Induced subgraphs and tree decompositions XIX. Thetas and forests
Abstract
Let H be a graph and let C be a hereditary class of theta-free graphs such that H C. We prove that if (a) H is a forest; and (b) C excludes the line graphs of all subdivisions of some wall, then the treewidth of every graph in C is at most a polynomial function of its clique number. This is best possible in that both (a) and (b) are necessary for the existence of any function with the above property.
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