English

On Gy\'arf\'as' Path-Colour Problem

Combinatorics 2025-06-25 v1

Abstract

In their 1997 paper titled ``Fruit Salad", Gy\'{a}rf\'{a}s posed the following conjecture: there exists a constant kk such that if each path of a graph spans a 33-colourable subgraph, then the graph is kk-colourable. It is noted that k=4k=4 might suffice. Let r(G)r(G) be the maximum chromatic number of any subgraph HH of GG where HH is spanned by a path. The only progress on this conjecture comes from Randerath and Schiermeyer in 2002, who proved that if GG is an nn vertex graph, then χ(G)r(G)log87(n)\chi(G) \leq r(G)\log_{\frac{8}{7}}(n). We prove that for all natural numbers rr, there exists a graph GG with r(G)rr(G)\leq r and χ(G)3r21\chi(G)\geq \lfloor\frac{3r}{2}\rfloor -1. Hence, for all constants kk there exists a graph with χr>k\chi - r > k. Our proof is constructive. We also study this problem in graphs with a forbidden induced subgraph. We show that if GG is K1,tK_{1,t}-free, for t4t\geq 4, then χ(G)(t1)(r(G)+(t12)3)\chi(G) \leq (t-1)(r(G)+\binom{t-1}{2}-3). If GG is claw-free, then we prove χ(G)2r(G)\chi(G) \leq 2r(G). Additionally, the graphs GG where every induced subgraph GG' of GG satisfy χ(G)=r(G)\chi(G') = r(G') are considered. We call such graphs path-perfect, as this class generalizes perfect graphs. We prove that if HH is a forest with at most 44 vertices other than the claw, then every HH-free graph GG has χ(G)r(G)+1\chi(G) \leq r(G)+1. We also prove that if HH is additionally not isomorphic to 2K22K_2 or K2+2K1K_2+2K_1, then all HH-free graphs are path-perfect.

Keywords

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

R2 v1 2026-07-01T03:30:18.872Z