Structure and colour in triangle-free graphs
Abstract
Motivated by a recent conjecture of the first author, we prove that every properly coloured triangle-free graph of chromatic number contains a rainbow independent set of size . This is sharp up to a factor . This result and its short proof have implications for the related notion of chromatic discrepancy. Drawing inspiration from both structural and extremal graph theory, we conjecture that every triangle-free graph of chromatic number contains an induced cycle of length as . Even if one only demands an induced path of length , the conclusion would be sharp up to a constant multiple. We prove it for regular girth graphs and for girth graphs. As a common strengthening of the induced paths form of this conjecture and of Johansson's theorem (1996), we posit the existence of some such that for every forest on vertices, every triangle-free and induced -free graph has chromatic number at most . We prove this assertion with `triangle-free' replaced by `regular girth '.
Cite
@article{arxiv.1912.13328,
title = {Structure and colour in triangle-free graphs},
author = {N. R. Aravind and Stijn Cambie and Wouter Cames van Batenburg and Rémi de Joannis de Verclos and Ross J. Kang and Viresh Patel},
journal= {arXiv preprint arXiv:1912.13328},
year = {2020}
}
Comments
12 pages; in v2 one section was removed due to a subtle error