Edge separators for graphs excluding a minor
Abstract
We prove that every n-vertex Kt-minor-free graph G of maximum degree has a set F of O(t2( t)1/4 n) edges such that every component of G - F has at most n/2 vertices. This is best possible up to the dependency on t and extends earlier results of Diks, Djidjev, Sykora, and Vrto (1993) for planar graphs, and of Sykora and Vrto (1993) for bounded-genus graphs. Our result is a consequence of the following more general result: The line graph of G is isomorphic to a subgraph of the strong product H K p for some graph H with treewidth at most t-2 and p = (t-3) |E(G)| + .
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