Some Results on Critical (P5,H)-free Graphs

Abstract

Given two graphs H1 and H2, a graph is (H1,H2)-free if it contains no induced subgraph isomorphic to H1 nor H2. A graph G is k-vertex-critical if every proper induced subgraph of G has chromatic number less than k, but G has chromatic number k. The study of k-vertex-critical graphs for specific graph classes is an important topic in algorithmic graph theory because if the number of such graphs that are in a given hereditary graph class is finite, then there exists a polynomial-time certifying algorithm to decide the k-colorability of a graph in the class. In this paper, we show that: (1) for k 1, there are finitely many k-vertex-critical (P5,K1,4+P1)-free graphs; (2) for s 1, there are finitely many 5-vertex-critical (P5,K1,s+P1)-free graphs; (3) for k 1, there are finitely many k-vertex-critical (P5,K3+2P1)-free graphs. Moreover, we characterize all 5-vertex-critical (P5,H)-free graphs where H ∈ \K1,3+P1,K1,4+P1,K3+2P1\ using an exhaustive graph generation algorithm.