Joint asymptotic distributions of smallest and largest insurance claims
Details
Download: BIB_B3F04E90B8D8.P001.pdf (239.52 [Ko])
State: Public
Version: Final published version
State: Public
Version: Final published version
Serval ID
serval:BIB_B3F04E90B8D8
Type
Article: article from journal or magazin.
Collection
Publications
Institution
Title
Joint asymptotic distributions of smallest and largest insurance claims
Journal
Risks
ISSN
2227-9091
Publication state
Published
Issued date
2014
Peer-reviewed
Oui
Volume
2
Number
3
Pages
289-314
Language
english
Abstract
Assume that claims in a portfolio of insurance contracts are described by independent and identically distributed random variables with regularly varying tails and occur according to a near mixed Poisson process. We provide a collection of results pertaining to the joint asymptotic Laplace transforms of the normalised sums of the smallest and largest claims, when the length of the considered time interval tends to infinity. The results crucially depend on the value of the tail index of the claim distribution, as well as on the number of largest claims under consideration.
Keywords
aggregate claims, ammeter problem, near mixed Poisson process, reinsurance, subexponential distributions, extremes
Open Access
Yes
Create date
18/07/2014 10:03
Last modification date
20/08/2019 15:22