Strong asymptotic independence on Wiener chaos

Abstract

Let Fn = (F1,n, ....,Fd,n), n≥ 1, be a sequence of random vectors such that, for every j=1,...,d, the random variable Fj,n belongs to a fixed Wiener chaos of a Gaussian field. We show that, as n∞, the components of Fn are asymptotically independent if and only if Cov(Fi,n2,Fj,n2) 0 for every i≠ j. Our findings are based on a novel inequality for vectors of multiple Wiener-It\o integrals, and represent a substantial refining of criteria for asymptotic independence in the sense of moments recently established by Nourdin and Rosinski.