Homogeneous sets, clique-separators, critical graphs, and optimal -binding functions

Abstract

Given a set H of graphs, let fH N>0 N>0 be the optimal -binding function of the class of H-free graphs, that is, fH(ω)=\(G): G is H-free, ω(G)=ω\. In this paper, we combine the two decomposition methods by homogeneous sets and clique-separators in order to determine optimal -binding functions for subclasses of P5-free graphs and of (C5,C7,…)-free graphs. In particular, we prove the following for each ω≥ 1: (i) \ f\P5,banner\(ω)=f3K1(ω)∈ (ω2/(ω)), (ii) \ f\P5,co-banner\(ω)=f\2K2\(ω)∈O(ω2), (iii) \ f\C5,C7,…,banner\(ω)=f\C5,3K1\(ω) O(ω), and (iv) \ f\P5,C4\(ω)=(5ω-1)/4. We also characterise, for each of our considered graph classes, all graphs G with (G)>(G-u) for each u∈ V(G). From these structural results, we can prove Reed's conjecture -- relating chromatic number, clique number, and maximum degree of a graph -- for (P5,banner)-free graphs.