Lundberg-type bounds for the joint distribution of surplus immediately before and after ruin under a Markov-modulated risk model

Andrew Ng; Hailiang Yang

doi:10.2143/AST.35.2.2003457

Lundberg-type bounds for the joint distribution of surplus immediately before and after ruin under a Markov-modulated risk model

Andrew Ng
, Hailiang Yang^*

^*Corresponding author for this work

The University of Hong Kong

Research output: Contribution to journal › Article › peer-review

Abstract

In this paper, we consider a Markov-modulated risk model (also called Markovian regime switching insurance risk model). Follow Asmussen (2000, 2003), by using the theory of Markov additive process, an exponential martingale is constructed and Lundberg-type upper bounds for the joint distribution of surplus immediately before and at ruin are obtained. As a natural corollary, bounds for the distribution of the deficit at ruin are obtained. We also present some numerical results to illustrate the tightness of the bound obtained in this paper.

Original language	English
Pages (from-to)	351-361
Journal	ASTIN Bulletin
Volume	35
Issue number	2
DOIs	https://doi.org/10.2143/AST.35.2.2003457
Publication status	Published - 2005
Externally published	Yes

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title = "Lundberg-type bounds for the joint distribution of surplus immediately before and after ruin under a Markov-modulated risk model",

abstract = "In this paper, we consider a Markov-modulated risk model (also called Markovian regime switching insurance risk model). Follow Asmussen (2000, 2003), by using the theory of Markov additive process, an exponential martingale is constructed and Lundberg-type upper bounds for the joint distribution of surplus immediately before and at ruin are obtained. As a natural corollary, bounds for the distribution of the deficit at ruin are obtained. We also present some numerical results to illustrate the tightness of the bound obtained in this paper.",

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AB - In this paper, we consider a Markov-modulated risk model (also called Markovian regime switching insurance risk model). Follow Asmussen (2000, 2003), by using the theory of Markov additive process, an exponential martingale is constructed and Lundberg-type upper bounds for the joint distribution of surplus immediately before and at ruin are obtained. As a natural corollary, bounds for the distribution of the deficit at ruin are obtained. We also present some numerical results to illustrate the tightness of the bound obtained in this paper.

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EP - 361

JO - ASTIN Bulletin

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Lundberg-type bounds for the joint distribution of surplus immediately before and after ruin under a Markov-modulated risk model

Abstract

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