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Zero
# Copyright (c) 2023 Amphion. | |
# | |
# This source code is licensed under the MIT license found in the | |
# LICENSE file in the root directory of this source tree. | |
import numpy as np | |
import torch | |
import torch.nn.functional as F | |
from torch.distributions import Normal | |
def log_sum_exp(x): | |
"""numerically stable log_sum_exp implementation that prevents overflow""" | |
# TF ordering | |
axis = len(x.size()) - 1 | |
m, _ = torch.max(x, dim=axis) | |
m2, _ = torch.max(x, dim=axis, keepdim=True) | |
return m + torch.log(torch.sum(torch.exp(x - m2), dim=axis)) | |
def discretized_mix_logistic_loss( | |
y_hat, y, num_classes=256, log_scale_min=-7.0, reduce=True | |
): | |
"""Discretized mixture of logistic distributions loss | |
Note that it is assumed that input is scaled to [-1, 1]. | |
Args: | |
y_hat (Tensor): Predicted output (B x C x T) | |
y (Tensor): Target (B x T x 1). | |
num_classes (int): Number of classes | |
log_scale_min (float): Log scale minimum value | |
reduce (bool): If True, the losses are averaged or summed for each | |
minibatch. | |
Returns | |
Tensor: loss | |
""" | |
assert y_hat.dim() == 3 | |
assert y_hat.size(1) % 3 == 0 | |
nr_mix = y_hat.size(1) // 3 | |
# (B x T x C) | |
y_hat = y_hat.transpose(1, 2) | |
# unpack parameters. (B, T, num_mixtures) x 3 | |
logit_probs = y_hat[:, :, :nr_mix] | |
means = y_hat[:, :, nr_mix : 2 * nr_mix] | |
log_scales = torch.clamp(y_hat[:, :, 2 * nr_mix : 3 * nr_mix], min=log_scale_min) | |
# B x T x 1 -> B x T x num_mixtures | |
y = y.expand_as(means) | |
centered_y = y - means | |
inv_stdv = torch.exp(-log_scales) | |
plus_in = inv_stdv * (centered_y + 1.0 / (num_classes - 1)) | |
cdf_plus = torch.sigmoid(plus_in) | |
min_in = inv_stdv * (centered_y - 1.0 / (num_classes - 1)) | |
cdf_min = torch.sigmoid(min_in) | |
# log probability for edge case of 0 (before scaling) | |
# equivalent: torch.log(torch.sigmoid(plus_in)) | |
log_cdf_plus = plus_in - F.softplus(plus_in) | |
# log probability for edge case of 255 (before scaling) | |
# equivalent: (1 - torch.sigmoid(min_in)).log() | |
log_one_minus_cdf_min = -F.softplus(min_in) | |
# probability for all other cases | |
cdf_delta = cdf_plus - cdf_min | |
mid_in = inv_stdv * centered_y | |
# log probability in the center of the bin, to be used in extreme cases | |
# (not actually used in our code) | |
log_pdf_mid = mid_in - log_scales - 2.0 * F.softplus(mid_in) | |
# tf equivalent | |
""" | |
log_probs = tf.where(x < -0.999, log_cdf_plus, | |
tf.where(x > 0.999, log_one_minus_cdf_min, | |
tf.where(cdf_delta > 1e-5, | |
tf.log(tf.maximum(cdf_delta, 1e-12)), | |
log_pdf_mid - np.log(127.5)))) | |
""" | |
# TODO: cdf_delta <= 1e-5 actually can happen. How can we choose the value | |
# for num_classes=65536 case? 1e-7? not sure.. | |
inner_inner_cond = (cdf_delta > 1e-5).float() | |
inner_inner_out = inner_inner_cond * torch.log( | |
torch.clamp(cdf_delta, min=1e-12) | |
) + (1.0 - inner_inner_cond) * (log_pdf_mid - np.log((num_classes - 1) / 2)) | |
inner_cond = (y > 0.999).float() | |
inner_out = ( | |
inner_cond * log_one_minus_cdf_min + (1.0 - inner_cond) * inner_inner_out | |
) | |
cond = (y < -0.999).float() | |
log_probs = cond * log_cdf_plus + (1.0 - cond) * inner_out | |
log_probs = log_probs + F.log_softmax(logit_probs, -1) | |
if reduce: | |
return -torch.sum(log_sum_exp(log_probs)) | |
else: | |
return -log_sum_exp(log_probs).unsqueeze(-1) | |
def to_one_hot(tensor, n, fill_with=1.0): | |
# we perform one hot encore with respect to the last axis | |
one_hot = torch.FloatTensor(tensor.size() + (n,)).zero_() | |
if tensor.is_cuda: | |
one_hot = one_hot.cuda() | |
one_hot.scatter_(len(tensor.size()), tensor.unsqueeze(-1), fill_with) | |
return one_hot | |
def sample_from_discretized_mix_logistic(y, log_scale_min=-7.0, clamp_log_scale=False): | |
""" | |
Sample from discretized mixture of logistic distributions | |
Args: | |
y (Tensor): B x C x T | |
log_scale_min (float): Log scale minimum value | |
Returns: | |
Tensor: sample in range of [-1, 1]. | |
""" | |
assert y.size(1) % 3 == 0 | |
