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Two-sided exit problem for a Spectrally Negative $\alpha$-Stable Ornstein-Uhlenbeck Process and the Wright's generalized hypergeometric functions


 
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1. Title Title of document Two-sided exit problem for a Spectrally Negative $\alpha$-Stable Ornstein-Uhlenbeck Process and the Wright's generalized hypergeometric functions
 
2. Creator Author's name, affiliation, country Pierre Patie; IMSV - University of Bern
 
3. Subject Discipline(s)
 
3. Subject Keyword(s) Two-sided exit time; stable Ornstein-Uhlenbeck process; Wright's generalized hypergeometric functions
 
3. Subject Subject classification 60J35; 60G40; 60E07
 
4. Description Abstract The Laplace transform of the first exit time from a finite interval by a regular spectrally negative $\alpha$-stable Ornstein-Uhlenbeck process is provided in terms of the Wright's generalized hypergeometric function. The Laplace transform of first passage times is also derived for some related processes such as the process killed when it enters the negative half line and the process conditioned to stay positive. The law of the maximum of the associated bridges is computed in terms of the $q$-resolvent density. As a byproduct, we deduce some interesting analytical properties for some Wright's generalized hypergeometric functions.
 
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6. Contributor Sponsor(s)
 
7. Date (YYYY-MM-DD) 2007-05-08
 
8. Type Status & genre Peer-reviewed Article
 
8. Type Type
 
9. Format File format PDF
 
10. Identifier Uniform Resource Identifier http://ecp.ejpecp.org/article/view/1265
 
10. Identifier Digital Object Identifier 10.1214/ECP.v12-1265
 
11. Source Journal/conference title; vol., no. (year) Electronic Communications in Probability; Vol 12
 
12. Language English=en
 
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