Abstract
Assume that an insurance company pays dividends to its shareholders whenever the surplus process is above a given threshold. In this paper we study the expected amount of dividends paid, and the expected time to ruin in the compound Poisson risk process perturbed by a Brownian motion. Two models are considered: In the first one the insurance company pays whatever amount exceeds a given level b as dividends to its shareholders. In the second model, the company starts to pay dividends at a given rate, smaller than the premium rate, whenever the surplus up-crosses the level b. The dividends are paid until the surplus down-crosses the level a, a < b . We assume that the claim sizes are phase-type distributed. In the analysis we apply the multidimensional Wald martingale, and the multidimensional Asmussesn and Kella martingale.
Publisher
Cambridge University Press (CUP)
Subject
Economics and Econometrics,Finance,Accounting
Reference29 articles.
1. When does surplus reach a certain level before ruin?;Zhou;Insurance: Mathematics and Economics,2004
2. Optimal choice of dividend barriers for a risk process with stochastic return on investments;Paulsen;Insurance: Mathematics and Economics,1997
3. Asmussen S. (2000) Ruin Probabilities. World Scientific.
4. The classical risk model with constant dividend barrier: analysis of the Gerber-Shiu discounted penalty function;Lin;Insurance: Mathematics and Economics,2003
5. On Optimal Dividend Strategies In The Compound Poisson Model
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