Hurewicz Theorem for Assouad-Nagata dimension

Abstract

Given a function f X Y of metric spaces, its asymptotic dimension (f) is the supremum of (A) such that A⊂ X and (f(A))=0. Our main result is Thm ThmAInAbstract (X)≤ (f)+(Y) for any large scale uniform function f X Y. Thm ThmAInAbstract generalizes a result of Bell and Dranishnikov in which f is Lipschitz and X is geodesic. We provide analogs of ThmAInAbstract for Assouad-Nagata dimension AN and asymptotic Assouad-Nagata dimension . In case of linearly controlled asymptotic dimension we provide counterexamples to three questions in a list of problems of Dranishnikov. As an application of analogs of ThmAInAbstract we prove Thm ThmBInAbstract If 1 K G H 1 is an exact sequence of groups and G is finitely generated, then (G,dG)≤ (K,dG|K)+ (H,dH) for any word metrics metrics dG on G and dH on H. Thm ThmBInAbstract extends a result of Bell and Dranishnikov for asymptotic dimension.

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