An Optimal -Bound for (P6, diamond)-Free Graphs

Abstract

Given two graphs H1 and H2, a graph G is (H1,H2)-free if it contains no induced subgraph isomorphic to H1 or H2. Let Pt be the path on t vertices and Kt be the complete graph on t vertices. The diamond is the graph obtained from K4 by removing an edge. In this paper we show that every (P6, diamond)-free graph G satisfies (G) ω(G)+3, where (G) and ω(G) are the chromatic number and clique number of G, respectively. Our bound is attained by the complement of the famous 27-vertex Schl\"afli graph. Our result unifies previously known results on the existence of linear -binding functions for several graph classes. Our proof is based on a reduction via the Strong Perfect Graph Theorem to imperfect (P6, diamond)-free graphs, a careful analysis of the structure of those graphs, and a computer search that relies on a well-known characterization of 3-colourable (P6,K3)-free graphs.