Infinite dimensional reflecting Ornstein-Uhlenbeck stochastic process
Abstract
In this article we introduce the Gaussian Sobolev space W1,2( O,γ), where O is an arbitrary open set of a separable Banach space E endowed with a nondegenerate centered Gaussian measure γ. Moreover, we investigate the semimartingale structure of the infinite dimensional reflecting Ornstein-Uhlenbeck process for open sets of the form O=\x∈ E\, :\, G(x)<0\, where G is some Borel function on E.
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