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MotionGPT0 / mGPT /metrics /utils.py

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	import numpy as np
	import scipy.linalg
	import torch
	from torch import linalg
	import sys


	def l2_norm(x1, x2, dim):
	return torch.linalg.vector_norm(x1 - x2, ord=2, dim=dim)


	def variance(x, T, dim):
	mean = x.mean(dim)
	out = (x - mean)**2
	out = out.sum(dim)
	return out / (T - 1)


	def sqrtm(input):
	m = input.detach().cpu().numpy().astype(np.float64_)
	sqrtm = torch.from_numpy(scipy.linalg.sqrtm(m)).to(input)
	return sqrtm


	# (X - X_train)(X - X_train) = -2XX_train + XX + X_trainX_train
	def euclidean_distance_matrix(matrix1, matrix2):
	"""
	Params:
	-- matrix1: N1 x D
	-- matrix2: N2 x D
	Returns:
	-- dist: N1 x N2
	dist[i, j] == distance(matrix1[i], matrix2[j])
	"""
	assert matrix1.shape[1] == matrix2.shape[1]
	d1 = -2 * torch.mm(matrix1, matrix2.T) # shape (num_test, num_train)
	d2 = torch.sum(torch.square(matrix1), axis=1,
	keepdims=True) # shape (num_test, 1)
	d3 = torch.sum(torch.square(matrix2), axis=1) # shape (num_train, )
	dists = torch.sqrt(d1 + d2 + d3) # broadcasting
	return dists


	def euclidean_distance_matrix_np(matrix1, matrix2):
	"""
	Params:
	-- matrix1: N1 x D
	-- matrix2: N2 x D
	Returns:
	-- dist: N1 x N2
	dist[i, j] == distance(matrix1[i], matrix2[j])
	"""
	assert matrix1.shape[1] == matrix2.shape[1]
	d1 = -2 * np.dot(matrix1, matrix2.T) # shape (num_test, num_train)
	d2 = np.sum(np.square(matrix1), axis=1,
	keepdims=True) # shape (num_test, 1)
	d3 = np.sum(np.square(matrix2), axis=1) # shape (num_train, )
	dists = np.sqrt(d1 + d2 + d3) # broadcasting
	return dists


	def calculate_top_k(mat, top_k):
	size = mat.shape[0]
	gt_mat = (torch.unsqueeze(torch.arange(size),
	1).to(mat.device).repeat_interleave(size, 1))
	bool_mat = mat == gt_mat
	correct_vec = False
	top_k_list = []
	for i in range(top_k):
	# print(correct_vec, bool_mat[:, i])
	correct_vec = correct_vec \| bool_mat[:, i]
	# print(correct_vec)
	top_k_list.append(correct_vec[:, None])
	top_k_mat = torch.cat(top_k_list, dim=1)
	return top_k_mat


	def calculate_activation_statistics(activations):
	"""
	Params:
	-- activation: num_samples x dim_feat
	Returns:
	-- mu: dim_feat
	-- sigma: dim_feat x dim_feat
	"""
	activations = activations.cpu().numpy()
	mu = np.mean(activations, axis=0)
	sigma = np.cov(activations, rowvar=False)
	return mu, sigma


	def calculate_activation_statistics_np(activations):
	"""
	Params:
	-- activation: num_samples x dim_feat
	Returns:
	-- mu: dim_feat
	-- sigma: dim_feat x dim_feat
	"""
	mu = np.mean(activations, axis=0)
	cov = np.cov(activations, rowvar=False)
	return mu, cov


