An invariance result for capacities on Wiener space

For a geometrically and stochastically complete, noncompact Riemannian manifold, we show that the flows on the path space generated by the Cameron-Martin vector fields exist as a set of random variables. Furthermore, if the Ricci curvature grows at most linearly, then the Wiener measure (the law of

We consider a differential equation on the Wiener space. We show that the solutions for the differential equation satisfy the flow property quasi-everywhere and we obtain the equivalence of capacities under the transformations of the Wiener space induced by the solutions by using the quasi flow prop

We study a quasi-invariance property of the Wiener measure on the path space over a compact Riemannian manifold which generalizes the well-known CameronMartin theorem for euclidean space. This property is used to prove an integration by parts formula for the gradient operator. We use the integration

## dedicated to professor shinzo watanabe on the occasion of his sixtieth birthday We study the Hodge Kodaira Laplacians on an abstract Wiener space with a weighted Wiener measure. Under some exponential integrability conditions for the density function, we determine the kernels, establish the rel