Vertex-critical graphs in co-gem-free graphs

Abstract

A graph G 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 (co-gem, H)-free graphs for all k when H is any graph of order 4 by showing finiteness in the three remaining open cases, those are the cases when H is 2P2, K3+P1, and K4. For the first two cases we actually prove the stronger results: There are only finitely many k-vertex-critical (co-gem, paw+P1)-free graphs for all k and that only finitely many k-vertex-critical (co-gem, paw+P1)-free graphs for all k 1. There are only finitely many k-vertex-critical (co-gem, P5, P3+cP2)-free graphs for all k 1 and c 0. To prove the latter result, we employ a novel application of Sperner's Theorem on the number of antichains in a partially ordered set. Our result for K4 uses exhaustive computer search and is proved by showing the stronger result that every (co-gem, K4)-free graph is 4-colourable. Our results imply the existence of simple polynomial-time certifying algorithms to decide the k-colourability of (co-gem, H)-free graphs for all k and all H of order 4 by searching the vertex-critical graphs as induced subgraphs.