Optimal dividend strategies for a risk process under force of interest

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serval:BIB_0AE104867012
Type
Article: article from journal or magazin.
Collection
Publications
Title
Optimal dividend strategies for a risk process under force of interest
Journal
Insurance: Mathematics and Economics
Author(s)
Albrecher H., Thonhauser S.
ISSN
0167-6687
Publication state
Published
Issued date
2008
Peer-reviewed
Oui
Volume
43
Number
1
Pages
134-149
Language
english
Abstract
In the classical Cramer-Lundberg model in risk theory the problem of maximizing the expected cumulated discounted dividend payments until ruin is a widely discussed topic. In the most general case within that framework it is proved [Gerber, H.U., 1968. Entscheidungskriterien fuer den zusammengesetzten Poisson-prosess. Schweiz. Aktuarver. Mitt. 1, 185-227; Azcue, P., Muler, N., 2005. Optimal reinsurance and dividend distribution policies in the Cramer-Lundberg model. Math. Finance 15 (2) 261-308; Schmidli, H., 2008. Stochastic Control in Insurance. Springer] that the optimal dividend strategy is of band type. In the present paper we discuss this maximization problem in a generalized setting including a constant force of interest in the risk model. The value function is identified in the set of viscosity solutions of the associated Hamilton-Jacobi-Bellman equation and the optimal dividend strategy in this risk model with interest is derived, which in the general case is again of band type and for exponential claim sizes collapses to a barrier strategy. Finally, an example is constructed for Erlang(2)-claim sizes, in which the bands for the optimal strategy are explicitly calculated.
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09/02/2009 18:52
Last modification date
20/08/2019 12:32
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