Fluctuations of Quadratic Chaos

Abstract

In this paper we characterize all distributional limits of the random quadratic form Tn =Σ1 u< v n au, v Xu Xv, where ((au, v))1 u,v n is a \0, 1\-valued symmetric matrix with zeros on the diagonal and X1, X2, …, Xn are i.i.d.~ mean 0 variance 1 random variables with common distribution function F. In particular, we show that any distributional limit of Sn:=Tn/Var[Tn] can be expressed as the sum of three independent components: a Gaussian, a (possibly) infinite weighted sum of independent centered chi-squares, and a Gaussian mixture with a random variance. As a consequence, we prove a fourth moment theorem for the asymptotic normality of Sn, which applies even when F does not have finite fourth moment. More formally, we show that Sn converges to N(0, 1) if and only if the fourth moment of Sn (appropriately truncated when F does not have finite fourth moment) converges to 3 (the fourth moment of the standard normal distribution).