On integration by parts formula on open convex sets in Wiener spaces

Abstract

In Euclidean space, it is well known that any integration by parts formula for a set of finite perimeter is expressed by the integration with respect to a measure P(,·) which is equivalent to the one-codimensional Hausdorff measure restricted to the reduced boundary of . The same result has been proved in an abstract Wiener space, typically an infinite dimensional space, where the surface measure considered is the one-codimensional spherical Hausdorff-Gauss measure S∞-1 restricted to the measure-theoretic boundary of . In this paper we consider an open convex set and we provide an explicit formula for the density of P(,·) with respect to S∞-1. In particular, the density can be written in terms of the Minkowski functional of with respect to an inner point of . As a consequence, we obtain an integration by parts formula for open convex sets in Wiener spaces.