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| # Copyright 2022 Xiaomi Corp. (authors: Daniel Povey) | |
| # | |
| # See ../LICENSE for clarification regarding multiple authors | |
| # | |
| # Licensed under the Apache License, Version 2.0 (the "License"); | |
| # you may not use this file except in compliance with the License. | |
| # You may obtain a copy of the License at | |
| # | |
| # http://www.apache.org/licenses/LICENSE-2.0 | |
| # | |
| # Unless required by applicable law or agreed to in writing, software | |
| # distributed under the License is distributed on an "AS IS" BASIS, | |
| # WITHOUT WARRANTIES OR CONDITIONS OF ANY KIND, either express or implied. | |
| # See the License for the specific language governing permissions and | |
| # limitations under the License. | |
| import contextlib | |
| import logging | |
| from collections import defaultdict | |
| from typing import List | |
| from typing import Tuple | |
| import torch | |
| from torch import Tensor | |
| from torch.optim import Optimizer | |
| class BatchedOptimizer(Optimizer): | |
| """ | |
| This class adds to class Optimizer the capability to optimize parameters in batches: | |
| it will stack the parameters and their grads for you so the optimizer can work | |
| on tensors with an extra leading dimension. This is intended for speed with GPUs, | |
| as it reduces the number of kernels launched in the optimizer. | |
| Args: | |
| params: | |
| """ | |
| def __init__(self, params, defaults): | |
| super(BatchedOptimizer, self).__init__(params, defaults) | |
| def batched_params(self, param_group, group_params_names): | |
| """ | |
| This function returns (technically, yields) a list of | |
| of tuples (p, state), where | |
| p is a `fake` parameter that is stacked (over axis 0) from real parameters | |
| that share the same shape, and its gradient is also stacked; | |
| `state` is the state corresponding to this batch of parameters | |
| (it will be physically located in the "state" for one of the real | |
| parameters, the last one that has any particular shape and dtype). | |
| This function is decorated as a context manager so that it can | |
| write parameters back to their "real" locations. | |
| The idea is, instead of doing: | |
| <code> | |
| for p in group["params"]: | |
| state = self.state[p] | |
| ... | |
| </code> | |
| you can do: | |
| <code> | |
| with self.batched_params(group["params"]) as batches: | |
| for p, state, p_names in batches: | |
| ... | |
| </code> | |
| Args: | |
| group: a parameter group, which is a list of parameters; should be | |
| one of self.param_groups. | |
| group_params_names: name for each parameter in group, | |
| which is List[str]. | |
| """ | |
| batches = defaultdict( | |
| list | |
| ) # `batches` maps from tuple (dtype_as_str,*shape) to list of nn.Parameter | |
| batches_names = defaultdict( | |
| list | |
| ) # `batches` maps from tuple (dtype_as_str,*shape) to list of str | |
| assert len(param_group) == len(group_params_names) | |
| for p, named_p in zip(param_group, group_params_names): | |
| key = (str(p.dtype), *p.shape) | |
| batches[key].append(p) | |
| batches_names[key].append(named_p) | |
| batches_names_keys = list(batches_names.keys()) | |
| sorted_idx = sorted( | |
| range(len(batches_names)), key=lambda i: batches_names_keys[i]) | |
| batches_names = [ | |
| batches_names[batches_names_keys[idx]] for idx in sorted_idx | |
| ] | |
| batches = [batches[batches_names_keys[idx]] for idx in sorted_idx] | |
| stacked_params_dict = dict() | |
| # turn batches into a list, in deterministic order. | |
| # tuples will contain tuples of (stacked_param, state, stacked_params_names), | |
| # one for each batch in `batches`. | |
| tuples = [] | |
| for batch, batch_names in zip(batches, batches_names): | |
| p = batch[0] | |
| # we arbitrarily store the state in the | |
| # state corresponding to the 1st parameter in the | |
