Excluding an induced wheel minor in graphs without large induced stars

Abstract

We study a conjecture due to Dallard, Krnc, Kwon, Milanic, Munaro, Storgel, and Wiederrecht stating 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. A k-wheel is the graph obtained from a cycle of length k by adding a vertex adjacent to all vertices of the cycle. We show that the conjecture of Dallard et al. is true when H is a k-wheel for any k≥ 3. Our proof uses a generalization of the concept of brambles to tree-independence number. As a consequence of our main result, several important NP-hard problems such as Maximum Independent Set are tractable on K1,d-free graphs without large induced wheel minors. Moreover, for fixed d and k, we provide a polynomial-time algorithm that, given a K1,d-free graph G as input, finds an induced minor model of a k-wheel in G if one exists.