Tilings of the Hyperbolic Space and Lipschitz Functions

Abstract

We use a special tiling for the hyperbolic d-space Hd for d=2,3,4 to construct an (almost) explicit isomorphism between the Lipschitz-free space F(Hd) and F(P)(N) where P is a polytope in Rd and N a net in Hd coming from the tiling. This implies that the spaces F(Hd) and F(Rd) F(M) are isomorphic for every net M in Hd. In particular, we obtain that, for d=2,3,4, F(Hd) has a Schauder basis. Moreover, using a similar method, we also give an explicit isomorphism between Lip(Hd) and Lip(Rd).