Treewidth is Polynomial in Maximum Degree on Weakly Sparse Graphs Excluding a Planar Induced Minor
Abstract
A graph G contains a graph H as an induced minor if H can be obtained from G after vertex deletions and edge contractions. We show that for every k-vertex planar graph H, every graph G excluding H as an induced minor and Kt,t as a subgraph has treewidth at most (G)f(k,t) where (G) denotes the maximum degree of G. Without requiring the absence of a Kt,t subgraph, Korhonen [JCTB '23] has shown the upper bound of kO(1) 2(G)5 whose dependence in (G) is exponential. Our result partially answers a question of Chudnovsky [Dagstuhl seminar '23] asking whether the treewidth of graphs with (G)=O(|V(G)|) excluding both a k-vertex planar graph as an induced minor and the biclique Kt,t as a subgraph is in Ok,t( |V(G)|). We confirm that the treewidth is in this case polylogarithmic in |V(G)|.
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