Statistical Inference for Optimal Transport ...

Optimal transport is a flexible framework for comparing probability distributions, which has received a recent surge of interest as a methodological tool in statistics. The aim of this thesis is to develop procedures for performing valid and efficient statistical inference for various objects arising from the optimal transport framework. On the one hand, we derive a semiparametric efficient estimator of the quadratic Wasserstein distance between probability measures of arbitrary fixed dimension. On the other hand, we develop a pointwise central limit theorem for the quadratic optimal transport map between multivariate periodic distributions. We also develop nonasymptotic and sequential inferential procedures for various optimal transport divergence functionals. These results provide a step toward the longstanding problem of performing practical inference for optimal transport in arbitrary dimension. Along the way, this thesis studies the related question of performing minimax estimation for optimal transport ...