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On some equalities of laws for Brownian motion with drift

Part of: Markov processes

Published online by Cambridge University Press:  14 July 2016

J. P. Imhof
J. P. Imhof*
Affiliation:
University of Geneva
*
Postal address: 18 av Peschier, 1206 Geneva, Switzerland. Email address: [email protected]
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Abstract

A trivariate equality of laws given by Doney and Yor is extended to a quadrivariate version. Some related explicit density calculations are carried out. It is shown that a bivariate case which has been used to establish the Dassios–Port–Wendel equality of laws is in fact equivalent to it.

Keywords

Brownian motion with driftgeneralized arc-sine laws

MSC classification

Secondary: 60J20: Applications of Markov chains and discrete-time Markov processes on general state spaces (social mobility, learning theory, industrial processes, etc.)
Type
Research Papers
Information
Journal of Applied Probability , Volume 36 , Issue 3 , September 1999 , pp. 682 - 687
Copyright
Copyright © Applied Probability Trust 1999 

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References

Akahori, J. (1995). Some formulae for a new type of path-dependent option. Ann. Appl. Prob. 5, 383388.Google Scholar
Baxter, G. (1961). A combinatorial lemma for complex numbers. Ann. Math. Statist. 32, 901904.Google Scholar
Bertoin, J., and Pitman, J. W. (1994). Path transformations connecting Brownian bridge, excursion and meander. Bull. Sci. Math. 118, 147166.Google Scholar
Bertoin, J., Chaumont, L., and Yor, M. (1997). Two chain-transformations and their applications to quantiles. J. Appl. Prob. 34, 882897.CrossRefGoogle Scholar
Chung, K. L. (1976). Excursions in Brownian motion. Ark. Math. 14, 155177.Google Scholar
Csàki, E., and Vincze, I. (1963). On some combinatorial relations concerning the symmetric random walk. Acta Sci. Math. 24, 231235.Google Scholar
Doney, R., and Yor, M. (1998). On a formula of Takàcs for Brownian motion with drift. J. Appl. Prob. 35, 272280.Google Scholar
Embrechts, P., Rogers, L. C. G., and Yor, M. (1995). A proof of Dassios' representation of the α-quantile of Brownian motion with drift. Ann. Appl. Prob. 5, 757767.CrossRefGoogle Scholar
Imhof, J. P. (1986). On the time spent above a level by Brownian motion with negative drift. Adv. Appl. Prob. 18, 10171018.Google Scholar
Takàcs, L. (1996). On a generalization of the arc-sine law. Ann. Appl. Prob. 6, 10351039.CrossRefGoogle Scholar