Entropy-regularized optimal transport on multivariate normal and q-normal distributions

TL;DR

This paper derives explicit formulas for entropy-regularized optimal transport costs and estimators on multivariate normal and q-normal distributions, illuminating the effects of entropy regularization on statistical measures.

Contribution

It provides the first explicit forms of entropy-regularized optimal transport costs and estimators for these distributions, advancing theoretical understanding.

Findings

Explicit formulas for entropy-regularized transport costs on normal distributions

Explicit formulas for entropy-regularized transport costs on q-normal distributions

Demonstrations of how regularization affects Wasserstein distance and statistical efficiency

Abstract

The distance and divergence of the probability measures play a central role in statistics, machine learning, and many other related fields. The Wasserstein distance has received much attention in recent years because of its distinctions from other distances or divergences. Although~computing the Wasserstein distance is costly, entropy-regularized optimal transport was proposed to computationally efficiently approximate the Wasserstein distance. The purpose of this study is to understand the theoretical aspect of entropy-regularized optimal transport. In this paper, we~focus on entropy-regularized optimal transport on multivariate normal distributions and $q$-normal distributions. We~obtain the explicit form of the entropy-regularized optimal transport cost on multivariate normal and $q$-normal distributions; this provides a perspective to understand the effect of entropy regularization, which was previously known only experimentally. Furthermore, we obtain the entropy-regularized Kantorovich estimator for the probability measure that satisfies certain conditions. We also demonstrate how the Wasserstein distance, optimal coupling, geometric structure, and statistical efficiency are affected by entropy regularization in some experiments. In particular, our results about the explicit form of the optimal coupling of the Tsallis entropy-regularized optimal transport on multivariate $q$-normal distributions and the entropy-regularized Kantorovich estimator are novel and will become the first step towards the understanding of a more general setting.