A high-dimensional CLT in W2 distance with near optimal convergence rate

Abstract

Let X1, … , Xn be i.i.d. random vectors in Rd with \|X1\| β. Then, we show that 1n(X1 + … + Xn) converges to a Gaussian in quadratic transportation (also known as "Kantorovich" or "Wasserstein") distance at a rate of O( d β nn ), improving a result of Valiant and Valiant. The main feature of our theorem is that the rate of convergence is within n of optimal for n, d → ∞.