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Bibliographic Details
Main Authors: Daniels, Mara, Maunu, Tyler, Hand, Paul
Format: Preprint
Published: 2021
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Online Access:https://arxiv.org/abs/2110.03237
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author Daniels, Mara
Maunu, Tyler
Hand, Paul
author_facet Daniels, Mara
Maunu, Tyler
Hand, Paul
contents We consider the fundamental problem of sampling the optimal transport coupling between given source and target distributions. In certain cases, the optimal transport plan takes the form of a one-to-one mapping from the source support to the target support, but learning or even approximating such a map is computationally challenging for large and high-dimensional datasets due to the high cost of linear programming routines and an intrinsic curse of dimensionality. We study instead the Sinkhorn problem, a regularized form of optimal transport whose solutions are couplings between the source and the target distribution. We introduce a novel framework for learning the Sinkhorn coupling between two distributions in the form of a score-based generative model. Conditioned on source data, our procedure iterates Langevin Dynamics to sample target data according to the regularized optimal coupling. Key to this approach is a neural network parametrization of the Sinkhorn problem, and we prove convergence of gradient descent with respect to network parameters in this formulation. We demonstrate its empirical success on a variety of large scale optimal transport tasks.
format Preprint
id arxiv_https___arxiv_org_abs_2110_03237
institution arXiv
publishDate 2021
record_format arxiv
spellingShingle Score-based Generative Neural Networks for Large-Scale Optimal Transport
Daniels, Mara
Maunu, Tyler
Hand, Paul
Machine Learning
We consider the fundamental problem of sampling the optimal transport coupling between given source and target distributions. In certain cases, the optimal transport plan takes the form of a one-to-one mapping from the source support to the target support, but learning or even approximating such a map is computationally challenging for large and high-dimensional datasets due to the high cost of linear programming routines and an intrinsic curse of dimensionality. We study instead the Sinkhorn problem, a regularized form of optimal transport whose solutions are couplings between the source and the target distribution. We introduce a novel framework for learning the Sinkhorn coupling between two distributions in the form of a score-based generative model. Conditioned on source data, our procedure iterates Langevin Dynamics to sample target data according to the regularized optimal coupling. Key to this approach is a neural network parametrization of the Sinkhorn problem, and we prove convergence of gradient descent with respect to network parameters in this formulation. We demonstrate its empirical success on a variety of large scale optimal transport tasks.
title Score-based Generative Neural Networks for Large-Scale Optimal Transport
topic Machine Learning
url https://arxiv.org/abs/2110.03237