Critical (P5,W4)-Free Graphs
Abstract
A graph G is k-vertex-critical if (G) = k but (G-v)<k for all v ∈ V(G). A graph is (H1,H2)-free if it contains no induced subgraph isomorphic to H1 nor H2. A W4 is the graph consisting of a C4 plus an additional vertex adjacent to all the vertices of the C4. We show that there are finitely many k-vertex-critical (P5,W4)-free graphs for all k 1 and we characterize all 5-vertex-critical (P5,W4)-free graphs. Our results imply the existence of a polynomial-time certifying algorithm to decide the k-colorability of (P5,W4)-free graphs for each k 1 where the certificate is either a k-coloring or a (k+1)-vertex-critical induced subgraph.
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