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triplet_loss.py
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triplet_loss.py
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import torch
from torch import nn
def normalize(x, axis=-1):
"""Normalizing to unit length along the specified dimension.
Args:
x: pytorch Variable
Returns:
x: pytorch Variable, same shape as input
"""
x = 1. * x / (torch.norm(x, 2, axis, keepdim=True).expand_as(x) + 1e-12)
return x
def euclidean_dist(x, y):
"""
Args:
x: pytorch Variable, with shape [m, d]
y: pytorch Variable, with shape [n, d]
Returns:
dist: pytorch Variable, with shape [m, n]
"""
m, n = x.size(0), y.size(0)
xx = torch.pow(x, 2).sum(1, keepdim=True).expand(m, n)
yy = torch.pow(y, 2).sum(1, keepdim=True).expand(n, m).t()
dist = xx + yy
dist = dist - 2 * torch.matmul(x, y.t())
# dist.addmm_(1, -2, x, y.t())
dist = dist.clamp(min=1e-12).sqrt() # for numerical stability
return dist
def cosine_dist(x, y):
"""
Args:
x: pytorch Variable, with shape [m, d]
y: pytorch Variable, with shape [n, d]
Returns:
dist: pytorch Variable, with shape [m, n]
"""
m, n = x.size(0), y.size(0)
x_norm = torch.pow(x, 2).sum(1, keepdim=True).sqrt().expand(m, n)
y_norm = torch.pow(y, 2).sum(1, keepdim=True).sqrt().expand(n, m).t()
xy_intersection = torch.mm(x, y.t())
dist = xy_intersection/(x_norm * y_norm)
dist = (1. - dist) / 2
return dist
def hard_example_mining(dist_mat, labels, return_inds=False):
"""For each anchor, find the hardest positive and negative sample.
Args:
dist_mat: pytorch Variable, pair wise distance between samples, shape [N, N]
labels: pytorch LongTensor, with shape [N]
return_inds: whether to return the indices. Save time if `False`(?)
Returns:
dist_ap: pytorch Variable, distance(anchor, positive); shape [N]
dist_an: pytorch Variable, distance(anchor, negative); shape [N]
p_inds: pytorch LongTensor, with shape [N];
indices of selected hard positive samples; 0 <= p_inds[i] <= N - 1
n_inds: pytorch LongTensor, with shape [N];
indices of selected hard negative samples; 0 <= n_inds[i] <= N - 1
NOTE: Only consider the case in which all labels have same num of samples,
thus we can cope with all anchors in parallel.
"""
assert len(dist_mat.size()) == 2
assert dist_mat.size(0) == dist_mat.size(1)
N = dist_mat.size(0)
# shape [N, N]
is_pos = labels.expand(N, N).eq(labels.expand(N, N).t())
is_neg = labels.expand(N, N).ne(labels.expand(N, N).t())
# `dist_ap` means distance(anchor, positive)
# both `dist_ap` and `relative_p_inds` with shape [N, 1]
dist_ap, relative_p_inds = torch.max(
dist_mat[is_pos].contiguous().view(N, -1), 1, keepdim=True)
# print(dist_mat[is_pos].shape)
# `dist_an` means distance(anchor, negative)
# both `dist_an` and `relative_n_inds` with shape [N, 1]
dist_an, relative_n_inds = torch.min(
dist_mat[is_neg].contiguous().view(N, -1), 1, keepdim=True)
# shape [N]
dist_ap = dist_ap.squeeze(1)
dist_an = dist_an.squeeze(1)
if return_inds:
# shape [N, N]
ind = (labels.new().resize_as_(labels)
.copy_(torch.arange(0, N).long())
.unsqueeze(0).expand(N, N))
# shape [N, 1]
p_inds = torch.gather(
ind[is_pos].contiguous().view(N, -1), 1, relative_p_inds.data)
n_inds = torch.gather(
ind[is_neg].contiguous().view(N, -1), 1, relative_n_inds.data)
# shape [N]
p_inds = p_inds.squeeze(1)
n_inds = n_inds.squeeze(1)
return dist_ap, dist_an, p_inds, n_inds
return dist_ap, dist_an
class TripletLoss(object):
"""
Triplet loss using HARDER example mining,
modified based on original triplet loss using hard example mining
"""
def __init__(self, margin=None, hard_factor=0.0):
self.margin = margin
self.hard_factor = hard_factor
if margin is not None:
self.ranking_loss = nn.MarginRankingLoss(margin=margin)
else:
self.ranking_loss = nn.SoftMarginLoss()
def __call__(self, global_feat, labels, normalize_feature=False):
if normalize_feature:
global_feat = normalize(global_feat, axis=-1)
dist_mat = euclidean_dist(global_feat, global_feat)
dist_ap, dist_an = hard_example_mining(dist_mat, labels)
# dist_ap *= (1.0 + self.hard_factor)
# dist_an *= (1.0 - self.hard_factor)
y = dist_an.new().resize_as_(dist_an).fill_(1)
if self.margin is not None:
loss = self.ranking_loss(dist_an, dist_ap, y)
else:
loss = self.ranking_loss(dist_an - dist_ap, y)
return loss, dist_ap, dist_an