Triangulations of uniform subquadratic growth are quasi-trees

Abstract

It is known that for every α ≥ 1 there is a planar triangulation in which every ball of radius r has size (rα). We prove that for α <2 every such triangulation is quasi-isometric to a tree. The result extends to Riemannian 2-manifolds of finite genus, and to large-scale-simply-connected graphs. We also prove that every planar triangulation of asymptotic dimension 1 is quasi-isometric to a tree.

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