| | |
| | |
| | |
| | |
| | |
| | |
| | |
| | |
| | |
| | |
| | |
| | |
| | |
| | |
| | """PyTorch optimization for diffusion models.""" |
| |
|
| | import math |
| | from enum import Enum |
| | from typing import Optional, Union |
| |
|
| | from torch.optim import Optimizer |
| | from torch.optim.lr_scheduler import LambdaLR |
| |
|
| | from .utils import logging |
| |
|
| |
|
| | logger = logging.get_logger(__name__) |
| |
|
| |
|
| | class SchedulerType(Enum): |
| | LINEAR = "linear" |
| | COSINE = "cosine" |
| | COSINE_WITH_RESTARTS = "cosine_with_restarts" |
| | POLYNOMIAL = "polynomial" |
| | CONSTANT = "constant" |
| | CONSTANT_WITH_WARMUP = "constant_with_warmup" |
| | PIECEWISE_CONSTANT = "piecewise_constant" |
| |
|
| |
|
| | def get_constant_schedule(optimizer: Optimizer, last_epoch: int = -1) -> LambdaLR: |
| | """ |
| | Create a schedule with a constant learning rate, using the learning rate set in optimizer. |
| | |
| | Args: |
| | optimizer ([`~torch.optim.Optimizer`]): |
| | The optimizer for which to schedule the learning rate. |
| | last_epoch (`int`, *optional*, defaults to -1): |
| | The index of the last epoch when resuming training. |
| | |
| | Return: |
| | `torch.optim.lr_scheduler.LambdaLR` with the appropriate schedule. |
| | """ |
| | return LambdaLR(optimizer, lambda _: 1, last_epoch=last_epoch) |
| |
|
| |
|
| | def get_constant_schedule_with_warmup(optimizer: Optimizer, num_warmup_steps: int, last_epoch: int = -1) -> LambdaLR: |
| | """ |
| | Create a schedule with a constant learning rate preceded by a warmup period during which the learning rate |
| | increases linearly between 0 and the initial lr set in the optimizer. |
| | |
| | Args: |
| | optimizer ([`~torch.optim.Optimizer`]): |
| | The optimizer for which to schedule the learning rate. |
| | num_warmup_steps (`int`): |
| | The number of steps for the warmup phase. |
| | last_epoch (`int`, *optional*, defaults to -1): |
| | The index of the last epoch when resuming training. |
| | |
| | Return: |
| | `torch.optim.lr_scheduler.LambdaLR` with the appropriate schedule. |
| | """ |
| |
|
| | def lr_lambda(current_step: int): |
| | if current_step < num_warmup_steps: |
| | return float(current_step) / float(max(1.0, num_warmup_steps)) |
| | return 1.0 |
| |
|
| | return LambdaLR(optimizer, lr_lambda, last_epoch=last_epoch) |
| |
|
| |
|
| | def get_piecewise_constant_schedule(optimizer: Optimizer, step_rules: str, last_epoch: int = -1) -> LambdaLR: |
| | """ |
| | Create a schedule with a constant learning rate, using the learning rate set in optimizer. |
| | |
| | Args: |
| | optimizer ([`~torch.optim.Optimizer`]): |
| | The optimizer for which to schedule the learning rate. |
| | step_rules (`string`): |
| | The rules for the learning rate. ex: rule_steps="1:10,0.1:20,0.01:30,0.005" it means that the learning rate |
| | if multiple 1 for the first 10 steps, multiple 0.1 for the next 20 steps, multiple 0.01 for the next 30 |
| | steps and multiple 0.005 for the other steps. |
| | last_epoch (`int`, *optional*, defaults to -1): |
| | The index of the last epoch when resuming training. |
| | |
| | Return: |
| | `torch.optim.lr_scheduler.LambdaLR` with the appropriate schedule. |
| | """ |
| |
|
| | rules_dict = {} |
| | rule_list = step_rules.split(",") |
| | for rule_str in rule_list[:-1]: |
| | value_str, steps_str = rule_str.split(":") |
| | steps = int(steps_str) |
| | value = float(value_str) |
| | rules_dict[steps] = value |
| | last_lr_multiple = float(rule_list[-1]) |
| |
|
