About the infinite dimensional skew and obliquely reflected Ornstein–Uhlenbeck process

Abstract

Based on an integration by parts formula for closed and convex subsets [Formula: see text] of a separable real Hilbert space [Formula: see text] with respect to a Gaussian measure, we first construct and identify the infinite dimensional analogue of the obliquely reflected Ornstein–Uhlenbeck process (perturbed by a bounded drift [Formula: see text]) by means of a Skorokhod type decomposition. The variable oblique reflection at a reflection point of the boundary [Formula: see text] is uniquely described through a reflection angle and a direction in the tangent space (more precisely through an element of the orthogonal complement of the normal vector) at the reflection point. In case of normal reflection at the boundary of a regular convex set and under some monotonicity condition on [Formula: see text], we prove the existence and uniqueness of a strong solution to the corresponding SDE. Subsequently, we consider an increasing sequence [Formula: see text] of closed and convex subsets of [Formula: see text] and the skew reflection problem at the boundaries of this sequence. We present concrete examples and obtain as a special case the infinite dimensional analogue of the [Formula: see text]-skew reflected Ornstein–Uhlenbeck process.