172 lines
5.9 KiB
Python
172 lines
5.9 KiB
Python
r"""
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The ``distributions`` package contains parameterizable probability distributions
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and sampling functions. This allows the construction of stochastic computation
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graphs and stochastic gradient estimators for optimization. This package
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generally follows the design of the `TensorFlow Distributions`_ package.
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.. _`TensorFlow Distributions`:
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https://arxiv.org/abs/1711.10604
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It is not possible to directly backpropagate through random samples. However,
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there are two main methods for creating surrogate functions that can be
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backpropagated through. These are the score function estimator/likelihood ratio
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estimator/REINFORCE and the pathwise derivative estimator. REINFORCE is commonly
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seen as the basis for policy gradient methods in reinforcement learning, and the
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pathwise derivative estimator is commonly seen in the reparameterization trick
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in variational autoencoders. Whilst the score function only requires the value
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of samples :math:`f(x)`, the pathwise derivative requires the derivative
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:math:`f'(x)`. The next sections discuss these two in a reinforcement learning
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example. For more details see
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`Gradient Estimation Using Stochastic Computation Graphs`_ .
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.. _`Gradient Estimation Using Stochastic Computation Graphs`:
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https://arxiv.org/abs/1506.05254
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Score function
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^^^^^^^^^^^^^^
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When the probability density function is differentiable with respect to its
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parameters, we only need :meth:`~torch.distributions.Distribution.sample` and
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:meth:`~torch.distributions.Distribution.log_prob` to implement REINFORCE:
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.. math::
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\Delta\theta = \alpha r \frac{\partial\log p(a|\pi^\theta(s))}{\partial\theta}
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where :math:`\theta` are the parameters, :math:`\alpha` is the learning rate,
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:math:`r` is the reward and :math:`p(a|\pi^\theta(s))` is the probability of
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taking action :math:`a` in state :math:`s` given policy :math:`\pi^\theta`.
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In practice we would sample an action from the output of a network, apply this
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action in an environment, and then use ``log_prob`` to construct an equivalent
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loss function. Note that we use a negative because optimizers use gradient
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descent, whilst the rule above assumes gradient ascent. With a categorical
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policy, the code for implementing REINFORCE would be as follows::
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probs = policy_network(state)
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# Note that this is equivalent to what used to be called multinomial
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m = Categorical(probs)
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action = m.sample()
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next_state, reward = env.step(action)
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loss = -m.log_prob(action) * reward
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loss.backward()
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Pathwise derivative
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^^^^^^^^^^^^^^^^^^^
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The other way to implement these stochastic/policy gradients would be to use the
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reparameterization trick from the
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:meth:`~torch.distributions.Distribution.rsample` method, where the
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parameterized random variable can be constructed via a parameterized
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deterministic function of a parameter-free random variable. The reparameterized
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sample therefore becomes differentiable. The code for implementing the pathwise
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derivative would be as follows::
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params = policy_network(state)
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m = Normal(*params)
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# Any distribution with .has_rsample == True could work based on the application
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action = m.rsample()
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next_state, reward = env.step(action) # Assuming that reward is differentiable
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loss = -reward
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loss.backward()
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"""
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from .bernoulli import Bernoulli
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from .beta import Beta
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from .binomial import Binomial
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from .categorical import Categorical
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from .cauchy import Cauchy
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from .chi2 import Chi2
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from .constraint_registry import biject_to, transform_to
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from .continuous_bernoulli import ContinuousBernoulli
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from .dirichlet import Dirichlet
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from .distribution import Distribution
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from .exp_family import ExponentialFamily
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from .exponential import Exponential
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from .fishersnedecor import FisherSnedecor
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from .gamma import Gamma
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from .geometric import Geometric
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from .gumbel import Gumbel
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from .half_cauchy import HalfCauchy
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from .half_normal import HalfNormal
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from .independent import Independent
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from .inverse_gamma import InverseGamma
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from .kl import _add_kl_info, kl_divergence, register_kl
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from .kumaraswamy import Kumaraswamy
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from .laplace import Laplace
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from .lkj_cholesky import LKJCholesky
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from .log_normal import LogNormal
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from .logistic_normal import LogisticNormal
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from .lowrank_multivariate_normal import LowRankMultivariateNormal
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from .mixture_same_family import MixtureSameFamily
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from .multinomial import Multinomial
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from .multivariate_normal import MultivariateNormal
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from .negative_binomial import NegativeBinomial
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from .normal import Normal
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from .one_hot_categorical import OneHotCategorical, OneHotCategoricalStraightThrough
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from .pareto import Pareto
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from .poisson import Poisson
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from .relaxed_bernoulli import RelaxedBernoulli
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from .relaxed_categorical import RelaxedOneHotCategorical
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from .studentT import StudentT
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from .transformed_distribution import TransformedDistribution
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from .transforms import * # noqa: F403
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from . import transforms
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from .uniform import Uniform
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from .von_mises import VonMises
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from .weibull import Weibull
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from .wishart import Wishart
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_add_kl_info()
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del _add_kl_info
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__all__ = [
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"Bernoulli",
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"Beta",
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"Binomial",
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"Categorical",
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"Cauchy",
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"Chi2",
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"ContinuousBernoulli",
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"Dirichlet",
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"Distribution",
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"Exponential",
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"ExponentialFamily",
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"FisherSnedecor",
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"Gamma",
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"Geometric",
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"Gumbel",
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"HalfCauchy",
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"HalfNormal",
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"Independent",
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"InverseGamma",
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"Kumaraswamy",
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"LKJCholesky",
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"Laplace",
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"LogNormal",
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"LogisticNormal",
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"LowRankMultivariateNormal",
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"MixtureSameFamily",
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"Multinomial",
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"MultivariateNormal",
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"NegativeBinomial",
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"Normal",
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"OneHotCategorical",
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"OneHotCategoricalStraightThrough",
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"Pareto",
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"RelaxedBernoulli",
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"RelaxedOneHotCategorical",
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"StudentT",
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"Poisson",
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"Uniform",
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"VonMises",
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"Weibull",
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"Wishart",
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"TransformedDistribution",
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"biject_to",
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"kl_divergence",
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"register_kl",
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"transform_to",
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]
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__all__.extend(transforms.__all__)
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