Toward Vu's conjecture

Abstract

In 2002, Vu conjectured that graphs of maximum degree and maximum codegree at most ζ have chromatic number at most (ζ+o(1)). Despite its importance, the conjecture has remained widely open. The only direct progress so far has been obtained in the ``dense regime,'' when ζ is close to 1, by Hurley, de Verclos, and Kang. In this paper we provide the first progress in the sparse regime ζ 1, the case of primary interest to Vu. We show that there exists ζ0 > 0 such that for all ζ ∈ [-32,ζ0], the following holds: if G is a graph with maximum degree and maximum codegree at most ζ , then (G) ≤ (ζ1/32 + o(1)). We derive this from a more general result that assumes only that the common neighborhood of any s 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.