On linear evolution equations with cylindrical L\'evy noise

Abstract

We study an infinite-dimensional Ornstein-Uhlenbeck process (Xt) in a given Hilbert space H. This is driven by a cylindrical symmetric L\'evy process without a Gaussian component and taking values in a Hilbert space U which usually contains H. We give if and only if conditions under which Xt takes values in H for some t>0 or for all t>0. Moreover, we prove irreducibility for (Xt).