	# def calculate_frechet_distance(mu1, sigma1, mu2, sigma2, eps=1e-6):
	# """Numpy implementation of the Frechet Distance.
	# The Frechet distance between two multivariate Gaussians X_1 ~ N(mu_1, C_1)
	# and X_2 ~ N(mu_2, C_2) is
	# d^2 = \|\|mu_1 - mu_2\|\|^2 + Tr(C_1 + C_2 - 2sqrt(C_1C_2)).
	# Stable version by Dougal J. Sutherland.
	# Params:
	# -- mu1 : Numpy array containing the activations of a layer of the
	# inception net (like returned by the function 'get_predictions')
	# for generated samples.
	# -- mu2 : The sample mean over activations, precalculated on an
	# representative data set.
	# -- sigma1: The covariance matrix over activations for generated samples.
	# -- sigma2: The covariance matrix over activations, precalculated on an
	# representative data set.
	# Returns:
	# -- : The Frechet Distance.
	# """

	# mu1 = torch.atleast_1d(mu1)
	# mu2 = torch.atleast_1d(mu2)

	# sigma1 = torch.atleast_2d(sigma1)
	# sigma2 = torch.atleast_2d(sigma2)

	# assert mu1.shape == mu2.shape, \
	# 'Training and test mean vectors have different lengths'
	# assert sigma1.shape == sigma2.shape, \
	# 'Training and test covariances have different dimensions'

	# diff = mu1 - mu2

	# # Product might be almost singular
	# # covmean, _ = sqrtm(sigma1.dot(sigma2), disp=False)
	# covmean = sqrtm(torch.mm(sigma1,sigma2))
	# if not torch.isfinite(covmean).all():
	# msg = ('fid calculation produces singular product; '
	# 'adding %s to diagonal of cov estimates') % eps
	# print(msg)
	# offset = torch.eye(sigma1.shape[0]) * eps
	# # covmean = sqrtm((sigma1 + offset).dot(sigma2 + offset))
	# covmean = sqrtm(torch.mm(sigma1+ offset,sigma2+ offset))

	# # Numerical error might give slight imaginary component
	# if torch.is_complex(covmean):
	# if not torch.allclose(torch.diagonal(covmean).imag, 0, atol=1e-3):
	# m = torch.max(torch.abs(covmean.imag))
	# raise ValueError('Imaginary component {}'.format(m))
	# covmean = covmean.real

	# tr_covmean = torch.trace(covmean)

	# return (diff.dot(diff) + torch.trace(sigma1) +
	# torch.trace(sigma2) - 2 * tr_covmean)


	def calculate_frechet_distance_np(mu1, sigma1, mu2, sigma2, eps=1e-6):
	"""Numpy implementation of the Frechet Distance.
	The Frechet distance between two multivariate Gaussians X_1 ~ N(mu_1, C_1)
	and X_2 ~ N(mu_2, C_2) is
	d^2 = \|\|mu_1 - mu_2\|\|^2 + Tr(C_1 + C_2 - 2sqrt(C_1C_2)).
	Stable version by Dougal J. Sutherland.
	Params:
	-- mu1 : Numpy array containing the activations of a layer of the
	inception net (like returned by the function 'get_predictions')
	for generated samples.
	-- mu2 : The sample mean over activations, precalculated on an
	representative data set.
	-- sigma1: The covariance matrix over activations for generated samples.
	-- sigma2: The covariance matrix over activations, precalculated on an
	representative data set.
	Returns:
	-- : The Frechet Distance.
	"""

	mu1 = np.atleast_1d(mu1)
	mu2 = np.atleast_1d(mu2)

	sigma1 = np.atleast_2d(sigma1)
	sigma2 = np.atleast_2d(sigma2)

	assert (mu1.shape == mu2.shape
	), "Training and test mean vectors have different lengths"
	assert (sigma1.shape == sigma2.shape
	), "Training and test covariances have different dimensions"

	diff = mu1 - mu2
	# Product might be almost singular
	covmean, _ = scipy.linalg.sqrtm(sigma1.dot(sigma2), disp=False)
	if not np.isfinite(covmean).all():
	msg = ("fid calculation produces singular product; "
	"adding %s to diagonal of cov estimates") % eps
	print(msg)
	offset = np.eye(sigma1.shape[0]) * eps
	covmean = scipy.linalg.sqrtm((sigma1 + offset).dot(sigma2 + offset))

