New moments criteria for convergence towards normal product/tetilla laws

Abstract

In the framework of classical probability, we consider the normal product distribution F∞ N1 × N2 where N1, N2 are two independent standard normal random variable, and in the setting of free probability, F∞ ( S1 S2 + S2 S1 )/2 known as tetilla law d-n, where S1, S2 are freely independent normalized semicircular random variables. We provide novel characterization of F∞ within the second Wiener (Wigner) chaos. More precisely, we show that for any generic element F in the second Wiener (Wigner) chaos with variance one the laws of F and F∞ match if and only if μ4 (F)= 9 \, (resp. (F4)=2.5), and μ2r(F)= ((2r-1)!!)2 \, (resp. (F2r)=(F2r∞ )) for some r 3, where μr (F) stands for the rth moment of the random variable F, and is the relevant tracial state. We use our moments characterization to study the non central limit theorems within the second Wiener (Wigner) chaos and the target random variable F∞. Our results generalize the findings in Nourdin \& Poly n-p-2w, Azmoodeh, et. al a-p-p in the classical probability, and of Deya \& Nourdin d-n in the free probability setting.