In graph analysis, a classic task consists in computing similarity measures between (groups of) nodes. In latent space random graphs, nodes are associated to unknown latent variables. One may then seek to compute distances directly in the latent space, using only the graph structure. In this paper, we show that it is possible to consistently estimate entropic-regularized Optimal Transport (OT) distances between groups of nodes in the latent space. We provide a general stability result for entropic OT with respect to perturbations of the cost matrix. We then apply it to several examples of random graphs, such as graphons or $\epsilon$-graphs on manifolds. Along the way, we prove new concentration results for the so-called Universal Singular ...
We analyze optimal transport problems with additional entropic cost evaluated along curves in the Wa...
This paper presents a unified framework for smooth convex regularization of discrete optimal transpo...
Grogan et al. [11, 12] have recently proposed a solution to colour transfer by minimising the Euclid...
The recently developed bag-of-paths (BoP) framework consists in setting a Gibbs-Boltzmann distributi...
The recently developed bag-of-paths (BoP) framework consists in setting a Gibbs-Boltzmann distributi...
The present work investigates a new relative entropy-regularized algorithm for solving the optimal t...
We study the entropic regularization of the optimal transport problem in dimension 1 when the cost f...
The distance that compares the difference between two probability distributions plays a fundamental ...
As interest in graph data has grown in recent years, the computation of various geometric tools has ...
We prove several fundamental statistical bounds for entropic OT with the squared Euclidean cost betw...
The notion of entropy-regularized optimal transport, also known as Sinkhorn divergence, has recently...
International audienceAlthough optimal transport (OT) problems admit closed form solutions in a very...
Entropic regularization of optimal transport is appealing both from a numerical and theoretical pers...
We develop a computationally tractable method for estimating the optimal map between two distributio...
This thesis deals with a class of multi-marginal optimal transport problems, which we call graph-str...
We analyze optimal transport problems with additional entropic cost evaluated along curves in the Wa...
This paper presents a unified framework for smooth convex regularization of discrete optimal transpo...
Grogan et al. [11, 12] have recently proposed a solution to colour transfer by minimising the Euclid...
The recently developed bag-of-paths (BoP) framework consists in setting a Gibbs-Boltzmann distributi...
The recently developed bag-of-paths (BoP) framework consists in setting a Gibbs-Boltzmann distributi...
The present work investigates a new relative entropy-regularized algorithm for solving the optimal t...
We study the entropic regularization of the optimal transport problem in dimension 1 when the cost f...
The distance that compares the difference between two probability distributions plays a fundamental ...
As interest in graph data has grown in recent years, the computation of various geometric tools has ...
We prove several fundamental statistical bounds for entropic OT with the squared Euclidean cost betw...
The notion of entropy-regularized optimal transport, also known as Sinkhorn divergence, has recently...
International audienceAlthough optimal transport (OT) problems admit closed form solutions in a very...
Entropic regularization of optimal transport is appealing both from a numerical and theoretical pers...
We develop a computationally tractable method for estimating the optimal map between two distributio...
This thesis deals with a class of multi-marginal optimal transport problems, which we call graph-str...
We analyze optimal transport problems with additional entropic cost evaluated along curves in the Wa...
This paper presents a unified framework for smooth convex regularization of discrete optimal transpo...
Grogan et al. [11, 12] have recently proposed a solution to colour transfer by minimising the Euclid...