On continuity properties of integrals of Lévy processes

Titel:: On continuity properties of integrals of Lévy processes
Dokumenttyp:: Buchbeitrag
Autor(en):: Bertoin, J., Lindner, A., Maller, R.
Künstler (Werkautoren):: Donati-Martin, C., Émery, M., Rouault, A. und Stricker, C. (Eds.)
Abstract:: Let (ξ,η) be a bivariate Lévy process such that the integral ∫₀^∞ e^-ξ_t-dη_t converges almost surely. We characterise, in terms of their Lévy measures, those Lévy processes for which (the distribution of) this integral has atoms. We then turn attention to almost surely convergent integrals of the form I:=∫₀^∞g(ξ_t)dY_t, where g is a deterministic function. We give sufficient conditions ensuring that I has no atoms, and under further conditions derive that I has a Lebesgue density. The results are also extended to certain integrals of the form ∫₀^∞g(ξ_t)dY_t, where Y is an almost surely strictly increasing stochastic process, independent of ξ.
Seitenangaben Beitrag:: 137-159
Buchtitel:: Donati-Martin, C., Émery, M., Rouault, A. und Stricker, C.: Séminaire de Probabilités
Verlag / Institution:: Springer
Jahr:: 2008
Reviewed:: ja
Sprache:: en
WWW:: http://link.springer.com/chapter/10.1007%2F978-3-540-77913-1_6
Semester:: SS 08
Format:: Text
BibTeX

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