# Copyright (c) 2021 PaddlePaddle Authors. All Rights Reserved. # # 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 math import warnings import numpy as np from paddle import _C_ops from ..fluid import core from ..fluid.data_feeder import (check_dtype, check_type, check_variable_and_dtype, convert_dtype) from ..fluid.framework import _non_static_mode from ..fluid.layers import (control_flow, elementwise_add, elementwise_div, elementwise_mul, elementwise_sub, nn, ops, tensor) from ..tensor import arange, concat, gather_nd, multinomial from .distribution import Distribution class Normal(Distribution): r"""The Normal distribution with location `loc` and `scale` parameters. Mathematical details The probability density function (pdf) is .. math:: pdf(x; \mu, \sigma) = \\frac{1}{Z}e^{\\frac {-0.5 (x - \mu)^2} {\sigma^2} } .. math:: Z = (2 \pi \sigma^2)^{0.5} In the above equation: * :math:`loc = \mu`: is the mean. * :math:`scale = \sigma`: is the std. * :math:`Z`: is the normalization constant. Args: loc(int|float|list|tuple|numpy.ndarray|Tensor): The mean of normal distribution.The data type is int, float, list, numpy.ndarray or Tensor. scale(int|float|list|tuple|numpy.ndarray|Tensor): The std of normal distribution.The data type is int, float, list, numpy.ndarray or Tensor. name(str, optional): Name for the operation (optional, default is None). For more information, please refer to :ref:`api_guide_Name`. Examples: .. code-block:: python import paddle from paddle.distribution import Normal # Define a single scalar Normal distribution. dist = Normal(loc=0., scale=3.) # Define a batch of two scalar valued Normals. # The first has mean 1 and standard deviation 11, the second 2 and 22. dist = Normal(loc=[1., 2.], scale=[11., 22.]) # Get 3 samples, returning a 3 x 2 tensor. dist.sample([3]) # Define a batch of two scalar valued Normals. # Both have mean 1, but different standard deviations. dist = Normal(loc=1., scale=[11., 22.]) # Complete example value_tensor = paddle.to_tensor([0.8], dtype="float32") normal_a = Normal([0.], [1.]) normal_b = Normal([0.5], [2.]) sample = normal_a.sample([2]) # a random tensor created by normal distribution with shape: [2, 1] entropy = normal_a.entropy() # [1.4189385] with shape: [1] lp = normal_a.log_prob(value_tensor) # [-1.2389386] with shape: [1] p = normal_a.probs(value_tensor) # [0.28969154] with shape: [1] kl = normal_a.kl_divergence(normal_b) # [0.34939718] with shape: [1] """ def __init__(self, loc, scale, name=None): if not _non_static_mode(): check_type(loc, 'loc', (int, float, np.ndarray, tensor.Variable, list, tuple), 'Normal') check_type(scale, 'scale', (int, float, np.ndarray, tensor.Variable, list, tuple), 'Normal') self.batch_size_unknown = False self.all_arg_is_float = False self.name = name if name is not None else 'Normal' self.dtype = 'float32' if isinstance(loc, int): loc = float(loc) if isinstance(scale, int): scale = float(scale) if self._validate_args(loc, scale): self.batch_size_unknown = True self.loc = loc self.scale = scale self.dtype = convert_dtype(loc.dtype) else: if isinstance(loc, float) and isinstance(scale, float): self.all_arg_is_float = True if isinstance( loc, np.ndarray) and str(loc.dtype) in ['float32', 'float64']: self.dtype = loc.dtype elif isinstance( scale, np.ndarray) and str(scale.dtype) in ['float32', 'float64']: self.dtype = scale.dtype # pylint: disable=unbalanced-tuple-unpacking self.loc, self.scale = self._to_tensor(loc, scale) if self.dtype != convert_dtype(self.loc.dtype): self.loc = tensor.cast(self.loc, dtype=self.dtype) self.scale = tensor.cast(self.scale, dtype=self.dtype) def sample(self, shape, seed=0): """Generate samples of the specified shape. Args: shape (list): 1D `int32`. Shape of the generated samples. seed (int): Python