Tree-independence number of K1,d-free graph classes

Abstract

In this paper, we investigate the tree-independence number of graph classes that do not contain K1,d as an induced subgraph. Dallard et al. conjectured that for any positive integer d and any planar graph H, the class of all K1,d-free graphs without H as an induced minor has bounded tree-independence number. Our main contribution towards this conjecture is showing that the conjecture holds for outerstring graphs. Additionally we give linear and quadratic bounds for the tree-independence number of various K1,d-free graph classes, sharpening previous bounds. Finally, we bound the tree-independence number of K2,d-free graphs additionally forbidding holes of length at least 5.