Sharp bound on the number of maximal sum-free subsets of integers

Abstract

Cameron and Erdos asked whether the number of maximal sum-free sets in \1, … , n\ is much smaller than the number of sum-free sets. In the same paper they gave a lower bound of 2 n/4 for the number of maximal sum-free sets. Here, we prove the following: For each 1≤ i ≤ 4, there is a constant Ci such that, given any n i 4, \1, … , n\ contains (Ci+o(1)) 2n/4 maximal sum-free sets. Our proof makes use of container and removal lemmas of Green, a structural result of Deshouillers, Freiman, S\'os and Temkin and a recent bound on the number of subsets of integers with small sumset by Green and Morris. We also discuss related results and open problems on the number of maximal sum-free subsets of abelian groups.