| | def create_rules_function(rules_dict, last_lr_multiple): |
| | def rule_func(steps: int) -> float: |
| | sorted_steps = sorted(rules_dict.keys()) |
| | for i, sorted_step in enumerate(sorted_steps): |
| | if steps < sorted_step: |
| | return rules_dict[sorted_steps[i]] |
| | return last_lr_multiple |
| |
|
| | return rule_func |
| |
|
| | rules_func = create_rules_function(rules_dict, last_lr_multiple) |
| |
|
| | return LambdaLR(optimizer, rules_func, last_epoch=last_epoch) |
| |
|
| |
|
| | def get_linear_schedule_with_warmup( |
| | optimizer: Optimizer, num_warmup_steps: int, num_training_steps: int, last_epoch: int = -1 |
| | ) -> LambdaLR: |
| | """ |
| | Create a schedule with a learning rate that decreases linearly from the initial lr set in the optimizer to 0, after |
| | a warmup period during which it increases linearly from 0 to the initial lr set in the optimizer. |
| | |
| | Args: |
| | optimizer ([`~torch.optim.Optimizer`]): |
| | The optimizer for which to schedule the learning rate. |
| | num_warmup_steps (`int`): |
| | The number of steps for the warmup phase. |
| | num_training_steps (`int`): |
| | The total number of training steps. |
| | last_epoch (`int`, *optional*, defaults to -1): |
| | The index of the last epoch when resuming training. |
| | |
| | Return: |
| | `torch.optim.lr_scheduler.LambdaLR` with the appropriate schedule. |
| | """ |
| |
|
| | def lr_lambda(current_step: int): |
| | if current_step < num_warmup_steps: |
| | return float(current_step) / float(max(1, num_warmup_steps)) |
| | return max( |
| | 0.0, float(num_training_steps - current_step) / float(max(1, num_training_steps - num_warmup_steps)) |
| | ) |
| |
|
| | return LambdaLR(optimizer, lr_lambda, last_epoch) |
| |
|
| |
|
| | def get_cosine_schedule_with_warmup( |
| | optimizer: Optimizer, num_warmup_steps: int, num_training_steps: int, num_cycles: float = 0.5, last_epoch: int = -1 |
| | ) -> LambdaLR: |
| | """ |
| | Create a schedule with a learning rate that decreases following the values of the cosine function between the |
| | initial lr set in the optimizer to 0, after a warmup period during which it increases linearly between 0 and the |
| | initial lr set in the optimizer. |
| | |
| | Args: |
| | optimizer ([`~torch.optim.Optimizer`]): |
| | The optimizer for which to schedule the learning rate. |
| | num_warmup_steps (`int`): |
| | The number of steps for the warmup phase. |
| | num_training_steps (`int`): |
| | The total number of training steps. |
| | num_periods (`float`, *optional*, defaults to 0.5): |
| | The number of periods of the cosine function in a schedule (the default is to just decrease from the max |
| | value to 0 following a half-cosine). |
| | last_epoch (`int`, *optional*, defaults to -1): |
| | The index of the last epoch when resuming training. |
| | |
| | Return: |
| | `torch.optim.lr_scheduler.LambdaLR` with the appropriate schedule. |
| | """ |
| |
|
| | def lr_lambda(current_step): |
| | if current_step < num_warmup_steps: |
| | return float(current_step) / float(max(1, num_warmup_steps)) |
| | progress = float(current_step - num_warmup_steps) / float(max(1, num_training_steps - num_warmup_steps)) |
| | return max(0.0, 0.5 * (1.0 + math.cos(math.pi * float(num_cycles) * 2.0 * progress))) |
| |
|
| | return LambdaLR(optimizer, lr_lambda, last_epoch) |
| |
|
| |
|
| | def get_cosine_with_hard_restarts_schedule_with_warmup( |
| | optimizer: Optimizer, num_warmup_steps: int, num_training_steps: int, num_cycles: int = 1, last_epoch: int = -1 |
| | ) -> LambdaLR: |
