English

A Sharp Ramsey Theorem for Ordered Hypergraph Matchings

Combinatorics 2025-07-21 v4

Abstract

We prove essentially sharp bounds for Ramsey numbers of ordered hypergraph matchings, inroduced recently by Dudek, Grytczuk, and Ruci\'{n}ski. Namely, for any r2r \ge 2 and n2n \ge 2, we show that any collection H\mathcal H of nn pairwise disjoint subsets in Z\mathbb Z of size rr contains a subcollection of size n1/(2r1)/2\lfloor n^{1/(2^r-1)}/2\rfloor in which every pair of sets are in the same relative position with respect to the linear ordering on Z\mathbb Z. This improves previous bounds of Dudek-Grytczuk-Ruci\'nski and of Anastos-Jin-Kwan-Sudakov and is sharp up to a factor of 22. For large rr, we even obtain such a subcollection of size (1o(1))n1/(2r1)\lfloor (1-o(1))\cdot n^{1/(2^r-1)}\rfloor, which is asymptotically tight (here, the o(1)o(1)-term tends to zero as rr \to \infty, regardless of the value of nn). Furthermore, we prove a multiparameter extension of this result where one wants to find a clique of prescribed size mPm_P for each relative position pattern PP. Our bound is sharp for all choices of parameters mPm_P, up to a constant factor depending on rr only. This answers questions of Anastos-Jin-Kwan-Sudakov and of Dudek-Grytczuk-Ruci\'nski.

Keywords

Cite

@article{arxiv.2309.04813,
  title  = {A Sharp Ramsey Theorem for Ordered Hypergraph Matchings},
  author = {Lisa Sauermann and Dmitrii Zakharov},
  journal= {arXiv preprint arXiv:2309.04813},
  year   = {2025}
}

Comments

Journal version accepted to Advances in Combinatorics

R2 v1 2026-06-28T12:17:03.552Z