Induced subgraphs and tree decompositions X. Towards logarithmic treewidth for even-hole-free graphs

Abstract

A generalized t-pyramid is a graph obtained from a certain kind of tree (a subdivided star or a subdivided cubic caterpillar) and the line graph of a subdivided cubic caterpillar by identifying simplicial vertices. We prove that for every integer t there exists a constant c(t) such that every n-vertex even-hole-free graph with no clique of size t and no induced subgraph isomorphic to a generalized t-pyramid has treewidth at most c(t)n. This settles a special case of a conjecture of Sintiari and Trotignon; this bound is also best possible for the class. It follows that several NP-hard problems such as Stable Set, Vertex Cover, Dominating Set and Coloring admit polynomial-time algorithms on this class of graphs. Results from this paper are also used in later papers of the series, in particular to solve the full version of the Sintiari-Trotignon conjecture.