English

Small subsets without $k$-term arithmetic progressions

Combinatorics 2021-09-08 v1

Abstract

Szemer\'edi's theorem implies that there are 2o(n)2^{o(n)} subsets of [n][n] which do not contain a kk-term arithmetic progression. A sparse analogue of this statement was obtained by Balogh, Morris, and Samotij, using the hypergraph container method: For any β>0\beta > 0 there exists C>0C > 0, such that if mCn11/(k1)m \ge Cn^{1 - 1/(k-1)} then there are at most βm(nm)\beta^m \binom{n}{m} mm-element subsets of {1,,n}\{1, \ldots, n\} without a kk-term arithmetic progression. We give a short, inductive proof of this result. Consequently, this provides a short proof of the Szemer\'edi's theorem in random subsets of integers.

Keywords

Cite

@article{arxiv.2109.02964,
  title  = {Small subsets without $k$-term arithmetic progressions},
  author = {Rajko Nenadov},
  journal= {arXiv preprint arXiv:2109.02964},
  year   = {2021}
}

Comments

6 pages. Companion note to the paper "A new proof of the KLR conjecture" [arXiv:2108.05687]

R2 v1 2026-06-24T05:44:56.344Z