Vertex-critical graphs in subfamilies of (P4+ P1)-free graphs

Abstract

A graph G is k-vertex-critical if (G)=k but (G-v)<k for all v∈ V(G). In this paper we make progress on the open problem of the finiteness of k-vertex-critical (P4+ P1)-free graphs by showing that there are only finitely many k-vertex-critical graphs in the following subfamilies of (P4+ P1)-free graphs for all k 1 and 0: (P4+ P1,chair)-free graphs, (P4+ P1,P5,bull)-free graphs, and (P4+ P1,P5,cricket)-free graphs. In fact, all but the first of these are special cases of our general result that there are only finitely many k-vertex-critical (P4+ P1,B4(m),B3(m)+)-free graphs for all k 1 and ,m 0. Here Bn(m) is the graph obtained from a path of order n by identifying one of its leaves with the centre vertex of K1,m and Bn(m)+ is the graph obtained by identifying an edge of K3 with the edge of Bn(m) with endpoints of degrees 2 and m, respectively. Our results imply the existence of simple polynomial-time certifying algorithms to decide the k-colourability of all graphs in these subfamilies for every fixed k. We also show that (G) +2 for all (P4+ P1,K3)-free graphs and all 0, improving the previously known upper bound of 2+2 that followed from Randerath and Schiermeyer's 2004 result on (Pt,K3)-free graphs. More generally, we provide a -bound in O(ω-1) for (P4+ P1)-free graphs which improves the bound of (2+2)ω-1 which followed from Gravier, Ho\`ang and Maffray in 2003 for Pt-free graphs.