Symmetric Ornstein-Uhlenbeck Semigroups and their Generators

Abstract

We provide necessary and sufficient conditions for a Hilbert space-valued Ornstein-Uhlenbeck process to be reversible with respect to its invariant measure μ. For a reversible process the domain of its generator in Lp(μ ) is characterized in terms of appropriate Sobolev spaces thus extending the Meyer equivalence of norms to any symmetric Ornstein-Uhlenbeck operator. We provide also a formula for the size of the spectral gap of the generator. Those results are applied to study the Ornstein-Uhlenbeck process in a chaotic environment. Necessary and sufficient conditions for a transition semigroup (Rt) to be compact, Hilbert-Schmidt and strong Feller are given in terms of the coefficients of the Ornstein-Uhlenbeck operator. We show also that the existence of spectral gap implies a smoothing property of Rt and provide an estimate for the (appropriately defined) gradient of Rtφ. Finally, in the Hilbert-Schmidt case, we show that for any φ∈ Lp(μ) the function Rtφ is an (almost) classical solution of a version of the Kolmogorov equation.

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