	# Numerical error might give slight imaginary component
	if np.iscomplexobj(covmean):
	if not np.allclose(np.diagonal(covmean).imag, 0, atol=1e-3):
	m = np.max(np.abs(covmean.imag))
	raise ValueError("Imaginary component {}".format(m))
	# print("Imaginary component {}".format(m))
	covmean = covmean.real
	tr_covmean = np.trace(covmean)

	return diff.dot(diff) + np.trace(sigma1) + np.trace(
	sigma2) - 2 * tr_covmean


	def calculate_diversity(activation, diversity_times):
	assert len(activation.shape) == 2
	assert activation.shape[0] > diversity_times
	num_samples = activation.shape[0]

	first_indices = np.random.choice(num_samples,
	diversity_times,
	replace=False)
	second_indices = np.random.choice(num_samples,
	diversity_times,
	replace=False)
	dist = linalg.norm(activation[first_indices] - activation[second_indices],
	axis=1)
	return dist.mean()


	def calculate_diversity_np(activation, diversity_times):
	assert len(activation.shape) == 2
	assert activation.shape[0] > diversity_times
	num_samples = activation.shape[0]

	first_indices = np.random.choice(num_samples,
	diversity_times,
	replace=False)
	second_indices = np.random.choice(num_samples,
	diversity_times,
	replace=False)
	dist = scipy.linalg.norm(activation[first_indices] -
	activation[second_indices],
	axis=1)
	return dist.mean()


	def calculate_multimodality_np(activation, multimodality_times):
	assert len(activation.shape) == 3
	assert activation.shape[1] > multimodality_times
	num_per_sent = activation.shape[1]

	first_dices = np.random.choice(num_per_sent,
	multimodality_times,
	replace=False)
	second_dices = np.random.choice(num_per_sent,
	multimodality_times,
	replace=False)
	dist = scipy.linalg.norm(activation[:, first_dices] -
	activation[:, second_dices],
	axis=2)
	return dist.mean()


	# motion reconstructions metrics


	def batch_compute_similarity_transform_torch(S1, S2):
	"""
	Computes a similarity transform (sR, t) that takes
	a set of 3D points S1 (3 x N) closest to a set of 3D points S2,
	where R is an 3x3 rotation matrix, t 3x1 translation, s scale.
	i.e. solves the orthogonal Procrutes problem.
	"""
	transposed = False
	if S1.shape[0] != 3 and S1.shape[0] != 2:
	S1 = S1.permute(0, 2, 1)
	S2 = S2.permute(0, 2, 1)
	transposed = True
	assert S2.shape[1] == S1.shape[1]

	# 1. Remove mean.
	mu1 = S1.mean(axis=-1, keepdims=True)
	mu2 = S2.mean(axis=-1, keepdims=True)

	X1 = S1 - mu1
	X2 = S2 - mu2

	# 2. Compute variance of X1 used for scale.
	var1 = torch.sum(X1**2, dim=1).sum(dim=1)

	# 3. The outer product of X1 and X2.
	K = X1.bmm(X2.permute(0, 2, 1))

	# 4. Solution that Maximizes trace(R'K) is R=U*V', where U, V are
	# singular vectors of K.
	U, s, V = torch.svd(K)

	# Construct Z that fixes the orientation of R to get det(R)=1.
	Z = torch.eye(U.shape[1], device=S1.device).unsqueeze(0)
	Z = Z.repeat(U.shape[0], 1, 1)
	Z[:, -1, -1] *= torch.sign(torch.det(U.bmm(V.permute(0, 2, 1))))

