Bounds on treewidth via excluding disjoint unions of cycles
Abstract
One of the fundamental results in graph minor theory is that for every planar graph~H, there is a minimum integer~f(H) such that graphs with no minor isomorphic to~H have treewidth at most~f(H). The best known bound for an arbitrary planar H is O(|V(H)|9poly~log |V(H)|). We show that if H is the disjoint union of cycles, then f(H) is O(|V(H)|2 |V(H)|), which is a |V(H)| factor away being optimal.
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