English

Chromatic thresholds in dense random graphs

Combinatorics 2016-08-15 v2

Abstract

The chromatic threshold δχ(H,p)\delta_\chi(H,p) of a graph HH with respect to the random graph G(n,p)G(n,p) is the infimum over d>0d > 0 such that the following holds with high probability: the family of HH-free graphs GG(n,p)G \subset G(n,p) with minimum degree δ(G)dpn\delta(G) \ge dpn has bounded chromatic number. The study of the parameter δχ(H):=δχ(H,1)\delta_\chi(H) := \delta_\chi(H,1) was initiated in 1973 by Erd\H{o}s and Simonovits, and was recently determined for all graphs HH. In this paper we show that δχ(H,p)=δχ(H)\delta_\chi(H,p) = \delta_\chi(H) for all fixed p(0,1)p \in (0,1), but that typically δχ(H,p)δχ(H)\delta_\chi(H,p) \ne \delta_\chi(H) if p=o(1)p = o(1). We also make significant progress towards determining δχ(H,p)\delta_\chi(H,p) for all graphs HH in the range p=no(1)p = n^{-o(1)}. In sparser random graphs the problem is somewhat more complicated, and is studied in a separate paper.

Keywords

Cite

@article{arxiv.1508.03870,
  title  = {Chromatic thresholds in dense random graphs},
  author = {Peter Allen and Julia Böttcher and Simon Griffiths and Yoshiharu Kohayakawa and Robert Morris},
  journal= {arXiv preprint arXiv:1508.03870},
  year   = {2016}
}

Comments

36 pages (including appendix), 1 figure; the appendix is copied with minor modifications from arXiv:1108.1746 for a self-contained proof of a technical lemma; accepted to Random Structures and Algorithms

R2 v1 2026-06-22T10:34:49.118Z