On the finiteness of k-vertex-critical 2P2-free graphs with forbidden induced squids or bulls

Abstract

A graph is k-vertex-critical if (G)=k but (G-v)<k for all v∈ V(G) and (G,H)-free if it contains no induced subgraph isomorphic to G or H. We show that there are only finitely many k-vertex-critical (2P2,H)-free graphs for all k when H is isomorphic to any of the following graphs of order 5: bull, chair, claw+P1, or diamond+P1. The latter three are corollaries of more general results where H is isomorphic to (m, )-squid for m=3,4 and any 1 where an (m,)-squid is the graph obtained from an m-cycle by attaching leaves to a single vertex of the cycle. For each of the graphs H above and any fixed k, our results imply the existence of polynomial-time certifying algorithms for deciding the k-colourability problem for (2P2,H)-free graphs. Further, our structural classifications allow us to exhaustively generate, with aid of computer search, all k-vertex-critical (2P2,H)-free graphs for k 7 when H=bull or H=(4,1)-squid (also known as banner).