| # group. class Optimizer will take care of saving/loading state. | |
| state = self.state[p] | |
| p_stacked = torch.stack(batch) | |
| grad = torch.stack([ | |
| torch.zeros_like(p) if p.grad is None else p.grad for p in batch | |
| ]) | |
| p_stacked.grad = grad | |
| stacked_params_dict[key] = p_stacked | |
| tuples.append((p_stacked, state, batch_names)) | |
| yield tuples # <-- calling code will do the actual optimization here! | |
| for ((stacked_params, _state, _names), batch) in zip(tuples, batches): | |
| for i, p in enumerate(batch): # batch is list of Parameter | |
| p.copy_(stacked_params[i]) | |
| class ScaledAdam(BatchedOptimizer): | |
| """ | |
| Implements 'Scaled Adam', a variant of Adam where we scale each parameter's update | |
| proportional to the norm of that parameter; and also learn the scale of the parameter, | |
| in log space, subject to upper and lower limits (as if we had factored each parameter as | |
| param = underlying_param * log_scale.exp()) | |
| Args: | |
| params: The parameters or param_groups to optimize (like other Optimizer subclasses) | |
| lr: The learning rate. We will typically use a learning rate schedule that starts | |
| at 0.03 and decreases over time, i.e. much higher than other common | |
| optimizers. | |
| clipping_scale: (e.g. 2.0) | |
| A scale for gradient-clipping: if specified, the normalized gradients | |
| over the whole model will be clipped to have 2-norm equal to | |
| `clipping_scale` times the median 2-norm over the most recent period | |
| of `clipping_update_period` minibatches. By "normalized gradients", | |
| we mean after multiplying by the rms parameter value for this tensor | |
| [for non-scalars]; this is appropriate because our update is scaled | |
| by this quantity. | |
| betas: beta1,beta2 are momentum constants for regular momentum, and moving sum-sq grad. | |
| Must satisfy 0 < beta <= beta2 < 1. | |
| scalar_lr_scale: A scaling factor on the learning rate, that we use to update the | |
| scale of each parameter tensor and scalar parameters of the mode.. | |
| If each parameter were decomposed | |
| as p * p_scale.exp(), where (p**2).mean().sqrt() == 1.0, scalar_lr_scale | |
| would be a the scaling factor on the learning rate of p_scale. | |
| eps: A general-purpose epsilon to prevent division by zero | |
| param_min_rms: Minimum root-mean-square value of parameter tensor, for purposes of | |
| learning the scale on the parameters (we'll constrain the rms of each non-scalar | |
| parameter tensor to be >= this value) | |
| param_max_rms: Maximum root-mean-square value of parameter tensor, for purposes of | |
| learning the scale on the parameters (we'll constrain the rms of each non-scalar | |
| parameter tensor to be <= this value) | |
| scalar_max: Maximum absolute value for scalar parameters (applicable if your | |
| model has any parameters with numel() == 1). | |
| size_update_period: The periodicity, in steps, with which we update the size (scale) | |
| of the parameter tensor. This is provided to save a little time | |
| in the update. | |
| clipping_update_period: if clipping_scale is specified, this is the period | |
| """ | |
| def __init__( | |
| self, | |
| params, | |
| lr=3e-02, | |
| clipping_scale=None, | |
| betas=(0.9, 0.98), | |
| scalar_lr_scale=0.1, | |
| eps=1.0e-08, | |
| param_min_rms=1.0e-05, | |
| param_max_rms=3.0, | |
| scalar_max=10.0, | |
| size_update_period=4, | |
| clipping_update_period=100, | |
| parameters_names=None, | |
| show_dominant_parameters=True, ): | |
| assert parameters_names is not None, ( | |
| "Please prepare parameters_names," | |
| "which is a List[List[str]]. Each List[str] is for a group" | |
| "and each str is for a parameter") | |
| defaults = dict( | |
| lr=lr, | |
| clipping_scale=clipping_scale, | |
| betas=betas, | |
| scalar_lr_scale=scalar_lr_scale, | |
| eps=eps, | |
