Blow-up structure of graphs excluding a tree or an apex-tree as a minor
Abstract
We prove blow-up structure theorems for graphs excluding a tree or an apex-tree as a minor. First, we show that for every t-vertex tree T with t≥ 3 and radius h, and every graph G excluding T as a minor, there exists a graph H with pathwidth at most 2h-1 such that G is contained in H Kt-2 as a subgraph. This improves on a recent theorem of Dujmovi\'c, Hickingbotham, Joret, Micek, Morin, and Wood (2024), who proved the same result but with a larger bound on the order of the complete graph in the product. Second, we show that for every t-vertex tree T with t≥ 2, radius h and maximum degree d, and every graph G excluding the apex-tree T+ as a minor, where T+ is the tree obtained by adding a universal vertex to T, there exists a graph H with treewidth at most 4h-1 such that G is contained in H K2(t-1)d. The bound on the treewidth of H is best possible up to a factor 2, and improves on a 2h+2-4 bound that follows from a recent result of Dujmovi\'c, Hickingbotham, Hodor, Joret, La, Micek, Morin, Rambaud, and Wood (2024).
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