On Gy\'arf\'as' Path-Colour Problem
Abstract
In their 1997 paper titled ``Fruit Salad", Gy\'{a}rf\'{a}s posed the following conjecture: there exists a constant such that if each path of a graph spans a -colourable subgraph, then the graph is -colourable. It is noted that might suffice. Let be the maximum chromatic number of any subgraph of where is spanned by a path. The only progress on this conjecture comes from Randerath and Schiermeyer in 2002, who proved that if is an vertex graph, then . We prove that for all natural numbers , there exists a graph with and . Hence, for all constants there exists a graph with . Our proof is constructive. We also study this problem in graphs with a forbidden induced subgraph. We show that if is -free, for , then . If is claw-free, then we prove . Additionally, the graphs where every induced subgraph of satisfy are considered. We call such graphs path-perfect, as this class generalizes perfect graphs. We prove that if is a forest with at most vertices other than the claw, then every -free graph has . We also prove that if is additionally not isomorphic to or , then all -free graphs are path-perfect.
Cite
@article{arxiv.2506.19100,
title = {On Gy\'arf\'as' Path-Colour Problem},
author = {Ben Cameron and Alexander Clow},
journal= {arXiv preprint arXiv:2506.19100},
year = {2025}
}
Comments
30 pages, 5 figures