	# Construct R.
	R = V.bmm(Z.bmm(U.permute(0, 2, 1)))

	# 5. Recover scale.
	scale = torch.cat([torch.trace(x).unsqueeze(0) for x in R.bmm(K)]) / var1

	# 6. Recover translation.
	t = mu2 - (scale.unsqueeze(-1).unsqueeze(-1) * (R.bmm(mu1)))

	# 7. Error:
	S1_hat = scale.unsqueeze(-1).unsqueeze(-1) * R.bmm(S1) + t

	if transposed:
	S1_hat = S1_hat.permute(0, 2, 1)

	return S1_hat, (scale, R, t)


	def compute_mpjpe(preds,
	target,
	valid_mask=None,
	pck_joints=None,
	sample_wise=True):
	"""
	Mean per-joint position error (i.e. mean Euclidean distance)
	often referred to as "Protocol #1" in many papers.
	"""
	assert preds.shape == target.shape, print(preds.shape,
	target.shape) # BxJx3
	mpjpe = torch.norm(preds - target, p=2, dim=-1) # BxJ

	if pck_joints is None:
	if sample_wise:
	mpjpe_seq = ((mpjpe * valid_mask.float()).sum(-1) /
	valid_mask.float().sum(-1)
	if valid_mask is not None else mpjpe.mean(-1))
	else:
	mpjpe_seq = mpjpe[valid_mask] if valid_mask is not None else mpjpe
	return mpjpe_seq
	else:
	mpjpe_pck_seq = mpjpe[:, pck_joints]
	return mpjpe_pck_seq


	def align_by_parts(joints, align_inds=None):
	if align_inds is None:
	return joints
	pelvis = joints[:, align_inds].mean(1)
	return joints - torch.unsqueeze(pelvis, dim=1)


	def calc_mpjpe(preds, target, align_inds=[0], sample_wise=True, trans=None):
	# Expects BxJx3
	valid_mask = target[:, :, 0] != -2.0
	# valid_mask = torch.BoolTensor(target[:, :, 0].shape)
	if align_inds is not None:
	preds_aligned = align_by_parts(preds, align_inds=align_inds)
	if trans is not None:
	preds_aligned += trans
	target_aligned = align_by_parts(target, align_inds=align_inds)
	else:
	preds_aligned, target_aligned = preds, target
	mpjpe_each = compute_mpjpe(preds_aligned,
	target_aligned,
	valid_mask=valid_mask,
	sample_wise=sample_wise)
	return mpjpe_each


	def calc_accel(preds, target):
	"""
	Mean joint acceleration error
	often referred to as "Protocol #1" in many papers.
	"""
	assert preds.shape == target.shape, print(preds.shape,
	target.shape) # BxJx3
	assert preds.dim() == 3
	# Expects BxJx3
	# valid_mask = torch.BoolTensor(target[:, :, 0].shape)
	accel_gt = target[:-2] - 2 * target[1:-1] + target[2:]
	accel_pred = preds[:-2] - 2 * preds[1:-1] + preds[2:]
	normed = torch.linalg.norm(accel_pred - accel_gt, dim=-1)
	accel_seq = normed.mean(1)
	return accel_seq


	def calc_pampjpe(preds, target, sample_wise=True, return_transform_mat=False):
	# Expects BxJx3
	target, preds = target.float(), preds.float()
	# extracting the keypoints that all samples have valid annotations
	# valid_mask = (target[:, :, 0] != -2.).sum(0) == len(target)
	# preds_tranformed, PA_transform = batch_compute_similarity_transform_torch(preds[:, valid_mask], target[:, valid_mask])
	# pa_mpjpe_each = compute_mpjpe(preds_tranformed, target[:, valid_mask], sample_wise=sample_wise)

	preds_tranformed, PA_transform = batch_compute_similarity_transform_torch(
	preds, target)
	pa_mpjpe_each = compute_mpjpe(preds_tranformed,
	target,
	sample_wise=sample_wise)

	if return_transform_mat:
	return pa_mpjpe_each, PA_transform
	else:
	return pa_mpjpe_each


