Coarse Geometry of Free Products of Metric Spaces
Abstract
Recently, a notion of the free product X Y of two metric spaces X and Y has been introduced by T. Fukaya and T. Matsuka. In this paper, we study coarse geometric permanence properties of the free product X Y. We show that if X and Y satisfy any of the following conditions, then X Y also satisfies that condition: (1) they are coarsely embeddable into a Hilbert space or a uniformly convex Banach space; (2) they have Yu's Property A; (3) they are hyperbolic spaces. These generalize the corresponding results for discrete groups to the case of metric spaces.
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