 3.2636703109769406e-06, "epoch": 0.8518815052041633, "percentage": 85.2, "elapsed_time": "7:51:50", "remaining_time": "1:21:57"}
+{"current_steps": 2661, "total_steps": 3122, "loss": 2.2057, "learning_rate": 3.249871208142238e-06, "epoch": 0.8522017614091273, "percentage": 85.23, "elapsed_time": "7:52:01", "remaining_time": "1:21:46"}
+{"current_steps": 2662, "total_steps": 3122, "loss": 2.5783, "learning_rate": 3.236099310891638e-06, "epoch": 0.8525220176140913, "percentage": 85.27, "elapsed_time": "7:52:11", "remaining_time": "1:21:35"}
+{"current_steps": 2663, "total_steps": 3122, "loss": 2.2508, "learning_rate": 3.2223546364513636e-06, "epoch": 0.8528422738190552, "percentage": 85.3, "elapsed_time": "7:52:21", "remaining_time": "1:21:25"}
+{"current_steps": 2664, "total_steps": 3122, "loss": 2.5538, "learning_rate": 3.2086372020135815e-06, "epoch": 0.8531625300240192, "percentage": 85.33, "elapsed_time": "7:52:32", "remaining_time": "1:21:14"}
+{"current_steps": 2665, "total_steps": 3122, "loss": 2.0804, "learning_rate": 3.194947024736392e-06, "epoch": 0.8534827862289832, "percentage": 85.36, "elapsed_time": "7:52:42", "remaining_time": "1:21:03"}
+{"current_steps": 2666, "total_steps": 3122, "loss": 2.5366, "learning_rate": 3.1812841217438023e-06, "epoch": 0.8538030424339471, "percentage": 85.39, "elapsed_time": "7:52:52", "remaining_time": "1:20:52"}
+{"current_steps": 2667, "total_steps": 3122, "loss": 2.1118, "learning_rate": 3.1676485101256844e-06, "epoch": 0.8541232986389111, "percentage": 85.43, "elapsed_time": "7:53:03", "remaining_time": "1:20:42"}
+{"current_steps": 2668, "total_steps": 3122, "loss": 2.3653, "learning_rate": 3.1540402069378084e-06, "epoch": 0.8544435548438751, "percentage": 85.46, "elapsed_time": "7:53:13", "remaining_time": "1:20:31"}
+{"current_steps": 2669, "total_steps": 3122, "loss": 2.4334, "learning_rate": 3.140459229201753e-06, "epoch": 0.854763811048839, "percentage": 85.49, "elapsed_time": "7:53:24", "remaining_time": "1:20:20"}
+{"current_steps": 2670, "total_steps": 3122, "loss": 2.5745, "learning_rate": 3.1269055939049356e-06, "epoch": 0.855084067253803, "percentage": 85.52, "elapsed_time": "7:53:34", "remaining_time": "1:20:10"}
+{"current_steps": 2671, "total_steps": 3122, "loss": 1.7917, "learning_rate": 3.11337931800057e-06, "epoch": 0.855404323458767, "percentage": 85.55, "elapsed_time": "7:53:44", "remaining_time": "1:19:59"}
+{"current_steps": 2672, "total_steps": 3122, "loss": 2.3825, "learning_rate": 3.0998804184076495e-06, "epoch": 0.8557245796637309, "percentage": 85.59, "elapsed_time": "7:53:55", "remaining_time": "1:19:48"}
+{"current_steps": 2673, "total_steps": 3122, "loss": 2.1879, "learning_rate": 3.0864089120109186e-06, "epoch": 0.856044835868695, "percentage": 85.62, "elapsed_time": "7:54:05", "remaining_time": "1:19:38"}
+{"current_steps": 2674, "total_steps": 3122, "loss": 2.2279, "learning_rate": 3.07296481566087e-06, "epoch": 0.856365092073659, "percentage": 85.65, "elapsed_time": "7:54:15", "remaining_time": "1:19:27"}
+{"current_steps": 2675, "total_steps": 3122, "loss": 2.1929, "learning_rate": 3.059548146173691e-06, "epoch": 0.8566853482786229, "percentage": 85.68, "elapsed_time": "7:54:26", "remaining_time": "1:19:16"}
+{"current_steps": 2676, "total_steps": 3122, "loss": 2.2886, "learning_rate": 3.046158920331277e-06, "epoch": 0.8570056044835869, "percentage": 85.71, "elapsed_time": "7:54:36", "remaining_time": "1:19:06"}
+{"current_steps": 2677, "total_steps": 3122, "loss": 2.8405, "learning_rate": 3.032797154881198e-06, "epoch": 0.8573258606885509, "percentage": 85.75, "elapsed_time": "7:54:47", "remaining_time": "1:18:55"}
+{"current_steps": 2678, "total_steps": 3122, "loss": 1.712, "learning_rate": 3.019462866536668e-06, "epoch": 0.8576461168935148, "percentage": 85.78, "elapsed_time": "7:54:57", "remaining_time": "1:18:44"}
+{"current_steps": 2679, "total_steps": 3122, "loss": 2.4549, "learning_rate": 3.0061560719765376e-06, "epoch": 0.8579663730984788, "percentage": 85.81, "elapsed_time": "7:55:07", "remaining_time": "1:18:34"}
+{"current_steps": 2680, "total_steps": 3122, "loss": 2.2048, "learning_rate": 2.9928767878452698e-06, "epoch": 0.8582866293034428, "percentage": 85.84, "elapsed_time": "7:55:18", "remaining_time": "1:18:23"}
+{"current_steps": 2681, "total_steps": 3122, "loss": 2.1138, "learning_rate": 2.9796250307528973e-06, "epoch": 0.8586068855084067, "percentage": 85.87, "elapsed_time": "7:55:28", "remaining_time": "1:18:12"}
+{"current_steps": 2682, "total_steps": 3122, "loss": 2.0606, "learning_rate": 2.9664008172750557e-06, "epoch": 0.8589271417133707, "percentage": 85.91, "elapsed_time": "7:55:38", "remaining_time": "1:18:01"}
+{"current_steps": 2683, "total_steps": 3122, "loss": 2.1709, "learning_rate": 2.9532041639528967e-06, "epoch": 0.8592473979183347, "percentage": 85.94, "elapsed_time": "7:55:49", "remaining_time": "1:17:51"}
+{"current_steps": 2684, "total_steps": 3122, "loss": 2.5132, "learning_rate": 2.9400350872931138e-06, "epoch": 0.8595676541232986, "percentage": 85.97, "elapsed_time": "7:55:59", "remaining_time": "1:17:40"}
+{"current_steps": 2685, "total_steps": 3122, "loss": 2.2391, "learning_rate": 2.926893603767908e-06, "epoch": 0.8598879103282626, "percentage": 86.0, "elapsed_time": "7:56:09", "remaining_time": "1:17:29"}
+{"current_steps": 2686, "total_steps": 3122, "loss": 2.4567, "learning_rate": 2.9137797298149584e-06, "epoch": 0.8602081665332266, "percentage": 86.03, "elapsed_time": "7:56:20", "remaining_time": "1:17:19"}
+{"current_steps": 2687, "total_steps": 3122, "loss": 2.511, "learning_rate": 2.9006934818374187e-06, "epoch": 0.8605284227381905, "percentage": 86.07, "elapsed_time": "7:56:30", "remaining_time": "1:17:08"}
+{"current_steps": 2688, "total_steps": 3122, "loss": 2.4784, "learning_rate": 2.8876348762038846e-06, "epoch": 0.8608486789431545, "percentage": 86.1, "elapsed_time": "7:56:41", "remaining_time": "1:16:57"}
+{"current_steps": 2689, "total_steps": 3122, "loss": 1.7693, "learning_rate": 2.874603929248365e-06, "epoch": 0.8611689351481185, "percentage": 86.13, "elapsed_time": "7:56:51", "remaining_time": "1:16:47"}
+{"current_steps": 2690, "total_steps": 3122, "loss": 2.4669, "learning_rate": 2.8616006572702857e-06, "epoch": 0.8614891913530824, "percentage": 86.16, "elapsed_time": "7:57:01", "remaining_time": "1:16:36"}
+{"current_steps": 2691, "total_steps": 3122, "loss": 1.9782, "learning_rate": 2.848625076534453e-06, "epoch": 0.8618094475580464, "percentage": 86.19, "elapsed_time": "7:57:12", "remaining_time": "1:16:25"}
+{"current_steps": 2692, "total_steps": 3122, "loss": 2.2473, "learning_rate": 2.835677203271037e-06, "epoch": 0.8621297037630105, "percentage": 86.23, "elapsed_time": "7:57:22", "remaining_time": "1:16:15"}
+{"current_steps": 2693, "total_steps": 3122, "loss": 2.3449, "learning_rate": 2.8227570536755425e-06, "epoch": 0.8624499599679744, "percentage": 86.26, "elapsed_time": "7:57:32", "remaining_time": "1:16:04"}
+{"current_steps": 2694, "total_steps": 3122, "loss": 2.292, "learning_rate": 2.8098646439088106e-06, "epoch": 0.8627702161729384, "percentage": 86.29, "elapsed_time": "7:57:43", "remaining_time": "1:15:53"}
+{"current_steps": 2695, "total_steps": 3122, "loss": 2.395, "learning_rate": 2.796999990096974e-06, "epoch": 0.8630904723779024, "percentage": 86.32, "elapsed_time": "7:57:53", "remaining_time": "1:15:43"}
+{"current_steps": 2696, "total_steps": 3122, "loss": 2.19, "learning_rate": 2.7841631083314584e-06, "epoch": 0.8634107285828663, "percentage": 86.35, "elapsed_time": "7:58:03", "remaining_time": "1:15:32"}
+{"current_steps": 2697, "total_steps": 3122, "loss": 1.5913, "learning_rate": 2.771354014668931e-06, "epoch": 0.8637309847878303, "percentage": 86.39, "elapsed_time": "7:58:14", "remaining_time": "1:15:21"}
+{"current_steps": 2698, "total_steps": 3122, "loss": 2.1674, "learning_rate": 2.75857272513132e-06, "epoch": 0.8640512409927943, "percentage": 86.42, "elapsed_time": "7:58:24", "remaining_time": "1:15:11"}
+{"current_steps": 2699, "total_steps": 3122, "loss": 2.3245, "learning_rate": 2.74581925570577e-06, "epoch": 0.8643714971977582, "percentage": 86.45, "elapsed_time": "7:58:35", "remaining_time": "1:15:00"}
+{"current_steps": 2700, "total_steps": 3122, "loss": 1.8666, "learning_rate": 2.733093622344629e-06, "epoch": 0.8646917534027222, "percentage": 86.48, "elapsed_time": "7:58:45", "remaining_time": "1:14:49"}
+{"current_steps": 2701, "total_steps": 3122, "loss": 2.2844, "learning_rate": 2.7203958409654227e-06, "epoch": 0.8650120096076861, "percentage": 86.52, "elapsed_time": "7:59:21", "remaining_time": "1:14:43"}
+{"current_steps": 2702, "total_steps": 3122, "loss": 1.9818, "learning_rate": 2.707725927450844e-06, "epoch": 0.8653322658126501, "percentage": 86.55, "elapsed_time": "7:59:31", "remaining_time": "1:14:32"}
+{"current_steps": 2703, "total_steps": 3122, "loss": 1.9651, "learning_rate": 2.6950838976487287e-06, "epoch": 0.8656525220176141, "percentage": 86.58, "elapsed_time": "7:59:42", "remaining_time": "1:14:21"}
+{"current_steps": 2704, "total_steps": 3122, "loss": 2.1429, "learning_rate": 2.68246976737202e-06, "epoch": 0.865972778222578, "percentage": 86.61, "elapsed_time": "7:59:52", "remaining_time": "1:14:10"}
+{"current_steps": 2705, "total_steps": 3122, "loss": 2.1287, "learning_rate": 2.6698835523987832e-06, "epoch": 0.866293034427542, "percentage": 86.64, "elapsed_time": "8:00:03", "remaining_time": "1:14:00"}
+{"current_steps": 2706, "total_steps": 3122, "loss": 2.2263, "learning_rate": 2.657325268472155e-06, "epoch": 0.866613290632506, "percentage": 86.68, "elapsed_time": "8:00:13", "remaining_time": "1:13:49"}
+{"current_steps": 2707, "total_steps": 3122, "loss": 2.1328, "learning_rate": 2.6447949313003456e-06, "epoch": 0.8669335468374699, "percentage": 86.71, "elapsed_time": "8:00:23", "remaining_time": "1:13:38"}
+{"current_steps": 2708, "total_steps": 3122, "loss": 2.1588, "learning_rate": 2.6322925565565954e-06, "epoch": 0.8672538030424339, "percentage": 86.74, "elapsed_time": "8:00:34", "remaining_time": "1:13:28"}
+{"current_steps": 2709, "total_steps": 3122, "loss": 2.1747, "learning_rate": 2.619818159879178e-06, "epoch": 0.8675740592473979, "percentage": 86.77, "elapsed_time": "8:00:44", "remaining_time": "1:13:17"}
+{"current_steps": 2710, "total_steps": 3122, "loss": 1.9288, "learning_rate": 2.607371756871374e-06, "epoch": 0.8678943154523618, "percentage": 86.8, "elapsed_time": "8:00:55", "remaining_time": "1:13:06"}
+{"current_steps": 2711, "total_steps": 3122, "loss": 2.3231, "learning_rate": 2.594953363101435e-06, "epoch": 0.8682145716573259, "percentage": 86.84, "elapsed_time": "8:01:05", "remaining_time": "1:12:56"}
+{"current_steps": 2712, "total_steps": 3122, "loss": 2.2347, "learning_rate": 2.5825629941025887e-06, "epoch": 0.8685348278622899, "percentage": 86.87, "elapsed_time": "8:01:16", "remaining_time": "1:12:45"}
+{"current_steps": 2713, "total_steps": 3122, "loss": 2.5465, "learning_rate": 2.5702006653730072e-06, "epoch": 0.8688550840672538, "percentage": 86.9, "elapsed_time": "8:01:26", "remaining_time": "1:12:34"}
+{"current_steps": 2714, "total_steps": 3122, "loss": 2.163, "learning_rate": 2.557866392375788e-06, "epoch": 0.8691753402722178, "percentage": 86.93, "elapsed_time": "8:01:36", "remaining_time": "1:12:24"}
+{"current_steps": 2715, "total_steps": 3122, "loss": 2.5304, "learning_rate": 2.545560190538937e-06, "epoch": 0.8694955964771818, "percentage": 86.96, "elapsed_time": "8:01:47", "remaining_time": "1:12:13"}
+{"current_steps": 2716, "total_steps": 3122, "loss": 2.4132, "learning_rate": 2.5332820752553498e-06, "epoch": 0.8698158526821457, "percentage": 87.0, "elapsed_time": "8:01:57", "remaining_time": "1:12:02"}
+{"current_steps": 2717, "total_steps": 3122, "loss": 2.2646, "learning_rate": 2.521032061882786e-06, "epoch": 0.8701361088871097, "percentage": 87.03, "elapsed_time": "8:02:08", "remaining_time": "1:11:52"}
