Open AccessUniform Asymptotics for the Finite-Time Ruin Probability of a Time-Dependent Risk Model with Pairwise Quasiasymptotically Independent Claims
Author(s) -
Qingwu Gao
Publication year - 2012
Publication title -
isrn probability and statistics
Language(s) - English
Resource type - Journals
eISSN - 2090-472X
pISSN - 2090-4711
DOI - 10.5402/2012/186348
Subject(s) - mathematics , pairwise comparison , conditional independence , ruin theory , independence (probability theory) , risk model , pairwise independence , interval (graph theory) , class (philosophy) , constant (computer programming) , law of total probability , aggregate (composite) , probability distribution , statistics , combinatorics , posterior probability , moment generating function , algebra of random variables , computer science , bayesian probability , materials science , artificial intelligence , composite material , programming language
We consider a generalized time-dependent risk model with constant interest force, where the claim sizes are of pairwise quasiasymptotical independence structure, and the claim size and its interclaim time satisfy a dependence structure defined by a conditional tail probability of the claim size given the interclaim time before the claim occurs. As the claim-size distribution belongs to the dominated variation class, we establish some weakly asymptotic formulae for the tail probability of discounted aggregate claims and the finite-time ruin probability, which hold uniformly for all times in a relevant infinite interval.
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