On product of difference sets for sets of positive density

Abstract

In this paper we prove that given two sets E1,E2 ⊂ Z of positive density, there exists k ≥ 1 which is bounded by a number depending only on the densities of E1 and E2 such that kZ ⊂ (E1-E1)·(E2-E2). As a corollary of the main theorem we deduce that if α,β > 0 then there exist N0 and d0 which depend only on α and β such that for every N ≥ N0 and E1,E2 ⊂ ZN with |E1| ≥ α N, |E2| ≥ β N there exists d ≤ d0 a divisor of N satisfying d \, ZN ⊂ (E1-E1)·(E2-E2).