Properties of two dimensional sets with small sumset

Abstract

Let A, B⊂eq R2 be finite, nonempty subsets, let s≥ 2 be an integer, and let h1(A,B) denote the minimal number t such that there exist 2t (not necessarily distinct) parallel lines, 1,...,t,'1,...,'t, with A⊂eq i=1ti and B⊂eqi=1t'i. Suppose h1(A,B)≥ s. Then we show that: (a) if ||A|-|B||≤ s and |A|+|B|≥ 4s2-6s+3, then |A+B|≥ (2- 1 s)(|A|+|B|)-2s+1; (b) if |A|≥ |B|+s and |B|≥ 2s2-7/2s+3/2, then |A+B|≥ |A|+(3- 2 s)|B|-s; (c) if |A|≥ 1/2s(s-1)|B|+s and either |A|> 1/8(2s-1)2|B|-1/4(2s-1)+(s-1)22(|B|-2) or |B|≥ 2s+43, then |A+B|≥ |A|+s(|B|-1). This extends the 2-dimensional case of the Freiman 2d--Theorem to distinct sets A and B, and, in the symmetric case A=B, improves the best prior known bound for |A|+|B| (due to Stanchescu, and which was cubic in s) to an exact value. As part of the proof, we give general lower bounds for two dimensional subsets that improve the 2-dimensional case of estimates of Green and Tao and of Gardner and Gronchi, and that generalize the 2-dimensional case of the Brunn-Minkowski Theorem.