The largest (k, )-sum-free sets in compact abelian groups

Abstract

A subset A of a finite abelian group is called (k,)-sum-free if kA A=. In this paper, we extend this concept to compact abelian groups and study the question of how large a measurable (k,)-sum-free set can be. For integers 1 ≤ k < and a compact abelian group G, let λk,(G)=\ μ(A): kA A = \ be the maximum possible size of a (k,)-sum-free subset of G. We prove that if G=I × M, where I is the identity component of G, then λk, (G)= \ λk, (M), λk, (I) \. Moreover, if I is nontrivial, then λk,(I)=1k+. Finally, we discuss how this problem motivates a new framework for studying (k,)-sum-free sets in finite groups.