On a sumset conjecture of Erdos

Abstract

Erdos conjectured that for any set A⊂eq N with positive lower asymptotic density, there are infinite sets B,C⊂eq N such that B+C⊂eq A. We verify Erdos' conjecture in the case that A has Banach density exceeding 12. As a consequence, we prove that, for A⊂eq N with positive Banach density (a much weaker assumption than positive lower density), we can find infinite B,C⊂eq N such that B+C is contained in the union of A and a translate of A. Both of the aforementioned results are generalized to arbitrary countable amenable groups. We also provide a positive solution to Erdos' conjecture for subsets of the natural numbers that are pseudorandom.