The chromatic number of (P5, HVN )-free graphs
Abstract
Let G be a graph. We use (G) and ω(G) to denote the chromatic number and clique number of G respectively. A P5 is a path on 5 vertices, and an HVN is a K4 together with one more vertex which is adjacent to exactly two vertices of K4. Combining with some known result, in this paper we show that if G is (P5, HVN)-free, then (G)≤ \\16, ω(G)+3\, ω(G)+1\. This upper bound is almost sharp.
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