An Isometric Representation for the Lipschitz-Free Space of Length Spaces Embedded in Finite-Dimensional Spaces

Abstract

For a domain in a finite-dimensional space E, we consider the space M=(,d) where d is the intrinsic distance in . We obtain an isometric representation of the space Lip0(M) as a subspace of L∞(;E*) and we use this representation in order to obtain the corresponding isometric representation for the Lipschitz-free space F(M) as a quotient of the space L1(;E). We compare our result with those existent in the literature for bounded domains with Lipschitz boundary, and for convex domains, which can be then deduced as a corollaries of our result.

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