Source code for mindspore.nn.dynamic_lr

# Copyright 2020 Huawei Technologies Co., Ltd
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"""dynamic learning rate"""
import math

from mindspore._checkparam import Validator as validator
from mindspore._checkparam import Rel


[docs]def piecewise_constant_lr(milestone, learning_rates): r""" Get piecewise constant learning rate. Calculate learning rate by given `milestone` and `learning_rates`. Let the value of `milestone` be :math:`(M_1, M_2, ..., M_N)` and the value of `learning_rates` be :math:`(x_1, x_2, ..., x_N)`. N is the length of `milestone`. Let the output learning rate be `y`. .. math:: y[i] = x_t,\ for\ i \in [M_{t-1}, M_t) Args: milestone (Union[list[int], tuple[int]]): A list of milestone. This list is a monotone increasing list. Every element is a milestone step, and must be greater than 0. learning_rates (Union[list[float], tuple[float]]): A list of learning rates. Returns: list[float]. The size of list is :math:`M_N`. Examples: >>> milestone = [2, 5, 10] >>> learning_rates = [0.1, 0.05, 0.01] >>> piecewise_constant_lr(milestone, learning_rates) [0.1, 0.1, 0.05, 0.05, 0.05, 0.01, 0.01, 0.01, 0.01, 0.01] """ validator.check_value_type('milestone', milestone, (tuple, list), None) validator.check_value_type('learning_rates', learning_rates, (tuple, list), None) if len(milestone) != len(learning_rates): raise ValueError('The size of `milestone` must be same with the size of `learning_rates`.') lr = [] last_item = 0 for i, item in enumerate(milestone): validator.check_integer(f'milestone[{i}]', item, 0, Rel.GT, None) validator.check_float_legal_value(f'learning_rates[{i}]', learning_rates[i], None) if item < last_item: raise ValueError(f'The value of milestone[{i}] must be greater than milestone[{i - 1}]') lr += [learning_rates[i]] * (item - last_item) last_item = item return lr
def _check_inputs(learning_rate, decay_rate, total_step, step_per_epoch, decay_epoch, is_stair): validator.check_integer('total_step', total_step, 0, Rel.GT, None) validator.check_integer('step_per_epoch', step_per_epoch, 0, Rel.GT, None) validator.check_integer('decay_epoch', decay_epoch, 0, Rel.GT, None) validator.check_float_positive('learning_rate', learning_rate, None) validator.check_float_legal_value('learning_rate', learning_rate, None) validator.check_float_positive('decay_rate', decay_rate, None) validator.check_float_legal_value('decay_rate', decay_rate, None) validator.check_value_type('is_stair', is_stair, [bool], None)
[docs]def exponential_decay_lr(learning_rate, decay_rate, total_step, step_per_epoch, decay_epoch, is_stair=False): r""" Calculate learning rate base on exponential decay function. For the i-th step, the formula of computing decayed_learning_rate[i] is: .. math:: decayed\_learning\_rate[i] = learning\_rate * decay\_rate^{\frac{current\_epoch}{decay\_epoch}} Where :math:`current\_epoch=floor(\frac{i}{step\_per\_epoch})`. Args: learning_rate (float): The initial value of learning rate. decay_rate (float): The decay rate. total_step (int): The total number of steps. step_per_epoch (int): The number of steps in per epoch. decay_epoch (int): A value used to calculate decayed learning rate. is_stair (bool): If true, learning rate decay once every `decay_epoch` times. Default: False. Returns: list[float]. The size of list is `total_step`. Examples: >>> learning_rate = 0.1 >>> decay_rate = 0.9 >>> total_step = 6 >>> step_per_epoch = 2 >>> decay_epoch = 1 >>> exponential_decay_lr(learning_rate, decay_rate, total_step, step_per_epoch, decay_epoch) [0.1, 0.1, 0.09000000000000001, 0.09000000000000001, 0.08100000000000002, 0.08100000000000002] """ _check_inputs(learning_rate, decay_rate, total_step, step_per_epoch, decay_epoch, is_stair) lr = [] for i in range(total_step): if is_stair: lr.append(learning_rate * decay_rate ** math.floor(math.floor(i / step_per_epoch) / decay_epoch)) else: lr.append(learning_rate * decay_rate ** (math.floor(i / step_per_epoch) / decay_epoch)) return lr