	# from action2motion
	def calculate_diversity_multimodality(activations,
	labels,
	num_labels,
	diversity_times=200,
	multimodality_times=20):
	labels = labels.long()
	num_motions = activations.shape[0] # len(labels)

	diversity = 0

	first_indices = np.random.randint(0, num_motions, diversity_times)
	second_indices = np.random.randint(0, num_motions, diversity_times)
	for first_idx, second_idx in zip(first_indices, second_indices):
	diversity += torch.dist(activations[first_idx, :],
	activations[second_idx, :])
	diversity /= diversity_times

	multimodality = 0
	label_quotas = np.zeros(num_labels)
	label_quotas[labels.unique(
	)] = multimodality_times # if a label does not appear in batch, its quota remains zero
	while np.any(label_quotas > 0):
	# print(label_quotas)
	first_idx = np.random.randint(0, num_motions)
	first_label = labels[first_idx]
	if not label_quotas[first_label]:
	continue

	second_idx = np.random.randint(0, num_motions)
	second_label = labels[second_idx]
	while first_label != second_label:
	second_idx = np.random.randint(0, num_motions)
	second_label = labels[second_idx]

	label_quotas[first_label] -= 1

	first_activation = activations[first_idx, :]
	second_activation = activations[second_idx, :]
	multimodality += torch.dist(first_activation, second_activation)

	multimodality /= (multimodality_times * num_labels)

	return diversity, multimodality


	def calculate_fid(statistics_1, statistics_2):
	return calculate_frechet_distance_np(statistics_1[0], statistics_1[1],
	statistics_2[0], statistics_2[1])


	# from: https://github.com/abdulfatir/gan-metrics-pytorch/blob/master/kid_score.py
	def polynomial_mmd_averages(codes_g,
	codes_r,
	n_subsets=50,
	subset_size=1000,
	ret_var=True,
	output=sys.stdout,
	**kernel_args):
	m = min(codes_g.shape[0], codes_r.shape[0])
	mmds = np.zeros(n_subsets)
	if ret_var:
	vars = np.zeros(n_subsets)
	choice = np.random.choice

	replace = subset_size < len(codes_g)

	for i in range(n_subsets):
	g = codes_g[choice(len(codes_g), subset_size, replace=replace)]
	r = codes_r[choice(len(codes_r), subset_size, replace=replace)]
	o = polynomial_mmd(g, r, **kernel_args, var_at_m=m, ret_var=ret_var)
	if ret_var:
	mmds[i], vars[i] = o
	else:
	mmds[i] = o

	return (mmds, vars) if ret_var else mmds


	def polynomial_mmd(codes_g,
	codes_r,
	degree=3,
	gamma=None,
	coef0=1,
	var_at_m=None,
	ret_var=True):
	from sklearn.metrics.pairwise import polynomial_kernel

	# use k(x, y) = (gamma <x, y> + coef0)^degree
	# default gamma is 1 / dim
	X = codes_g
	Y = codes_r

	K_XX = polynomial_kernel(X, degree=degree, gamma=gamma, coef0=coef0)
	K_YY = polynomial_kernel(Y, degree=degree, gamma=gamma, coef0=coef0)
	K_XY = polynomial_kernel(X, Y, degree=degree, gamma=gamma, coef0=coef0)

	return _mmd2_and_variance(K_XX,
	K_XY,
	K_YY,
	var_at_m=var_at_m,
	ret_var=ret_var)


	def _mmd2_and_variance(K_XX,
	K_XY,
	K_YY,
	unit_diagonal=False,
	mmd_est='unbiased',
	block_size=1024,
	var_at_m=None,
	ret_var=True):
	# based on
	# https://github.com/dougalsutherland/opt-mmd/blob/master/two_sample/mmd.py
	# but changed to not compute the full kernel matrix at once
	m = K_XX.shape[0]
	assert K_XX.shape == (m, m)
	assert K_XY.shape == (m, m)
	assert K_YY.shape == (m, m)
	if var_at_m is None:
	var_at_m = m