| | """ |
| | Create a schedule with a learning rate that decreases following the values of the cosine function between the |
| | initial lr set in the optimizer to 0, with several hard restarts, after a warmup period during which it increases |
| | linearly between 0 and the initial lr set in the optimizer. |
| | |
| | Args: |
| | optimizer ([`~torch.optim.Optimizer`]): |
| | The optimizer for which to schedule the learning rate. |
| | num_warmup_steps (`int`): |
| | The number of steps for the warmup phase. |
| | num_training_steps (`int`): |
| | The total number of training steps. |
| | num_cycles (`int`, *optional*, defaults to 1): |
| | The number of hard restarts to use. |
| | last_epoch (`int`, *optional*, defaults to -1): |
| | The index of the last epoch when resuming training. |
| | |
| | Return: |
| | `torch.optim.lr_scheduler.LambdaLR` with the appropriate schedule. |
| | """ |
| |
|
| | def lr_lambda(current_step): |
| | if current_step < num_warmup_steps: |
| | return float(current_step) / float(max(1, num_warmup_steps)) |
| | progress = float(current_step - num_warmup_steps) / float(max(1, num_training_steps - num_warmup_steps)) |
| | if progress >= 1.0: |
| | return 0.0 |
| | return max(0.0, 0.5 * (1.0 + math.cos(math.pi * ((float(num_cycles) * progress) % 1.0)))) |
| |
|
| | return LambdaLR(optimizer, lr_lambda, last_epoch) |
| |
|
| |
|
| | def get_polynomial_decay_schedule_with_warmup( |
| | optimizer: Optimizer, |
| | num_warmup_steps: int, |
| | num_training_steps: int, |
| | lr_end: float = 1e-7, |
| | power: float = 1.0, |
| | last_epoch: int = -1, |
| | ) -> LambdaLR: |
| | """ |
| | Create a schedule with a learning rate that decreases as a polynomial decay from the initial lr set in the |
| | optimizer to end lr defined by *lr_end*, after a warmup period during which it increases linearly from 0 to the |
| | initial lr set in the optimizer. |
| | |
| | Args: |
| | optimizer ([`~torch.optim.Optimizer`]): |
| | The optimizer for which to schedule the learning rate. |
| | num_warmup_steps (`int`): |
| | The number of steps for the warmup phase. |
| | num_training_steps (`int`): |
| | The total number of training steps. |
| | lr_end (`float`, *optional*, defaults to 1e-7): |
| | The end LR. |
| | power (`float`, *optional*, defaults to 1.0): |
| | Power factor. |
| | last_epoch (`int`, *optional*, defaults to -1): |
| | The index of the last epoch when resuming training. |
| | |
| | Note: *power* defaults to 1.0 as in the fairseq implementation, which in turn is based on the original BERT |
| | implementation at |
| | https://github.com/google-research/bert/blob/f39e881b169b9d53bea03d2d341b31707a6c052b/optimization.py#L37 |
| | |
| | Return: |
| | `torch.optim.lr_scheduler.LambdaLR` with the appropriate schedule. |
| | |
| | """ |
| |
|
| | lr_init = optimizer.defaults["lr"] |
| | if not (lr_init > lr_end): |
| | raise ValueError(f"lr_end ({lr_end}) must be smaller than initial lr ({lr_init})") |
| |
|
| | def lr_lambda(current_step: int): |
| | if current_step < num_warmup_steps: |
| | return float(current_step) / float(max(1, num_warmup_steps)) |
| | elif current_step > num_training_steps: |
| | return lr_end / lr_init |
| | else: |
| | lr_range = lr_init - lr_end |
| | decay_steps = num_training_steps - num_warmup_steps |
| | pct_remaining = 1 - (current_step - num_warmup_steps) / decay_steps |
| | decay = lr_range * pct_remaining**power + lr_end |
| | return decay / lr_init |
| |
|
| | return LambdaLR(optimizer, lr_lambda, last_epoch) |
| |
|
| |
|
