On optimal matching of Gaussian samples III

Abstract

This article is a continuation of the papers [8,9] in which the optimal matching problem, and the related rates of convergence of empirical measures for Gaussian samples are addressed. A further step in both the dimensional and Kantorovich parameters is achieved here, proving that, given X1, …, Xn independent random variables with common distribution the standard Gaussian measure μ on Rd, d ≥ 3, and μn \, = \, 1n Σi=1n δXi the associated empirical measure, E ( Wpp (μn , μ ) ) \, ≈ \, 1np/d for any 1≤ p < d, where Wp is the p-th Kantorovich metric. The proof relies on the pde and mass transportation approach developed by L. Ambrosio, F. Stra and D. Trevisan in a compact setting.