| param_min_rms=param_min_rms, | |
| param_max_rms=param_max_rms, | |
| scalar_max=scalar_max, | |
| size_update_period=size_update_period, | |
| clipping_update_period=clipping_update_period, ) | |
| super(ScaledAdam, self).__init__(params, defaults) | |
| assert len(self.param_groups) == len(parameters_names) | |
| self.parameters_names = parameters_names | |
| self.show_dominant_parameters = show_dominant_parameters | |
| def __setstate__(self, state): | |
| super(ScaledAdam, self).__setstate__(state) | |
| def step(self, closure=None): | |
| """Performs a single optimization step. | |
| Arguments: | |
| closure (callable, optional): A closure that reevaluates the model | |
| and returns the loss. | |
| """ | |
| loss = None | |
| if closure is not None: | |
| with torch.enable_grad(): | |
| loss = closure() | |
| batch = True | |
| for group, group_params_names in zip(self.param_groups, | |
| self.parameters_names): | |
| with self.batched_params(group["params"], | |
| group_params_names) as batches: | |
| # batches is list of pairs (stacked_param, state). stacked_param is like | |
| # a regular parameter, and will have a .grad, but the 1st dim corresponds to | |
| # a stacking dim, it is not a real dim. | |
| if (len(batches[0][1]) == | |
| 0): # if len(first state) == 0: not yet initialized | |
| clipping_scale = 1 | |
| else: | |
| clipping_scale = self._get_clipping_scale(group, batches) | |
| for p, state, _ in batches: | |
| # Perform optimization step. | |
| # grad is not going to be None, we handled that when creating the batches. | |
| grad = p.grad | |
| if grad.is_sparse: | |
| raise RuntimeError( | |
| "ScaledAdam optimizer does not support sparse gradients" | |
| ) | |
| # State initialization | |
| if len(state) == 0: | |
| self._init_state(group, p, state) | |
| self._step_one_batch(group, p, state, clipping_scale) | |
| return loss | |
| def _init_state(self, group: dict, p: Tensor, state: dict): | |
| """ | |
| Initializes state dict for parameter 'p'. Assumes that dim 0 of tensor p | |
| is actually the batch dimension, corresponding to batched-together | |
| parameters of a given shape. | |
| Args: | |
| group: Dict to look up configuration values. | |
| p: The parameter that we are initializing the state for | |
| state: Dict from string to whatever state we are initializing | |
| """ | |
| size_update_period = group["size_update_period"] | |
| state["step"] = 0 | |
| kwargs = {"device": p.device, "dtype": p.dtype} | |
| # 'delta' implements conventional momentum. There are | |
| # several different kinds of update going on, so rather than | |
| # compute "exp_avg" like in Adam, we store and decay a | |
| # parameter-change "delta", which combines all forms of | |
| # update. this is equivalent to how it's done in Adam, | |
| # except for the first few steps. | |
| state["delta"] = torch.zeros_like( | |
| p, memory_format=torch.preserve_format) | |
| batch_size = p.shape[0] | |
| numel = p.numel() // batch_size | |
| numel = p.numel() | |
| if numel > 1: | |
| # "param_rms" just periodically records the scalar root-mean-square value of | |
| # the parameter tensor. | |
| # it has a shape like (batch_size, 1, 1, 1, 1) | |
| param_rms = ( | |
| (p**2).mean(dim=list(range(1, p.ndim)), keepdim=True).sqrt()) | |
| state["param_rms"] = param_rms | |
| state["scale_exp_avg_sq"] = torch.zeros_like(param_rms) | |
| state["scale_grads"] = torch.zeros(size_update_period, | |
| *param_rms.shape, **kwargs) | |
| # exp_avg_sq is the weighted sum of scaled gradients. as in Adam. | |
| state["exp_avg_sq"] = torch.zeros_like( | |
| p, memory_format=torch.preserve_format) | |
| def _get_clipping_scale(self, | |
| group: dict, | |
| tuples: List[Tuple[Tensor, dict, List[str]]] | |
| ) -> float: | |
| """ | |
| Returns a scalar factor <= 1.0 that dictates gradient clipping, i.e. we will scale the gradients | |
| by this amount before applying the rest of the update. | |
