Product structure extension of the Alon--Seymour--Thomas theorem
Abstract
Alon, Seymour and Thomas [1990] proved that every n-vertex graph excluding Kt as a minor has treewidth less than t3/2n. Illingworth, Scott and Wood [2022] recently refined this result by showing that every such graph is a subgraph of some graph with treewidth t-2, where each vertex is blown up by a complete graph of order O(tn). Solving an open problem of Illingworth, Scott and Wood [2022], we prove that the treewidth bound can be reduced to 4 while keeping blowups of order Ot(n). As an extension of the Lipton--Tarjan theorem, in the case of planar graphs, we show that the treewidth can be further reduced to 2, which is best possible. We generalise this result for K3,t-minor-free graphs, with blowups of order O(tn). This setting includes graphs embeddable on any fixed surface.
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