Regarding the domain of non-symmetric and, possibly, degenerate Ornstein--Uhlenbeck operators in separable Banach spaces

Abstract

Let X be a separable Banach space and let Q:X*→ X be a linear, bounded, non-negative and symmetric operator and let A:D(A)⊂eq X→ X be the infinitesimal generator of a strongly continuous semigroup of contractions on X. We consider the abstract Wiener space (X,μ∞,H∞) where μ∞ is a centred non-degenerate Gaussian measure on X with covariance operator defined, at least formally, as align* Q∞=∫0+∞ esAQesA*ds, align* and H∞ is the Cameron--Martin space associated to μ∞. Let H be the reproducing kernel Hilbert space associated with Q with inner product [·,·]H. We assume that the operator Q∞ A*:D(A*)⊂eq X*→ X extends to a bounded linear operator B∈ L(H) which satisfies B+B*=- IdH, where IdH denotes the identity operator on H. Let D and D2 be the first and second order Fr\'echet derivative operators, we denote by DH and D2H the closure in L2(X,μ∞) of the operators QD and QD2 and by W1,2H(X,μ∞) and and W2,2H(X,μ∞) their domains in L2(X,μ∞), respectively,. Furthermore, we denote by DA∞ the closure of the operator Q∞ A*D and by W1,2A∞(X,μ∞) its domain in L2(X,μ∞). We characterize the domain of the operator L, associated to the bilinear form align* (u,v)-∫X[BDHu,DHv]Hdμ∞, u,v∈ W1,2H(X,μ∞), align* in L2(X,μ∞). More precisely, we prove that D(L) coincides, up to an equivalent remorming, with a subspace of W2,2H(X,μ∞) W1,2A∞(X,μ∞). We stress that we are able to treat the case when L is degenerate and non-symmetric.