| Args: | |
| group: the parameter group, an item in self.param_groups | |
| tuples: a list of tuples of (param, state, param_names) | |
| where param is a batched set of parameters, | |
| with a .grad (1st dim is batch dim) | |
| and state is the state-dict where optimization parameters are kept. | |
| param_names is a List[str] while each str is name for a parameter | |
| in batched set of parameters "param". | |
| """ | |
| assert len(tuples) >= 1 | |
| clipping_scale = group["clipping_scale"] | |
| (first_p, first_state, _) = tuples[0] | |
| step = first_state["step"] | |
| if clipping_scale is None or step == 0: | |
| # no clipping. return early on step == 0 because the other | |
| # parameters' state won't have been initialized yet. | |
| return 1.0 | |
| clipping_update_period = group["clipping_update_period"] | |
| tot_sumsq = torch.tensor(0.0, device=first_p.device) | |
| for (p, state, param_names) in tuples: | |
| grad = p.grad | |
| if grad.is_sparse: | |
| raise RuntimeError( | |
| "ScaledAdam optimizer does not support sparse gradients") | |
| if p.numel() == p.shape[0]: # a batch of scalars | |
| tot_sumsq += (grad**2).sum() # sum() to change shape [1] to [] | |
| else: | |
| tot_sumsq += ((grad * state["param_rms"])**2).sum() | |
| tot_norm = tot_sumsq.sqrt() | |
| if "model_norms" not in first_state: | |
| first_state["model_norms"] = torch.zeros( | |
| clipping_update_period, device=p.device) | |
| first_state["model_norms"][step % clipping_update_period] = tot_norm | |
| if step % clipping_update_period == 0: | |
| # Print some stats. | |
| # We don't reach here if step == 0 because we would have returned | |
| # above. | |
| sorted_norms = first_state["model_norms"].sort()[0].to("cpu") | |
| quartiles = [] | |
| for n in range(0, 5): | |
| index = min( | |
| clipping_update_period - 1, | |
| (clipping_update_period // 4) * n, ) | |
| quartiles.append(sorted_norms[index].item()) | |
| median = quartiles[2] | |
| threshold = clipping_scale * median | |
| first_state["model_norm_threshold"] = threshold | |
| percent_clipped = (first_state["num_clipped"] * 100.0 / | |
| clipping_update_period | |
| if "num_clipped" in first_state else 0.0) | |
| first_state["num_clipped"] = 0 | |
| quartiles = " ".join(["%.3e" % x for x in quartiles]) | |
| logging.info( | |
| f"Clipping_scale={clipping_scale}, grad-norm quartiles {quartiles}, " | |
| f"threshold={threshold:.3e}, percent-clipped={percent_clipped:.1f}" | |
| ) | |
| if step < clipping_update_period: | |
| return 1.0 # We have not yet estimated a norm to clip to. | |
| else: | |
| try: | |
| model_norm_threshold = first_state["model_norm_threshold"] | |
| except KeyError: | |
| logging.info( | |
| "Warning: model_norm_threshold not in state: possibly " | |
| "you changed config when restarting, adding clipping_scale option?" | |
| ) | |
| return 1.0 | |
| ans = min(1.0, (model_norm_threshold / (tot_norm + 1.0e-20)).item()) | |
| if ans < 1.0: | |
| first_state["num_clipped"] += 1 | |
| if ans < 0.1: | |
| logging.warn( | |
| f"Scaling gradients by {ans}, model_norm_threshold={model_norm_threshold}" | |
| ) | |
| if self.show_dominant_parameters: | |
| assert p.shape[0] == len(param_names) | |
| self._show_gradient_dominating_parameter(tuples, tot_sumsq) | |
| return ans | |
| def _show_gradient_dominating_parameter( | |
| self, tuples: List[Tuple[Tensor, dict, List[str]]], | |
| tot_sumsq: Tensor): | |
| """ | |
| Show information of parameter wihch dominanting tot_sumsq. | |
| Args: | |
| tuples: a list of tuples of (param, state, param_names) | |
| where param is a batched set of parameters, | |
| with a .grad (1st dim is batch dim) | |
| and state is the state-dict where optimization parameters are kept. | |
| param_names is a List[str] while each str is name for a parameter | |
| in batched set of parameters "param". | |
