Pollard's theorem in general abelian groups

Abstract

We make further progress towards a Kneser-type generalization of Pollard's Theorem to general abelian groups. For two sets A and B in an abelian group G, the t-popular sumset of A and B, denoted by A+t B, is the set of elements in G each with at least t representations of the form a+b, where a∈ A and b∈ B. For |A|,\, |B| t≥ 2, we prove that if align* Σi=1t |A+i B|< t|A|+t|B|-43t2+23t, align* then there exist A'⊂eq A and B'⊂eq B with |A A'|+|B B'| t-1, A'+t B'=A'+B'=A+t B, and Σi=1t |A+i B| t|A|+t|B|-t|H|, where H is the stabilizer of A'+B'=A+t B. Our result improves the main quadratic term in the previous best bound from -2t2 to -43t2.