Bull-free graphs and χ-boundedness

Abstract

A bull is a graph obtained from a four-vertex path by adding a vertex adjacent to the two middle vertices of the path. A graph G is bull-free if no induced subgraph of G is a bull. We prove that for all k,t∈ N, if G is a bull-free graph of clique number at most k and every triangle-free induced subgraph of G has chromatic number at most t, then G has chromatic number at most kO( t). We further show that the bound kO( t) is best possible up to a multiplicative constant in the exponent. Thomassé, Trotignon, and Vušković (2017) were the first to give a bound of the form 2p p, where p=O(k2+t), with a proof that uses Chudnovsky's structure theorem for bull-free graphs. This was improved by Chudnovsky, Cook, Davies, and Oum (2026) to a bound of the form kO(t), with a 10-page proof that again relies heavily on Chudnovsky's structure theorem. Our proof is a single page long and completely avoids the structure theorem, instead using only a result of Chudnovsky and Safra (which itself has a short proof).

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