On Berry--Esseen bounds for non-instantaneous filters of linear processes

Abstract

Let Xn=Σi=1∞aiεn-i, where the εi are i.i.d. with mean 0 and at least finite second moment, and the ai are assumed to satisfy |ai|=O(i-β) with β >1/2. When 1/2<β<1, Xn is usually called a long-range dependent or long-memory process. For a certain class of Borel functions K(x1,...,xd+1), d0, from Rd+1 to R, which includes indicator functions and polynomials, the stationary sequence K(Xn,Xn+1,...,Xn+d) is considered. By developing a finite orthogonal expansion of K(Xn,...,Xn+d), the Berry--Esseen type bounds for the normalized sum QN/N,QN=Σn=1N(K(X n,...,Xn+d)-EK(Xn,...,Xn+d)) are obtained when QN/N obeys the central limit theorem with positive limiting variance.