+{"current_steps": 2718, "total_steps": 3122, "loss": 2.1072, "learning_rate": 2.5088101657438605e-06, "epoch": 0.8704563650920737, "percentage": 87.06, "elapsed_time": "8:02:18", "remaining_time": "1:11:41"}
+{"current_steps": 2719, "total_steps": 3122, "loss": 2.3744, "learning_rate": 2.4966164021260092e-06, "epoch": 0.8707766212970376, "percentage": 87.09, "elapsed_time": "8:02:28", "remaining_time": "1:11:30"}
+{"current_steps": 2720, "total_steps": 3122, "loss": 1.145, "learning_rate": 2.4844507862814835e-06, "epoch": 0.8710968775020016, "percentage": 87.12, "elapsed_time": "8:02:39", "remaining_time": "1:11:19"}
+{"current_steps": 2721, "total_steps": 3122, "loss": 1.9044, "learning_rate": 2.472313333427334e-06, "epoch": 0.8714171337069656, "percentage": 87.16, "elapsed_time": "8:02:49", "remaining_time": "1:11:09"}
+{"current_steps": 2722, "total_steps": 3122, "loss": 1.9285, "learning_rate": 2.4602040587453774e-06, "epoch": 0.8717373899119295, "percentage": 87.19, "elapsed_time": "8:02:59", "remaining_time": "1:10:58"}
+{"current_steps": 2723, "total_steps": 3122, "loss": 2.2034, "learning_rate": 2.4481229773821835e-06, "epoch": 0.8720576461168935, "percentage": 87.22, "elapsed_time": "8:03:10", "remaining_time": "1:10:47"}
+{"current_steps": 2724, "total_steps": 3122, "loss": 2.475, "learning_rate": 2.436070104449059e-06, "epoch": 0.8723779023218575, "percentage": 87.25, "elapsed_time": "8:03:20", "remaining_time": "1:10:37"}
+{"current_steps": 2725, "total_steps": 3122, "loss": 2.528, "learning_rate": 2.4240454550220367e-06, "epoch": 0.8726981585268214, "percentage": 87.28, "elapsed_time": "8:03:30", "remaining_time": "1:10:26"}
+{"current_steps": 2726, "total_steps": 3122, "loss": 2.067, "learning_rate": 2.412049044141823e-06, "epoch": 0.8730184147317854, "percentage": 87.32, "elapsed_time": "8:03:41", "remaining_time": "1:10:15"}
+{"current_steps": 2727, "total_steps": 3122, "loss": 1.8833, "learning_rate": 2.4000808868138212e-06, "epoch": 0.8733386709367494, "percentage": 87.35, "elapsed_time": "8:03:51", "remaining_time": "1:10:05"}
+{"current_steps": 2728, "total_steps": 3122, "loss": 2.4556, "learning_rate": 2.3881409980080954e-06, "epoch": 0.8736589271417133, "percentage": 87.38, "elapsed_time": "8:04:01", "remaining_time": "1:09:54"}
+{"current_steps": 2729, "total_steps": 3122, "loss": 1.9098, "learning_rate": 2.3762293926593433e-06, "epoch": 0.8739791833466773, "percentage": 87.41, "elapsed_time": "8:04:12", "remaining_time": "1:09:43"}
+{"current_steps": 2730, "total_steps": 3122, "loss": 2.4019, "learning_rate": 2.3643460856668823e-06, "epoch": 0.8742994395516414, "percentage": 87.44, "elapsed_time": "8:04:22", "remaining_time": "1:09:33"}
+{"current_steps": 2731, "total_steps": 3122, "loss": 2.2306, "learning_rate": 2.3524910918946484e-06, "epoch": 0.8746196957566053, "percentage": 87.48, "elapsed_time": "8:04:33", "remaining_time": "1:09:22"}
+{"current_steps": 2732, "total_steps": 3122, "loss": 2.2344, "learning_rate": 2.340664426171149e-06, "epoch": 0.8749399519615693, "percentage": 87.51, "elapsed_time": "8:04:43", "remaining_time": "1:09:11"}
+{"current_steps": 2733, "total_steps": 3122, "loss": 2.1087, "learning_rate": 2.3288661032894564e-06, "epoch": 0.8752602081665333, "percentage": 87.54, "elapsed_time": "8:04:53", "remaining_time": "1:09:01"}
+{"current_steps": 2734, "total_steps": 3122, "loss": 2.0231, "learning_rate": 2.3170961380071993e-06, "epoch": 0.8755804643714972, "percentage": 87.57, "elapsed_time": "8:05:04", "remaining_time": "1:08:50"}
+{"current_steps": 2735, "total_steps": 3122, "loss": 2.5689, "learning_rate": 2.305354545046537e-06, "epoch": 0.8759007205764612, "percentage": 87.6, "elapsed_time": "8:05:14", "remaining_time": "1:08:39"}
+{"current_steps": 2736, "total_steps": 3122, "loss": 2.1854, "learning_rate": 2.2936413390941325e-06, "epoch": 0.8762209767814252, "percentage": 87.64, "elapsed_time": "8:05:24", "remaining_time": "1:08:28"}
+{"current_steps": 2737, "total_steps": 3122, "loss": 2.2984, "learning_rate": 2.2819565348011466e-06, "epoch": 0.8765412329863891, "percentage": 87.67, "elapsed_time": "8:05:35", "remaining_time": "1:08:18"}
+{"current_steps": 2738, "total_steps": 3122, "loss": 2.3775, "learning_rate": 2.2703001467832137e-06, "epoch": 0.8768614891913531, "percentage": 87.7, "elapsed_time": "8:05:45", "remaining_time": "1:08:07"}
+{"current_steps": 2739, "total_steps": 3122, "loss": 2.5423, "learning_rate": 2.258672189620431e-06, "epoch": 0.8771817453963171, "percentage": 87.73, "elapsed_time": "8:05:55", "remaining_time": "1:07:56"}
+{"current_steps": 2740, "total_steps": 3122, "loss": 1.8138, "learning_rate": 2.2470726778573146e-06, "epoch": 0.877502001601281, "percentage": 87.76, "elapsed_time": "8:06:06", "remaining_time": "1:07:46"}
+{"current_steps": 2741, "total_steps": 3122, "loss": 1.9844, "learning_rate": 2.235501626002817e-06, "epoch": 0.877822257806245, "percentage": 87.8, "elapsed_time": "8:06:16", "remaining_time": "1:07:35"}
+{"current_steps": 2742, "total_steps": 3122, "loss": 1.8902, "learning_rate": 2.2239590485302887e-06, "epoch": 0.878142514011209, "percentage": 87.83, "elapsed_time": "8:06:27", "remaining_time": "1:07:24"}
+{"current_steps": 2743, "total_steps": 3122, "loss": 1.7303, "learning_rate": 2.212444959877466e-06, "epoch": 0.8784627702161729, "percentage": 87.86, "elapsed_time": "8:06:37", "remaining_time": "1:07:14"}
+{"current_steps": 2744, "total_steps": 3122, "loss": 2.1603, "learning_rate": 2.2009593744464456e-06, "epoch": 0.8787830264211369, "percentage": 87.89, "elapsed_time": "8:06:47", "remaining_time": "1:07:03"}
+{"current_steps": 2745, "total_steps": 3122, "loss": 1.5858, "learning_rate": 2.1895023066036745e-06, "epoch": 0.8791032826261009, "percentage": 87.92, "elapsed_time": "8:06:58", "remaining_time": "1:06:52"}
+{"current_steps": 2746, "total_steps": 3122, "loss": 2.3251, "learning_rate": 2.1780737706799255e-06, "epoch": 0.8794235388310648, "percentage": 87.96, "elapsed_time": "8:07:08", "remaining_time": "1:06:42"}
+{"current_steps": 2747, "total_steps": 3122, "loss": 2.1973, "learning_rate": 2.1666737809702963e-06, "epoch": 0.8797437950360288, "percentage": 87.99, "elapsed_time": "8:07:18", "remaining_time": "1:06:31"}
+{"current_steps": 2748, "total_steps": 3122, "loss": 2.2133, "learning_rate": 2.1553023517341566e-06, "epoch": 0.8800640512409927, "percentage": 88.02, "elapsed_time": "8:07:29", "remaining_time": "1:06:20"}
+{"current_steps": 2749, "total_steps": 3122, "loss": 2.7235, "learning_rate": 2.1439594971951666e-06, "epoch": 0.8803843074459567, "percentage": 88.05, "elapsed_time": "8:07:39", "remaining_time": "1:06:10"}
+{"current_steps": 2750, "total_steps": 3122, "loss": 1.9469, "learning_rate": 2.1326452315412413e-06, "epoch": 0.8807045636509208, "percentage": 88.08, "elapsed_time": "8:07:49", "remaining_time": "1:05:59"}
+{"current_steps": 2751, "total_steps": 3122, "loss": 2.0951, "learning_rate": 2.1213595689245386e-06, "epoch": 0.8810248198558847, "percentage": 88.12, "elapsed_time": "8:08:00", "remaining_time": "1:05:48"}
+{"current_steps": 2752, "total_steps": 3122, "loss": 2.1507, "learning_rate": 2.110102523461435e-06, "epoch": 0.8813450760608487, "percentage": 88.15, "elapsed_time": "8:08:10", "remaining_time": "1:05:38"}
+{"current_steps": 2753, "total_steps": 3122, "loss": 2.0099, "learning_rate": 2.098874109232521e-06, "epoch": 0.8816653322658127, "percentage": 88.18, "elapsed_time": "8:08:21", "remaining_time": "1:05:27"}
+{"current_steps": 2754, "total_steps": 3122, "loss": 1.7282, "learning_rate": 2.08767434028255e-06, "epoch": 0.8819855884707766, "percentage": 88.21, "elapsed_time": "8:08:31", "remaining_time": "1:05:16"}
+{"current_steps": 2755, "total_steps": 3122, "loss": 2.3165, "learning_rate": 2.07650323062048e-06, "epoch": 0.8823058446757406, "percentage": 88.24, "elapsed_time": "8:08:41", "remaining_time": "1:05:06"}
+{"current_steps": 2756, "total_steps": 3122, "loss": 2.093, "learning_rate": 2.065360794219395e-06, "epoch": 0.8826261008807046, "percentage": 88.28, "elapsed_time": "8:08:52", "remaining_time": "1:04:55"}
+{"current_steps": 2757, "total_steps": 3122, "loss": 1.8592, "learning_rate": 2.054247045016522e-06, "epoch": 0.8829463570856685, "percentage": 88.31, "elapsed_time": "8:09:02", "remaining_time": "1:04:44"}
+{"current_steps": 2758, "total_steps": 3122, "loss": 2.0496, "learning_rate": 2.0431619969132065e-06, "epoch": 0.8832666132906325, "percentage": 88.34, "elapsed_time": "8:09:12", "remaining_time": "1:04:33"}
+{"current_steps": 2759, "total_steps": 3122, "loss": 2.394, "learning_rate": 2.032105663774897e-06, "epoch": 0.8835868694955965, "percentage": 88.37, "elapsed_time": "8:09:23", "remaining_time": "1:04:23"}
+{"current_steps": 2760, "total_steps": 3122, "loss": 1.8352, "learning_rate": 2.021078059431114e-06, "epoch": 0.8839071257005604, "percentage": 88.4, "elapsed_time": "8:09:33", "remaining_time": "1:04:12"}
+{"current_steps": 2761, "total_steps": 3122, "loss": 1.8796, "learning_rate": 2.010079197675463e-06, "epoch": 0.8842273819055244, "percentage": 88.44, "elapsed_time": "8:09:43", "remaining_time": "1:04:01"}
+{"current_steps": 2762, "total_steps": 3122, "loss": 1.7734, "learning_rate": 1.9991090922655694e-06, "epoch": 0.8845476381104884, "percentage": 88.47, "elapsed_time": "8:09:54", "remaining_time": "1:03:51"}
+{"current_steps": 2763, "total_steps": 3122, "loss": 2.5961, "learning_rate": 1.9881677569231094e-06, "epoch": 0.8848678943154523, "percentage": 88.5, "elapsed_time": "8:10:04", "remaining_time": "1:03:40"}
+{"current_steps": 2764, "total_steps": 3122, "loss": 1.9614, "learning_rate": 1.977255205333775e-06, "epoch": 0.8851881505204163, "percentage": 88.53, "elapsed_time": "8:10:15", "remaining_time": "1:03:29"}
+{"current_steps": 2765, "total_steps": 3122, "loss": 2.529, "learning_rate": 1.966371451147239e-06, "epoch": 0.8855084067253803, "percentage": 88.57, "elapsed_time": "8:10:25", "remaining_time": "1:03:19"}
+{"current_steps": 2766, "total_steps": 3122, "loss": 2.4828, "learning_rate": 1.9555165079771703e-06, "epoch": 0.8858286629303442, "percentage": 88.6, "elapsed_time": "8:10:35", "remaining_time": "1:03:08"}
+{"current_steps": 2767, "total_steps": 3122, "loss": 2.0968, "learning_rate": 1.9446903894011937e-06, "epoch": 0.8861489191353082, "percentage": 88.63, "elapsed_time": "8:10:46", "remaining_time": "1:02:57"}
+{"current_steps": 2768, "total_steps": 3122, "loss": 1.7931, "learning_rate": 1.933893108960866e-06, "epoch": 0.8864691753402723, "percentage": 88.66, "elapsed_time": "8:10:56", "remaining_time": "1:02:47"}
+{"current_steps": 2769, "total_steps": 3122, "loss": 2.7387, "learning_rate": 1.9231246801617033e-06, "epoch": 0.8867894315452362, "percentage": 88.69, "elapsed_time": "8:11:06", "remaining_time": "1:02:36"}
+{"current_steps": 2770, "total_steps": 3122, "loss": 2.1077, "learning_rate": 1.9123851164731004e-06, "epoch": 0.8871096877502002, "percentage": 88.73, "elapsed_time": "8:11:17", "remaining_time": "1:02:25"}
+{"current_steps": 2771, "total_steps": 3122, "loss": 2.2398, "learning_rate": 1.901674431328368e-06, "epoch": 0.8874299439551642, "percentage": 88.76, "elapsed_time": "8:11:27", "remaining_time": "1:02:15"}
+{"current_steps": 2772, "total_steps": 3122, "loss": 2.5055, "learning_rate": 1.8909926381246862e-06, "epoch": 0.8877502001601281, "percentage": 88.79, "elapsed_time": "8:11:37", "remaining_time": "1:02:04"}
+{"current_steps": 2773, "total_steps": 3122, "loss": 2.0305, "learning_rate": 1.8803397502231034e-06, "epoch": 0.8880704563650921, "percentage": 88.82, "elapsed_time": "8:11:48", "remaining_time": "1:01:53"}
+{"current_steps": 2774, "total_steps": 3122, "loss": 2.3018, "learning_rate": 1.8697157809485055e-06, "epoch": 0.8883907125700561, "percentage": 88.85, "elapsed_time": "8:11:58", "remaining_time": "1:01:43"}
+{"current_steps": 2775, "total_steps": 3122, "loss": 2.3575, "learning_rate": 1.8591207435896096e-06, "epoch": 0.88871096877502, "percentage": 88.89, "elapsed_time": "8:12:09", "remaining_time": "1:01:32"}
