Properties of two dimensional sets with small sumset

TL;DR

This paper extends Freiman's theorem to two-dimensional sets with small sumsets, providing new bounds and inequalities that improve upon previous results, especially for the case of distinct sets and symmetric sets.

Contribution

It generalizes the 2D Freiman 2^d theorem to distinct sets and improves bounds for symmetric sets, advancing understanding of sumset properties in the plane.

Findings

Derived new lower bounds for sumsets in 2D.

Extended Freiman's theorem to non-symmetric sets.

Improved bounds over previous cubic estimates.

Abstract

Let $A, B\subseteq \mathbb{R}^2$ be finite, nonempty subsets, let $s\geq 2$ be an integer, and let $h_1(A,B)$ denote the minimal number $t$ such that there exist $2t$ (not necessarily distinct) parallel lines, $\ell_1,...,\ell_{t},\ell'_1,...,\ell'_{t}$, with $A\subseteq \bigcup_{i=1}^{t}\ell_i$ and $B\subseteq\bigcup_{i=1}^{t}\ell'_i$. Suppose $h_1(A,B)\geq s$. Then we show that: (a) if $||A|-|B||\leq s$ and $|A|+|B|\geq 4s^2-6s+3$, then $$|A+B|\geq (2-\frac 1 s)(|A|+|B|)-2s+1;$$ (b) if $|A|\geq |B|+s$ and $|B|\geq 2s^2-{7/2}s+{3/2}$, then $$|A+B|\geq |A|+(3-\frac 2 s)|B|-s;$$ (c) if $|A|\geq {1/2}s(s-1)|B|+s$ and either $|A|> {1/8}(2s-1)^2|B|-{1/4}(2s-1)+\frac{(s-1)^2}{2(|B|-2)}$ or $|B|\geq \frac{2s+4}{3}$, then $$|A+B|\geq |A|+s(|B|-1).$$ This extends the 2-dimensional case of the Freiman $2^d$--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.