We define a class of one dimensional diffusion processes whose transition p.d.f.'s satisfy some "strong" symmetry properties and a class of time-varying boundaries for which the first-passage-time and the transition pdf's with absorbing conditions on the boundaries can be obtained in closed form both for the cases of a single and of a pair of boundaries. Our findings are finally seen to include a result ingeniously obtained by Daniels for the standard Wiener process and a particular boundary.

On first-passage-time and transition densities for strongly symmetric diffusion processes

DI CRESCENZO, Antonio;GIORNO, Virginia;NOBILE, Amelia Giuseppina;
1997-01-01

Abstract

We define a class of one dimensional diffusion processes whose transition p.d.f.'s satisfy some "strong" symmetry properties and a class of time-varying boundaries for which the first-passage-time and the transition pdf's with absorbing conditions on the boundaries can be obtained in closed form both for the cases of a single and of a pair of boundaries. Our findings are finally seen to include a result ingeniously obtained by Daniels for the standard Wiener process and a particular boundary.
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/11386/3137429
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