Maximal L2 regularity for Dirichlet problems in Hilbert spaces

Abstract

We consider the Dirichlet problem λ U - LU= F in O, U=0 on ∂ O. Here F∈ L2(O, μ) where μ is a nondegenerate centered Gaussian measure in a Hilbert space X, L is an Ornstein-Uhlenbeck operator, and O is an open set in X with good boundary. We address the problem whether the weak solution U belongs to the Sobolev space W2,2(O, μ). It is well known that the question has positive answer if O = X; if O ≠ X we give a sufficient condition in terms of geometric properties of the boundary ∂ O. The results are quite different with respect to the finite dimensional case, for instance if O is the ball centered at the origin with radius r we prove that U∈ W2,2(O, μ) only for small r.