English

Arithmetic Progressions in Sumsets of Sparse Sets

Combinatorics 2021-04-20 v2

Abstract

A set of positive integers AZ>0A \subset \mathbb{Z}_{> 0} is \emph{log-sparse} if there is an absolute constant CC so that for any positive integer xx the sequence contains at most CC elements in the interval [x,2x)[x,2x). In this note we study arithmetic progressions in sums of log-sparse subsets of Z>0\mathbb{Z}_{> 0}. We prove that for any log-sparse subsets S1,,SnS_1, \dots, S_n of Z>0,\mathbb{Z}_{> 0}, the sumset S=S1++SnS = S_1 + \cdots + S_n cannot contain an arithmetic progression of size greater than n(1+o(1))n.n^{(1+o(1))n}. We also show that this is nearly tight by proving that there exist log-sparse sets S1,,SnS_1, \dots, S_n such that S1++SnS_1 + \cdots + S_n contains an arithmetic progression of size n(1o(1))n.n^{(1-o(1)) n}.

Keywords

Cite

@article{arxiv.2104.01564,
  title  = {Arithmetic Progressions in Sumsets of Sparse Sets},
  author = {Noga Alon and Ryan Alweiss and Yang P. Liu and Anders Martinsson and Shyam Narayanan},
  journal= {arXiv preprint arXiv:2104.01564},
  year   = {2021}
}

Comments

6 pages. This version: improved upper bound, added one author

R2 v1 2026-06-24T00:50:09.961Z