English

New results on simplex-clusters in set systems

Combinatorics 2022-06-13 v2

Abstract

A dd-simplex is defined to be a collection A1,,Ad+1A_1,\dots,A_{d+1} of subsets of size kk of [n][n] such that the intersection of all of them is empty, but the intersection of any dd of them is non-empty. Furthermore, a dd-cluster is a collection of d+1d+1 such sets with empty intersection and union of size 2k\le 2k, and a dd-simplex-cluster is such a collection that is both a dd-simplex and a dd-cluster. The Erd\H{o}s-Chv\'{a}tal dd-simplex Conjecture from 1974 states that any family of kk-subsets of [n][n] containing no dd-simplex must be of size no greater than (n1k1) {n -1 \choose k-1}. In 2011, Keevash and Mubayi extended this conjecture by hypothesizing that the same bound would hold for families containing no dd-simplex-cluster. In this paper, we resolve Keevash and Mubayi's conjecture for all 4d+1k4 \le d+1 \le k and n2kd+2n \ge 2k-d+2, which in turn resolves all remaining cases of the Erd\H{o}s-Chv\'{a}tal Conjecture except when nn is very small (i.e. n<2kd+2n < 2k-d+2).

Keywords

Cite

@article{arxiv.2001.01812,
  title  = {New results on simplex-clusters in set systems},
  author = {Gabriel Currier},
  journal= {arXiv preprint arXiv:2001.01812},
  year   = {2022}
}

Comments

Small edits, important references added

R2 v1 2026-06-23T13:04:28.112Z