Chordal graphs, even-hole-free graphs and sparse obstructions to bounded treewidth

Abstract

We present and study the following conjecture: for an integer t≥ 4 and a graph H, every even-hole-free graph of large enough treewidth has an induced subgraph isomorphic to either Kt or H, if (and only if) H is a K4-free chordal graph. The ``only if'' part follows from the properties of the so-called layered wheels due to Sintiari and Trotignon. Alecu, Chudnovsky, Spirkl and the author recently proved the conjecture in two special cases: (a) when t=4; and (b) when H=cone (F) for some forest F; that is, H is obtained from F by adding a universal vertex. Our first result is a common strengthening: for an integer t≥ 4 and graphs F and H, (even-hole, cone(cone (F)), H, Kt)-free graphs have bounded treewidth if and only if F is a forest and H is a K4-free chordal graph. Also, for general t≥ 4, we push the current state of the art further than (b) by settling the conjecture for the smallest choices of H that are not coned forests. This follows from our second result: we prove the conjecture when H is a crystal; that is, a graph obtained from several coned double stars by gluing them together along the middle edges of the double stars. In the first version of this paper, we suggested a strengthening of our main conjecture, that for every t≥ 1, every graph of sufficiently large treewidth has an induced subgraph of treewidth t which is either complete, complete bipartite, or 2-degenerate. This strengthening has now been refuted by Chudnovsky and Trotignon [On treewidth and maximum cliques, arXiv:2405.07471, 2024].