一类稀疏风险模型的Gerber-Shiu函数和最优红利策略

On the Gerber-Shiu Function and Optimal Dividend Strategy for a Thinning Risk Model

  • 摘要: 本文研究常数红利边界策略下的风险模型, 其中保险公司的保费收入为一复合Poisson过程, 而索赔计数过程是保费收入过程的p-稀疏过程. 得到了直至破产时总红利现值的期望和模型的期望折现罚金函数所满足的积分方程及边界条件, 并在索赔额及保费额均服从指数分布的情况下, 得到了直至破产时总红利现值的期望和破产时的Laplace变换的具体表达式, 以及使得直至破产时的总红利现值与赤字现值之差的期望值最大化的最优红利界.

     

    Abstract: In this paper, the risk model under constant dividend barrier strategy is studied, in which the premium income follows a compound Poisson process and the arrival of the claims is a p-thinning process of the premium arrival process. The integral equations with boundary conditions for the expected discounted aggregate dividend payments and the expected discounted penalty function until ruin are derived. In addition, the explicit expressions for the Laplace transform of the ruin time and the expected aggregate discounted dividend payments until ruin are given when the individual stochastic premium amount and claim amount are exponentially distributed. Finally, the optimal barrier is presented under the condition of maximizing the expectation of the difference between discounted aggregate dividends until ruin and the deficit at ruin.

     

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