Ergodic Theory for SDEs with Extrinsic Memory

Ergodic Theory for SDEs with Extrinsic Memory

We develop a theory of ergodicity for a class of random dynamical systems where the driving noise is not white. The two main tools of our analysis are the strong Feller property and topological irreducibility, introduced in this work for a class of non-Markovian systems. They allow us to obtain a cr...

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Veröffentlicht in:The Annals of probability 2007-09, Vol.35 (5), p.1950-1977
Hauptverfasser: Hairer, M., Ohashi, A.
Format: Artikel
Sprache:eng
Schlagworte:
26A33
60G10
60H10
Brownian motion
Continuous functions
Differential equations
Dynamical systems
Electric noise
Ergodic theory
ergodicity
Exact sciences and technology
fractional Brownian motion
General topics
Limit theorems
Markov processes
Mathematical models
Mathematics
Non-Markovian processes
Probability and statistics
Probability theory and stochastic processes
Sciences and techniques of general use
Semigroups
Special processes (renewal theory, markov renewal processes, semi-markov processes, statistical mechanics type models, applications)
Stochastic analysis
Studies
Systems analysis
Theory
Topological spaces
Topological theorems
Topology
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Beschreibung
Zusammenfassung:We develop a theory of ergodicity for a class of random dynamical systems where the driving noise is not white. The two main tools of our analysis are the strong Feller property and topological irreducibility, introduced in this work for a class of non-Markovian systems. They allow us to obtain a criteria for ergodicity which is similar in nature to the Doob-Khas' minskii theorem. The second part of this article shows how it is possible to apply these results to the case of stochastic differential equations driven by fractional Brownian motion. It follows that under a nondegeneracy condition on the noise, such equations admit a unique adapted stationary solution.
ISSN:0091-1798
2168-894X
DOI:10.1214/009117906000001141