Asymptotic structure. III. Excluding a fat tree

Abstract

Robertson and Seymour proved that for every finite tree H, there exists k such that every finite graph G with no H minor has path-width at most k; and conversely, for every integer k, there is a finite tree H such that every finite graph G with an H minor has path-width more than k. If we (twice) replace ``path-width'' by ``line-width'', the same is true for infinite graphs G. We prove a ``coarse graph theory'' analogue, as follows. For every finite tree H and every c, there exist k,L,C such that every graph that does not contain H as a c-fat minor admits an (L,C)-quasi-isonetry to a graph with line-width at most k; and conversely, for all k,L,C there exist c and a finite tree H such that every graph that contains H as a c-fat minor admits no (L,C)-quasi-isometry to a graph with line-width at most k.