English

Erdos-Hajnal-type theorems in hypergraphs

Combinatorics 2011-05-02 v1 Discrete Mathematics

Abstract

The Erdos-Hajnal conjecture states that if a graph on n vertices is H-free, that is, it does not contain an induced copy of a given graph H, then it must contain either a clique or an independent set of size n^{d(H)}, where d(H) > 0 depends only on the graph H. Except for a few special cases, this conjecture remains wide open. However, it is known that a H-free graph must contain a complete or empty bipartite graph with parts of polynomial size. We prove an analogue of this result for 3-uniform hypergraphs, showing that if a 3-uniform hypergraph on n vertices is H-free, for any given H, then it must contain a complete or empty tripartite subgraph with parts of order c(log n)^{1/2 + d(H)}, where d(H) > 0 depends only on H. This improves on the bound of c(log n)^{1/2}, which holds in all 3-uniform hypergraphs, and, up to the value of the constant d(H), is best possible. We also prove that, for k > 3, no analogue of the standard Erdos-Hajnal conjecture can hold in k-uniform hypergraphs. That is, there are k-uniform hypergraphs H and sequences of H-free hypergraphs which do not contain cliques or independent sets of size appreciably larger than one would normally expect.

Keywords

Cite

@article{arxiv.1104.5544,
  title  = {Erdos-Hajnal-type theorems in hypergraphs},
  author = {David Conlon and Jacob Fox and Benny Sudakov},
  journal= {arXiv preprint arXiv:1104.5544},
  year   = {2011}
}

Comments

15 pages

R2 v1 2026-06-21T18:00:13.236Z