layoutlm-funsd / README.md

smallonotation

End of training

0b1122d 10 months ago

preview code

raw

history blame contribute delete

No virus

9.32 kB

	---
	base_model: microsoft/layoutlm-base-uncased
	tags:
	- generated_from_trainer
	datasets:
	- funsd
	model-index:
	- name: layoutlm-funsd
	results: []
	---

	<!-- This model card has been generated automatically according to the information the Trainer had access to. You
	should probably proofread and complete it, then remove this comment. -->

	# layoutlm-funsd

	This model is a fine-tuned version of [microsoft/layoutlm-base-uncased](https://huggingface.co/microsoft/layoutlm-base-uncased) on the funsd dataset.
	It achieves the following results on the evaluation set:
	- Loss: 0.6771
	- Answer: {'precision': 0.7053571428571429, 'recall': 0.7812113720642769, 'f1': 0.7413489736070381, 'number': 809}
	- Header: {'precision': 0.29770992366412213, 'recall': 0.3277310924369748, 'f1': 0.312, 'number': 119}
	- Question: {'precision': 0.763716814159292, 'recall': 0.8103286384976526, 'f1': 0.7863325740318907, 'number': 1065}
	- Overall Precision: 0.7112
	- Overall Recall: 0.7697
	- Overall F1: 0.7393
	- Overall Accuracy: 0.8036

	## Model description

	More information needed

	## Intended uses & limitations

	More information needed

	## Training and evaluation data

	More information needed

	## Training procedure

	### Training hyperparameters

	The following hyperparameters were used during training:
	- learning_rate: 3e-05
	- train_batch_size: 16
	- eval_batch_size: 8
	- seed: 42
	- optimizer: Adam with betas=(0.9,0.999) and epsilon=1e-08
	- lr_scheduler_type: linear
	- num_epochs: 15

