Bohr topology and difference sets for some abelian groups

Abstract

For a fixed prime p, Fp denotes the field with p elements, and Fpω denotes the countable direct sum n=1∞ Fp. Viewing Fpω as a countable abelian group, we construct a set A⊂eq Fpω having positive upper Banach density while the difference set A-A:=\a-b:a,b∈ A\ does not contain a Bohr neighborhood of any c∈ Fpω. For p=2 we obtain a stronger conclusion: A-A does not contain a set of the form g+(B-B), where B is piecewise syndetic. This construction answers negatively a variant of the following question asked by several authors: if A⊂eq Z has positive upper Banach density, must A-A contain a Bohr neighborhood of some n∈ Z? We also construct sets S, A⊂eq Fpω such that S is dense in the Bohr topology of Fpω, A has positive upper Banach density, and A+S is not piecewise Bohr. For p=2 we show that every translate of S is a set of topological recurrence and A+S is not piecewise syndetic. These constructions answer a variant of a question asked by the author.