+{"current_steps": 2776, "total_steps": 3122, "loss": 2.1141, "learning_rate": 1.8485546513989372e-06, "epoch": 0.889031224979984, "percentage": 88.92, "elapsed_time": "8:12:19", "remaining_time": "1:01:21"}
+{"current_steps": 2777, "total_steps": 3122, "loss": 1.9234, "learning_rate": 1.8380175175928216e-06, "epoch": 0.889351481184948, "percentage": 88.95, "elapsed_time": "8:12:29", "remaining_time": "1:01:11"}
+{"current_steps": 2778, "total_steps": 3122, "loss": 2.3495, "learning_rate": 1.8275093553513533e-06, "epoch": 0.8896717373899119, "percentage": 88.98, "elapsed_time": "8:12:40", "remaining_time": "1:01:00"}
+{"current_steps": 2779, "total_steps": 3122, "loss": 2.2586, "learning_rate": 1.817030177818399e-06, "epoch": 0.8899919935948759, "percentage": 89.01, "elapsed_time": "8:12:50", "remaining_time": "1:00:49"}
+{"current_steps": 2780, "total_steps": 3122, "loss": 2.1218, "learning_rate": 1.8065799981015625e-06, "epoch": 0.8903122497998399, "percentage": 89.05, "elapsed_time": "8:13:00", "remaining_time": "1:00:39"}
+{"current_steps": 2781, "total_steps": 3122, "loss": 2.3084, "learning_rate": 1.7961588292721848e-06, "epoch": 0.8906325060048038, "percentage": 89.08, "elapsed_time": "8:13:11", "remaining_time": "1:00:28"}
+{"current_steps": 2782, "total_steps": 3122, "loss": 1.9461, "learning_rate": 1.7857666843653088e-06, "epoch": 0.8909527622097678, "percentage": 89.11, "elapsed_time": "8:13:21", "remaining_time": "1:00:17"}
+{"current_steps": 2783, "total_steps": 3122, "loss": 2.3538, "learning_rate": 1.775403576379689e-06, "epoch": 0.8912730184147318, "percentage": 89.14, "elapsed_time": "8:13:32", "remaining_time": "1:00:07"}
+{"current_steps": 2784, "total_steps": 3122, "loss": 2.2233, "learning_rate": 1.76506951827774e-06, "epoch": 0.8915932746196957, "percentage": 89.17, "elapsed_time": "8:13:42", "remaining_time": "0:59:56"}
+{"current_steps": 2785, "total_steps": 3122, "loss": 2.5818, "learning_rate": 1.7547645229855497e-06, "epoch": 0.8919135308246597, "percentage": 89.21, "elapsed_time": "8:13:52", "remaining_time": "0:59:45"}
+{"current_steps": 2786, "total_steps": 3122, "loss": 2.1235, "learning_rate": 1.7444886033928603e-06, "epoch": 0.8922337870296237, "percentage": 89.24, "elapsed_time": "8:14:03", "remaining_time": "0:59:35"}
+{"current_steps": 2787, "total_steps": 3122, "loss": 2.3278, "learning_rate": 1.7342417723530374e-06, "epoch": 0.8925540432345876, "percentage": 89.27, "elapsed_time": "8:14:13", "remaining_time": "0:59:24"}
+{"current_steps": 2788, "total_steps": 3122, "loss": 2.1486, "learning_rate": 1.7240240426830617e-06, "epoch": 0.8928742994395517, "percentage": 89.3, "elapsed_time": "8:14:23", "remaining_time": "0:59:13"}
+{"current_steps": 2789, "total_steps": 3122, "loss": 2.7315, "learning_rate": 1.713835427163521e-06, "epoch": 0.8931945556445157, "percentage": 89.33, "elapsed_time": "8:14:34", "remaining_time": "0:59:03"}
+{"current_steps": 2790, "total_steps": 3122, "loss": 1.8048, "learning_rate": 1.7036759385385682e-06, "epoch": 0.8935148118494796, "percentage": 89.37, "elapsed_time": "8:14:44", "remaining_time": "0:58:52"}
+{"current_steps": 2791, "total_steps": 3122, "loss": 2.6576, "learning_rate": 1.693545589515952e-06, "epoch": 0.8938350680544436, "percentage": 89.4, "elapsed_time": "8:14:54", "remaining_time": "0:58:41"}
+{"current_steps": 2792, "total_steps": 3122, "loss": 1.56, "learning_rate": 1.6834443927669446e-06, "epoch": 0.8941553242594076, "percentage": 89.43, "elapsed_time": "8:15:05", "remaining_time": "0:58:31"}
+{"current_steps": 2793, "total_steps": 3122, "loss": 2.1219, "learning_rate": 1.6733723609263674e-06, "epoch": 0.8944755804643715, "percentage": 89.46, "elapsed_time": "8:15:15", "remaining_time": "0:58:20"}
+{"current_steps": 2794, "total_steps": 3122, "loss": 1.3158, "learning_rate": 1.6633295065925647e-06, "epoch": 0.8947958366693355, "percentage": 89.49, "elapsed_time": "8:15:26", "remaining_time": "0:58:09"}
+{"current_steps": 2795, "total_steps": 3122, "loss": 2.4756, "learning_rate": 1.653315842327377e-06, "epoch": 0.8951160928742994, "percentage": 89.53, "elapsed_time": "8:15:36", "remaining_time": "0:57:58"}
+{"current_steps": 2796, "total_steps": 3122, "loss": 2.2544, "learning_rate": 1.6433313806561379e-06, "epoch": 0.8954363490792634, "percentage": 89.56, "elapsed_time": "8:15:46", "remaining_time": "0:57:48"}
+{"current_steps": 2797, "total_steps": 3122, "loss": 2.0936, "learning_rate": 1.6333761340676518e-06, "epoch": 0.8957566052842274, "percentage": 89.59, "elapsed_time": "8:15:57", "remaining_time": "0:57:37"}
+{"current_steps": 2798, "total_steps": 3122, "loss": 2.3256, "learning_rate": 1.6234501150141745e-06, "epoch": 0.8960768614891913, "percentage": 89.62, "elapsed_time": "8:16:07", "remaining_time": "0:57:26"}
+{"current_steps": 2799, "total_steps": 3122, "loss": 2.2462, "learning_rate": 1.6135533359114247e-06, "epoch": 0.8963971176941553, "percentage": 89.65, "elapsed_time": "8:16:17", "remaining_time": "0:57:16"}
+{"current_steps": 2800, "total_steps": 3122, "loss": 2.377, "learning_rate": 1.6036858091385137e-06, "epoch": 0.8967173738991193, "percentage": 89.69, "elapsed_time": "8:16:28", "remaining_time": "0:57:05"}
+{"current_steps": 2801, "total_steps": 3122, "loss": 2.2872, "learning_rate": 1.593847547037991e-06, "epoch": 0.8970376301040832, "percentage": 89.72, "elapsed_time": "8:17:04", "remaining_time": "0:56:57"}
+{"current_steps": 2802, "total_steps": 3122, "loss": 1.8975, "learning_rate": 1.5840385619157904e-06, "epoch": 0.8973578863090472, "percentage": 89.75, "elapsed_time": "8:17:14", "remaining_time": "0:56:47"}
+{"current_steps": 2803, "total_steps": 3122, "loss": 2.7625, "learning_rate": 1.574258866041231e-06, "epoch": 0.8976781425140112, "percentage": 89.78, "elapsed_time": "8:17:25", "remaining_time": "0:56:36"}
+{"current_steps": 2804, "total_steps": 3122, "loss": 2.2334, "learning_rate": 1.5645084716469777e-06, "epoch": 0.8979983987189751, "percentage": 89.81, "elapsed_time": "8:17:35", "remaining_time": "0:56:25"}
+{"current_steps": 2805, "total_steps": 3122, "loss": 2.3039, "learning_rate": 1.5547873909290716e-06, "epoch": 0.8983186549239391, "percentage": 89.85, "elapsed_time": "8:17:46", "remaining_time": "0:56:15"}
+{"current_steps": 2806, "total_steps": 3122, "loss": 1.9124, "learning_rate": 1.5450956360468698e-06, "epoch": 0.8986389111289032, "percentage": 89.88, "elapsed_time": "8:17:56", "remaining_time": "0:56:04"}
+{"current_steps": 2807, "total_steps": 3122, "loss": 1.9301, "learning_rate": 1.5354332191230502e-06, "epoch": 0.898959167333867, "percentage": 89.91, "elapsed_time": "8:18:06", "remaining_time": "0:55:53"}
+{"current_steps": 2808, "total_steps": 3122, "loss": 2.5829, "learning_rate": 1.5258001522435978e-06, "epoch": 0.8992794235388311, "percentage": 89.94, "elapsed_time": "8:18:17", "remaining_time": "0:55:43"}
+{"current_steps": 2809, "total_steps": 3122, "loss": 2.4198, "learning_rate": 1.516196447457785e-06, "epoch": 0.8995996797437951, "percentage": 89.97, "elapsed_time": "8:18:27", "remaining_time": "0:55:32"}
+{"current_steps": 2810, "total_steps": 3122, "loss": 2.4602, "learning_rate": 1.5066221167781557e-06, "epoch": 0.899919935948759, "percentage": 90.01, "elapsed_time": "8:18:38", "remaining_time": "0:55:21"}
+{"current_steps": 2811, "total_steps": 3122, "loss": 2.4408, "learning_rate": 1.4970771721805165e-06, "epoch": 0.900240192153723, "percentage": 90.04, "elapsed_time": "8:18:48", "remaining_time": "0:55:11"}
+{"current_steps": 2812, "total_steps": 3122, "loss": 2.3519, "learning_rate": 1.4875616256039031e-06, "epoch": 0.900560448358687, "percentage": 90.07, "elapsed_time": "8:18:58", "remaining_time": "0:55:00"}
+{"current_steps": 2813, "total_steps": 3122, "loss": 1.9272, "learning_rate": 1.478075488950606e-06, "epoch": 0.9008807045636509, "percentage": 90.1, "elapsed_time": "8:19:09", "remaining_time": "0:54:49"}
+{"current_steps": 2814, "total_steps": 3122, "loss": 2.1546, "learning_rate": 1.468618774086103e-06, "epoch": 0.9012009607686149, "percentage": 90.13, "elapsed_time": "8:19:19", "remaining_time": "0:54:39"}
+{"current_steps": 2815, "total_steps": 3122, "loss": 2.2757, "learning_rate": 1.4591914928390793e-06, "epoch": 0.9015212169735789, "percentage": 90.17, "elapsed_time": "8:19:30", "remaining_time": "0:54:28"}
+{"current_steps": 2816, "total_steps": 3122, "loss": 2.3683, "learning_rate": 1.449793657001408e-06, "epoch": 0.9018414731785428, "percentage": 90.2, "elapsed_time": "8:19:40", "remaining_time": "0:54:17"}
+{"current_steps": 2817, "total_steps": 3122, "loss": 1.7778, "learning_rate": 1.4404252783281308e-06, "epoch": 0.9021617293835068, "percentage": 90.23, "elapsed_time": "8:19:50", "remaining_time": "0:54:07"}
+{"current_steps": 2818, "total_steps": 3122, "loss": 2.2228, "learning_rate": 1.431086368537432e-06, "epoch": 0.9024819855884708, "percentage": 90.26, "elapsed_time": "8:20:01", "remaining_time": "0:53:56"}
+{"current_steps": 2819, "total_steps": 3122, "loss": 2.0747, "learning_rate": 1.4217769393106567e-06, "epoch": 0.9028022417934347, "percentage": 90.29, "elapsed_time": "8:20:11", "remaining_time": "0:53:45"}
+{"current_steps": 2820, "total_steps": 3122, "loss": 1.7582, "learning_rate": 1.4124970022922513e-06, "epoch": 0.9031224979983987, "percentage": 90.33, "elapsed_time": "8:20:22", "remaining_time": "0:53:35"}
+{"current_steps": 2821, "total_steps": 3122, "loss": 2.561, "learning_rate": 1.4032465690897944e-06, "epoch": 0.9034427542033627, "percentage": 90.36, "elapsed_time": "8:20:32", "remaining_time": "0:53:24"}
+{"current_steps": 2822, "total_steps": 3122, "loss": 1.9619, "learning_rate": 1.3940256512739447e-06, "epoch": 0.9037630104083266, "percentage": 90.39, "elapsed_time": "8:20:42", "remaining_time": "0:53:13"}
+{"current_steps": 2823, "total_steps": 3122, "loss": 2.1804, "learning_rate": 1.3848342603784453e-06, "epoch": 0.9040832666132906, "percentage": 90.42, "elapsed_time": "8:20:53", "remaining_time": "0:53:03"}
+{"current_steps": 2824, "total_steps": 3122, "loss": 2.6895, "learning_rate": 1.3756724079001165e-06, "epoch": 0.9044035228182546, "percentage": 90.45, "elapsed_time": "8:21:03", "remaining_time": "0:52:52"}
+{"current_steps": 2825, "total_steps": 3122, "loss": 1.9138, "learning_rate": 1.366540105298819e-06, "epoch": 0.9047237790232185, "percentage": 90.49, "elapsed_time": "8:21:13", "remaining_time": "0:52:41"}
+{"current_steps": 2826, "total_steps": 3122, "loss": 2.2131, "learning_rate": 1.3574373639974518e-06, "epoch": 0.9050440352281826, "percentage": 90.52, "elapsed_time": "8:21:24", "remaining_time": "0:52:31"}
+{"current_steps": 2827, "total_steps": 3122, "loss": 2.1942, "learning_rate": 1.3483641953819542e-06, "epoch": 0.9053642914331466, "percentage": 90.55, "elapsed_time": "8:21:34", "remaining_time": "0:52:20"}
+{"current_steps": 2828, "total_steps": 3122, "loss": 1.9268, "learning_rate": 1.3393206108012562e-06, "epoch": 0.9056845476381105, "percentage": 90.58, "elapsed_time": "8:21:44", "remaining_time": "0:52:09"}
+{"current_steps": 2829, "total_steps": 3122, "loss": 2.5872, "learning_rate": 1.33030662156729e-06, "epoch": 0.9060048038430745, "percentage": 90.61, "elapsed_time": "8:21:55", "remaining_time": "0:51:59"}
+{"current_steps": 2830, "total_steps": 3122, "loss": 2.0611, "learning_rate": 1.3213222389549724e-06, "epoch": 0.9063250600480385, "percentage": 90.65, "elapsed_time": "8:22:05", "remaining_time": "0:51:48"}
+{"current_steps": 2831, "total_steps": 3122, "loss": 2.4414, "learning_rate": 1.3123674742021862e-06, "epoch": 0.9066453162530024, "percentage": 90.68, "elapsed_time": "8:22:15", "remaining_time": "0:51:37"}
+{"current_steps": 2832, "total_steps": 3122, "loss": 2.0825, "learning_rate": 1.303442338509761e-06, "epoch": 0.9069655724579664, "percentage": 90.71, "elapsed_time": "8:22:26", "remaining_time": "0:51:27"}
+{"current_steps": 2833, "total_steps": 3122, "loss": 1.8121, "learning_rate": 1.2945468430414803e-06, "epoch": 0.9072858286629304, "percentage": 90.74, "elapsed_time": "8:22:36", "remaining_time": "0:51:16"}
