A note on the largest sum-free sets of integers

Abstract

Given A a set of N positive integers, an old question in additive combinatorics asks that whether A contains a sum-free subset of size at least N/3+ω(N) for some increasing unbounded function ω. The question is generally attacked in the literature by considering another conjecture, which asserts that as N∞, x∈R/ZΣn∈ A( 1(1/3,2/3)-1/3)(nx)∞. This conjecture, if true, would also imply that a similar phenomenon occurs for (2k,4k)-sum-free sets for every k≥1. In this note, we prove the latter result directly. The new ingredient of our proof is a structural analysis on the host set A, which might be of independent interest.