# Copyright 2023 The JAX 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 # # https://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 from jax import lax import jax.numpy as jnp from jax._src.numpy.util import promote_args_inexact from jax._src.lax.lax import _const as _lax_const from jax._src.scipy.special import gammaln, xlogy, xlog1py from jax._src.typing import Array, ArrayLike def logpmf(k: ArrayLike, n: ArrayLike, p: ArrayLike, loc: ArrayLike = 0) -> Array: r"""Binomial log probability mass function. JAX implementation of :obj:`scipy.stats.binom` ``logpmf``. The binomial probability mass function is defined as .. math:: f(k, n, p) = {n \choose k}p^k(1-p)^{n-k} for :math:`0\le p\le 1` and non-negative integers :math:`k`. Args: k: arraylike, value at which to evaluate the PMF n: arraylike, distribution shape parameter p: arraylike, distribution shape parameter loc: arraylike, distribution offset parameter Returns: array of logpmf values. See Also: :func:`jax.scipy.stats.binom.pmf` """ k, n, p, loc = promote_args_inexact("binom.logpmf", k, n, p, loc) y = lax.sub(k, loc) zero = _lax_const(y, 0) comb_term = lax.sub( gammaln(n + 1), lax.add(gammaln(y + 1), gammaln(n - y + 1)) ) log_linear_term = lax.add(xlogy(y, p), xlog1py(lax.sub(n, y), lax.neg(p))) log_probs = lax.add(comb_term, log_linear_term) y_n_cond = jnp.logical_or(jnp.logical_and(lax.eq(y, zero), lax.eq(n, zero)), lax.eq(log_linear_term, zero)) log_probs = jnp.where(y_n_cond, 0., log_probs) return jnp.where(lax.ge(k, loc) & lax.lt(k, loc + n + 1), log_probs, -jnp.inf) def pmf(k: ArrayLike, n: ArrayLike, p: ArrayLike, loc: ArrayLike = 0) -> Array: r"""Binomial probability mass function. JAX implementation of :obj:`scipy.stats.binom` ``pmf``. The binomial probability mass function is defined as .. math:: f(k, n, p) = {n \choose k}p^k(1-p)^{n-k} for :math:`0\le p\le 1` and non-negative integers :math:`k`. Args: k: arraylike, value at which to evaluate the PMF n: arraylike, distribution shape parameter p: arraylike, distribution shape parameter loc: arraylike, distribution offset parameter Returns: array of pmf values. See Also: :func:`jax.scipy.stats.binom.logpmf` """ return lax.exp(logpmf(k, n, p, loc))