The surpluses immediately before and at ruin, and the amount of the claim causing ruin
Details
Serval ID
serval:BIB_EFC1F4DF071E
Type
Article: article from journal or magazin.
Collection
Publications
Institution
Title
The surpluses immediately before and at ruin, and the amount of the claim causing ruin
Journal
Insurance: Mathematics and Economics
ISSN
0167-6687
Publication state
Published
Issued date
1988
Peer-reviewed
Oui
Volume
7
Number
3
Pages
193-199
Language
english
Abstract
In the classical compound Poisson model of the collective risk theory we consider X, the surplus before the claim that causes ruin, and Y, the deficit at the time of ruin. We denote by f(u; x, y) their joint density (u initial surplus) which is a defective probability density (since X and Y are only defined, if ruin takes place). For an arbitrary claim amount distribution we find that f(0; x, y) = ap(x + y), where p(z) is the probability density function of a claim amount and a is the ratio of the Poisson parameter and the rate of premium income. In the more realistic case, where u is positive, f(u; x, y) can be calculated explicitly, if the claim amount distribution is exponential or, more generally, a combination of exponential distributions. We are also interested in X + Y, the amount of the claim that causes ruin. Its density h(u; z) can be obtained from f(u; x, y). One finds, for example, that h(0; z) = azp(z).
Keywords
Ruin theory, Surpluses before and at ruin, Combination of exponential claim amount distributions
Web of science
Create date
19/11/2007 10:53
Last modification date
20/08/2019 16:17