English

Ramsey-type $\chi$-bounds for $\chi$-bounded graph classes

Combinatorics 2026-05-12 v1

Abstract

We prove that for every path PP, the class of graphs with no induced PP and no induced four-cycle C4C_4 is linearly χ\chi-bounded. More generally, we ask for which pairs {T,H}\{T,H\} where TT is a forest and HH is a complete multipartite graph, every graph GG with no induced TT and no induced HH has chromatic number at most CR(α(H),ω(G)+1)C \cdot R(\alpha(H),\omega(G)+1) for some constant CC depending only on TT and HH, where R(,)R(\cdot,\cdot) denotes the usual Ramsey numbers. We show that this holds in the following two instances, which strengthen the case T=PT=P and H=C4H=C_4 mentioned above: (1) every component of TT is a broom and HH is complete multipartite; or (2) TT is a forest and HH is complete bipartite. These two unify and substantially extend a number of previous results on linear and polynomial χ\chi-boundedness for various graph classes. For case (2), we also provide a new proof (with better bounds) of a recent result of Fox, Nenadov, and Pham on the existence of an induced copy of a fixed tree in a graph satisfying certain sparsity conditions.

Keywords

Cite

@article{arxiv.2605.08848,
  title  = {Ramsey-type $\chi$-bounds for $\chi$-bounded graph classes},
  author = {Tung Nguyen and Sang-il Oum},
  journal= {arXiv preprint arXiv:2605.08848},
  year   = {2026}
}

Comments

21 pages

R2 v1 2026-07-01T12:59:47.901Z