Induced subgraphs and tree decompositions XVII. Anticomplete sets of large treewidth

Abstract

Two sets X, Y of vertices in a graph G are "anticomplete" if X Y= and there is no edge in G with an end in X and an end in Y. We prove that every graph G of sufficiently large treewidth contains two anticomplete sets of vertices each inducing a subgraph of large treewidth unless G contains, as an induced subgraph, a highly structured graph of large treewidth that is an obvious counterexample to this statement. These are: complete graphs, complete bipartite graphs and "interrupted s-constellations." The latter is a slightly adjusted version of a well-known construction by Bonamy et al.

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