Malliavin Calculus for non Gaussian differentiable measures and surface measures in Hilbert spaces

Abstract

We construct surface measures in a Hilbert space endowed with a probability measure . The theory fits for invariant measures of some stochastic partial differential equations such as Burgers and reaction--diffusion equations. Other examples are weighted Gaussian measures and special product measures of non Gaussian measures; in this case we exhibit a Markov process having as invariant measure. In any case we prove integration by parts formulae on sublevel sets of good functions (including spheres and hyperplanes) that involve surface integrals.