Graph Skeletons and Diminishing Minors
Abstract
We introduce the notion of coarse bottlenecking in graphs and coarse skeletons of graphs and show how bottlenecking guarantees that a skeleton resembles (up to quasi-isometry) the original graph. We show how these tools can be used to simplify the structure of graphs upto quasi-isometry that have an excluded asymptotic minor, reducing it to a skeleton of the original containing no 3-fat minor. We give an example to show that a similar result does not hold for 2-fat minors. This makes progress towards a Conjecture posed by Georgakopoulos and Papasoglu.
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