English

$3$-uniform hypergraphs and linear cycles

Combinatorics 2017-09-08 v2

Abstract

Gy\'arf\'as, Gy\H{o}ri and Simonovits proved that if a 33-uniform hypergraph with nn vertices has no linear cycles, then its independence number α2n5\alpha \ge \frac{2n} {5}. The hypergraph consisting of vertex disjoint copies of a complete hypergraph K53K_5^3 on five vertices, shows that equality can hold. They asked whether this bound can be improved if we exclude K53K_5^3 as a subhypergraph and whether such a hypergraph is 22-colorable. In this paper we answer these questions affirmatively. Namely, we prove that if a 33-uniform linear-cycle-free hypergraph doesn't contain K53K_5^3 as a subhypergraph, then it is 22-colorable. This result clearly implies that its independence number αn2\alpha \ge \lceil \frac{n}{2} \rceil. We show that this bound is sharp. Gy\'arf\'as, Gy\H{o}ri and Simonovits also proved that a linear-cycle-free 33-uniform hypergraph contains a vertex of strong degree at most 2. In this context, we show that a linear-cycle-free 33-uniform hypergraph has a vertex of degree at most n2n-2 when n10n \ge 10.

Keywords

Cite

@article{arxiv.1609.03934,
  title  = {$3$-uniform hypergraphs and linear cycles},
  author = {Beka Ergemlidze and Ervin Győri and Abhishek Methuku},
  journal= {arXiv preprint arXiv:1609.03934},
  year   = {2017}
}

Comments

Improved the writing, more explanation added and corrections made

R2 v1 2026-06-22T15:48:37.753Z