Bohr sets in sumsets III: expanding difference sets and almost Bohr sets

Abstract

Let G be a discrete abelian group. Følner showed that if A ⊂eq G has positive upper Banach density, then A - A contains an almost Bohr set -- a set of the form B E where B is a Bohr set and E has zero Banach density. We study the sets S ⊂eq G for which A - A + S contains a Bohr set for every A ⊂eq G of positive upper Banach density. For G = Z, we show that the sets \n2: n ∈ N\, \p - 1: p prime\, and \ nc : n ∈ N \ with c > 0, have this property. Moreover, we prove that there are sets A, B ⊂eq Z such that A is dense in the Bohr topology of Z, d*(B) > 0, while A + B is not piecewise Bohr, answering two questions of the second author in [31]. We also study those sets S such that A + S contains a Bohr set for every almost Bohr set A. As applications, we prove: (i) If ϕ1, ϕ2: G G are (not necessarily commuting) homomorphisms with finite indices [G: ϕi(G)], and C ⊂eq G is a central set, then ϕ1(C) - ϕ1(C) + ϕ2(C) contains a Bohr set. This answers one of our questions in [35] and generalizes results in [44, 48]; (ii) Every set of pointwise recurrence in Z is a set of nice recurrence and a van der Corput set, extending known properties of sets of pointwise recurrence studied in [26, 27, 40].