nr_mix = y.size(1) // 3 | |
# B x T x C | |
y = y.transpose(1, 2) | |
logit_probs = y[:, :, :nr_mix] | |
# sample mixture indicator from softmax | |
temp = logit_probs.data.new(logit_probs.size()).uniform_(1e-5, 1.0 - 1e-5) | |
temp = logit_probs.data - torch.log(-torch.log(temp)) | |
_, argmax = temp.max(dim=-1) | |
# (B, T) -> (B, T, nr_mix) | |
one_hot = to_one_hot(argmax, nr_mix) | |
# select logistic parameters | |
means = torch.sum(y[:, :, nr_mix : 2 * nr_mix] * one_hot, dim=-1) | |
log_scales = torch.sum(y[:, :, 2 * nr_mix : 3 * nr_mix] * one_hot, dim=-1) | |
if clamp_log_scale: | |
log_scales = torch.clamp(log_scales, min=log_scale_min) | |
# sample from logistic & clip to interval | |
# we don't actually round to the nearest 8bit value when sampling | |
u = means.data.new(means.size()).uniform_(1e-5, 1.0 - 1e-5) | |
x = means + torch.exp(log_scales) * (torch.log(u) - torch.log(1.0 - u)) | |
x = torch.clamp(torch.clamp(x, min=-1.0), max=1.0) | |
return x | |
# we can easily define discretized version of the gaussian loss, however, | |
# use continuous version as same as the https://clarinet-demo.github.io/ | |
def mix_gaussian_loss(y_hat, y, log_scale_min=-7.0, reduce=True): | |
"""Mixture of continuous gaussian distributions loss | |
Note that it is assumed that input is scaled to [-1, 1]. | |
Args: | |
y_hat (Tensor): Predicted output (B x C x T) | |
y (Tensor): Target (B x T x 1). | |
log_scale_min (float): Log scale minimum value | |
reduce (bool): If True, the losses are averaged or summed for each | |
minibatch. | |
Returns | |
Tensor: loss | |
""" | |
assert y_hat.dim() == 3 | |
C = y_hat.size(1) | |
if C == 2: | |
nr_mix = 1 | |
else: | |
assert y_hat.size(1) % 3 == 0 | |
nr_mix = y_hat.size(1) // 3 | |
# (B x T x C) | |
y_hat = y_hat.transpose(1, 2) | |
# unpack parameters. | |
if C == 2: | |
# special case for C == 2, just for compatibility | |
logit_probs = None | |
means = y_hat[:, :, 0:1] | |
log_scales = torch.clamp(y_hat[:, :, 1:2], min=log_scale_min) | |
else: | |
# (B, T, num_mixtures) x 3 | |
logit_probs = y_hat[:, :, :nr_mix] | |
means = y_hat[:, :, nr_mix : 2 * nr_mix] | |
log_scales = torch.clamp( | |
y_hat[:, :, 2 * nr_mix : 3 * nr_mix], min=log_scale_min | |
) | |
# B x T x 1 -> B x T x num_mixtures | |
y = y.expand_as(means) | |
centered_y = y - means | |
dist = Normal(loc=0.0, scale=torch.exp(log_scales)) | |
# do we need to add a trick to avoid log(0)? | |
log_probs = dist.log_prob(centered_y) | |
if nr_mix > 1: | |
log_probs = log_probs + F.log_softmax(logit_probs, -1) | |
if reduce: | |
if nr_mix == 1: | |
return -torch.sum(log_probs) | |
else: | |
return -torch.sum(log_sum_exp(log_probs)) | |
else: | |
if nr_mix == 1: | |
return -log_probs | |
else: | |
return -log_sum_exp(log_probs).unsqueeze(-1) | |
def sample_from_mix_gaussian(y, log_scale_min=-7.0): | |
""" | |
Sample from (discretized) mixture of gaussian distributions | |
Args: | |
y (Tensor): B x C x T | |
log_scale_min (float): Log scale minimum value | |
Returns: | |
Tensor: sample in range of [-1, 1]. | |
""" | |
C = y.size(1) | |
if C == 2: | |
nr_mix = 1 | |
else: | |
assert y.size(1) % 3 == 0 | |
nr_mix = y.size(1) // 3 | |
# B x T x C | |
y = y.transpose(1, 2) | |
if C == 2: | |
logit_probs = None | |
else: | |
logit_probs = y[:, :, :nr_mix] | |
if nr_mix > 1: | |
# sample mixture indicator from softmax | |
temp = logit_probs.data.new(logit_probs.size()).uniform_(1e-5, 1.0 - 1e-5) | |
temp = logit_probs.data - torch.log(-torch.log(temp)) | |
_, argmax = temp.max(dim=-1) | |
# (B, T) -> (B, T, nr_mix) | |
one_hot = to_one_hot(argmax, nr_mix) | |
# Select means and log scales | |
means = torch.sum(y[:, :, nr_mix : 2 * nr_mix] * one_hot, dim=-1) | |
log_scales = torch.sum(y[:, :, 2 * nr_mix : 3 * nr_mix] * one_hot, dim=-1) | |
else: | |
if C == 2: | |
means, log_scales = y[:, :, 0], y[:, :, 1] | |
elif C == 3: | |
means, log_scales = y[:, :, 1], y[:, :, 2] | |
else: | |
assert False, "shouldn't happen" | |
scales = torch.exp(log_scales) | |
dist = Normal(loc=means, scale=scales) | |
x = dist.sample() | |
x = torch.clamp(x, min=-1.0, max=1.0) | |
return x | |