| tot_sumsq: sumsq of all parameters. Though it's could be calculated | |
| from tuples, we still pass it to save some time. | |
| """ | |
| all_sumsq_orig = {} | |
| for (p, state, batch_param_names) in tuples: | |
| # p is a stacked batch parameters. | |
| batch_grad = p.grad | |
| if p.numel() == p.shape[0]: # a batch of scalars | |
| batch_sumsq_orig = batch_grad**2 | |
| # Dummpy values used by following `zip` statement. | |
| batch_rms_orig = torch.ones(p.shape[0]) | |
| else: | |
| batch_rms_orig = state["param_rms"] | |
| batch_sumsq_orig = ((batch_grad * batch_rms_orig)**2).sum( | |
| dim=list(range(1, batch_grad.ndim))) | |
| for name, sumsq_orig, rms, grad in zip(batch_param_names, | |
| batch_sumsq_orig, | |
| batch_rms_orig, batch_grad): | |
| proportion_orig = sumsq_orig / tot_sumsq | |
| all_sumsq_orig[name] = (proportion_orig, sumsq_orig, rms, grad) | |
| assert torch.isclose( | |
| sum([value[0] for value in all_sumsq_orig.values()]).cpu(), | |
| torch.tensor(1.0), ) | |
| sorted_by_proportion = { | |
| k: v | |
| for k, v in sorted( | |
| all_sumsq_orig.items(), | |
| key=lambda item: item[1][0], | |
| reverse=True, ) | |
| } | |
| dominant_param_name = next(iter(sorted_by_proportion)) | |
| (dominant_proportion, dominant_sumsq, dominant_rms, | |
| dominant_grad, ) = sorted_by_proportion[dominant_param_name] | |
| logging.info(f"Parameter Dominanting tot_sumsq {dominant_param_name}" | |
| f" with proportion {dominant_proportion:.2f}," | |
| f" where dominant_sumsq=(grad_sumsq*orig_rms_sq)" | |
| f"={dominant_sumsq:.3e}," | |
| f" grad_sumsq = {(dominant_grad**2).sum():.3e}," | |
| f" orig_rms_sq={(dominant_rms**2).item():.3e}") | |
| def _step_one_batch(self, | |
| group: dict, | |
| p: Tensor, | |
| state: dict, | |
| clipping_scale: float): | |
| """ | |
| Do the step for one parameter, which is actually going to be a batch of | |
| `real` parameters, with dim 0 as the batch dim. | |
| Args: | |
| group: dict to look up configuration values | |
| p: parameter to update (actually multiple parameters stacked together | |
| as a batch) | |
| state: state-dict for p, to look up the optimizer state | |
| """ | |
| lr = group["lr"] | |
| size_update_period = group["size_update_period"] | |
| beta1 = group["betas"][0] | |
| grad = p.grad | |
| if clipping_scale != 1.0: | |
| grad = grad * clipping_scale | |
| step = state["step"] | |
| delta = state["delta"] | |
| delta.mul_(beta1) | |
| batch_size = p.shape[0] | |
| numel = p.numel() // batch_size | |
| if numel > 1: | |
| # Update the size/scale of p, and set param_rms | |
| scale_grads = state["scale_grads"] | |
| scale_grads[step % size_update_period] = (p * grad).sum( | |
| dim=list(range(1, p.ndim)), keepdim=True) | |
| if step % size_update_period == size_update_period - 1: | |
| param_rms = state["param_rms"] # shape: (batch_size, 1, 1, ..) | |
| param_rms.copy_((p**2) | |
| .mean(dim=list(range(1, p.ndim)), keepdim=True) | |
| .sqrt()) | |
| if step > 0: | |
| # self._size_update() learns the overall scale on the | |
| # parameter, by shrinking or expanding it. | |
| self._size_update(group, scale_grads, p, state) | |
| if numel == 1: | |
| # For parameters with 1 element we just use regular Adam. | |
| # Updates delta. | |
| self._step_scalar(group, p, state) | |
| else: | |
| self._step(group, p, state) | |
| state["step"] = step + 1 | |
| def _size_update(self, | |
| group: dict, | |
| scale_grads: Tensor, | |
| p: Tensor, | |
| state: dict) -> None: | |
| """ | |
| Called only where p.numel() > 1, this updates the scale of the parameter. | |
| If we imagine: p = underlying_param * scale.exp(), and we are doing | |
| gradient descent on underlying param and on scale, this function does the update | |
| on `scale`. | |
| Args: | |
| group: dict to look up configuration values | |
| scale_grads: a tensor of shape (size_update_period, batch_size, 1, 1,...) containing | |
| grads w.r.t. the scales. | |