	# Get the various sums of kernels that we'll use
	# Kts drop the diagonal, but we don't need to compute them explicitly
	if unit_diagonal:
	diag_X = diag_Y = 1
	sum_diag_X = sum_diag_Y = m
	sum_diag2_X = sum_diag2_Y = m
	else:
	diag_X = np.diagonal(K_XX)
	diag_Y = np.diagonal(K_YY)

	sum_diag_X = diag_X.sum()
	sum_diag_Y = diag_Y.sum()

	sum_diag2_X = _sqn(diag_X)
	sum_diag2_Y = _sqn(diag_Y)

	Kt_XX_sums = K_XX.sum(axis=1) - diag_X
	Kt_YY_sums = K_YY.sum(axis=1) - diag_Y
	K_XY_sums_0 = K_XY.sum(axis=0)
	K_XY_sums_1 = K_XY.sum(axis=1)

	Kt_XX_sum = Kt_XX_sums.sum()
	Kt_YY_sum = Kt_YY_sums.sum()
	K_XY_sum = K_XY_sums_0.sum()

	if mmd_est == 'biased':
	mmd2 = ((Kt_XX_sum + sum_diag_X) / (m * m) + (Kt_YY_sum + sum_diag_Y) /
	(m * m) - 2 * K_XY_sum / (m * m))
	else:
	assert mmd_est in {'unbiased', 'u-statistic'}
	mmd2 = (Kt_XX_sum + Kt_YY_sum) / (m * (m - 1))
	if mmd_est == 'unbiased':
	mmd2 -= 2 * K_XY_sum / (m * m)
	else:
	mmd2 -= 2 * (K_XY_sum - np.trace(K_XY)) / (m * (m - 1))

	if not ret_var:
	return mmd2

	Kt_XX_2_sum = _sqn(K_XX) - sum_diag2_X
	Kt_YY_2_sum = _sqn(K_YY) - sum_diag2_Y
	K_XY_2_sum = _sqn(K_XY)

	dot_XX_XY = Kt_XX_sums.dot(K_XY_sums_1)
	dot_YY_YX = Kt_YY_sums.dot(K_XY_sums_0)

	m1 = m - 1
	m2 = m - 2
	zeta1_est = (
	1 / (m * m1 * m2) *
	(_sqn(Kt_XX_sums) - Kt_XX_2_sum + _sqn(Kt_YY_sums) - Kt_YY_2_sum) - 1 /
	(m * m1)*2 (Kt_XX_sum2 + Kt_YY_sum2) + 1 / (m * m * m1) *
	(_sqn(K_XY_sums_1) + _sqn(K_XY_sums_0) - 2 * K_XY_2_sum) -
	2 / m*4 K_XY_sum*2 - 2 / (m m * m1) * (dot_XX_XY + dot_YY_YX) +
	2 / (m*3 m1) * (Kt_XX_sum + Kt_YY_sum) * K_XY_sum)
	zeta2_est = (1 / (m * m1) * (Kt_XX_2_sum + Kt_YY_2_sum) - 1 / (m * m1)*2
	(Kt_XX_sum2 + Kt_YY_sum2) + 2 / (m * m) * K_XY_2_sum -
	2 / m*4 K_XY_sum*2 - 4 / (m m * m1) *
	(dot_XX_XY + dot_YY_YX) + 4 / (m*3 m1) *
	(Kt_XX_sum + Kt_YY_sum) * K_XY_sum)
	var_est = (4 * (var_at_m - 2) / (var_at_m * (var_at_m - 1)) * zeta1_est +
	2 / (var_at_m * (var_at_m - 1)) * zeta2_est)

	return mmd2, var_est


	def _sqn(arr):
	flat = np.ravel(arr)
	return flat.dot(flat)


	def calculate_kid(real_activations, generated_activations):
	kid_values = polynomial_mmd_averages(real_activations,
	generated_activations,
	n_subsets=100)
	results = (kid_values[0].mean(), kid_values[0].std())
	return results