+{"current_steps": 2834, "total_steps": 3122, "loss": 2.3212, "learning_rate": 1.2856809989240326e-06, "epoch": 0.9076060848678943, "percentage": 90.78, "elapsed_time": "8:22:46", "remaining_time": "0:51:05"}
+{"current_steps": 2835, "total_steps": 3122, "loss": 2.4806, "learning_rate": 1.2768448172470444e-06, "epoch": 0.9079263410728583, "percentage": 90.81, "elapsed_time": "8:22:57", "remaining_time": "0:50:54"}
+{"current_steps": 2836, "total_steps": 3122, "loss": 2.4582, "learning_rate": 1.2680383090630077e-06, "epoch": 0.9082465972778223, "percentage": 90.84, "elapsed_time": "8:23:07", "remaining_time": "0:50:44"}
+{"current_steps": 2837, "total_steps": 3122, "loss": 2.4116, "learning_rate": 1.2592614853873224e-06, "epoch": 0.9085668534827862, "percentage": 90.87, "elapsed_time": "8:23:18", "remaining_time": "0:50:33"}
+{"current_steps": 2838, "total_steps": 3122, "loss": 2.1586, "learning_rate": 1.2505143571982515e-06, "epoch": 0.9088871096877502, "percentage": 90.9, "elapsed_time": "8:23:28", "remaining_time": "0:50:22"}
+{"current_steps": 2839, "total_steps": 3122, "loss": 2.3296, "learning_rate": 1.2417969354369147e-06, "epoch": 0.9092073658927142, "percentage": 90.94, "elapsed_time": "8:23:38", "remaining_time": "0:50:12"}
+{"current_steps": 2840, "total_steps": 3122, "loss": 1.7858, "learning_rate": 1.2331092310072623e-06, "epoch": 0.9095276220976781, "percentage": 90.97, "elapsed_time": "8:23:49", "remaining_time": "0:50:01"}
+{"current_steps": 2841, "total_steps": 3122, "loss": 2.1908, "learning_rate": 1.2244512547761016e-06, "epoch": 0.9098478783026421, "percentage": 91.0, "elapsed_time": "8:23:59", "remaining_time": "0:49:50"}
+{"current_steps": 2842, "total_steps": 3122, "loss": 2.1441, "learning_rate": 1.2158230175730201e-06, "epoch": 0.910168134507606, "percentage": 91.03, "elapsed_time": "8:24:09", "remaining_time": "0:49:40"}
+{"current_steps": 2843, "total_steps": 3122, "loss": 2.2306, "learning_rate": 1.2072245301904345e-06, "epoch": 0.91048839071257, "percentage": 91.06, "elapsed_time": "8:24:20", "remaining_time": "0:49:29"}
+{"current_steps": 2844, "total_steps": 3122, "loss": 2.5195, "learning_rate": 1.1986558033835333e-06, "epoch": 0.910808646917534, "percentage": 91.1, "elapsed_time": "8:24:30", "remaining_time": "0:49:18"}
+{"current_steps": 2845, "total_steps": 3122, "loss": 2.6438, "learning_rate": 1.190116847870293e-06, "epoch": 0.911128903122498, "percentage": 91.13, "elapsed_time": "8:24:40", "remaining_time": "0:49:08"}
+{"current_steps": 2846, "total_steps": 3122, "loss": 2.0309, "learning_rate": 1.181607674331439e-06, "epoch": 0.911449159327462, "percentage": 91.16, "elapsed_time": "8:24:51", "remaining_time": "0:48:57"}
+{"current_steps": 2847, "total_steps": 3122, "loss": 2.1805, "learning_rate": 1.1731282934104553e-06, "epoch": 0.911769415532426, "percentage": 91.19, "elapsed_time": "8:25:01", "remaining_time": "0:48:46"}
+{"current_steps": 2848, "total_steps": 3122, "loss": 2.2949, "learning_rate": 1.1646787157135463e-06, "epoch": 0.9120896717373899, "percentage": 91.22, "elapsed_time": "8:25:12", "remaining_time": "0:48:36"}
+{"current_steps": 2849, "total_steps": 3122, "loss": 2.3779, "learning_rate": 1.1562589518096607e-06, "epoch": 0.9124099279423539, "percentage": 91.26, "elapsed_time": "8:25:22", "remaining_time": "0:48:25"}
+{"current_steps": 2850, "total_steps": 3122, "loss": 1.8918, "learning_rate": 1.1478690122304293e-06, "epoch": 0.9127301841473179, "percentage": 91.29, "elapsed_time": "8:25:32", "remaining_time": "0:48:14"}
+{"current_steps": 2851, "total_steps": 3122, "loss": 2.4792, "learning_rate": 1.1395089074701936e-06, "epoch": 0.9130504403522818, "percentage": 91.32, "elapsed_time": "8:25:43", "remaining_time": "0:48:04"}
+{"current_steps": 2852, "total_steps": 3122, "loss": 2.6007, "learning_rate": 1.1311786479859781e-06, "epoch": 0.9133706965572458, "percentage": 91.35, "elapsed_time": "8:25:53", "remaining_time": "0:47:53"}
+{"current_steps": 2853, "total_steps": 3122, "loss": 2.0799, "learning_rate": 1.12287824419747e-06, "epoch": 0.9136909527622098, "percentage": 91.38, "elapsed_time": "8:26:03", "remaining_time": "0:47:42"}
+{"current_steps": 2854, "total_steps": 3122, "loss": 2.4274, "learning_rate": 1.114607706487006e-06, "epoch": 0.9140112089671737, "percentage": 91.42, "elapsed_time": "8:26:14", "remaining_time": "0:47:32"}
+{"current_steps": 2855, "total_steps": 3122, "loss": 2.5174, "learning_rate": 1.1063670451995856e-06, "epoch": 0.9143314651721377, "percentage": 91.45, "elapsed_time": "8:26:24", "remaining_time": "0:47:21"}
+{"current_steps": 2856, "total_steps": 3122, "loss": 2.1216, "learning_rate": 1.0981562706428166e-06, "epoch": 0.9146517213771017, "percentage": 91.48, "elapsed_time": "8:26:34", "remaining_time": "0:47:10"}
+{"current_steps": 2857, "total_steps": 3122, "loss": 2.0923, "learning_rate": 1.0899753930869394e-06, "epoch": 0.9149719775820656, "percentage": 91.51, "elapsed_time": "8:26:45", "remaining_time": "0:47:00"}
+{"current_steps": 2858, "total_steps": 3122, "loss": 2.3559, "learning_rate": 1.0818244227647905e-06, "epoch": 0.9152922337870296, "percentage": 91.54, "elapsed_time": "8:26:55", "remaining_time": "0:46:49"}
+{"current_steps": 2859, "total_steps": 3122, "loss": 2.3995, "learning_rate": 1.0737033698717979e-06, "epoch": 0.9156124899919936, "percentage": 91.58, "elapsed_time": "8:27:06", "remaining_time": "0:46:38"}
+{"current_steps": 2860, "total_steps": 3122, "loss": 2.1872, "learning_rate": 1.0656122445659721e-06, "epoch": 0.9159327461969575, "percentage": 91.61, "elapsed_time": "8:27:16", "remaining_time": "0:46:28"}
+{"current_steps": 2861, "total_steps": 3122, "loss": 1.9036, "learning_rate": 1.057551056967887e-06, "epoch": 0.9162530024019215, "percentage": 91.64, "elapsed_time": "8:27:26", "remaining_time": "0:46:17"}
+{"current_steps": 2862, "total_steps": 3122, "loss": 2.4604, "learning_rate": 1.0495198171606657e-06, "epoch": 0.9165732586068855, "percentage": 91.67, "elapsed_time": "8:27:37", "remaining_time": "0:46:06"}
+{"current_steps": 2863, "total_steps": 3122, "loss": 2.326, "learning_rate": 1.0415185351899837e-06, "epoch": 0.9168935148118494, "percentage": 91.7, "elapsed_time": "8:27:47", "remaining_time": "0:45:56"}
+{"current_steps": 2864, "total_steps": 3122, "loss": 2.0918, "learning_rate": 1.0335472210640323e-06, "epoch": 0.9172137710168135, "percentage": 91.74, "elapsed_time": "8:27:57", "remaining_time": "0:45:45"}
+{"current_steps": 2865, "total_steps": 3122, "loss": 2.2654, "learning_rate": 1.0256058847535221e-06, "epoch": 0.9175340272217775, "percentage": 91.77, "elapsed_time": "8:28:08", "remaining_time": "0:45:34"}
+{"current_steps": 2866, "total_steps": 3122, "loss": 2.1514, "learning_rate": 1.0176945361916657e-06, "epoch": 0.9178542834267414, "percentage": 91.8, "elapsed_time": "8:28:18", "remaining_time": "0:45:24"}
+{"current_steps": 2867, "total_steps": 3122, "loss": 2.1784, "learning_rate": 1.0098131852741777e-06, "epoch": 0.9181745396317054, "percentage": 91.83, "elapsed_time": "8:28:28", "remaining_time": "0:45:13"}
+{"current_steps": 2868, "total_steps": 3122, "loss": 2.1977, "learning_rate": 1.001961841859228e-06, "epoch": 0.9184947958366694, "percentage": 91.86, "elapsed_time": "8:28:39", "remaining_time": "0:45:02"}
+{"current_steps": 2869, "total_steps": 3122, "loss": 2.4212, "learning_rate": 9.941405157674778e-07, "epoch": 0.9188150520416333, "percentage": 91.9, "elapsed_time": "8:28:49", "remaining_time": "0:44:52"}
+{"current_steps": 2870, "total_steps": 3122, "loss": 1.8568, "learning_rate": 9.863492167820232e-07, "epoch": 0.9191353082465973, "percentage": 91.93, "elapsed_time": "8:28:59", "remaining_time": "0:44:41"}
+{"current_steps": 2871, "total_steps": 3122, "loss": 2.2068, "learning_rate": 9.785879546484077e-07, "epoch": 0.9194555644515613, "percentage": 91.96, "elapsed_time": "8:29:10", "remaining_time": "0:44:30"}
+{"current_steps": 2872, "total_steps": 3122, "loss": 2.2889, "learning_rate": 9.708567390746077e-07, "epoch": 0.9197758206565252, "percentage": 91.99, "elapsed_time": "8:29:20", "remaining_time": "0:44:20"}
+{"current_steps": 2873, "total_steps": 3122, "loss": 2.3926, "learning_rate": 9.631555797310122e-07, "epoch": 0.9200960768614892, "percentage": 92.02, "elapsed_time": "8:29:31", "remaining_time": "0:44:09"}
+{"current_steps": 2874, "total_steps": 3122, "loss": 2.2207, "learning_rate": 9.554844862504158e-07, "epoch": 0.9204163330664532, "percentage": 92.06, "elapsed_time": "8:29:41", "remaining_time": "0:43:58"}
+{"current_steps": 2875, "total_steps": 3122, "loss": 2.3968, "learning_rate": 9.47843468228013e-07, "epoch": 0.9207365892714171, "percentage": 92.09, "elapsed_time": "8:29:51", "remaining_time": "0:43:48"}
+{"current_steps": 2876, "total_steps": 3122, "loss": 2.2347, "learning_rate": 9.402325352213582e-07, "epoch": 0.9210568454763811, "percentage": 92.12, "elapsed_time": "8:30:02", "remaining_time": "0:43:37"}
+{"current_steps": 2877, "total_steps": 3122, "loss": 2.4828, "learning_rate": 9.326516967504056e-07, "epoch": 0.9213771016813451, "percentage": 92.15, "elapsed_time": "8:30:12", "remaining_time": "0:43:26"}
+{"current_steps": 2878, "total_steps": 3122, "loss": 2.2806, "learning_rate": 9.251009622974426e-07, "epoch": 0.921697357886309, "percentage": 92.18, "elapsed_time": "8:30:22", "remaining_time": "0:43:16"}
+{"current_steps": 2879, "total_steps": 3122, "loss": 2.2707, "learning_rate": 9.175803413071088e-07, "epoch": 0.922017614091273, "percentage": 92.22, "elapsed_time": "8:30:33", "remaining_time": "0:43:05"}
+{"current_steps": 2880, "total_steps": 3122, "loss": 1.9029, "learning_rate": 9.100898431863791e-07, "epoch": 0.922337870296237, "percentage": 92.25, "elapsed_time": "8:30:43", "remaining_time": "0:42:54"}
+{"current_steps": 2881, "total_steps": 3122, "loss": 1.0364, "learning_rate": 9.026294773045535e-07, "epoch": 0.9226581265012009, "percentage": 92.28, "elapsed_time": "8:30:53", "remaining_time": "0:42:44"}
+{"current_steps": 2882, "total_steps": 3122, "loss": 2.0725, "learning_rate": 8.95199252993223e-07, "epoch": 0.922978382706165, "percentage": 92.31, "elapsed_time": "8:31:04", "remaining_time": "0:42:33"}
+{"current_steps": 2883, "total_steps": 3122, "loss": 2.2058, "learning_rate": 8.877991795463086e-07, "epoch": 0.923298638911129, "percentage": 92.34, "elapsed_time": "8:31:14", "remaining_time": "0:42:22"}
+{"current_steps": 2884, "total_steps": 3122, "loss": 2.1161, "learning_rate": 8.804292662199842e-07, "epoch": 0.9236188951160929, "percentage": 92.38, "elapsed_time": "8:31:25", "remaining_time": "0:42:12"}
+{"current_steps": 2885, "total_steps": 3122, "loss": 2.715, "learning_rate": 8.730895222327284e-07, "epoch": 0.9239391513210569, "percentage": 92.41, "elapsed_time": "8:31:35", "remaining_time": "0:42:01"}
+{"current_steps": 2886, "total_steps": 3122, "loss": 1.7732, "learning_rate": 8.657799567652614e-07, "epoch": 0.9242594075260209, "percentage": 92.44, "elapsed_time": "8:31:45", "remaining_time": "0:41:50"}
+{"current_steps": 2887, "total_steps": 3122, "loss": 2.3266, "learning_rate": 8.585005789605638e-07, "epoch": 0.9245796637309848, "percentage": 92.47, "elapsed_time": "8:31:56", "remaining_time": "0:41:40"}
+{"current_steps": 2888, "total_steps": 3122, "loss": 2.277, "learning_rate": 8.512513979238579e-07, "epoch": 0.9248999199359488, "percentage": 92.5, "elapsed_time": "8:32:06", "remaining_time": "0:41:29"}
+{"current_steps": 2889, "total_steps": 3122, "loss": 2.2216, "learning_rate": 8.440324227225959e-07, "epoch": 0.9252201761409127, "percentage": 92.54, "elapsed_time": "8:32:16", "remaining_time": "0:41:18"}
+{"current_steps": 2890, "total_steps": 3122, "loss": 2.1062, "learning_rate": 8.368436623864384e-07, "epoch": 0.9255404323458767, "percentage": 92.57, "elapsed_time": "8:32:27", "remaining_time": "0:41:08"}
+{"current_steps": 2891, "total_steps": 3122, "loss": 2.6251, "learning_rate": 8.296851259072702e-07, "epoch": 0.9258606885508407, "percentage": 92.6, "elapsed_time": "8:32:37", "remaining_time": "0:40:57"}
