Low Polynomial Exclusion of Planar Graph Patterns
Abstract
The celebrated grid exclusion theorem states that for every h-vertex planar graph H, there is a constant ch such that if a graph G does not contain H as a minor then G has treewidth at most ch. We are looking for patterns of H where this bound can become a low degree polynomial. We provide such bounds for the following parameterized graphs: the wheel (ch=O(h)), the double wheel (ch=O(h2· 2 h)), any graph of pathwidth at most 2 (ch=O(h2)), and the yurt graph (ch=O(h4)).
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