[docs]def natural_exp_decay_lr(learning_rate, decay_rate, total_step, step_per_epoch, decay_epoch, is_stair=False): r""" Calculate learning rate base on natural exponential decay function. For the i-th step, the formula of computing decayed_learning_rate[i] is: .. math:: decayed\_learning\_rate[i] = learning\_rate * e^{-decay\_rate * current\_epoch} Where :math:`current\_epoch=floor(\frac{i}{step\_per\_epoch})`. Args: learning_rate (float): The initial value of learning rate. decay_rate (float): The decay rate. total_step (int): The total number of steps. step_per_epoch (int): The number of steps in per epoch. decay_epoch (int): A value used to calculate decayed learning rate. is_stair (bool): If true, learning rate decay once every `decay_epoch` times. Default: False. Returns: list[float]. The size of list is `total_step`. Examples: >>> learning_rate = 0.1 >>> decay_rate = 0.9 >>> total_step = 6 >>> step_per_epoch = 2 >>> decay_epoch = 2 >>> natural_exp_decay_lr(learning_rate, decay_rate, total_step, step_per_epoch, decay_epoch, True) [0.1, 0.1, 0.1, 0.1, 0.016529888822158657, 0.016529888822158657] """ _check_inputs(learning_rate, decay_rate, total_step, step_per_epoch, decay_epoch, is_stair) function = lambda x, y: x if is_stair: function = lambda x, y: math.floor(x / y) * y lr = [] for i in range(total_step): lr.append(learning_rate * math.e ** (-decay_rate * function(math.floor(i / step_per_epoch), decay_epoch))) return lr
[docs]def inverse_decay_lr(learning_rate, decay_rate, total_step, step_per_epoch, decay_epoch, is_stair=False): r""" Calculate learning rate base on inverse-time decay function. For the i-th step, the formula of computing decayed_learning_rate[i] is: .. math:: decayed\_learning\_rate[i] = learning\_rate / (1 + decay\_rate * current\_epoch / decay\_epoch) Where :math:`current\_epoch=floor(\frac{i}{step\_per\_epoch})`. Args: learning_rate (float): The initial value of learning rate. decay_rate (float): The decay rate. total_step (int): The total number of steps. step_per_epoch (int): The number of steps in per epoch. decay_epoch (int): A value used to calculate decayed learning rate. is_stair (bool): If true, learning rate decay once every `decay_epoch` times. Default: False. Returns: list[float]. The size of list is `total_step`. Examples: >>> learning_rate = 0.1 >>> decay_rate = 0.5 >>> total_step = 6 >>> step_per_epoch = 1 >>> decay_epoch = 1 >>> inverse_decay_lr(learning_rate, decay_rate, total_step, step_per_epoch, decay_epoch, True) [0.1, 0.06666666666666667, 0.05, 0.04, 0.03333333333333333, 0.028571428571428574] """ _check_inputs(learning_rate, decay_rate, total_step, step_per_epoch, decay_epoch, is_stair) lr = [] for i in range(total_step): if is_stair: lr.append(learning_rate / (1 + decay_rate * math.floor(math.floor(i / step_per_epoch) / decay_epoch))) else: lr.append(learning_rate / (1 + decay_rate * math.floor(i / step_per_epoch) / decay_epoch)) return lr
[docs]def cosine_decay_lr(min_lr, max_lr, total_step, step_per_epoch, decay_epoch): r""" Calculate learning rate base on cosine decay function. For the i-th step, the formula of computing decayed_learning_rate[i] is: .. math:: decayed\_learning\_rate[i] = min\_learning\_rate + 0.5 * (max\_learning\_rate - min\_learning\_rate) * (1 + cos(\frac{current\_epoch}{decay\_epoch}\pi)) Where :math:`current\_epoch=floor(\frac{i}{step\_per\_epoch})`. Args: min_lr (float): The minimum value of learning rate. max_lr (float): The maximum value of learning rate. total_step (int): The total number of steps. step_per_epoch (int): The number of steps in per epoch. decay_epoch (int): A value used to calculate decayed learning rate. Returns: list[float]. The size of list is `total_step`. Examples: >>> min_lr = 0.01 >>> max_lr = 0.1 >>> total_step = 6 >>> step_per_epoch = 2 >>> decay_epoch = 2 >>> cosine_decay_lr(min_lr, max_lr, total_step, step_per_epoch, decay_epoch) [0.1, 0.1, 0.05500000000000001, 0.05500000000000001, 0.01, 0.01] """ if not isinstance(min_lr, float): raise TypeError("min_lr must be float.") validator.check_number_range("min_lr", min_lr, 0.0, float("inf"), Rel.INC_LEFT, None) validator.check_float_positive('max_lr', max_lr, None) validator.check_float_legal_value('max_lr', max_lr, None) validator.check_integer('total_step', total_step, 0, Rel.GT, None) validator.check_integer('step_per_epoch', step_per_epoch, 0, Rel.GT, None) validator.check_integer('decay_epoch', decay_epoch, 0, Rel.GT, None) if min_lr >= max_lr: raise ValueError('`max_lr` should be greater than `min_lr`.') delta = 0.5 * (max_lr - min_lr) lr = [] for i in range(total_step): tmp_epoch = min(math.floor(i / step_per_epoch), decay_epoch) lr.append(min_lr + delta * (1 + math.cos(math.pi * tmp_epoch / decay_epoch))) return lr
