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跳扩散对偶模型在带壁分红策略下的分红函数
引用本文:李波,吴荣. 跳扩散对偶模型在带壁分红策略下的分红函数[J]. 应用数学和力学, 2008, 29(9): 1124-1134. DOI: 10.3879/j.issn.1000-0887.2008.09.013
作者姓名:李波  吴荣
作者单位:南开大学 数学科学学院,天津 300071
基金项目:国家重点基础研究发展计划(973计划),国家自然科学基金,高等教育博士学科点科研基金 
摘    要:考虑了带干扰的古典风险模型的对偶模型,讨论了模型在带壁分红策略下的一些结论.通过研究过程的局部时,证明了所讨论函数的边界条件.用在没有分红策略下模型的函数,给出了期望折现分红函数的显示表达.在最后一节,对于跳服从相位分布的情形,给出了数值例子,并讨论了最优分红边界的存在性.

关 键 词:复合Poisson过程   扩散过程   Gerber-Shiu函数   微分积分方程   破产时   破产前余额   赤字
收稿时间:2007-10-27

Dividend Function in the Jump-Diffusion Dual Model With Barrier Dividend Strategy
LI Bo,WU Rong. Dividend Function in the Jump-Diffusion Dual Model With Barrier Dividend Strategy[J]. Applied Mathematics and Mechanics, 2008, 29(9): 1124-1134. DOI: 10.3879/j.issn.1000-0887.2008.09.013
Authors:LI Bo  WU Rong
Affiliation:School of Mathematical Sciences and LPMC, Nankai University, Tianjin 300071, P. R. China
Abstract:A dual model of the perturbed classical compound Poisson risk model under a constant dividend barrier was considered. A new method is used in deriving the boundary condition of the equation satisfied by that expectation function, by using the local time of a related process. The expression for the expected discounted dividend function was obtained in terms of those in the corresponding perturbed compound Poisson risk model without barrier. The special cases where the gain size is phasetype distributed is illustrated in the last section. Also the existence of the optimal dividend level was considered.
Keywords:
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