Excursions Into a New Duality Relation for Diffusion Processes
Abstract
This work was motivated by the recent work by H. Dette, J. Pitman and W.J. Studden on a new duality relation for random walks. In this note we consider the diffusion process limit of their result, and use the alternative approach of Ito excursion theory. This leads to a duality for Ito excursion rates.
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Pages: 65-69
Publication Date: September 18, 1996
DOI: 10.1214/ECP.v1-977
References
- H. Dette, J. Pitman and W. J. Studden, A new duality relation for random walks, Technical Report No. 432, Department of Statistics, University of California at Berkeley, (1995). Math Review article not available.
- L.C.G. Rogers and David Williams, Diffusions, Markov Processes and Martingales: Vol. 2, Ito Calculus, John Wiley & Sons, (1987). Math Review link
- D.S. Dean and K.M. Jansons, Excursions for polymers in elongational flows, J. Stat. Phys. 79, (1995), 265--297. Math Review article not available.
- D. Siegmund, The equivalence of absorbing and reflecting barrier problems for stochastically monotone Markov processes, Ann. Prob. 4, (1976), 914--924. Math Review link
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