Determining the complexity of colouring ($4K_1, C_4$)-free graph is a long open problem. Recently Penev showed that there is a polynomial-time algorithm to colour a ($4K_1, C_4, C_6$)-free graph. In this paper, we will prove that if $G$ is a ($4K_1, C_4, P_6$)-free graph that contains a $C_6$, then $G$ has bounded clique-width. To this purpose, we use a new method to bound the clique-width, that is of independent interest. As a consequence, there is a polynomial-time algorithm to colour ($4K_1, C_4, P_6$)-free graphs.
翻译:确定($4K_1$, $C_4$)-自由图的着色复杂度是一个长期存在的开放问题。最近,Penev 证明了存在多项式时间算法可以对($4K_1$, $C_4$, $C_6$)-自由图进行着色。本文中,我们将证明:若 $G$ 是一个包含 $C_6$ 的($4K_1$, $C_4$, $P_6$)-自由图,则 $G$ 具有有界团宽度。为此,我们采用了一种新的界定团宽度的方法,该方法本身具有独立的研究价值。由此可得,存在多项式时间算法对($4K_1$, $C_4$, $P_6$)-自由图进行着色。
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