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Brownian excursions, stochastic integrals, and representation of Wiener functionals


 
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1. Title Title of document Brownian excursions, stochastic integrals, and representation of Wiener functionals
 
2. Creator Author's name, affiliation, country Jean Picard; Labo. de Mathématiques, Université Blaise Pascal
 
3. Subject Discipline(s)
 
3. Subject Keyword(s) Brownian excursions; Malliavin calculus; stochastic integrals; stochastic integral representation; anticipating calculus
 
3. Subject Subject classification 60H05; 60J65
 
4. Description Abstract A stochastic calculus similar to Malliavin's calculus is worked out for Brownian excursions. The analogue of the Malliavin derivative in this calculus is not a differential operator, but its adjoint is (like the Skorohod integral) an extension of the Itô integral. As an application, we obtain an expression for the integrand in the stochastic integral representation of square integrable Wiener functionals; this expression is an alternative to the classical Clark-Ocone formula. Moreover, this calculus enables to construct stochastic integrals of predictable or anticipating processes (forward, backward and symmetric integrals are considered).
 
5. Publisher Organizing agency, location
 
6. Contributor Sponsor(s)
 
7. Date (YYYY-MM-DD) 2006-03-12
 
8. Type Status & genre Peer-reviewed Article
 
8. Type Type
 
9. Format File format PDF
 
10. Identifier Uniform Resource Identifier http://ejp.ejpecp.org/article/view/310
 
10. Identifier Digital Object Identifier 10.1214/EJP.v11-310
 
11. Source Journal/conference title; vol., no. (year) Electronic Journal of Probability; Vol 11
 
12. Language English=en
 
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