Hyperbolic rank and subexponential corank of metric spaces

Abstract

We introduce a new quasi-isometry invariant X of a metric space X called subexponential corank. A metric space X has subexponential corank k if roughly speaking there exists a continuous map g:X T such that for each t∈ T the set g-1(t) has subexponential growth rate in X and the topological dimension T=k is minimal among all such maps. Our main result is the inequality X X for a large class of metric spaces X including all locally compact Hadamard spaces, where X is maximal topological dimension of Y among all (-1) spaces Y quasi-isometrically embedded into X (the notion introduced by M. Gromov in a slightly stronger form). This proves several properties of conjectured by M. Gromov, in particular, that any Riemannian symmetric space X of noncompact type possesses no quasi-isometric embedding n X of the standard hyperbolic space n with n-1> X- X.

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