+{"current_steps": 2892, "total_steps": 3122, "loss": 3.0058, "learning_rate": 8.225568222391539e-07, "epoch": 0.9261809447558046, "percentage": 92.63, "elapsed_time": "8:32:47", "remaining_time": "0:40:46"}
+{"current_steps": 2893, "total_steps": 3122, "loss": 2.0105, "learning_rate": 8.154587602983432e-07, "epoch": 0.9265012009607686, "percentage": 92.66, "elapsed_time": "8:32:58", "remaining_time": "0:40:36"}
+{"current_steps": 2894, "total_steps": 3122, "loss": 2.0824, "learning_rate": 8.08390948963264e-07, "epoch": 0.9268214571657326, "percentage": 92.7, "elapsed_time": "8:33:08", "remaining_time": "0:40:25"}
+{"current_steps": 2895, "total_steps": 3122, "loss": 2.2465, "learning_rate": 8.013533970745113e-07, "epoch": 0.9271417133706965, "percentage": 92.73, "elapsed_time": "8:33:19", "remaining_time": "0:40:14"}
+{"current_steps": 2896, "total_steps": 3122, "loss": 2.2219, "learning_rate": 7.943461134348129e-07, "epoch": 0.9274619695756605, "percentage": 92.76, "elapsed_time": "8:33:29", "remaining_time": "0:40:04"}
+{"current_steps": 2897, "total_steps": 3122, "loss": 2.332, "learning_rate": 7.873691068090605e-07, "epoch": 0.9277822257806245, "percentage": 92.79, "elapsed_time": "8:33:39", "remaining_time": "0:39:53"}
+{"current_steps": 2898, "total_steps": 3122, "loss": 2.7178, "learning_rate": 7.804223859242482e-07, "epoch": 0.9281024819855884, "percentage": 92.83, "elapsed_time": "8:33:50", "remaining_time": "0:39:43"}
+{"current_steps": 2899, "total_steps": 3122, "loss": 1.4854, "learning_rate": 7.735059594695171e-07, "epoch": 0.9284227381905524, "percentage": 92.86, "elapsed_time": "8:34:00", "remaining_time": "0:39:32"}
+{"current_steps": 2900, "total_steps": 3122, "loss": 2.2354, "learning_rate": 7.666198360960858e-07, "epoch": 0.9287429943955164, "percentage": 92.89, "elapsed_time": "8:34:10", "remaining_time": "0:39:21"}
+{"current_steps": 2901, "total_steps": 3122, "loss": 1.8512, "learning_rate": 7.597640244172921e-07, "epoch": 0.9290632506004803, "percentage": 92.92, "elapsed_time": "8:34:50", "remaining_time": "0:39:13"}
+{"current_steps": 2902, "total_steps": 3122, "loss": 1.8892, "learning_rate": 7.529385330085431e-07, "epoch": 0.9293835068054443, "percentage": 92.95, "elapsed_time": "8:35:01", "remaining_time": "0:39:02"}
+{"current_steps": 2903, "total_steps": 3122, "loss": 2.5126, "learning_rate": 7.461433704073373e-07, "epoch": 0.9297037630104084, "percentage": 92.99, "elapsed_time": "8:35:11", "remaining_time": "0:38:51"}
+{"current_steps": 2904, "total_steps": 3122, "loss": 2.1277, "learning_rate": 7.393785451132146e-07, "epoch": 0.9300240192153723, "percentage": 93.02, "elapsed_time": "8:35:22", "remaining_time": "0:38:41"}
+{"current_steps": 2905, "total_steps": 3122, "loss": 2.4802, "learning_rate": 7.326440655877925e-07, "epoch": 0.9303442754203363, "percentage": 93.05, "elapsed_time": "8:35:32", "remaining_time": "0:38:30"}
+{"current_steps": 2906, "total_steps": 3122, "loss": 2.1335, "learning_rate": 7.259399402547134e-07, "epoch": 0.9306645316253003, "percentage": 93.08, "elapsed_time": "8:35:42", "remaining_time": "0:38:19"}
+{"current_steps": 2907, "total_steps": 3122, "loss": 2.5345, "learning_rate": 7.192661774996584e-07, "epoch": 0.9309847878302642, "percentage": 93.11, "elapsed_time": "8:35:53", "remaining_time": "0:38:09"}
+{"current_steps": 2908, "total_steps": 3122, "loss": 2.3705, "learning_rate": 7.126227856703332e-07, "epoch": 0.9313050440352282, "percentage": 93.15, "elapsed_time": "8:36:03", "remaining_time": "0:37:58"}
+{"current_steps": 2909, "total_steps": 3122, "loss": 2.6065, "learning_rate": 7.060097730764548e-07, "epoch": 0.9316253002401922, "percentage": 93.18, "elapsed_time": "8:36:14", "remaining_time": "0:37:47"}
+{"current_steps": 2910, "total_steps": 3122, "loss": 2.1943, "learning_rate": 6.994271479897314e-07, "epoch": 0.9319455564451561, "percentage": 93.21, "elapsed_time": "8:36:24", "remaining_time": "0:37:37"}
+{"current_steps": 2911, "total_steps": 3122, "loss": 1.9554, "learning_rate": 6.928749186438738e-07, "epoch": 0.9322658126501201, "percentage": 93.24, "elapsed_time": "8:36:35", "remaining_time": "0:37:26"}
+{"current_steps": 2912, "total_steps": 3122, "loss": 2.3002, "learning_rate": 6.863530932345625e-07, "epoch": 0.9325860688550841, "percentage": 93.27, "elapsed_time": "8:36:45", "remaining_time": "0:37:15"}
+{"current_steps": 2913, "total_steps": 3122, "loss": 2.4129, "learning_rate": 6.798616799194634e-07, "epoch": 0.932906325060048, "percentage": 93.31, "elapsed_time": "8:36:55", "remaining_time": "0:37:05"}
+{"current_steps": 2914, "total_steps": 3122, "loss": 2.1435, "learning_rate": 6.734006868181847e-07, "epoch": 0.933226581265012, "percentage": 93.34, "elapsed_time": "8:37:06", "remaining_time": "0:36:54"}
+{"current_steps": 2915, "total_steps": 3122, "loss": 1.9209, "learning_rate": 6.66970122012292e-07, "epoch": 0.933546837469976, "percentage": 93.37, "elapsed_time": "8:37:16", "remaining_time": "0:36:43"}
+{"current_steps": 2916, "total_steps": 3122, "loss": 2.4338, "learning_rate": 6.605699935452902e-07, "epoch": 0.9338670936749399, "percentage": 93.4, "elapsed_time": "8:37:27", "remaining_time": "0:36:33"}
+{"current_steps": 2917, "total_steps": 3122, "loss": 2.2675, "learning_rate": 6.542003094226201e-07, "epoch": 0.9341873498799039, "percentage": 93.43, "elapsed_time": "8:37:37", "remaining_time": "0:36:22"}
+{"current_steps": 2918, "total_steps": 3122, "loss": 1.4878, "learning_rate": 6.478610776116278e-07, "epoch": 0.9345076060848679, "percentage": 93.47, "elapsed_time": "8:37:47", "remaining_time": "0:36:11"}
+{"current_steps": 2919, "total_steps": 3122, "loss": 2.2072, "learning_rate": 6.415523060415846e-07, "epoch": 0.9348278622898318, "percentage": 93.5, "elapsed_time": "8:37:58", "remaining_time": "0:36:01"}
+{"current_steps": 2920, "total_steps": 3122, "loss": 2.3663, "learning_rate": 6.352740026036475e-07, "epoch": 0.9351481184947958, "percentage": 93.53, "elapsed_time": "8:38:08", "remaining_time": "0:35:50"}
+{"current_steps": 2921, "total_steps": 3122, "loss": 2.3013, "learning_rate": 6.290261751508708e-07, "epoch": 0.9354683746997599, "percentage": 93.56, "elapsed_time": "8:38:18", "remaining_time": "0:35:39"}
+{"current_steps": 2922, "total_steps": 3122, "loss": 2.0383, "learning_rate": 6.228088314981867e-07, "epoch": 0.9357886309047238, "percentage": 93.59, "elapsed_time": "8:38:29", "remaining_time": "0:35:29"}
+{"current_steps": 2923, "total_steps": 3122, "loss": 1.8135, "learning_rate": 6.16621979422402e-07, "epoch": 0.9361088871096878, "percentage": 93.63, "elapsed_time": "8:38:39", "remaining_time": "0:35:18"}
+{"current_steps": 2924, "total_steps": 3122, "loss": 2.2271, "learning_rate": 6.104656266621766e-07, "epoch": 0.9364291433146518, "percentage": 93.66, "elapsed_time": "8:38:49", "remaining_time": "0:35:07"}
+{"current_steps": 2925, "total_steps": 3122, "loss": 2.2725, "learning_rate": 6.043397809180257e-07, "epoch": 0.9367493995196157, "percentage": 93.69, "elapsed_time": "8:39:00", "remaining_time": "0:34:57"}
+{"current_steps": 2926, "total_steps": 3122, "loss": 2.1763, "learning_rate": 5.982444498523005e-07, "epoch": 0.9370696557245797, "percentage": 93.72, "elapsed_time": "8:39:10", "remaining_time": "0:34:46"}
+{"current_steps": 2927, "total_steps": 3122, "loss": 2.3399, "learning_rate": 5.921796410891994e-07, "epoch": 0.9373899119295437, "percentage": 93.75, "elapsed_time": "8:39:20", "remaining_time": "0:34:35"}
+{"current_steps": 2928, "total_steps": 3122, "loss": 1.8565, "learning_rate": 5.861453622147157e-07, "epoch": 0.9377101681345076, "percentage": 93.79, "elapsed_time": "8:39:31", "remaining_time": "0:34:25"}
+{"current_steps": 2929, "total_steps": 3122, "loss": 2.3172, "learning_rate": 5.801416207766808e-07, "epoch": 0.9380304243394716, "percentage": 93.82, "elapsed_time": "8:39:41", "remaining_time": "0:34:14"}
+{"current_steps": 2930, "total_steps": 3122, "loss": 1.864, "learning_rate": 5.741684242847156e-07, "epoch": 0.9383506805444356, "percentage": 93.85, "elapsed_time": "8:39:52", "remaining_time": "0:34:03"}
+{"current_steps": 2931, "total_steps": 3122, "loss": 2.4591, "learning_rate": 5.682257802102408e-07, "epoch": 0.9386709367493995, "percentage": 93.88, "elapsed_time": "8:40:02", "remaining_time": "0:33:53"}
+{"current_steps": 2932, "total_steps": 3122, "loss": 2.759, "learning_rate": 5.623136959864494e-07, "epoch": 0.9389911929543635, "percentage": 93.91, "elapsed_time": "8:40:12", "remaining_time": "0:33:42"}
+{"current_steps": 2933, "total_steps": 3122, "loss": 1.5265, "learning_rate": 5.564321790083316e-07, "epoch": 0.9393114491593275, "percentage": 93.95, "elapsed_time": "8:40:23", "remaining_time": "0:33:31"}
+{"current_steps": 2934, "total_steps": 3122, "loss": 2.2601, "learning_rate": 5.505812366326219e-07, "epoch": 0.9396317053642914, "percentage": 93.98, "elapsed_time": "8:40:33", "remaining_time": "0:33:21"}
+{"current_steps": 2935, "total_steps": 3122, "loss": 1.9696, "learning_rate": 5.447608761778189e-07, "epoch": 0.9399519615692554, "percentage": 94.01, "elapsed_time": "8:40:43", "remaining_time": "0:33:10"}
+{"current_steps": 2936, "total_steps": 3122, "loss": 2.2893, "learning_rate": 5.389711049241741e-07, "epoch": 0.9402722177742193, "percentage": 94.04, "elapsed_time": "8:40:54", "remaining_time": "0:32:59"}
+{"current_steps": 2937, "total_steps": 3122, "loss": 2.2355, "learning_rate": 5.332119301136695e-07, "epoch": 0.9405924739791833, "percentage": 94.07, "elapsed_time": "8:41:04", "remaining_time": "0:32:49"}
+{"current_steps": 2938, "total_steps": 3122, "loss": 2.0032, "learning_rate": 5.274833589500205e-07, "epoch": 0.9409127301841473, "percentage": 94.11, "elapsed_time": "8:41:14", "remaining_time": "0:32:38"}
+{"current_steps": 2939, "total_steps": 3122, "loss": 2.6002, "learning_rate": 5.217853985986648e-07, "epoch": 0.9412329863891112, "percentage": 94.14, "elapsed_time": "8:41:25", "remaining_time": "0:32:28"}
+{"current_steps": 2940, "total_steps": 3122, "loss": 2.2874, "learning_rate": 5.161180561867401e-07, "epoch": 0.9415532425940752, "percentage": 94.17, "elapsed_time": "8:41:35", "remaining_time": "0:32:17"}
+{"current_steps": 2941, "total_steps": 3122, "loss": 2.5509, "learning_rate": 5.104813388031038e-07, "epoch": 0.9418734987990393, "percentage": 94.2, "elapsed_time": "8:41:45", "remaining_time": "0:32:06"}
+{"current_steps": 2942, "total_steps": 3122, "loss": 2.1587, "learning_rate": 5.048752534982909e-07, "epoch": 0.9421937550040032, "percentage": 94.23, "elapsed_time": "8:41:56", "remaining_time": "0:31:56"}
+{"current_steps": 2943, "total_steps": 3122, "loss": 2.4545, "learning_rate": 4.992998072845311e-07, "epoch": 0.9425140112089672, "percentage": 94.27, "elapsed_time": "8:42:06", "remaining_time": "0:31:45"}
+{"current_steps": 2944, "total_steps": 3122, "loss": 1.585, "learning_rate": 4.937550071357239e-07, "epoch": 0.9428342674139312, "percentage": 94.3, "elapsed_time": "8:42:17", "remaining_time": "0:31:34"}
+{"current_steps": 2945, "total_steps": 3122, "loss": 2.0142, "learning_rate": 4.882408599874433e-07, "epoch": 0.9431545236188951, "percentage": 94.33, "elapsed_time": "8:42:27", "remaining_time": "0:31:24"}
+{"current_steps": 2946, "total_steps": 3122, "loss": 2.179, "learning_rate": 4.827573727369112e-07, "epoch": 0.9434747798238591, "percentage": 94.36, "elapsed_time": "8:42:37", "remaining_time": "0:31:13"}
+{"current_steps": 2947, "total_steps": 3122, "loss": 2.4145, "learning_rate": 4.773045522430103e-07, "epoch": 0.9437950360288231, "percentage": 94.39, "elapsed_time": "8:42:48", "remaining_time": "0:31:02"}
+{"current_steps": 2948, "total_steps": 3122, "loss": 2.4136, "learning_rate": 4.7188240532625714e-07, "epoch": 0.944115292233787, "percentage": 94.43, "elapsed_time": "8:42:58", "remaining_time": "0:30:52"}
+{"current_steps": 2949, "total_steps": 3122, "loss": 1.7031, "learning_rate": 4.664909387688043e-07, "epoch": 0.944435548438751, "percentage": 94.46, "elapsed_time": "8:43:08", "remaining_time": "0:30:41"}
