On Optimal Transport Maps Between 1 /d-Concave Densities

Abstract

In this paper, we extend the scope of Caffarelli's contraction theorem, which provides a measure of the Lipschitz constant for optimal transport maps between log-concave probability densities in d. Our focus is on a broader category of densities, specifically those that are 1d-concave and can be represented as V-d, where V is convex. By setting appropriate conditions, we derive linear or sublinear limitations for the optimal transport map. This leads us to a comprehensive Lipschitz estimate that aligns with the principles established in Caffarelli's theorem.

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