Diffusion Processes on p-Wasserstein Space over Banach Space

Abstract

To study diffusion processes on the p-Wasserstein space Pp for p∈ [1,∞) over a separable, reflexive Banach space X, we present a criterion on the quasi-regularity of Dirichlet forms in L2( Pp,) for a reference probability on Pp. It is formulated in terms of an upper bound condition with the uniform norm of the intrinsic derivative. We find a versatile class of quasi-regular local Dirichlet forms on Pp by using images of Dirichlet forms on the tangent space Lp(X X,μ0) at a reference point μ0∈ Pp. The Ornstein--Uhlenbeck type Dirichlet form and process on P2 are an important example in this class. We derive an L2-estimate for the corresponding heat kernel and an integration by parts formula for the invariant measure.