DURATION OF NEGATIVE SURPLUS FOR A TWO STATE MARKOV-MODULATED RISK MODEL 被引量：2

DURATION OF NEGATIVE SURPLUS FOR A TWO STATE MARKOV-MODULATED RISK MODEL

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摘要 We consider a continuous time risk model based on a two state Markov process, in which after an exponentially distributed time, the claim frequency changes to a different level and can change back again in the same way. We derive the Laplace transform for the first passage time to surplus zero from a given negative surplus and for the duration of negative surplus. Closed-form expressions are given in the case of exponential individual claim. Finally, numerical results are provided to show how to estimate the moments of duration of negative surplus. We consider a continuous time risk model based on a two state Markov process, in which after an exponentially distributed time, the claim frequency changes to a different level and can change back again in the same way. We derive the Laplace transform for the first passage time to surplus zero from a given negative surplus and for the duration of negative surplus. Closed-form expressions are given in the case of exponential individual claim. Finally, numerical results are provided to show how to estimate the moments of duration of negative surplus.

作者马学敏袁海丽胡亦钧

机构地区 School of Mathematics and Statistics

出处《Acta Mathematica Scientia》 SCIE CSCD 2010年第4期1167-1173,共7页 数学物理学报（B辑英文版）

基金 Supported in part by the National Natural Science Foundation of China and the Ministry of Education of China

关键词 Homogeneous Markov process ruin probability DEFICIT duration of negative surplus compound Poisson risk model Homogeneous Markov process ruin probability deficit duration of negative surplus compound Poisson risk model

分类号 O211.62 [理学—概率论与数理统计]

作者简介 E-mail： maxuemind@sohu.com;E-mail： hailiyuan@gmail.com;E-mail： yijunhu@public.wh.hb. cn

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参考文献9

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DURATION OF NEGATIVE SURPLUS FOR A TWO STATE MARKOV-MODULATED RISK MODEL 被引量：2

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