Bounding Ornstein-Uhlenbeck Processes and Alikes
Abstract
In this note we consider SDEs of the type d Xt=[F (Xt) -A Xt] d t +D d Wt under the assumptions that A's eigenvalues are all of positive real parts and F (·) has slower-than-linear growth rate. It is proved that t ∞ \|Xt\| t =2 λ1 almost surely with λ1 being the largest eigenvalue of the matrix :=∫0∞ e-s A · (D · DT) · e-s AT d s; the discarded measure-zero set can be chosen independent of the initial values X0=x.
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