Sets with few differences in abelian groups

Abstract

Let (G, +) be an abelian group. In 2004, Eliahou and Kervaire found an explicit formula for the smallest possible cardinality of the sumset A+A, where A ⊂eq G has fixed cardinality r. We consider instead the smallest possible cardinality of the difference set A-A, which is always greater than or equal to the smallest possible cardinality of A+A and can be strictly greater. We conjecture a formula for this quantity and prove the conjecture in the case that G is a cyclic group or a vector space over a finite field. This resolves a conjecture of Bajnok and Matzke on signed sumsets.