Lp bounds for a central limit theorem with involutions

Abstract

Let E=((eij))n× n be a fixed array of real numbers such that eij=eji, eii=0 for 1 i,j n. Let the permutation group be denoted by Sn and the collection of involutions with no fixed points by n, that is, n=\π∈ Sn: π2= id, π(i)≠ i\,∀ i\ with id denoting the identity permutation. For π uniformly chosen from n, let YE=Σi=1n eiπ(i) and W=(YE-μE)/σE where μE=E(YE) and σE2= Var(YE). Denoting by FW and the distribution functions of W and a N(0,1) variate respectively, we bound ||FW-||p for 1 p ∞ using Stein's method and the zero bias transformation. Optimal Berry-Esseen or L∞ bounds for the classical problem where π is chosen uniformly from Sn were obtained by Bolthausen using Stein's method. Although in our case π ∈ n uniformly, the Lp bounds we obtain are of similar form as Bolthausen's bound which holds for p=∞. The difficulty in extending Bolthausen's method from Sn to n arising due to the involution restriction is tackled by the use of zero bias transformations.