A characterisation of graphs quasi-isometric to K4-minor-free graphs
Abstract
We prove that there is a function f such that every graph with no K-fat K4 minor is f(K)-quasi-isometric to a graph with no K4 minor. This solves the K4-case of a general conjecture of Georgakopoulos and Papasoglu. Our proof technique also yields a new short proof of the respective K4--case, which was first established by Fujiwara and Papasoglu.
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