Ruin probabilities and aggregate claims distributions for shot noise Cox processes

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Serval ID
serval:BIB_ADBF719E704A
Type
Article: article from journal or magazin.
Collection
Publications
Title
Ruin probabilities and aggregate claims distributions for shot noise Cox processes
Journal
Scandinavian Actuarial Journal
Author(s)
Albrecher H., Asmussen S.
ISSN
0346-1238
Publication state
Published
Issued date
2006
Peer-reviewed
Oui
Number
2
Pages
86-110
Language
english
Abstract
We consider a risk process R t where the claim arrival process is a superposition of a homogeneous Poisson process and a Cox process with a Poisson shot noise intensity process, capturing the effect of sudden increases of the claim intensity due to external events. The distribution of the aggregate claim size is investigated under these assumptions. For both light-tailed and heavy-tailed claim size distributions, asymptotic estimates for infinite-time and finite-time ruin probabilities are derived. Moreover, we discuss an extension of the model to an adaptive premium rule that is dynamically adjusted according to past claims experience.
Keywords
Adative premium rule, Adjustment coefficient, Convex ordering, Cramér-Lundberg approximation, Exponential change of measure, Gärtner-Ellis theorem, Large deviations, Phase-type distribution, Saddlepoint approximation, Subexponential distribution
Create date
09/02/2009 19:25
Last modification date
20/08/2019 15:17
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