Critical (P5,dart)-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. Let Pt be the path on t vertices. A dart is the graph obtained from a diamond by adding a new vertex and making it adjacent to exactly one vertex with degree 3 in the diamond. In this paper, we show that there are finitely many k-vertex-critical (P5,dart)-free graphs for k 1 To prove these results, we use induction on k and perform a careful structural analysis via Strong Perfect Graph Theorem combined with the pigeonhole principle based on the properties of vertex-critical graphs. Moreover, for k ∈ \5, 6, 7\ we characterize all k-vertex-critical (P5,dart)-free graphs using a computer generation algorithm. Our results imply the existence of a polynomial-time certifying algorithm to decide the k-colorability of (P5,dart)-free graphs for k 1 where the certificate is either a k-coloring or a (k+1)-vertex-critical induced subgraph.