2007.168: Delay differential equations driven by Lévy processes: Stationarity and Feller properties
2007.168: M. Reiß, M. Riedle and O. Van Gaans (2006) Delay differential equations driven by Lévy processes: Stationarity and Feller properties. Stochastic Processes and their Applications, 116 (10). pp. 1409-1432. ISSN 0304-4149
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DOI: 10.1016/j.spa.2006.03.002
Abstract
We consider a stochastic delay differential equation driven by a general Lévy process. Both the drift and the noise term may depend on the past, but only the drift term is assumed to be linear. We show that the segment process is eventually Feller, but in general not eventually strong Feller on the Skorokhod space. The existence of an invariant measure is shown by proving tightness of the segments using semimartingale characteristics and the Krylov–Bogoliubov method. A counterexample shows that the stationary solution in completely general situations may not be unique, but in more specific cases uniqueness is established.
| Item Type: | Article |
|---|---|
| Uncontrolled Keywords: | Feller process; Invariant measure; Lévy process; Semimartingale characteristic; Stationary solution; Stochastic equation with delay; Stochastic functional differential equation |
| Subjects: | MSC 2000 > 60 Probability theory and stochastic processes |
| MIMS number: | 2007.168 |
| Deposited By: | Mrs Louise Healey |
| Deposited On: | 19 November 2007 |
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