The Skitovich-Darmois theorem for finite Abelian groups
Abstract
Let X be a finite Abelian group, xii, i=1,2,...,n,n>1, be independent random variables with values in X and distributions mui. Let alphaij,i,j=1,2,...,n, be automorphisms of X. We prove that the independence of n linear forms Lj=alpha1jxi1+alpha2jxi2+...+alphanjxin implies that all mui are shifts of the Haar distributions on some subgroups of the group X. This theorem is an analogue of the Skitovich-Darmois theorem for finite Abelian groups.
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