Excluding a Ladder as an Induced Minor in Graphs Without Induced Stars

Abstract

A k-ladder is the graph obtained from two disjoint paths, each with k vertices, by joining the ith vertices of both paths with an edge for each i∈\ 1,…,k\. In this paper, we show that for all positive integers k and d, the class of all K1,d-free graphs excluding the k-ladder as an induced minor has a bounded tree-independence number. We further show that our method implies a number of known results: We improve the bound on the tree-independence number for the class of K1,d-free graphs not containing a wheel as an induced minor given by Choi, Hilaire, Milanic, and Wiederrecht. Furthermore, we show that the class of K1,d-free graphs not containing a theta or a prism, whose paths have length at least k, as an induced subgraph has bounded tree-independence number. This improves a result by Chudnovsky, Hajebi, and Trotignon. Finally, we extend the induced Erdos-P\'osa result of Ahn, Gollin, Huynh, and Kwon in K1,d-free graphs from long induced cycles to any graph that is an induced minor of the k-ladder where every edge is subdivided exactly once.