English

On local Tur\'an problems

Combinatorics 2020-04-24 v2

Abstract

Since its formulation, Tur\'an's hypergraph problems have been among the most challenging open problems in extremal combinatorics. One of them is the following: given a 33-uniform hypergraph F\mathcal{F} on nn vertices in which any five vertices span at least one edge, prove that F(1/4o(1))(n3)|\mathcal{F}| \ge (1/4 -o(1))\binom{n}{3}. The construction showing that this bound would be best possible is simply (X3)(Y3)\binom{X}{3} \cup \binom{Y}{3} where XX and YY evenly partition the vertex set. This construction has the following more general (2p+1,p+1)(2p+1, p+1)-property: any set of 2p+12p+1 vertices spans a complete sub-hypergraph on p+1p+1 vertices. One of our main results says that, quite surprisingly, for all p>2p>2 the (2p+1,p+1)(2p+1,p+1)-property implies the conjectured lower bound.

Keywords

Cite

@article{arxiv.2004.08734,
  title  = {On local Tur\'an problems},
  author = {Peter Frankl and Hao Huang and Vojtěch Rödl},
  journal= {arXiv preprint arXiv:2004.08734},
  year   = {2020}
}
R2 v1 2026-06-23T14:56:34.410Z