| | TYPE_TO_SCHEDULER_FUNCTION = { |
| | SchedulerType.LINEAR: get_linear_schedule_with_warmup, |
| | SchedulerType.COSINE: get_cosine_schedule_with_warmup, |
| | SchedulerType.COSINE_WITH_RESTARTS: get_cosine_with_hard_restarts_schedule_with_warmup, |
| | SchedulerType.POLYNOMIAL: get_polynomial_decay_schedule_with_warmup, |
| | SchedulerType.CONSTANT: get_constant_schedule, |
| | SchedulerType.CONSTANT_WITH_WARMUP: get_constant_schedule_with_warmup, |
| | SchedulerType.PIECEWISE_CONSTANT: get_piecewise_constant_schedule, |
| | } |
| |
|
| |
|
| | def get_scheduler( |
| | name: Union[str, SchedulerType], |
| | optimizer: Optimizer, |
| | step_rules: Optional[str] = None, |
| | num_warmup_steps: Optional[int] = None, |
| | num_training_steps: Optional[int] = None, |
| | num_cycles: int = 1, |
| | power: float = 1.0, |
| | last_epoch: int = -1, |
| | ) -> LambdaLR: |
| | """ |
| | Unified API to get any scheduler from its name. |
| | |
| | Args: |
| | name (`str` or `SchedulerType`): |
| | The name of the scheduler to use. |
| | optimizer (`torch.optim.Optimizer`): |
| | The optimizer that will be used during training. |
| | step_rules (`str`, *optional*): |
| | A string representing the step rules to use. This is only used by the `PIECEWISE_CONSTANT` scheduler. |
| | num_warmup_steps (`int`, *optional*): |
| | The number of warmup steps to do. This is not required by all schedulers (hence the argument being |
| | optional), the function will raise an error if it's unset and the scheduler type requires it. |
| | num_training_steps (`int``, *optional*): |
| | The number of training steps to do. This is not required by all schedulers (hence the argument being |
| | optional), the function will raise an error if it's unset and the scheduler type requires it. |
| | num_cycles (`int`, *optional*): |
| | The number of hard restarts used in `COSINE_WITH_RESTARTS` scheduler. |
| | power (`float`, *optional*, defaults to 1.0): |
| | Power factor. See `POLYNOMIAL` scheduler |
| | last_epoch (`int`, *optional*, defaults to -1): |
| | The index of the last epoch when resuming training. |
| | """ |
| | name = SchedulerType(name) |
| | schedule_func = TYPE_TO_SCHEDULER_FUNCTION[name] |
| | if name == SchedulerType.CONSTANT: |
| | return schedule_func(optimizer, last_epoch=last_epoch) |
| |
|
| | if name == SchedulerType.PIECEWISE_CONSTANT: |
| | return schedule_func(optimizer, step_rules=step_rules, last_epoch=last_epoch) |
| |
|
| | |
| | if num_warmup_steps is None: |
| | raise ValueError(f"{name} requires `num_warmup_steps`, please provide that argument.") |
| |
|
| | if name == SchedulerType.CONSTANT_WITH_WARMUP: |
| | return schedule_func(optimizer, num_warmup_steps=num_warmup_steps, last_epoch=last_epoch) |
| |
|
| | |
| | if num_training_steps is None: |
| | raise ValueError(f"{name} requires `num_training_steps`, please provide that argument.") |
| |
|
| | if name == SchedulerType.COSINE_WITH_RESTARTS: |
| | return schedule_func( |
| | optimizer, |
| | num_warmup_steps=num_warmup_steps, |
| | num_training_steps=num_training_steps, |
| | num_cycles=num_cycles, |
| | last_epoch=last_epoch, |
| | ) |
| |
|
| | if name == SchedulerType.POLYNOMIAL: |
| | return schedule_func( |
| | optimizer, |
| | num_warmup_steps=num_warmup_steps, |
| | num_training_steps=num_training_steps, |
| | power=power, |
| | last_epoch=last_epoch, |
| | ) |
| |
|
| | return schedule_func( |
| | optimizer, num_warmup_steps=num_warmup_steps, num_training_steps=num_training_steps, last_epoch=last_epoch |
| | ) |
| |
|