+{"current_steps": 2950, "total_steps": 3122, "loss": 2.3827, "learning_rate": 4.6113015931442683e-07, "epoch": 0.944755804643715, "percentage": 94.49, "elapsed_time": "8:43:19", "remaining_time": "0:30:30"}
+{"current_steps": 2951, "total_steps": 3122, "loss": 2.4576, "learning_rate": 4.558000736685164e-07, "epoch": 0.9450760608486789, "percentage": 94.52, "elapsed_time": "8:43:29", "remaining_time": "0:30:20"}
+{"current_steps": 2952, "total_steps": 3122, "loss": 2.6722, "learning_rate": 4.5050068849807334e-07, "epoch": 0.9453963170536429, "percentage": 94.55, "elapsed_time": "8:43:39", "remaining_time": "0:30:09"}
+{"current_steps": 2953, "total_steps": 3122, "loss": 2.5232, "learning_rate": 4.4523201043169813e-07, "epoch": 0.9457165732586069, "percentage": 94.59, "elapsed_time": "8:43:50", "remaining_time": "0:29:58"}
+{"current_steps": 2954, "total_steps": 3122, "loss": 2.327, "learning_rate": 4.3999404605957196e-07, "epoch": 0.9460368294635708, "percentage": 94.62, "elapsed_time": "8:44:00", "remaining_time": "0:29:48"}
+{"current_steps": 2955, "total_steps": 3122, "loss": 2.152, "learning_rate": 4.347868019334789e-07, "epoch": 0.9463570856685348, "percentage": 94.65, "elapsed_time": "8:44:11", "remaining_time": "0:29:37"}
+{"current_steps": 2956, "total_steps": 3122, "loss": 2.3246, "learning_rate": 4.296102845667532e-07, "epoch": 0.9466773418734988, "percentage": 94.68, "elapsed_time": "8:44:21", "remaining_time": "0:29:26"}
+{"current_steps": 2957, "total_steps": 3122, "loss": 2.4348, "learning_rate": 4.244645004343156e-07, "epoch": 0.9469975980784627, "percentage": 94.71, "elapsed_time": "8:44:31", "remaining_time": "0:29:16"}
+{"current_steps": 2958, "total_steps": 3122, "loss": 2.3624, "learning_rate": 4.193494559726313e-07, "epoch": 0.9473178542834267, "percentage": 94.75, "elapsed_time": "8:44:42", "remaining_time": "0:29:05"}
+{"current_steps": 2959, "total_steps": 3122, "loss": 2.3969, "learning_rate": 4.1426515757972684e-07, "epoch": 0.9476381104883908, "percentage": 94.78, "elapsed_time": "8:44:52", "remaining_time": "0:28:54"}
+{"current_steps": 2960, "total_steps": 3122, "loss": 2.1616, "learning_rate": 4.0921161161515674e-07, "epoch": 0.9479583666933546, "percentage": 94.81, "elapsed_time": "8:45:02", "remaining_time": "0:28:44"}
+{"current_steps": 2961, "total_steps": 3122, "loss": 1.9173, "learning_rate": 4.041888244000286e-07, "epoch": 0.9482786228983187, "percentage": 94.84, "elapsed_time": "8:45:13", "remaining_time": "0:28:33"}
+{"current_steps": 2962, "total_steps": 3122, "loss": 2.3724, "learning_rate": 3.991968022169529e-07, "epoch": 0.9485988791032827, "percentage": 94.88, "elapsed_time": "8:45:23", "remaining_time": "0:28:22"}
+{"current_steps": 2963, "total_steps": 3122, "loss": 2.1529, "learning_rate": 3.9423555131007925e-07, "epoch": 0.9489191353082466, "percentage": 94.91, "elapsed_time": "8:45:33", "remaining_time": "0:28:12"}
+{"current_steps": 2964, "total_steps": 3122, "loss": 2.1868, "learning_rate": 3.8930507788506046e-07, "epoch": 0.9492393915132106, "percentage": 94.94, "elapsed_time": "8:45:44", "remaining_time": "0:28:01"}
+{"current_steps": 2965, "total_steps": 3122, "loss": 1.8231, "learning_rate": 3.8440538810904367e-07, "epoch": 0.9495596477181746, "percentage": 94.97, "elapsed_time": "8:45:54", "remaining_time": "0:27:50"}
+{"current_steps": 2966, "total_steps": 3122, "loss": 2.235, "learning_rate": 3.7953648811068777e-07, "epoch": 0.9498799039231385, "percentage": 95.0, "elapsed_time": "8:46:05", "remaining_time": "0:27:40"}
+{"current_steps": 2967, "total_steps": 3122, "loss": 2.3122, "learning_rate": 3.746983839801238e-07, "epoch": 0.9502001601281025, "percentage": 95.04, "elapsed_time": "8:46:15", "remaining_time": "0:27:29"}
+{"current_steps": 2968, "total_steps": 3122, "loss": 2.4373, "learning_rate": 3.698910817689694e-07, "epoch": 0.9505204163330665, "percentage": 95.07, "elapsed_time": "8:46:25", "remaining_time": "0:27:18"}
+{"current_steps": 2969, "total_steps": 3122, "loss": 1.7601, "learning_rate": 3.6511458749031723e-07, "epoch": 0.9508406725380304, "percentage": 95.1, "elapsed_time": "8:46:36", "remaining_time": "0:27:08"}
+{"current_steps": 2970, "total_steps": 3122, "loss": 2.7486, "learning_rate": 3.6036890711871886e-07, "epoch": 0.9511609287429944, "percentage": 95.13, "elapsed_time": "8:46:46", "remaining_time": "0:26:57"}
+{"current_steps": 2971, "total_steps": 3122, "loss": 2.1883, "learning_rate": 3.556540465901842e-07, "epoch": 0.9514811849479584, "percentage": 95.16, "elapsed_time": "8:46:56", "remaining_time": "0:26:46"}
+{"current_steps": 2972, "total_steps": 3122, "loss": 2.4816, "learning_rate": 3.509700118021736e-07, "epoch": 0.9518014411529223, "percentage": 95.2, "elapsed_time": "8:47:07", "remaining_time": "0:26:36"}
+{"current_steps": 2973, "total_steps": 3122, "loss": 2.3101, "learning_rate": 3.463168086135976e-07, "epoch": 0.9521216973578863, "percentage": 95.23, "elapsed_time": "8:47:17", "remaining_time": "0:26:25"}
+{"current_steps": 2974, "total_steps": 3122, "loss": 2.7864, "learning_rate": 3.416944428447838e-07, "epoch": 0.9524419535628503, "percentage": 95.26, "elapsed_time": "8:47:27", "remaining_time": "0:26:14"}
+{"current_steps": 2975, "total_steps": 3122, "loss": 2.1871, "learning_rate": 3.3710292027750724e-07, "epoch": 0.9527622097678142, "percentage": 95.29, "elapsed_time": "8:47:38", "remaining_time": "0:26:04"}
+{"current_steps": 2976, "total_steps": 3122, "loss": 2.508, "learning_rate": 3.3254224665494883e-07, "epoch": 0.9530824659727782, "percentage": 95.32, "elapsed_time": "8:47:48", "remaining_time": "0:25:53"}
+{"current_steps": 2977, "total_steps": 3122, "loss": 1.6672, "learning_rate": 3.2801242768171483e-07, "epoch": 0.9534027221777422, "percentage": 95.36, "elapsed_time": "8:47:59", "remaining_time": "0:25:42"}
+{"current_steps": 2978, "total_steps": 3122, "loss": 2.5607, "learning_rate": 3.235134690238062e-07, "epoch": 0.9537229783827061, "percentage": 95.39, "elapsed_time": "8:48:09", "remaining_time": "0:25:32"}
+{"current_steps": 2979, "total_steps": 3122, "loss": 2.4434, "learning_rate": 3.1904537630862984e-07, "epoch": 0.9540432345876702, "percentage": 95.42, "elapsed_time": "8:48:19", "remaining_time": "0:25:21"}
+{"current_steps": 2980, "total_steps": 3122, "loss": 2.1326, "learning_rate": 3.146081551249874e-07, "epoch": 0.9543634907926342, "percentage": 95.45, "elapsed_time": "8:48:30", "remaining_time": "0:25:11"}
+{"current_steps": 2981, "total_steps": 3122, "loss": 2.3844, "learning_rate": 3.102018110230587e-07, "epoch": 0.9546837469975981, "percentage": 95.48, "elapsed_time": "8:48:40", "remaining_time": "0:25:00"}
+{"current_steps": 2982, "total_steps": 3122, "loss": 2.5421, "learning_rate": 3.058263495144015e-07, "epoch": 0.9550040032025621, "percentage": 95.52, "elapsed_time": "8:48:50", "remaining_time": "0:24:49"}
+{"current_steps": 2983, "total_steps": 3122, "loss": 1.6864, "learning_rate": 3.014817760719546e-07, "epoch": 0.955324259407526, "percentage": 95.55, "elapsed_time": "8:49:01", "remaining_time": "0:24:39"}
+{"current_steps": 2984, "total_steps": 3122, "loss": 2.5311, "learning_rate": 2.971680961300127e-07, "epoch": 0.95564451561249, "percentage": 95.58, "elapsed_time": "8:49:11", "remaining_time": "0:24:28"}
+{"current_steps": 2985, "total_steps": 3122, "loss": 2.2674, "learning_rate": 2.9288531508422644e-07, "epoch": 0.955964771817454, "percentage": 95.61, "elapsed_time": "8:49:22", "remaining_time": "0:24:17"}
+{"current_steps": 2986, "total_steps": 3122, "loss": 2.4979, "learning_rate": 2.886334382916078e-07, "epoch": 0.9562850280224179, "percentage": 95.64, "elapsed_time": "8:49:32", "remaining_time": "0:24:07"}
+{"current_steps": 2987, "total_steps": 3122, "loss": 2.3117, "learning_rate": 2.8441247107050264e-07, "epoch": 0.9566052842273819, "percentage": 95.68, "elapsed_time": "8:49:42", "remaining_time": "0:23:56"}
+{"current_steps": 2988, "total_steps": 3122, "loss": 2.069, "learning_rate": 2.802224187005986e-07, "epoch": 0.9569255404323459, "percentage": 95.71, "elapsed_time": "8:49:53", "remaining_time": "0:23:45"}
+{"current_steps": 2989, "total_steps": 3122, "loss": 2.3921, "learning_rate": 2.7606328642291736e-07, "epoch": 0.9572457966373098, "percentage": 95.74, "elapsed_time": "8:50:03", "remaining_time": "0:23:35"}
+{"current_steps": 2990, "total_steps": 3122, "loss": 2.7724, "learning_rate": 2.7193507943979457e-07, "epoch": 0.9575660528422738, "percentage": 95.77, "elapsed_time": "8:50:13", "remaining_time": "0:23:24"}
+{"current_steps": 2991, "total_steps": 3122, "loss": 2.1656, "learning_rate": 2.678378029148998e-07, "epoch": 0.9578863090472378, "percentage": 95.8, "elapsed_time": "8:50:24", "remaining_time": "0:23:13"}
+{"current_steps": 2992, "total_steps": 3122, "loss": 2.1326, "learning_rate": 2.6377146197319733e-07, "epoch": 0.9582065652522017, "percentage": 95.84, "elapsed_time": "8:50:34", "remaining_time": "0:23:03"}
+{"current_steps": 2993, "total_steps": 3122, "loss": 2.2594, "learning_rate": 2.5973606170096585e-07, "epoch": 0.9585268214571657, "percentage": 95.87, "elapsed_time": "8:50:44", "remaining_time": "0:22:52"}
+{"current_steps": 2994, "total_steps": 3122, "loss": 2.2226, "learning_rate": 2.5573160714578436e-07, "epoch": 0.9588470776621297, "percentage": 95.9, "elapsed_time": "8:50:55", "remaining_time": "0:22:41"}
+{"current_steps": 2995, "total_steps": 3122, "loss": 2.1275, "learning_rate": 2.517581033165184e-07, "epoch": 0.9591673338670936, "percentage": 95.93, "elapsed_time": "8:51:05", "remaining_time": "0:22:31"}
+{"current_steps": 2996, "total_steps": 3122, "loss": 2.3456, "learning_rate": 2.4781555518332e-07, "epoch": 0.9594875900720576, "percentage": 95.96, "elapsed_time": "8:51:16", "remaining_time": "0:22:20"}
+{"current_steps": 2997, "total_steps": 3122, "loss": 2.5249, "learning_rate": 2.439039676776306e-07, "epoch": 0.9598078462770216, "percentage": 96.0, "elapsed_time": "8:51:26", "remaining_time": "0:22:09"}
+{"current_steps": 2998, "total_steps": 3122, "loss": 1.8815, "learning_rate": 2.4002334569215023e-07, "epoch": 0.9601281024819855, "percentage": 96.03, "elapsed_time": "8:51:36", "remaining_time": "0:21:59"}
+{"current_steps": 2999, "total_steps": 3122, "loss": 2.5048, "learning_rate": 2.3617369408085732e-07, "epoch": 0.9604483586869496, "percentage": 96.06, "elapsed_time": "8:51:47", "remaining_time": "0:21:48"}
+{"current_steps": 3000, "total_steps": 3122, "loss": 2.205, "learning_rate": 2.3235501765898615e-07, "epoch": 0.9607686148919136, "percentage": 96.09, "elapsed_time": "8:51:57", "remaining_time": "0:21:37"}
+{"current_steps": 3001, "total_steps": 3122, "loss": 2.0211, "learning_rate": 2.285673212030326e-07, "epoch": 0.9610888710968775, "percentage": 96.12, "elapsed_time": "8:52:34", "remaining_time": "0:21:28"}
+{"current_steps": 3002, "total_steps": 3122, "loss": 2.1957, "learning_rate": 2.2481060945073738e-07, "epoch": 0.9614091273018415, "percentage": 96.16, "elapsed_time": "8:52:44", "remaining_time": "0:21:17"}
+{"current_steps": 3003, "total_steps": 3122, "loss": 2.2572, "learning_rate": 2.21084887101089e-07, "epoch": 0.9617293835068055, "percentage": 96.19, "elapsed_time": "8:52:55", "remaining_time": "0:21:07"}
+{"current_steps": 3004, "total_steps": 3122, "loss": 2.4002, "learning_rate": 2.1739015881430125e-07, "epoch": 0.9620496397117694, "percentage": 96.22, "elapsed_time": "8:53:05", "remaining_time": "0:20:56"}
+{"current_steps": 3005, "total_steps": 3122, "loss": 1.8485, "learning_rate": 2.137264292118385e-07, "epoch": 0.9623698959167334, "percentage": 96.25, "elapsed_time": "8:53:16", "remaining_time": "0:20:45"}
+{"current_steps": 3006, "total_steps": 3122, "loss": 2.4418, "learning_rate": 2.1009370287637664e-07, "epoch": 0.9626901521216974, "percentage": 96.28, "elapsed_time": "8:53:26", "remaining_time": "0:20:35"}
+{"current_steps": 3007, "total_steps": 3122, "loss": 2.4171, "learning_rate": 2.0649198435181983e-07, "epoch": 0.9630104083266613, "percentage": 96.32, "elapsed_time": "8:53:36", "remaining_time": "0:20:24"}
