The Skitovich-Darmois theorem for discrete and compact totally disconnected Abelian groups

Abstract

Let X be an Abelian group of the form X=Rm× K× D, where m≥ 0, K is a compact totally disconnected group of the special form, D is a discrete group. Let i, i=1,2,...,n,n≥ 2, be independent random variables with values in X and distributions μi, and αij,i,j=1,2,...,n, be topological automorphisms of X. We prove that the independence of the linear forms Lj=Σi=1nαiji,j=1,2,...,n, implies that all μi are convolutions of Gaussian and idempotent distributions. This theorem can be considered as a generalization for the group X of the well-known Skitovich-Darmois theorem for n linear forms.