Suns in triangle-free graphs of large chromatic number

Abstract

For an integer t≥ 4, a t-sun is a graph obtained from a t-vertex cycle C by adding a degree-one neighbor for each vertex of C. Trotignon asked whether every triangle-free graph of sufficiently large chromatic number has an induced subgraph that is a t-sun for some t≥ 4. This remains open, but we show that every triangle-free graph of chromatic number at least 48 has an induced subgraph that is either a t-sun for some t≥ 5, or a 4-sun with a single degree-one vertex deleted. In fact, we prove that for all ≥ 5, there exists c=c()∈ N such that every triangle-free graph of chromatic number at least c has an induced subgraph that is either a t-sun for some t≥ , or a 4-sun with a single degree-one vertex deleted.