On Extending Pollard's Theorem for t-Representable Sums

Abstract

Let t≥ 1, let A and B be finite, nonempty subsets of an abelian group G, and let Ai B denote all the elements c with at least i representations of the form c=a+b, with a∈ A and b∈ B. For |A|, |B|≥ t, we show that either almosti=1t|Ai B|≥ t|A|+t|B|-2t2+1, or else there exist A'⊂eq A and B'⊂eq B with l&:=&|A A'|+|B B'|≤ t-1, A'tB'&=&A'+B'=AtB,and i=1t|AiB|&≥& t|A|+t|B|-(t-l)(|H|-)-tl≥ t|A|+t|B|-t|H|, where H is the (nontrivial) stabilizer of At B and =|A'+H|-|A'|+|B'+H|-|B'|. In the case t=2, we improve (almost) to |A1B|+|A2B|≥ 2|A|+2|B|-4.