On the domain of elliptic operators defined in subsets of Wiener spaces

Abstract

Let X be a separable Banach space endowed with a non-degenerate centered Gaussian measure μ. The associated Cameron-Martin space is denoted by H. Consider two sufficiently regular convex functions U:X→R and G:X→ R. We let =e-Uμ and =G-1(-∞,0]. In this paper we are interested in the domain of the the self-adjoint operator associated with the quadratic form gather (,) ∫∇H,∇HHd,∈ W1,2(,). () gather In particular we obtain a complete characterization of the Ornstein-Uhlenbeck operator on half-spaces, namely if U 0 and G is an affine function, then the domain of the operator defined via () is the space \[\u∈ W2,2(,μ)\,|\, ∇H u(x),∇H G(x)H=0 for -a.e. x∈ G-1(0)\,\] where is the Feyel-de La Pradelle Hausdorff-Gauss surface measure.