A tight linear chromatic bound for (P3 P2, W4)-free graphs
Abstract
For two vertex disjoint graphs H and F, we use H F to denote the graph with vertex set V(H) V(F) and edge set E(H) E(F), and use H+F to denote the graph with vertex set V(H) V(F) and edge set E(H) E(F)\xy\;|\; x∈ V(H), y∈ V(F)\. A W4 is the graph K1+C4. In this paper, we prove that (G) 2ω(G) if G is a (P3 P2, W4)-free graph. This bound is tight when ω =2 and 3, and improves the main result of Wang and Zhang. Also, this bound partially generalizes some results of Prashant et al..
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