The Heyde theorem on a group Rn× D, where D is a discrete Abelian group

Abstract

Heyde proved that a Gaussian distribution on the real line is characterized by the symmetry of the conditional distribution of one linear statistic given another. The present article is devoted to a group analogue of the Heyde theorem. We describe distributions of independent random variables 1, 2 with values in a group X=Rn× D, where D is a discrete Abelian group, which are characterized by the symmetry of the conditional distribution of the linear statistic L2 = 1 + δ2 given L1 = 1 + 2, where δ is a topological automorphism of X such that Ker(I+δ)=\0\.