Characterization of probability distribution convergence in Wasserstein distance by Lp-quantization error function

Abstract

We establish conditions to characterize probability measures by their Lp-quantization error functions in both Rd and Hilbert settings. This characterization is two-fold: static (identity of two distributions) and dynamic (convergence for the Lp-Wasserstein distance). We first propose a criterion on the quantization level N, valid for any norm on Rd and any order p based on a geometrical approach involving the Vorono\"i diagram. Then, we prove that in the L2-case on a (separable) Hilbert space, the condition on the level N can be reduced to N=2, which is optimal. More quantization based characterization cases on dimension 1 and a discussion of the completeness of a distance defined by the quantization error function can be found in the end of this paper.