Bohr neighborhoods in generalized difference sets

Abstract

If A is a set of integers having positive upper Banach density and r,s,t are nonzero integers whose sum is zero, a theorem of Bergelson and Ruzsa says that the set rA+sA+tA:=\ra1+sa2+ta3:ai∈ A\ contains a Bohr neighborhood of zero. We prove the natural generalization of this result for subsets of countable abelian groups and more summands.