The class of (2P3,C4,C6)-free graphs, part II: (2P3,C4,C6,C7,T0)-free graphs
Abstract
This is the second in a series of two papers dealing with (2P3,C4,C6)-free graphs, or equivalently, (2P3,even hole)-free graphs. In this two-paper series, we give a full structural description of (2P3,C4,C6)-free graphs that contain no simplicial vertices, and we show that such graphs have bounded clique-width. This implies that Graph Coloring can be solved in polynomial time for (2P3,C4,C6)-free graphs. In the first paper of the series, we described the structure of (2P3,C4,C6)-free graphs that contain an induced C7 or an induced T0 (where T0 is a certain 2-connected graph on nine vertices in which all holes are of length five), and we showed that such graphs either contain a simplicial vertex or have bounded clique-width. In the present paper (the second part of the series), we describe the structure of (2P3,C4,C6,C7,T0)-free graphs that contain no simplicial vertices, and we show that such graphs have bounded clique-width. Finally this paper gives the full statement of the theorem describing the structure of (2P3,C4,C6)-free graphs that contain no simplicial vertices.
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