The general class of Wasserstein Sobolev spaces: density of cylinder functions, reflexivity, uniform convexity and Clarkson's inequalities

Abstract

We show that the algebra of cylinder functions in the Wasserstein Sobolev space H1,q(Pp(X,d), Wp, d, m) generated by a finite and positive Borel measure m on the (p,d)-Wasserstein space (Pp(X,d), Wp, d) on a complete and separable metric space (X,d) is dense in energy. As an application, we prove that, in case the underlying metric space is a separable Banach space B, then the Wasserstein Sobolev space is reflexive (resp.~uniformly convex) if B is reflexive (resp.~if the dual of B is uniformly convex). Finally, we also provide sufficient conditions for the validity of Clarkson's type inequalities in the Wasserstein Sobolev space.

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