[docs]def polynomial_decay_lr(learning_rate, end_learning_rate, total_step, step_per_epoch, decay_epoch, power, update_decay_epoch=False): r""" Calculate learning rate base on polynomial decay function. For the i-th step, the formula of computing decayed_learning_rate[i] is: .. math:: decayed\_learning\_rate[i] = (learning\_rate - end\_learning\_rate) * (1 - tmp\_epoch / tmp\_decay\_epoch)^{power} + end\_learning\_rate Where :math:`tmp\_epoch=min(current\_epoch, decay\_epoch),\ current\_epoch=floor(\frac{i}{step\_per\_epoch})`, and :math:`tmp\_decay\_epoch = decay\_epoch`. If `update_decay_epoch` is true, update the value of `tmp_decay_epoch` every epoch. The formula is :math:`tmp\_decay\_epoch = decay\_epoch * ceil(current\_epoch / decay\_epoch)` Args: learning_rate (float): The initial value of learning rate. end_learning_rate (float): The end value of learning rate. total_step (int): The total number of steps. step_per_epoch (int): The number of steps in per epoch. decay_epoch (int): A value used to calculate decayed learning rate. power (float): A value used to calculate decayed learning rate. This parameter should be greater than 0. update_decay_epoch (bool): If true, update `decay_epoch`. Default: False. Returns: list[float]. The size of list is `total_step`. Examples: >>> learning_rate = 0.1 >>> end_learning_rate = 0.01 >>> total_step = 6 >>> step_per_epoch = 2 >>> decay_epoch = 2 >>> power = 0.5 >>> polynomial_decay_lr(learning_rate, end_learning_rate, total_step, step_per_epoch, decay_epoch, power) [0.1, 0.1, 0.07363961030678928, 0.07363961030678928, 0.01, 0.01] """ validator.check_float_positive('learning_rate', learning_rate, None) validator.check_float_legal_value('learning_rate', learning_rate, None) if not isinstance(end_learning_rate, float): raise TypeError("end_learning_rate must be float.") validator.check_number_range("end_learning_rate", end_learning_rate, 0.0, float("inf"), Rel.INC_LEFT, None) validator.check_float_positive('power', power, None) validator.check_float_legal_value('power', power, None) validator.check_integer('total_step', total_step, 0, Rel.GT, None) validator.check_integer('step_per_epoch', step_per_epoch, 0, Rel.GT, None) validator.check_integer('decay_epoch', decay_epoch, 0, Rel.GT, None) validator.check_value_type('update_decay_epoch', update_decay_epoch, [bool], None) origin_decay_epoch = decay_epoch function = lambda x, y: (x, min(x, y)) if update_decay_epoch: function = lambda x, y: (origin_decay_epoch * max(math.ceil(y / origin_decay_epoch), 1), y) lr = [] delta = learning_rate - end_learning_rate for i in range(total_step): current_epoch = math.floor(i / step_per_epoch) decay_epoch, tmp_epoch = function(decay_epoch, current_epoch) lr.append(delta * (1 - tmp_epoch / decay_epoch) ** power + end_learning_rate) return lr
[docs]def warmup_lr(learning_rate, total_step, step_per_epoch, warmup_epoch): r""" Get learning rate warming up. For the i-th step, the formula of computing warmup_learning_rate[i] is: .. math:: warmup\_learning\_rate[i] = learning\_rate * tmp\_epoch / tmp\_warmup\_epoch Where :math:`tmp\_epoch=min(current\_epoch, warmup\_epoch),\ current\_epoch=floor(\frac{i}{step\_per\_epoch})` Args: learning_rate (float): The initial value of learning rate. warmup_steps (int): The warm up steps of learning rate. Inputs: Tensor. The current step number. Returns: Tensor. The learning rate value for the current step. Examples: >>> learning_rate = 0.1 >>> total_step = 6 >>> step_per_epoch = 2 >>> warmup_epoch = 2 >>> warmup_lr(learning_rate, total_step, step_per_epoch, warmup_epoch) [0.0, 0.0, 0.05, 0.05, 0.1, 0.1] """ if not isinstance(learning_rate, float): raise TypeError("learning_rate must be float.") validator.check_number_range("learning_rate", learning_rate, 0.0, float("inf"), Rel.INC_LEFT, None) validator.check_integer('warmup_epoch', warmup_epoch, 0, Rel.GT, None) validator.check_integer('total_step', total_step, 0, Rel.GT, None) validator.check_integer('step_per_epoch', step_per_epoch, 0, Rel.GT, None) function = lambda x, y: (x, min(x, y)) lr = [] for i in range(total_step): current_epoch = math.floor(i / step_per_epoch) warmup_epoch, tmp_epoch = function(warmup_epoch, current_epoch) lr.append(learning_rate * tmp_epoch/ warmup_epoch) return lr
__all__ = [ 'piecewise_constant_lr', 'exponential_decay_lr', 'natural_exp_decay_lr', 'inverse_decay_lr', 'cosine_decay_lr', 'polynomial_decay_lr', 'warmup_lr' ]