	### Training results

	\| Training Loss \| Epoch \| Step \| Validation Loss \| Answer \| Header \| Question \| Overall Precision \| Overall Recall \| Overall F1 \| Overall Accuracy \|
	\|:-------------:\|:-----:\|:----:\|:---------------:\|:-------------------------------------------------------------------------------------------------------------:\|:------------------------------------------------------------------------------------------------------------:\|:------------------------------------------------------------------------------------------------------------:\|:-----------------:\|:--------------:\|:----------:\|:----------------:\|
	\| 1.7668 \| 1.0 \| 10 \| 1.5655 \| {'precision': 0.01564945226917058, 'recall': 0.012360939431396786, 'f1': 0.013812154696132598, 'number': 809} \| {'precision': 0.0, 'recall': 0.0, 'f1': 0.0, 'number': 119} \| {'precision': 0.31925675675675674, 'recall': 0.17746478873239438, 'f1': 0.22812311406155703, 'number': 1065} \| 0.1617 \| 0.0998 \| 0.1234 \| 0.3599 \|
	\| 1.4335 \| 2.0 \| 20 \| 1.2504 \| {'precision': 0.22972972972972974, 'recall': 0.2521631644004944, 'f1': 0.24042427813789036, 'number': 809} \| {'precision': 0.0, 'recall': 0.0, 'f1': 0.0, 'number': 119} \| {'precision': 0.391304347826087, 'recall': 0.5492957746478874, 'f1': 0.45703125, 'number': 1065} \| 0.3311 \| 0.3959 \| 0.3606 \| 0.5926 \|
	\| 1.1215 \| 3.0 \| 30 \| 0.9771 \| {'precision': 0.4570273003033367, 'recall': 0.5587144622991347, 'f1': 0.5027808676307008, 'number': 809} \| {'precision': 0.0, 'recall': 0.0, 'f1': 0.0, 'number': 119} \| {'precision': 0.5460829493087558, 'recall': 0.6676056338028169, 'f1': 0.6007604562737643, 'number': 1065} \| 0.5022 \| 0.5835 \| 0.5398 \| 0.6802 \|
	\| 0.8632 \| 4.0 \| 40 \| 0.7960 \| {'precision': 0.5714285714285714, 'recall': 0.7317676143386898, 'f1': 0.6417344173441735, 'number': 809} \| {'precision': 0.0379746835443038, 'recall': 0.025210084033613446, 'f1': 0.030303030303030304, 'number': 119} \| {'precision': 0.633201581027668, 'recall': 0.752112676056338, 'f1': 0.6875536480686696, 'number': 1065} \| 0.5866 \| 0.7005 \| 0.6385 \| 0.7572 \|
	\| 0.6913 \| 5.0 \| 50 \| 0.7202 \| {'precision': 0.6335797254487856, 'recall': 0.7416563658838071, 'f1': 0.683371298405467, 'number': 809} \| {'precision': 0.10752688172043011, 'recall': 0.08403361344537816, 'f1': 0.09433962264150944, 'number': 119} \| {'precision': 0.6907216494845361, 'recall': 0.7549295774647887, 'f1': 0.721399730820996, 'number': 1065} \| 0.6416 \| 0.7095 \| 0.6738 \| 0.7808 \|
	\| 0.5758 \| 6.0 \| 60 \| 0.6812 \| {'precision': 0.6677248677248677, 'recall': 0.7799752781211372, 'f1': 0.7194982896237172, 'number': 809} \| {'precision': 0.17857142857142858, 'recall': 0.16806722689075632, 'f1': 0.17316017316017318, 'number': 119} \| {'precision': 0.6919315403422983, 'recall': 0.7971830985915493, 'f1': 0.7408376963350787, 'number': 1065} \| 0.6567 \| 0.7526 \| 0.7014 \| 0.7947 \|
	\| 0.4993 \| 7.0 \| 70 \| 0.6593 \| {'precision': 0.6597938144329897, 'recall': 0.7911001236093943, 'f1': 0.7195053400786959, 'number': 809} \| {'precision': 0.21875, 'recall': 0.17647058823529413, 'f1': 0.19534883720930232, 'number': 119} \| {'precision': 0.7158703071672355, 'recall': 0.787793427230047, 'f1': 0.7501117568171659, 'number': 1065} \| 0.6702 \| 0.7526 \| 0.7091 \| 0.7951 \|
	\| 0.4397 \| 8.0 \| 80 \| 0.6633 \| {'precision': 0.6749192680301399, 'recall': 0.7750309023485785, 'f1': 0.721518987341772, 'number': 809} \| {'precision': 0.23943661971830985, 'recall': 0.2857142857142857, 'f1': 0.26053639846743293, 'number': 119} \| {'precision': 0.7274290627687017, 'recall': 0.7943661971830986, 'f1': 0.7594254937163376, 'number': 1065} \| 0.6746 \| 0.7561 \| 0.7130 \| 0.7987 \|
	\| 0.396 \| 9.0 \| 90 \| 0.6605 \| {'precision': 0.6875699888017918, 'recall': 0.7589616810877626, 'f1': 0.7215041128084607, 'number': 809} \| {'precision': 0.25203252032520324, 'recall': 0.2605042016806723, 'f1': 0.25619834710743805, 'number': 119} \| {'precision': 0.7344013490725126, 'recall': 0.8178403755868544, 'f1': 0.7738782763216348, 'number': 1065} \| 0.6885 \| 0.7607 \| 0.7228 \| 0.8026 \|
	\| 0.3578 \| 10.0 \| 100 \| 0.6624 \| {'precision': 0.6842105263157895, 'recall': 0.7873918417799752, 'f1': 0.7321839080459769, 'number': 809} \| {'precision': 0.2773109243697479, 'recall': 0.2773109243697479, 'f1': 0.2773109243697479, 'number': 119} \| {'precision': 0.7476231633535004, 'recall': 0.812206572769953, 'f1': 0.7785778577857785, 'number': 1065} \| 0.6955 \| 0.7702 \| 0.7310 \| 0.8022 \|
	\| 0.3249 \| 11.0 \| 110 \| 0.6678 \| {'precision': 0.6865671641791045, 'recall': 0.796044499381953, 'f1': 0.7372638809387521, 'number': 809} \| {'precision': 0.273972602739726, 'recall': 0.33613445378151263, 'f1': 0.3018867924528302, 'number': 119} \| {'precision': 0.7584973166368515, 'recall': 0.7962441314553991, 'f1': 0.7769125057260651, 'number': 1065} \| 0.6957 \| 0.7687 \| 0.7304 \| 0.8010 \|
	\| 0.3021 \| 12.0 \| 120 \| 0.6681 \| {'precision': 0.7120535714285714, 'recall': 0.788627935723115, 'f1': 0.7483870967741936, 'number': 809} \| {'precision': 0.2923076923076923, 'recall': 0.31932773109243695, 'f1': 0.3052208835341365, 'number': 119} \| {'precision': 0.7547826086956522, 'recall': 0.8150234741784037, 'f1': 0.7837471783295711, 'number': 1065} \| 0.7096 \| 0.7747 \| 0.7407 \| 0.8045 \|
	\| 0.2895 \| 13.0 \| 130 \| 0.6755 \| {'precision': 0.7122060470324748, 'recall': 0.7861557478368356, 'f1': 0.7473560517038778, 'number': 809} \| {'precision': 0.2887323943661972, 'recall': 0.3445378151260504, 'f1': 0.31417624521072796, 'number': 119} \| {'precision': 0.7595048629531388, 'recall': 0.8065727699530516, 'f1': 0.7823315118397085, 'number': 1065} \| 0.7091 \| 0.7707 \| 0.7386 \| 0.8026 \|
	\| 0.2734 \| 14.0 \| 140 \| 0.6768 \| {'precision': 0.7093541202672605, 'recall': 0.7873918417799752, 'f1': 0.7463386057410661, 'number': 809} \| {'precision': 0.28368794326241137, 'recall': 0.33613445378151263, 'f1': 0.3076923076923077, 'number': 119} \| {'precision': 0.7570175438596491, 'recall': 0.8103286384976526, 'f1': 0.7827664399092971, 'number': 1065} \| 0.7067 \| 0.7727 \| 0.7383 \| 0.8026 \|
	\| 0.2804 \| 15.0 \| 150 \| 0.6771 \| {'precision': 0.7053571428571429, 'recall': 0.7812113720642769, 'f1': 0.7413489736070381, 'number': 809} \| {'precision': 0.29770992366412213, 'recall': 0.3277310924369748, 'f1': 0.312, 'number': 119} \| {'precision': 0.763716814159292, 'recall': 0.8103286384976526, 'f1': 0.7863325740318907, 'number': 1065} \| 0.7112 \| 0.7697 \| 0.7393 \| 0.8036 \|


	### Framework versions

	- Transformers 4.34.0
	- Pytorch 2.1.0+cpu
	- Datasets 2.14.5
	- Tokenizers 0.14.1