Haar-open sets: a right way of generalizing the Steinhaus sum theorem to non-locally compact groups

Abstract

Let X be the countable product of Abelian locally compact Polish groups and A,B⊂ X be two Borel sets, which are not Haar-null in X. We prove that the sum-set A+B:=\a+b:a∈ A,\;\;b∈ B\ is Haar-open in the sense that for any non-empty compact subset K⊂ X and point p∈ K there exists a point x∈ X such that the set K(A+B+x) is a neighborhood of p in K. This is a generalization of the classical Steinhaus Theorem (1920) to non-locally compact groups. We do not know if this generalization holds for Banach spaces.