Almost sure limit theorems on Wiener chaos: the non-central case

Abstract

In BNT, a framework to prove almost sure central limit theorems for sequences (Gn) belonging to the Wiener space was developed, with a particular emphasis of the case where Gn takes the form of a multiple Wiener-It\o integral with respect to a given isonormal Gaussian process. In the present paper, we complement the study initiated in BNT, by considering the more general situation where the sequence (Gn) may not need to converge to a Gaussian distribution. As an application, we prove that partial sums of Hermite polynomials of increments of fractional Brownian motion satisfy an almost sure limit theorem in the long-range dependence case, a problem left open in BNT.