On the structure of (4K1, C4, P6)-free graphs
Abstract
Determining the complexity of colouring (4K1, C4)-free graph is a long open problem. Recently Penev showed that there is a polynomial-time algorithm to colour a (4K1, C4, C6)-free graph. In this paper, we will prove that if G is a (4K1, C4, P6)-free graph that contains a C6, 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 (4K1, C4, P6)-free graphs.
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