It was recently shown that under smoothness conditions, the squared Wasserstein distance between two distributions could be efficiently computed with appealing statistical error upper bounds. However, rather than the distance itself, the object of interest for applications such as generative modeling is the underlying optimal transport map. Hence, computational and statistical guarantees need to be obtained for the estimated maps themselves. In this paper, we propose the first tractable algorithm for which the statistical $L^2$ error on the maps nearly matches the existing minimax lower-bounds for smooth map estimation. Our method is based on solving the semi-dual formulation of optimal transport with an infinite-dimensional sum-of-squares ...
Main: 10 pages,4 Figures Tables Supplementary: 19 pages, 13 Figures ,1 Table. Sumbitted to Neurips 2...
The notion of entropy-regularized optimal transport, also known as Sinkhorn divergence, has recently...
15 pages, 4 figures. To appear in the Proceedings of the International Conference on Learning Repres...
It was recently shown that under smoothness conditions, the squared Wasserstein distance between two...
International audienceIt is well-known that plug-in statistical estimation of optimal transport suff...
International audienceThe problem of estimating Wasserstein distances between two densities living i...
We analyze a number of natural estimators for the optimal transport map between two distributions an...
Over the past few years, optimal transport has gained popularity in machine learning as a way to com...
The objective in statistical Optimal Transport (OT) is to consistently estimate the optimal transpor...
We present new algorithms to compute the mean of a set of N empirical probability measures under the...
We propose a simple subsampling scheme for fast randomized approximate computation of optimal transp...
Thesis: Ph. D., Massachusetts Institute of Technology, Department of Mathematics, 2019Cataloged from...
This paper introduces the first statistically consistent estimator of the optimal transport map betw...
Neurips 2021 Optimal Transport and Machine Learning WorkshopOptimal transport distances (OT) have be...
Main: 10 pages,4 Figures Tables Supplementary: 19 pages, 13 Figures ,1 Table. Sumbitted to Neurips 2...
The notion of entropy-regularized optimal transport, also known as Sinkhorn divergence, has recently...
15 pages, 4 figures. To appear in the Proceedings of the International Conference on Learning Repres...
It was recently shown that under smoothness conditions, the squared Wasserstein distance between two...
International audienceIt is well-known that plug-in statistical estimation of optimal transport suff...
International audienceThe problem of estimating Wasserstein distances between two densities living i...
We analyze a number of natural estimators for the optimal transport map between two distributions an...
Over the past few years, optimal transport has gained popularity in machine learning as a way to com...
The objective in statistical Optimal Transport (OT) is to consistently estimate the optimal transpor...
We present new algorithms to compute the mean of a set of N empirical probability measures under the...
We propose a simple subsampling scheme for fast randomized approximate computation of optimal transp...
Thesis: Ph. D., Massachusetts Institute of Technology, Department of Mathematics, 2019Cataloged from...
This paper introduces the first statistically consistent estimator of the optimal transport map betw...
Neurips 2021 Optimal Transport and Machine Learning WorkshopOptimal transport distances (OT) have be...
Main: 10 pages,4 Figures Tables Supplementary: 19 pages, 13 Figures ,1 Table. Sumbitted to Neurips 2...
The notion of entropy-regularized optimal transport, also known as Sinkhorn divergence, has recently...
15 pages, 4 figures. To appear in the Proceedings of the International Conference on Learning Repres...