A Finitary Approach to Coarse Separation of Euclidean spaces

Abstract

We give a novel proof of the fact that every coarsely separating family of subsets of the Euclidean space Rd must have asymptotic dimension at least d-1. The proof only uses singular homology/cohomology and standard facts from algebraic topology, such as Alexander duality. We do this by first reducing the problem to a finitary version of it. Using our approach, it follows immediately that every coarsely separating family of subsets of a d-dimensional Euclidean building or a product of d geodesic, geodesically complete metric spaces has asymptotic dimension at least d-1. As a corollary, we obtain obstructions to coarse embeddings of Euclidean spaces into certain fundamental groups of graphs of groups.

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