Bounds on the constant in the mean central limit theorem

Abstract

Let X1,\...,Xn be independent with zero means, finite variances σ12,\...,σn2 and finite absolute third moments. Let Fn be the distribution function of (X1+\...+Xn)/σ, where σ2=Σi=1nσi2, and that of the standard normal. The L1-distance between Fn and then satisfies \[ Fn-11σ3Σi=1nE|Xi|3.\] In particular, when X1,\...,Xn are identically distributed with variance σ2, we have \[ Fn-1E|X1|3σ3n for all n∈N,\] corresponding to an L1-Berry--Esseen constant of 1.