New moments criteria for convergence towards normal product/tetilla laws (1708.07681v2)
Abstract: In the framework of classical probability, we consider the normal product distribution $F_\infty \sim N_1 \times N_2$ where $N_1, N_2$ are two independent standard normal random variable, and in the setting of free probability, $F_\infty \sim \left( S_1 S_2 + S_2 S_1 \right)/\sqrt{2}$ known as {\it tetilla law} \cite{d-n}, where $S_1, S_2$ are freely independent normalized semicircular random variables. We provide novel characterization of $F_\infty$ 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 $F_\infty$ match if and only if $\mu_4 (F)= 9 \, (\mbox{resp. }\varphi(F4)=2.5)$, and $\mu_{2r}(F)= ((2r-1)!!)2 \, (\mbox{resp. }\varphi(F{2r})=\varphi(F{2r}_\infty ))$ for some $r \ge 3$, where $\mu_r (F)$ stands for the $r$th moment of the random variable $F$, and $\varphi$ 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 $F_\infty$. Our results generalize the findings in Nourdin & Poly \cite{n-p-2w}, Azmoodeh, et. al \cite{a-p-p} in the classical probability, and of Deya & Nourdin \cite{d-n} in the free probability setting.