English

Stability with minuscule structure for chromatic thresholds

Combinatorics 2026-02-24 v2

Abstract

The chromatic threshold δχ(H)\delta_\chi(H) of a graph HH is the infimum of d>0d>0 such that the chromatic number of every nn-vertex HH-free graph with minimum degree at least dnd n is bounded by a constant depending only on HH and dd. Allen, B{\"o}ttcher, Griffiths, Kohayakawa, and Morris determined the chromatic threshold for every HH; in particular, they showed that if χ(H)=r3\chi(H)=r\ge 3, then δχ(H){r3r2, 2r52r3, r2r1}\delta_\chi(H) \in\{\frac{r-3}{r-2},~\frac{2 r-5}{2 r-3},~\frac{r-2}{r-1}\}. While the chromatic thresholds have been completely determined, rather surprisingly the structural behaviors of extremal graphs near the threshold remain unexplored. In this paper, we establish the stability theorems for chromatic threshold problems. We prove that every nn-vertex HH-free graph GG with δ(G)(δχ(H)o(1))n\delta(G)\ge (\delta_\chi(H)-o(1))n and χ(G)=ω(1)\chi(G)=\omega(1) must be structurally close to one of the extremal configurations. Furthermore, we give a stronger stability result when HH is a clique, showing that GG admits a partition into independent sets and a small subgraph on sublinear number of vertices. We show that this small subgraph has fractional chromatic number 2+o(1)2+o(1) and is homomorphic to a Kneser graph defined by subsets of a logarithmic size set; both these two bounds are best possible. This is the first stability result that captures the lower-order structural features of extremal graphs. We also study two variations of chromatic thresholds. Replacing chromatic number by its fractional counterpart, we determine the fractional chromatic thresholds for all graphs. Another variation is the bounded-VC chromatic thresholds, which was introduced by Liu, Shangguan, Skokan, and Xu very recently. Extending work of {\L}uczak and Thomass{\'e} on the triangle case, we determine the bounded-VC chromatic thresholds for all cliques.

Keywords

Cite

@article{arxiv.2506.14748,
  title  = {Stability with minuscule structure for chromatic thresholds},
  author = {Jaehoon Kim and Hong Liu and Chong Shangguan and Guanghui Wang and Zhuo Wu and Yisai Xue},
  journal= {arXiv preprint arXiv:2506.14748},
  year   = {2026}
}

Comments

27 pages, 2 figures

R2 v1 2026-07-01T03:22:21.705Z