English

Counting sets with small sumset and applications

Combinatorics 2014-02-05 v2 Number Theory

Abstract

We study the number of kk-element sets A{1,,N}A \subset \{1,\ldots,N\} with A+AKA|A + A| \leq K|A| for some (fixed) K>0K > 0. Improving results of the first author and of Alon, Balogh, Samotij and the second author, we determine this number up to a factor of 2o(k)No(1)2^{o(k)} N^{o(1)} for most NN and kk. As a consequence of this and a further new result concerning the number of sets AZ/NZA \subset \mathbf{Z}/N\mathbf{Z} with A+AcA2|A +A| \leq c |A|^2, we deduce that the random Cayley graph on Z/NZ\mathbf{Z}/N\mathbf{Z} with edge density~12\frac{1}{2} has no clique or independent set of size greater than (2+o(1))log2N\big( 2 + o(1) \big) \log_2 N, asymptotically the same as for the Erd\H{o}s-R\'enyi random graph. This improves a result of the first author from 2003 in which a bound of 160log2N160 \log_2 N was obtained. As a second application, we show that if the elements of ANA \subset \mathbf{N} are chosen at random, each with probability 1/21/2, then the probability that A+AA+A misses exactly kk elements of N\mathbf{N} is equal to (2+o(1))k/2\big( 2 + o(1) \big)^{-k/2} as kk \to \infty.

Keywords

Cite

@article{arxiv.1305.3079,
  title  = {Counting sets with small sumset and applications},
  author = {Ben Green and Robert Morris},
  journal= {arXiv preprint arXiv:1305.3079},
  year   = {2014}
}

Comments

30 pages, to appear in Combinatorica. Minor changes made following helpful suggestions by the referees

R2 v1 2026-06-22T00:16:08.406Z