English

Toward Vu's conjecture

Combinatorics 2025-09-09 v2 Discrete Mathematics

Abstract

In 2002, Vu conjectured that graphs of maximum degree Δ\Delta and maximum codegree at most ζΔ\zeta \Delta have chromatic number at most (ζ+o(1))Δ(\zeta+o(1))\Delta. Despite its importance, the conjecture has remained widely open. The only direct progress so far has been obtained in the ``dense regime,'' when ζ\zeta is close to 11, by Hurley, de Verclos, and Kang. In this paper we provide the first progress in the sparse regime ζ1\zeta \ll 1, the case of primary interest to Vu. We show that there exists ζ0>0\zeta_0 > 0 such that for all ζ[log32Δ,ζ0]\zeta \in [\log^{-32}\Delta,\zeta_0], the following holds: if GG is a graph with maximum degree Δ\Delta and maximum codegree at most ζΔ\zeta \Delta, then χ(G)(ζ1/32+o(1))Δ\chi(G) \leq (\zeta^{1/32} + o(1))\Delta. We derive this from a more general result that assumes only that the common neighborhood of any ss vertices is bounded rather than the codegrees of pairs of vertices. Our more general result also extends to the list coloring setting, which is of independent interest.

Keywords

Cite

@article{arxiv.2508.16818,
  title  = {Toward Vu's conjecture},
  author = {Peter Bradshaw and Abhishek Dhawan and Abhishek Methuku and Michael C. Wigal},
  journal= {arXiv preprint arXiv:2508.16818},
  year   = {2025}
}

Comments

29 pages; comments welcome!

R2 v1 2026-07-01T05:02:31.685Z