Excluding K2,t as a fat minor

Abstract

We prove that for every t ∈ N, the graph K2,t satisfies the fat minor conjecture of Georgakopoulos and Papasoglu: for every K∈ N there exist M,A∈ N such that every graph with no K-fat K2,t minor is (M,A)-quasi-isometric to a graph with no K2,t minor. We use this to obtain an efficient algorithm for approximating the minimal multiplicative distortion of any embedding of a finite graph into a K2,t-minor-free graph, answering a question of Chepoi, Dragan, Newman, Rabinovich, and Vax\`es from 2012.

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