We propose a simple subsampling scheme for fast randomized approximate computation of optimal transport distances on finite spaces. This scheme operates on a random subset of the full data and can use any exact algorithm as a black-box back-end, including state-of-the-art solvers and entropically penalized versions. It is based on averaging the exact distances between empirical measures generated from independent samples from the original measures and can easily be tuned towards higher accuracy or shorter computation times. To this end, we give non-asymptotic deviation bounds for its accuracy in the case of discrete optimal transport problems. In particular, we show that in many important instances, including images (2D-histograms), the app...
We present new algorithms to compute the mean of a set of N empirical probability measures under the...
Optimal Transport is a well developed mathematical theory that defines robust metrics between probab...
The goal of this thesis is to develop new numerical methods to address inverse problems using optima...
Optimal Transport and Wasserstein Distance are closely related terms that do not only have a long h...
Optimal Transport and especially distances based on optimal transport are a widely applied tool in ...
Over the past few years, optimal transport has gained popularity in machine learning as a way to com...
It was recently shown that under smoothness conditions, the squared Wasserstein distance between two...
International audienceOptimal transport (OT) defines a powerful framework to compare probability dis...
Le Transport Optimal régularisé par l’Entropie (TOE) permet de définir les Divergences de Sinkhorn (D...
The Optimal Transport theory not only defines a notion of distance between probability measures, but...
Abstract. In this paper, we propose an improvement of an algorithm of Au-renhammer, Hoffmann and Aro...
Wasserstein distances or, more generally, distances that quantify the optimal transport between prob...
International audienceThis paper introduces a new class of algorithms for optimization problems invo...
Thesis: Ph. D., Massachusetts Institute of Technology, Department of Brain and Cognitive Sciences, 2...
This paper presents a unified framework for smooth convex regularization of discrete optimal transpo...
We present new algorithms to compute the mean of a set of N empirical probability measures under the...
Optimal Transport is a well developed mathematical theory that defines robust metrics between probab...
The goal of this thesis is to develop new numerical methods to address inverse problems using optima...
Optimal Transport and Wasserstein Distance are closely related terms that do not only have a long h...
Optimal Transport and especially distances based on optimal transport are a widely applied tool in ...
Over the past few years, optimal transport has gained popularity in machine learning as a way to com...
It was recently shown that under smoothness conditions, the squared Wasserstein distance between two...
International audienceOptimal transport (OT) defines a powerful framework to compare probability dis...
Le Transport Optimal régularisé par l’Entropie (TOE) permet de définir les Divergences de Sinkhorn (D...
The Optimal Transport theory not only defines a notion of distance between probability measures, but...
Abstract. In this paper, we propose an improvement of an algorithm of Au-renhammer, Hoffmann and Aro...
Wasserstein distances or, more generally, distances that quantify the optimal transport between prob...
International audienceThis paper introduces a new class of algorithms for optimization problems invo...
Thesis: Ph. D., Massachusetts Institute of Technology, Department of Brain and Cognitive Sciences, 2...
This paper presents a unified framework for smooth convex regularization of discrete optimal transpo...
We present new algorithms to compute the mean of a set of N empirical probability measures under the...
Optimal Transport is a well developed mathematical theory that defines robust metrics between probab...
The goal of this thesis is to develop new numerical methods to address inverse problems using optima...