| p: The parameter to update | |
| state: The state-dict of p | |
| """ | |
| param_rms = state["param_rms"] | |
| beta1, beta2 = group["betas"] | |
| size_lr = group["lr"] * group["scalar_lr_scale"] | |
| param_min_rms = group["param_min_rms"] | |
| param_max_rms = group["param_max_rms"] | |
| eps = group["eps"] | |
| step = state["step"] | |
| batch_size = p.shape[0] | |
| size_update_period = scale_grads.shape[0] | |
| # correct beta2 for the size update period: we will have | |
| # faster decay at this level. | |
| beta2_corr = beta2**size_update_period | |
| scale_exp_avg_sq = state[ | |
| "scale_exp_avg_sq"] # shape: (batch_size, 1, 1, ..) | |
| scale_exp_avg_sq.mul_(beta2_corr).add_( | |
| (scale_grads**2).mean(dim=0), # mean over dim `size_update_period` | |
| alpha=1 - beta2_corr, ) # shape is (batch_size, 1, 1, ...) | |
| # The 1st time we reach here is when size_step == 1. | |
| size_step = (step + 1) // size_update_period | |
| bias_correction2 = 1 - beta2_corr**size_step | |
| # we don't bother with bias_correction1; this will help prevent divergence | |
| # at the start of training. | |
| denom = scale_exp_avg_sq.sqrt() + eps | |
| scale_step = (-size_lr * (bias_correction2**0.5) * | |
| scale_grads.sum(dim=0) / denom) | |
| is_too_small = param_rms < param_min_rms | |
| is_too_large = param_rms > param_max_rms | |
| # when the param gets too small, just don't shrink it any further. | |
| scale_step.masked_fill_(is_too_small, 0.0) | |
| # when it gets too large, stop it from getting any larger. | |
| scale_step.masked_fill_(is_too_large, -size_lr * size_update_period) | |
| delta = state["delta"] | |
| # the factor of (1-beta1) relates to momentum. | |
| delta.add_(p * scale_step, alpha=(1 - beta1)) | |
| def _step(self, group: dict, p: Tensor, state: dict): | |
| """ | |
| This function does the core update of self.step(), in the case where the members of | |
| the batch have more than 1 element. | |
| Args: | |
| group: A dict which will be used to look up configuration values | |
| p: The parameter to be updated | |
| grad: The grad of p | |
| state: The state-dict corresponding to parameter p | |
| This function modifies p. | |
| """ | |
| grad = p.grad | |
| lr = group["lr"] | |
| beta1, beta2 = group["betas"] | |
| eps = group["eps"] | |
| param_min_rms = group["param_min_rms"] | |
| step = state["step"] | |
| exp_avg_sq = state["exp_avg_sq"] | |
| exp_avg_sq.mul_(beta2).addcmul_(grad, grad, value=(1 - beta2)) | |
| this_step = state["step"] - (state["zero_step"] | |
| if "zero_step" in state else 0) | |
| bias_correction2 = 1 - beta2**(this_step + 1) | |
| if bias_correction2 < 0.99: | |
| # note: not in-place. | |
| exp_avg_sq = exp_avg_sq * (1.0 / bias_correction2) | |
| denom = exp_avg_sq.sqrt() | |
| denom += eps | |
| grad = grad / denom | |
| alpha = -lr * (1 - beta1) * state["param_rms"].clamp(min=param_min_rms) | |
| delta = state["delta"] | |
| delta.add_(grad * alpha) | |
| p.add_(delta) | |
| def _step_scalar(self, group: dict, p: Tensor, state: dict): | |
| """ | |
| A simplified form of the core update for scalar tensors, where we cannot get a good | |
| estimate of the parameter rms. | |
| """ | |
| beta1, beta2 = group["betas"] | |
| scalar_max = group["scalar_max"] | |
| eps = group["eps"] | |
| lr = group["lr"] * group["scalar_lr_scale"] | |
| grad = p.grad | |
| exp_avg_sq = state["exp_avg_sq"] # shape: (batch_size,) | |
| exp_avg_sq.mul_(beta2).addcmul_(grad, grad, value=1 - beta2) | |
| # bias_correction2 is like in Adam. Don't bother with bias_correction1; | |
| # slower update at the start will help stability anyway. | |
| bias_correction2 = 1 - beta2**(state["step"] + 1) | |
| denom = (exp_avg_sq / bias_correction2).sqrt() + eps | |
| delta = state["delta"] | |
| delta.add_(grad / denom, alpha=-lr * (1 - beta1)) | |
| p.clamp_(min=-scalar_max, max=scalar_max) | |
| p.add_(delta) | |