Distortion of imbeddings of groups of intermediate growth into metric spaces
Abstract
For every metric space X in which there exists a sequence of finite groups of bounded-size generating set that does not embed coarsely, and for every unbounded, increasing function , we produce a group of subexponential word growth all of whose imbeddings in X have distortion worse than . This applies in particular to any B-convex Banach space X, such as Hilbert space.
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