Heyde theorem on locally compact Abelian groups with the connected component of zero of dimension 1

Abstract

Let X be a locally compact Abelian group with the connected component of zero of dimension 1. Let 1 and 2 be independent random variables with values in X with nonvanishing characteristic functions. We prove that if a topological automorphism α of the group X satisfies the condition Ker(I+α)=\0\ and the conditional distribution of the linear form L2 = 1 + α2 given L1 = 1 + 2 is symmetric, then the distributions of j are convolutions of Gaussian distributions on X and distributions supported in the subgroup \x∈ X:2x=0\. This result can be viewed as a generalization of the well-known Heyde theorem on the characterization of the Gaussian distribution on the real line.