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Optimal transport mapping via input convex neural networks

Ashok Vardhan Makkuva, Amirhossein Taghvaei, Sewoong Oh, Jason Lee

202027 citations

Abstract

In this paper, we present a novel and principled approach to learn the optimal transport between two distributions, from samples. Guided by the optimal transport theory, we learn the optimal Kantorovich potential which induces the optimal transport map. This involves learning two convex functions, by solving a novel minimax optimization. Building upon recent advances in the field of input convex neural networks, we propose a new framework where the gradient of one convex function represents the optimal transport mapping. Numerical experiments confirm that we learn the optimal transport mapping. This approach ensures that the transport mapping we find is optimal independent of how we initialize the neural networks. Further, target distributions from a discontinuous support can be easily captured, as gradient of a convex function naturally models a {\em discontinuous} transport mapping.

Topics & Concepts

Artificial neural networkRegular polygonConvex optimizationFunction (biology)Mathematical optimizationComputer scienceMinimaxConvex functionConvex analysisMathematicsArtificial intelligenceGeometryBiologyEvolutionary biologyStochastic Gradient Optimization TechniquesMachine Learning and ELMDomain Adaptation and Few-Shot Learning