Induced minors and subpolynomial treewidth
Abstract
Given a family H of graphs, we say that a graph G is H-induced-minor-free if no induced minor of G is isomorphic to a member of H, We denote by Wt× t the t-by-t hexagonal grid, and by Kt,t the complete bipartite graph with both sides of the bipartition of size t. We show that the class of \Kt,t,Wt× t\-induced minor-free graphs with bounded clique number has subpolynomial treewidth. Specifically, we prove that for every integer t there exist ε ∈ (0,1] and c ∈ N such that every n-vertex \Kt,t,Wt× t\-induced minor-free graph with no clique of size t has treewidth at most 2c1-εn.
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