+{"current_steps": 3008, "total_steps": 3122, "loss": 2.5708, "learning_rate": 2.02921278143281e-07, "epoch": 0.9633306645316253, "percentage": 96.35, "elapsed_time": "8:53:47", "remaining_time": "0:20:13"}
+{"current_steps": 3009, "total_steps": 3122, "loss": 2.2956, "learning_rate": 1.99381588717093e-07, "epoch": 0.9636509207365893, "percentage": 96.38, "elapsed_time": "8:53:57", "remaining_time": "0:20:03"}
+{"current_steps": 3010, "total_steps": 3122, "loss": 2.6983, "learning_rate": 1.9587292050077255e-07, "epoch": 0.9639711769415532, "percentage": 96.41, "elapsed_time": "8:54:08", "remaining_time": "0:19:52"}
+{"current_steps": 3011, "total_steps": 3122, "loss": 2.1624, "learning_rate": 1.9239527788305622e-07, "epoch": 0.9642914331465172, "percentage": 96.44, "elapsed_time": "8:54:18", "remaining_time": "0:19:41"}
+{"current_steps": 3012, "total_steps": 3122, "loss": 1.8433, "learning_rate": 1.889486652138589e-07, "epoch": 0.9646116893514812, "percentage": 96.48, "elapsed_time": "8:54:29", "remaining_time": "0:19:31"}
+{"current_steps": 3013, "total_steps": 3122, "loss": 2.5753, "learning_rate": 1.855330868042876e-07, "epoch": 0.9649319455564451, "percentage": 96.51, "elapsed_time": "8:54:39", "remaining_time": "0:19:20"}
+{"current_steps": 3014, "total_steps": 3122, "loss": 1.9499, "learning_rate": 1.8214854692662765e-07, "epoch": 0.9652522017614091, "percentage": 96.54, "elapsed_time": "8:54:49", "remaining_time": "0:19:09"}
+{"current_steps": 3015, "total_steps": 3122, "loss": 1.9731, "learning_rate": 1.7879504981434536e-07, "epoch": 0.9655724579663731, "percentage": 96.57, "elapsed_time": "8:55:00", "remaining_time": "0:18:59"}
+{"current_steps": 3016, "total_steps": 3122, "loss": 2.0553, "learning_rate": 1.7547259966207708e-07, "epoch": 0.965892714171337, "percentage": 96.6, "elapsed_time": "8:55:10", "remaining_time": "0:18:48"}
+{"current_steps": 3017, "total_steps": 3122, "loss": 2.3178, "learning_rate": 1.7218120062562071e-07, "epoch": 0.966212970376301, "percentage": 96.64, "elapsed_time": "8:55:21", "remaining_time": "0:18:37"}
+{"current_steps": 3018, "total_steps": 3122, "loss": 1.948, "learning_rate": 1.6892085682193583e-07, "epoch": 0.9665332265812651, "percentage": 96.67, "elapsed_time": "8:55:31", "remaining_time": "0:18:27"}
+{"current_steps": 3019, "total_steps": 3122, "loss": 2.2639, "learning_rate": 1.6569157232914079e-07, "epoch": 0.966853482786229, "percentage": 96.7, "elapsed_time": "8:55:41", "remaining_time": "0:18:16"}
+{"current_steps": 3020, "total_steps": 3122, "loss": 2.1195, "learning_rate": 1.6249335118650456e-07, "epoch": 0.967173738991193, "percentage": 96.73, "elapsed_time": "8:55:52", "remaining_time": "0:18:05"}
+{"current_steps": 3021, "total_steps": 3122, "loss": 2.0017, "learning_rate": 1.5932619739443543e-07, "epoch": 0.967493995196157, "percentage": 96.76, "elapsed_time": "8:56:02", "remaining_time": "0:17:55"}
+{"current_steps": 3022, "total_steps": 3122, "loss": 1.485, "learning_rate": 1.5619011491448677e-07, "epoch": 0.9678142514011209, "percentage": 96.8, "elapsed_time": "8:56:12", "remaining_time": "0:17:44"}
+{"current_steps": 3023, "total_steps": 3122, "loss": 2.2819, "learning_rate": 1.5308510766934848e-07, "epoch": 0.9681345076060849, "percentage": 96.83, "elapsed_time": "8:56:23", "remaining_time": "0:17:33"}
+{"current_steps": 3024, "total_steps": 3122, "loss": 1.7135, "learning_rate": 1.5001117954283329e-07, "epoch": 0.9684547638110489, "percentage": 96.86, "elapsed_time": "8:56:33", "remaining_time": "0:17:23"}
+{"current_steps": 3025, "total_steps": 3122, "loss": 2.3383, "learning_rate": 1.4696833437988778e-07, "epoch": 0.9687750200160128, "percentage": 96.89, "elapsed_time": "8:56:43", "remaining_time": "0:17:12"}
+{"current_steps": 3026, "total_steps": 3122, "loss": 1.7648, "learning_rate": 1.4395657598657296e-07, "epoch": 0.9690952762209768, "percentage": 96.93, "elapsed_time": "8:56:54", "remaining_time": "0:17:02"}
+{"current_steps": 3027, "total_steps": 3122, "loss": 2.0177, "learning_rate": 1.4097590813007545e-07, "epoch": 0.9694155324259408, "percentage": 96.96, "elapsed_time": "8:57:04", "remaining_time": "0:16:51"}
+{"current_steps": 3028, "total_steps": 3122, "loss": 1.8389, "learning_rate": 1.380263345386795e-07, "epoch": 0.9697357886309047, "percentage": 96.99, "elapsed_time": "8:57:15", "remaining_time": "0:16:40"}
+{"current_steps": 3029, "total_steps": 3122, "loss": 2.0451, "learning_rate": 1.35107858901784e-07, "epoch": 0.9700560448358687, "percentage": 97.02, "elapsed_time": "8:57:25", "remaining_time": "0:16:30"}
+{"current_steps": 3030, "total_steps": 3122, "loss": 2.4008, "learning_rate": 1.3222048486989102e-07, "epoch": 0.9703763010408326, "percentage": 97.05, "elapsed_time": "8:57:35", "remaining_time": "0:16:19"}
+{"current_steps": 3031, "total_steps": 3122, "loss": 2.2855, "learning_rate": 1.2936421605459494e-07, "epoch": 0.9706965572457966, "percentage": 97.09, "elapsed_time": "8:57:46", "remaining_time": "0:16:08"}
+{"current_steps": 3032, "total_steps": 3122, "loss": 2.2895, "learning_rate": 1.2653905602858507e-07, "epoch": 0.9710168134507606, "percentage": 97.12, "elapsed_time": "8:57:56", "remaining_time": "0:15:58"}
+{"current_steps": 3033, "total_steps": 3122, "loss": 2.4505, "learning_rate": 1.2374500832564306e-07, "epoch": 0.9713370696557245, "percentage": 97.15, "elapsed_time": "8:58:06", "remaining_time": "0:15:47"}
+{"current_steps": 3034, "total_steps": 3122, "loss": 2.6746, "learning_rate": 1.209820764406261e-07, "epoch": 0.9716573258606885, "percentage": 97.18, "elapsed_time": "8:58:17", "remaining_time": "0:15:36"}
+{"current_steps": 3035, "total_steps": 3122, "loss": 2.5954, "learning_rate": 1.1825026382947801e-07, "epoch": 0.9719775820656525, "percentage": 97.21, "elapsed_time": "8:58:27", "remaining_time": "0:15:26"}
+{"current_steps": 3036, "total_steps": 3122, "loss": 2.7764, "learning_rate": 1.1554957390921828e-07, "epoch": 0.9722978382706164, "percentage": 97.25, "elapsed_time": "8:58:37", "remaining_time": "0:15:15"}
+{"current_steps": 3037, "total_steps": 3122, "loss": 2.1283, "learning_rate": 1.1288001005793358e-07, "epoch": 0.9726180944755805, "percentage": 97.28, "elapsed_time": "8:58:48", "remaining_time": "0:15:04"}
+{"current_steps": 3038, "total_steps": 3122, "loss": 2.1614, "learning_rate": 1.1024157561477233e-07, "epoch": 0.9729383506805445, "percentage": 97.31, "elapsed_time": "8:58:58", "remaining_time": "0:14:54"}
+{"current_steps": 3039, "total_steps": 3122, "loss": 2.4447, "learning_rate": 1.0763427387996128e-07, "epoch": 0.9732586068855084, "percentage": 97.34, "elapsed_time": "8:59:09", "remaining_time": "0:14:43"}
+{"current_steps": 3040, "total_steps": 3122, "loss": 2.3156, "learning_rate": 1.0505810811476947e-07, "epoch": 0.9735788630904724, "percentage": 97.37, "elapsed_time": "8:59:19", "remaining_time": "0:14:32"}
+{"current_steps": 3041, "total_steps": 3122, "loss": 2.5195, "learning_rate": 1.0251308154153317e-07, "epoch": 0.9738991192954364, "percentage": 97.41, "elapsed_time": "8:59:29", "remaining_time": "0:14:22"}
+{"current_steps": 3042, "total_steps": 3122, "loss": 2.5644, "learning_rate": 9.999919734362539e-08, "epoch": 0.9742193755004003, "percentage": 97.44, "elapsed_time": "8:59:40", "remaining_time": "0:14:11"}
+{"current_steps": 3043, "total_steps": 3122, "loss": 2.3122, "learning_rate": 9.75164586654781e-08, "epoch": 0.9745396317053643, "percentage": 97.47, "elapsed_time": "8:59:50", "remaining_time": "0:14:00"}
+{"current_steps": 3044, "total_steps": 3122, "loss": 2.1659, "learning_rate": 9.506486861255715e-08, "epoch": 0.9748598879103283, "percentage": 97.5, "elapsed_time": "9:00:00", "remaining_time": "0:13:50"}
+{"current_steps": 3045, "total_steps": 3122, "loss": 2.1065, "learning_rate": 9.264443025137626e-08, "epoch": 0.9751801441152922, "percentage": 97.53, "elapsed_time": "9:00:11", "remaining_time": "0:13:39"}
+{"current_steps": 3046, "total_steps": 3122, "loss": 2.4461, "learning_rate": 9.025514660946921e-08, "epoch": 0.9755004003202562, "percentage": 97.57, "elapsed_time": "9:00:21", "remaining_time": "0:13:28"}
+{"current_steps": 3047, "total_steps": 3122, "loss": 2.4571, "learning_rate": 8.78970206754176e-08, "epoch": 0.9758206565252202, "percentage": 97.6, "elapsed_time": "9:00:32", "remaining_time": "0:13:18"}
+{"current_steps": 3048, "total_steps": 3122, "loss": 1.889, "learning_rate": 8.55700553988148e-08, "epoch": 0.9761409127301841, "percentage": 97.63, "elapsed_time": "9:00:42", "remaining_time": "0:13:07"}
+{"current_steps": 3049, "total_steps": 3122, "loss": 2.25, "learning_rate": 8.327425369029085e-08, "epoch": 0.9764611689351481, "percentage": 97.66, "elapsed_time": "9:00:52", "remaining_time": "0:12:56"}
+{"current_steps": 3050, "total_steps": 3122, "loss": 2.4113, "learning_rate": 8.100961842148758e-08, "epoch": 0.9767814251401121, "percentage": 97.69, "elapsed_time": "9:01:03", "remaining_time": "0:12:46"}
+{"current_steps": 3051, "total_steps": 3122, "loss": 2.4718, "learning_rate": 7.877615242506408e-08, "epoch": 0.977101681345076, "percentage": 97.73, "elapsed_time": "9:01:13", "remaining_time": "0:12:35"}
+{"current_steps": 3052, "total_steps": 3122, "loss": 2.5222, "learning_rate": 7.657385849469678e-08, "epoch": 0.97742193755004, "percentage": 97.76, "elapsed_time": "9:01:23", "remaining_time": "0:12:25"}
+{"current_steps": 3053, "total_steps": 3122, "loss": 2.1825, "learning_rate": 7.44027393850627e-08, "epoch": 0.977742193755004, "percentage": 97.79, "elapsed_time": "9:01:34", "remaining_time": "0:12:14"}
+{"current_steps": 3054, "total_steps": 3122, "loss": 1.9089, "learning_rate": 7.226279781185341e-08, "epoch": 0.9780624499599679, "percentage": 97.82, "elapsed_time": "9:01:44", "remaining_time": "0:12:03"}
+{"current_steps": 3055, "total_steps": 3122, "loss": 2.3184, "learning_rate": 7.015403645176111e-08, "epoch": 0.978382706164932, "percentage": 97.85, "elapsed_time": "9:01:54", "remaining_time": "0:11:53"}
+{"current_steps": 3056, "total_steps": 3122, "loss": 1.9132, "learning_rate": 6.80764579424703e-08, "epoch": 0.978702962369896, "percentage": 97.89, "elapsed_time": "9:02:05", "remaining_time": "0:11:42"}
+{"current_steps": 3057, "total_steps": 3122, "loss": 1.9538, "learning_rate": 6.603006488266616e-08, "epoch": 0.9790232185748599, "percentage": 97.92, "elapsed_time": "9:02:15", "remaining_time": "0:11:31"}
+{"current_steps": 3058, "total_steps": 3122, "loss": 2.1982, "learning_rate": 6.40148598320317e-08, "epoch": 0.9793434747798239, "percentage": 97.95, "elapsed_time": "9:02:26", "remaining_time": "0:11:21"}
+{"current_steps": 3059, "total_steps": 3122, "loss": 1.9992, "learning_rate": 6.203084531123115e-08, "epoch": 0.9796637309847879, "percentage": 97.98, "elapsed_time": "9:02:36", "remaining_time": "0:11:10"}
+{"current_steps": 3060, "total_steps": 3122, "loss": 2.0144, "learning_rate": 6.007802380191552e-08, "epoch": 0.9799839871897518, "percentage": 98.01, "elapsed_time": "9:02:46", "remaining_time": "0:10:59"}
+{"current_steps": 3061, "total_steps": 3122, "loss": 1.9409, "learning_rate": 5.815639774672532e-08, "epoch": 0.9803042433947158, "percentage": 98.05, "elapsed_time": "9:02:57", "remaining_time": "0:10:49"}
+{"current_steps": 3062, "total_steps": 3122, "loss": 2.4769, "learning_rate": 5.6265969549271216e-08, "epoch": 0.9806244995996798, "percentage": 98.08, "elapsed_time": "9:03:07", "remaining_time": "0:10:38"}
+{"current_steps": 3063, "total_steps": 3122, "loss": 2.4554, "learning_rate": 5.44067415741506e-08, "epoch": 0.9809447558046437, "percentage": 98.11, "elapsed_time": "9:03:17", "remaining_time": "0:10:27"}
+{"current_steps": 3064, "total_steps": 3122, "loss": 2.1183, "learning_rate": 5.257871614692822e-08, "epoch": 0.9812650120096077, "percentage": 98.14, "elapsed_time": "9:03:28", "remaining_time": "0:10:17"}
+{"current_steps": 3065, "total_steps": 3122, "loss": 2.0154, "learning_rate": 5.07818955541417e-08, "epoch": 0.9815852682145717, "percentage": 98.17, "elapsed_time": "9:03:38", "remaining_time": "0:10:06"}
