Subgraphs of large connectivity and chromatic number

Abstract

Resolving a problem raised by Norin, we show that for each k ∈ N, there exists an f(k) 7k such that every graph G with chromatic number at least f(k)+1 contains a subgraph H with both connectivity and chromatic number at least k. This result is best-possible up to multiplicative constants, and sharpens earlier results of Alon-Kleitman-Thomassen-Saks-Seymour from 1987 showing that f(k) = O(k3), and of Chudnovsky-Penev-Scott-Trotignon from 2013 showing that f(k) = O(k2). Our methods are robust enough to handle list colouring as well: we also show that for each k ∈ N, there exists an f(k) 4k such that every graph G with list chromatic number at least f(k)+1 contains a subgraph H with both connectivity and list chromatic number at least k. This result is again best-possible up to multiplicative constants; here, unlike with f(·), even the existence of f(·) appears to have been previously unknown.