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One-dimensional distributions of subordinators with upper truncated Lévy measure, and applications

Published online by Cambridge University Press:  01 July 2016

Shai Covo*
Affiliation:
Bar Ilan University
*
Postal address: Department of Mathematics, Bar Ilan University, 52900 Ramat-Gan, Israel. Email address: [email protected]
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Abstract

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Given a pure-jump subordinator (i.e. nondecreasing Lévy process with no drift) with continuous Lévy measure ν, we derive a formula for the distribution function Fs (x; t) at time t of the associated subordinator whose Lévy measure is the restriction of ν to (0,s]. It will be expressed in terms of ν and the marginal distribution function F (⋅; t) of the original process. A generalization concerning an arbitrary truncation of ν will follow. Under certain conditions, an analogous formula will be obtained for the nth derivative, ∂nFs (x; t) ∂ xn. The requirement that ν is continuous is shown to have no intrinsic meaning. A number of interesting results involving the size ordered jumps of subordinators will be derived. An appropriate approximation for the small jumps of a gamma process will be considered, leading to a revisiting of the generalized Dickman distribution.

Type
General Applied Probability
Copyright
Copyright © Applied Probability Trust 2009 

Footnotes

This paper is part of the author's PhD thesis, prepared at Bar Ilan University under the supervision of Professor E. Merzbach. This work was supported by the Doctoral Fellowship of Excellence, Bar Ilan University.

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