Observable concentration of mm-spaces into nonpositively curved manifolds
Abstract
The measure concentration property of an mm-space X is roughly described as that any 1-Lipschitz map on X to a metric space Y is almost close to a constant map. The target space Y is called the screen. The case of Y=R is widely studied in many literature (see gromov, ledoux, mil2, milsch, sch, tal, tal2 and its reference). M. Gromov developed the theory of measure concentration in the case where the screen Y is not necessarily R (cf. gromovcat, gromov2, gromov). In this paper, we consider the case where the screen Y is a nonpositively curved manifolds. We also show that if the screen Y is so big, then the mm-space X does not concentrate.
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