Construction of a surface integral under local Malliavin assumption and integration by parts formulae

Abstract

In this paper, we consider convex sets Kr = \g r\ in an infinite dimensional Hilbert space, where g is suitably related to a reference Gaussian measure μ in H. We first show how to define a surface measure on the level sets \g = r\ that is related to μ. This allows to introduce an integration-by-parts formula in H. This formula can be applied in several important constructions, as for instance the case where μ is the law of a (Gaussian) stochastic process and H is the space of its trajectories