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Lévy Processes and Infinitely Divisible Measures in the Dual of a Nuclear Space

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  • C. A. Fonseca-Mora

    (Universidad de Costa Rica)

Abstract

Let $$\Phi $$Φ be a nuclear space and let $$\Phi '_{\beta }$$Φβ′ denote its strong dual. In this work, we prove the existence of càdlàg versions, the Lévy–Itô decomposition and the Lévy–Khintchine formula for $$\Phi '_{\beta }$$Φβ′-valued Lévy processes. Moreover, we give a characterization for Lévy measures on $$\Phi '_{\beta }$$Φβ′ and provide conditions for the existence of regular versions to cylindrical Lévy processes in $$\Phi '$$Φ′. Furthermore, under the assumption that $$\Phi $$Φ is a barrelled nuclear space we establish a one-to-one correspondence between infinitely divisible measures on $$\Phi '_{\beta }$$Φβ′ and Lévy processes in $$\Phi '_{\beta }$$Φβ′. Finally, we prove the Lévy–Khintchine formula for infinitely divisible measures on $$\Phi '_{\beta }$$Φβ′.

Suggested Citation

  • C. A. Fonseca-Mora, 2020. "Lévy Processes and Infinitely Divisible Measures in the Dual of a Nuclear Space," Journal of Theoretical Probability, Springer, vol. 33(2), pages 649-691, June.
    • Handle: RePEc:spr:jotpro:v:33:y:2020:i:2:d:10.1007_s10959-019-00972-3
    DOI: 10.1007/s10959-019-00972-3
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    References listed on IDEAS

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    1. Medvegyev, Peter, 2007. "Stochastic Integration Theory," OUP Catalogue, Oxford University Press, number 9780199215256.
    2. Riedle, Markus & van Gaans, Onno, 2009. "Stochastic integration for Lévy processes with values in Banach spaces," Stochastic Processes and their Applications, Elsevier, vol. 119(6), pages 1952-1974, June.
    3. Bojdecki, Tomasz & Jakubowski, Jacek, 1990. "Stochastic integration for inhomogeneous Wiener process in the dual of a nuclear space," Journal of Multivariate Analysis, Elsevier, vol. 34(2), pages 185-210, August.
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    Cited by:

    1. C. A. Fonseca-Mora, 2023. "Almost Sure Uniform Convergence of Stochastic Processes in the Dual of a Nuclear Space," Journal of Theoretical Probability, Springer, vol. 36(1), pages 1-26, March.

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