integer number. Returns: Tensor: A tensor with prepended dimensions shape.The data type is float32. """ if not _non_static_mode(): check_type(shape, 'shape', (list), 'sample') check_type(seed, 'seed', (int), 'sample') batch_shape = list((self.loc + self.scale).shape) name = self.name + '_sample' if self.batch_size_unknown: output_shape = shape + batch_shape zero_tmp = tensor.fill_constant_batch_size_like( self.loc + self.scale, batch_shape + shape, self.dtype, 0.) zero_tmp_reshape = nn.reshape(zero_tmp, output_shape) zero_tmp_shape = nn.shape(zero_tmp_reshape) normal_random_tmp = nn.gaussian_random( zero_tmp_shape, mean=0., std=1., seed=seed, dtype=self.dtype) output = normal_random_tmp * (zero_tmp_reshape + self.scale) output = elementwise_add(output, self.loc, name=name) return output else: output_shape = shape + batch_shape output = nn.gaussian_random(output_shape, mean=0., std=1., seed=seed, dtype=self.dtype) * \ (tensor.zeros(output_shape, dtype=self.dtype) + self.scale) output = elementwise_add(output, self.loc, name=name) if self.all_arg_is_float: return nn.reshape(output, shape, name=name) else: return output def entropy(self): r"""Shannon entropy in nats. The entropy is .. math:: entropy(\sigma) = 0.5 \\log (2 \pi e \sigma^2) In the above equation: * :math:`scale = \sigma`: is the std. Returns: Tensor: Shannon entropy of normal distribution.The data type is float32. """ name = self.name + '_entropy' batch_shape = list((self.loc + self.scale).shape) zero_tmp = tensor.fill_constant_batch_size_like( self.loc + self.scale, batch_shape, self.dtype, 0.) return elementwise_add( 0.5 + zero_tmp, 0.5 * math.log(2 * math.pi) + nn.log((self.scale + zero_tmp)), name=name) def log_prob(self, value): """Log probability density/mass function. Args: value (Tensor): The input tensor. Returns: Tensor: log probability.The data type is same with value. """ name = self.name + '_log_prob' value = self._check_values_dtype_in_probs(self.loc, value) var = self.scale * self.scale log_scale = nn.log(self.scale) return elementwise_sub( -1. * ((value - self.loc) * (value - self.loc)) / (2. * var), log_scale + math.log(math.sqrt(2. * math.pi)), name=name) def probs(self, value): """Probability density/mass function. Args: value (Tensor): The input tensor. Returns: Tensor: probability.The data type is same with value. """ name = self.name + '_probs' value = self._check_values_dtype_in_probs(self.loc, value) var = self.scale * self.scale return elementwise_div( ops.exp(-1. * ((value - self.loc) * (value - self.loc)) / (2. * var)), (math.sqrt(2 * math.pi) * self.scale), name=name) def kl_divergence(self, other): r"""The KL-divergence between two normal distributions. The probability density function (pdf) is .. math:: KL\_divergence(\mu_0, \sigma_0; \mu_1, \sigma_1) = 0.5 (ratio^2 + (\\frac{diff}{\sigma_1})^2 - 1 - 2 \\ln {ratio}) .. math:: ratio = \\frac{\sigma_0}{\sigma_1} .. math:: diff = \mu_1 - \mu_0 In the above equation: * :math:`loc = \mu_0`: is the mean of current Normal distribution. * :math:`scale = \sigma_0`: is the std of current Normal distribution. * :math:`loc = \mu_1`: is the mean of other Normal distribution. * :math:`scale = \sigma_1`: is the std of other Normal distribution. * :math:`ratio`: is the ratio of scales. * :math:`diff`: is the difference between means. Args: other (Normal): instance of Normal. Returns: Tensor: kl-divergence between two normal distributions.The data type is float32. """ if not _non_static_mode(): check_type(other, 'other', Normal, 'kl_divergence') name = self.name + '_kl_divergence' var_ratio = self.scale / other.scale var_ratio = (var_ratio * var_ratio) t1 = (self.loc - other.loc) / other.scale t1 = (t1 * t1) return elementwise_add( 0.5 * var_ratio, 0.5 * (t1 - 1. - nn.log(var_ratio)), name=name)