An invariance principle under the total variation distance

Abstract

Let X1,X2,… be a sequence of i.i.d. random variables, with mean zero and variance one. Let Wn=(X1+…+Xn)/n. An old and celebrated result of Prohorov asserts that Wn converges in total variation to the standard Gaussian distribution if and only if Wn0 has an absolutely continuous component for some n0. In the present paper, we give yet another proof and extend Prohorov's theorem to a situation where, instead of Wn, we consider more generally a sequence of homogoneous polynomials in the Xi. More precisely, we exhibit conditions for a recent invariance principle proved by Mossel, O'Donnel and Oleszkiewicz to hold under the total variation distance. There are many works about CLT under various metrics in the literature, but the present one seems to be the first attempt to deal with homogeneous polynomials in the Xi with degree strictly greater than one.