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Stability of Random Dynamical Systems on Banach Spaces

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Abstract

We consider a stochastic process generated by random dynamical systems on Banach spaces. Under the suitable assumptions we show that this process is weakly convergent to some limit.

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References

  1. L. Arnold, Random Dynamical Systems, Springer - Verlag, Berlin (1998).

  2. G. Da Prato, J. Zabczyk, Stochastic Equations in Infinite Dimensions, Cambridge University Press, Cambridge (1992).

  3. M.H.A. Davis Markov, Models and Optimization, Chapman and Hall, London (1993).

  4. R.M. Dudley, Probabilities and Matrics, Aarhus Universitet (1976).

  5. S. Ethier, T. Kurtz, Markov Processes, John Wiley and Sons, New York (1986).

  6. R. Fortet, B. Mourier, Convergence de la répartition empirique vers la répartition théorétique, Ann. Sci. École Norm. Sup., 70 (1953), 267–285.

    Google Scholar 

  7. U. Frisch, Wave propagation in random media, In: A.T. Bharucha-Reid (ed) Probabilistic Methods in Applied Mathematics, Academic Press (1968).

  8. K. Horbacz, Dynamical systems with multiplicative perturbations: The strong convergence of measures, Ann. Polon. Math., 58 (1993), 85–93.

    Google Scholar 

  9. K. Horbacz, Randomly connected dynamical systems – asymptotic stability, Ann. Pol. Math. (1998), 31–50.

  10. K. Horbacz, T. Szarek, Randomly connected dynamical systems on Banach spaces, Stochastic Anal. Appl., 19 (2001), 519–543.

    Google Scholar 

  11. J.B. Keller, Stochastic equations and wave propagation in random media, Proc. Symp. Appl. Math., 16 (1964), 1456–170.

  12. M. Kuczma, B. Choczewski, R. Ger, Iterative Functional Equations, Cambridge Univ. Press, New York - Cambridge (1985).

  13. A. Lasota, J. Traple, Invariant measures related with Poisson driven stochastic differential equation, Stoch. Proc. and Their Appl., 106 (2003), 81–93.

  14. A. Lasota, J.A. Yorke, Lower bound technique for Markov operators and iterated function systems, Random Comput. Dynam., 2 (1994) 41–77.

  15. S. Meyn, R. Tweedie, Markov Chains and Stochastic Stability, Springer - Verlag, Berlin (1993).

  16. D. Snyder, Random Point Processes, John Wiley, New York (1975).

  17. T. Szarek, S. Wedrychowicz, Markov semigroups generated by a Poisson driven differential equation, Nonlin. Anal. TMA, 50(1) (2002) 41–54.

    Google Scholar 

  18. T. Szarek, Invariant measures for Markov operators with applications to function systems, Studia Math., 154(3) (2003), 207–222.

  19. J. Traple, Markov semigroups generated by Poisson driven differential equations Bull. Pol. Ac.:Math., 44 (1996), 161–182.

    Google Scholar 

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Authors and Affiliations

  1. Institute of Mathematics, Silesian University, Bankowa 14, 40-007, Katowice, Poland, (KH)

    Katarzyna Horbacz

  2. Dipartimento di Matematica Pura ed Applicata, Università di L'Aquila, Via Vetoio, 67100, L'Aquila, Italy

    Józef Myjak

  3. Institute of Mathematics, Silesian University, Bankowa 14, 40-007, Katowice, Poland, (TS)

    Tomasz Szarek

Authors
  1. Katarzyna Horbacz
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  2. Józef Myjak
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  3. Tomasz Szarek
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Correspondence to Tomasz Szarek.

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Horbacz, K., Myjak, J. & Szarek, T. Stability of Random Dynamical Systems on Banach Spaces. Positivity 10, 517–538 (2006). https://doi.org/10.1007/s11117-005-0005-2

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  • DOI: https://doi.org/10.1007/s11117-005-0005-2

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