+{"current_steps": 3066, "total_steps": 3122, "loss": 2.1623, "learning_rate": 4.901628204330155e-08, "epoch": 0.9819055244195356, "percentage": 98.21, "elapsed_time": "9:03:49", "remaining_time": "0:09:55"}
+{"current_steps": 3067, "total_steps": 3122, "loss": 1.8426, "learning_rate": 4.728187782287452e-08, "epoch": 0.9822257806244996, "percentage": 98.24, "elapsed_time": "9:03:59", "remaining_time": "0:09:45"}
+{"current_steps": 3068, "total_steps": 3122, "loss": 2.0737, "learning_rate": 4.5578685062297456e-08, "epoch": 0.9825460368294636, "percentage": 98.27, "elapsed_time": "9:04:09", "remaining_time": "0:09:34"}
+{"current_steps": 3069, "total_steps": 3122, "loss": 2.1993, "learning_rate": 4.390670589196622e-08, "epoch": 0.9828662930344275, "percentage": 98.3, "elapsed_time": "9:04:20", "remaining_time": "0:09:24"}
+{"current_steps": 3070, "total_steps": 3122, "loss": 2.5824, "learning_rate": 4.2265942403227345e-08, "epoch": 0.9831865492393915, "percentage": 98.33, "elapsed_time": "9:04:30", "remaining_time": "0:09:13"}
+{"current_steps": 3071, "total_steps": 3122, "loss": 2.3295, "learning_rate": 4.065639664839471e-08, "epoch": 0.9835068054443555, "percentage": 98.37, "elapsed_time": "9:04:40", "remaining_time": "0:09:02"}
+{"current_steps": 3072, "total_steps": 3122, "loss": 1.9268, "learning_rate": 3.907807064072178e-08, "epoch": 0.9838270616493194, "percentage": 98.4, "elapsed_time": "9:04:51", "remaining_time": "0:08:52"}
+{"current_steps": 3073, "total_steps": 3122, "loss": 2.4965, "learning_rate": 3.7530966354418215e-08, "epoch": 0.9841473178542834, "percentage": 98.43, "elapsed_time": "9:05:01", "remaining_time": "0:08:41"}
+{"current_steps": 3074, "total_steps": 3122, "loss": 2.1137, "learning_rate": 3.6015085724638856e-08, "epoch": 0.9844675740592475, "percentage": 98.46, "elapsed_time": "9:05:11", "remaining_time": "0:08:30"}
+{"current_steps": 3075, "total_steps": 3122, "loss": 1.6508, "learning_rate": 3.453043064748362e-08, "epoch": 0.9847878302642114, "percentage": 98.49, "elapsed_time": "9:05:22", "remaining_time": "0:08:20"}
+{"current_steps": 3076, "total_steps": 3122, "loss": 2.1851, "learning_rate": 3.307700297999483e-08, "epoch": 0.9851080864691754, "percentage": 98.53, "elapsed_time": "9:05:32", "remaining_time": "0:08:09"}
+{"current_steps": 3077, "total_steps": 3122, "loss": 1.754, "learning_rate": 3.1654804540157124e-08, "epoch": 0.9854283426741393, "percentage": 98.56, "elapsed_time": "9:05:43", "remaining_time": "0:07:58"}
+{"current_steps": 3078, "total_steps": 3122, "loss": 2.1616, "learning_rate": 3.02638371068864e-08, "epoch": 0.9857485988791033, "percentage": 98.59, "elapsed_time": "9:05:53", "remaining_time": "0:07:48"}
+{"current_steps": 3079, "total_steps": 3122, "loss": 2.733, "learning_rate": 2.890410242003816e-08, "epoch": 0.9860688550840673, "percentage": 98.62, "elapsed_time": "9:06:03", "remaining_time": "0:07:37"}
+{"current_steps": 3080, "total_steps": 3122, "loss": 2.0874, "learning_rate": 2.757560218040467e-08, "epoch": 0.9863891112890312, "percentage": 98.65, "elapsed_time": "9:06:14", "remaining_time": "0:07:26"}
+{"current_steps": 3081, "total_steps": 3122, "loss": 2.343, "learning_rate": 2.6278338049706696e-08, "epoch": 0.9867093674939952, "percentage": 98.69, "elapsed_time": "9:06:24", "remaining_time": "0:07:16"}
+{"current_steps": 3082, "total_steps": 3122, "loss": 2.3688, "learning_rate": 2.5012311650587927e-08, "epoch": 0.9870296236989592, "percentage": 98.72, "elapsed_time": "9:06:34", "remaining_time": "0:07:05"}
+{"current_steps": 3083, "total_steps": 3122, "loss": 1.8563, "learning_rate": 2.377752456662885e-08, "epoch": 0.9873498799039231, "percentage": 98.75, "elapsed_time": "9:06:45", "remaining_time": "0:06:54"}
+{"current_steps": 3084, "total_steps": 3122, "loss": 2.2285, "learning_rate": 2.257397834233288e-08, "epoch": 0.9876701361088871, "percentage": 98.78, "elapsed_time": "9:06:55", "remaining_time": "0:06:44"}
+{"current_steps": 3085, "total_steps": 3122, "loss": 2.2832, "learning_rate": 2.1401674483118027e-08, "epoch": 0.9879903923138511, "percentage": 98.81, "elapsed_time": "9:07:06", "remaining_time": "0:06:33"}
+{"current_steps": 3086, "total_steps": 3122, "loss": 2.1044, "learning_rate": 2.026061445533356e-08, "epoch": 0.988310648518815, "percentage": 98.85, "elapsed_time": "9:07:16", "remaining_time": "0:06:23"}
+{"current_steps": 3087, "total_steps": 3122, "loss": 2.234, "learning_rate": 1.9150799686246112e-08, "epoch": 0.988630904723779, "percentage": 98.88, "elapsed_time": "9:07:26", "remaining_time": "0:06:12"}
+{"current_steps": 3088, "total_steps": 3122, "loss": 1.7073, "learning_rate": 1.8072231564036922e-08, "epoch": 0.988951160928743, "percentage": 98.91, "elapsed_time": "9:07:37", "remaining_time": "0:06:01"}
+{"current_steps": 3089, "total_steps": 3122, "loss": 2.6741, "learning_rate": 1.702491143780738e-08, "epoch": 0.9892714171337069, "percentage": 98.94, "elapsed_time": "9:07:47", "remaining_time": "0:05:51"}
+{"current_steps": 3090, "total_steps": 3122, "loss": 2.2903, "learning_rate": 1.6008840617565134e-08, "epoch": 0.9895916733386709, "percentage": 98.98, "elapsed_time": "9:07:57", "remaining_time": "0:05:40"}
+{"current_steps": 3091, "total_steps": 3122, "loss": 2.1201, "learning_rate": 1.5024020374243554e-08, "epoch": 0.9899119295436349, "percentage": 99.01, "elapsed_time": "9:08:08", "remaining_time": "0:05:29"}
+{"current_steps": 3092, "total_steps": 3122, "loss": 2.3257, "learning_rate": 1.4070451939673934e-08, "epoch": 0.9902321857485988, "percentage": 99.04, "elapsed_time": "9:08:18", "remaining_time": "0:05:19"}
+{"current_steps": 3093, "total_steps": 3122, "loss": 2.3063, "learning_rate": 1.3148136506604958e-08, "epoch": 0.9905524419535628, "percentage": 99.07, "elapsed_time": "9:08:28", "remaining_time": "0:05:08"}
+{"current_steps": 3094, "total_steps": 3122, "loss": 2.2024, "learning_rate": 1.2257075228688797e-08, "epoch": 0.9908726981585269, "percentage": 99.1, "elapsed_time": "9:08:39", "remaining_time": "0:04:57"}
+{"current_steps": 3095, "total_steps": 3122, "loss": 2.2727, "learning_rate": 1.1397269220486672e-08, "epoch": 0.9911929543634908, "percentage": 99.14, "elapsed_time": "9:08:49", "remaining_time": "0:04:47"}
+{"current_steps": 3096, "total_steps": 3122, "loss": 1.8462, "learning_rate": 1.0568719557468853e-08, "epoch": 0.9915132105684548, "percentage": 99.17, "elapsed_time": "9:09:00", "remaining_time": "0:04:36"}
+{"current_steps": 3097, "total_steps": 3122, "loss": 1.2467, "learning_rate": 9.771427276000778e-09, "epoch": 0.9918334667734188, "percentage": 99.2, "elapsed_time": "9:09:10", "remaining_time": "0:04:25"}
+{"current_steps": 3098, "total_steps": 3122, "loss": 1.7548, "learning_rate": 9.00539337335693e-09, "epoch": 0.9921537229783827, "percentage": 99.23, "elapsed_time": "9:09:20", "remaining_time": "0:04:15"}
+{"current_steps": 3099, "total_steps": 3122, "loss": 1.8665, "learning_rate": 8.270618807706965e-09, "epoch": 0.9924739791833467, "percentage": 99.26, "elapsed_time": "9:09:31", "remaining_time": "0:04:04"}
+{"current_steps": 3100, "total_steps": 3122, "loss": 1.8483, "learning_rate": 7.56710449813236e-09, "epoch": 0.9927942353883107, "percentage": 99.3, "elapsed_time": "9:09:41", "remaining_time": "0:03:54"}
+{"current_steps": 3101, "total_steps": 3122, "loss": 2.3824, "learning_rate": 6.894851324595886e-09, "epoch": 0.9931144915932746, "percentage": 99.33, "elapsed_time": "9:10:29", "remaining_time": "0:03:43"}
+{"current_steps": 3102, "total_steps": 3122, "loss": 2.3081, "learning_rate": 6.2538601279776846e-09, "epoch": 0.9934347477982386, "percentage": 99.36, "elapsed_time": "9:10:39", "remaining_time": "0:03:33"}
+{"current_steps": 3103, "total_steps": 3122, "loss": 2.6313, "learning_rate": 5.644131710039191e-09, "epoch": 0.9937550040032026, "percentage": 99.39, "elapsed_time": "9:10:50", "remaining_time": "0:03:22"}
+{"current_steps": 3104, "total_steps": 3122, "loss": 2.2497, "learning_rate": 5.065666833442562e-09, "epoch": 0.9940752602081665, "percentage": 99.42, "elapsed_time": "9:11:00", "remaining_time": "0:03:11"}
+{"current_steps": 3105, "total_steps": 3122, "loss": 2.2095, "learning_rate": 4.518466221750672e-09, "epoch": 0.9943955164131305, "percentage": 99.46, "elapsed_time": "9:11:10", "remaining_time": "0:03:01"}
+{"current_steps": 3106, "total_steps": 3122, "loss": 2.0491, "learning_rate": 4.002530559410467e-09, "epoch": 0.9947157726180945, "percentage": 99.49, "elapsed_time": "9:11:21", "remaining_time": "0:02:50"}
+{"current_steps": 3107, "total_steps": 3122, "loss": 1.9228, "learning_rate": 3.5178604917668334e-09, "epoch": 0.9950360288230584, "percentage": 99.52, "elapsed_time": "9:11:31", "remaining_time": "0:02:39"}
+{"current_steps": 3108, "total_steps": 3122, "loss": 2.6178, "learning_rate": 3.0644566250598305e-09, "epoch": 0.9953562850280224, "percentage": 99.55, "elapsed_time": "9:11:42", "remaining_time": "0:02:29"}
+{"current_steps": 3109, "total_steps": 3122, "loss": 2.0714, "learning_rate": 2.6423195264163593e-09, "epoch": 0.9956765412329864, "percentage": 99.58, "elapsed_time": "9:11:52", "remaining_time": "0:02:18"}
+{"current_steps": 3110, "total_steps": 3122, "loss": 2.1848, "learning_rate": 2.2514497238557144e-09, "epoch": 0.9959967974379503, "percentage": 99.62, "elapsed_time": "9:12:03", "remaining_time": "0:02:07"}
+{"current_steps": 3111, "total_steps": 3122, "loss": 2.4682, "learning_rate": 1.891847706286809e-09, "epoch": 0.9963170536429143, "percentage": 99.65, "elapsed_time": "9:12:13", "remaining_time": "0:01:57"}
+{"current_steps": 3112, "total_steps": 3122, "loss": 2.3354, "learning_rate": 1.5635139235109507e-09, "epoch": 0.9966373098478783, "percentage": 99.68, "elapsed_time": "9:12:23", "remaining_time": "0:01:46"}
+{"current_steps": 3113, "total_steps": 3122, "loss": 1.8637, "learning_rate": 1.2664487862107389e-09, "epoch": 0.9969575660528422, "percentage": 99.71, "elapsed_time": "9:12:34", "remaining_time": "0:01:35"}
+{"current_steps": 3114, "total_steps": 3122, "loss": 2.0926, "learning_rate": 1.0006526659667171e-09, "epoch": 0.9972778222578063, "percentage": 99.74, "elapsed_time": "9:12:44", "remaining_time": "0:01:25"}
+{"current_steps": 3115, "total_steps": 3122, "loss": 2.0889, "learning_rate": 7.661258952434969e-10, "epoch": 0.9975980784627703, "percentage": 99.78, "elapsed_time": "9:12:55", "remaining_time": "0:01:14"}
+{"current_steps": 3116, "total_steps": 3122, "loss": 1.7024, "learning_rate": 5.628687673897571e-10, "epoch": 0.9979183346677342, "percentage": 99.81, "elapsed_time": "9:13:05", "remaining_time": "0:01:03"}
+{"current_steps": 3117, "total_steps": 3122, "loss": 2.477, "learning_rate": 3.9088153664379457e-10, "epoch": 0.9982385908726982, "percentage": 99.84, "elapsed_time": "9:13:15", "remaining_time": "0:00:53"}
+{"current_steps": 3118, "total_steps": 3122, "loss": 2.363, "learning_rate": 2.5016441813630054e-10, "epoch": 0.9985588470776622, "percentage": 99.87, "elapsed_time": "9:13:26", "remaining_time": "0:00:42"}
+{"current_steps": 3119, "total_steps": 3122, "loss": 2.3924, "learning_rate": 1.4071758787648214e-10, "epoch": 0.9988791032826261, "percentage": 99.9, "elapsed_time": "9:13:36", "remaining_time": "0:00:31"}
+{"current_steps": 3120, "total_steps": 3122, "loss": 2.2253, "learning_rate": 6.254118276316501e-11, "epoch": 0.9991993594875901, "percentage": 99.94, "elapsed_time": "9:13:46", "remaining_time": "0:00:21"}
+{"current_steps": 3121, "total_steps": 3122, "loss": 2.4826, "learning_rate": 1.5635300579242008e-11, "epoch": 0.9995196156925541, "percentage": 99.97, "elapsed_time": "9:13:57", "remaining_time": "0:00:10"}
+{"current_steps": 3122, "total_steps": 3122, "loss": 2.4466, "learning_rate": 0.0, "epoch": 0.999839871897518, "percentage": 100.0, "elapsed_time": "9:14:07", "remaining_time": "0:00:00"}
+{"current_steps": 3122, "total_steps": 3122, "epoch": 0.999839871897518, "percentage": 100.0, "elapsed_time": "9:14:07", "remaining_time": "0:00:00"}