考虑交易费用和管理费用的Cramer-Lundberg模型的最优分红策略

岳毅蒙

doi:10.3969/j.issn.2095-476X.2014.04.023

July 2014

Article Contents

YUE Yi-meng. Optimal dividend strategies in a Cramer-Lundberg model with transaction and administration costs[J]. Journal of Light Industry, 2014, 29(4): 100-104. doi: 10.3969/j.issn.2095-476X.2014.04.023

Citation: YUE Yi-meng. Optimal dividend strategies in a Cramer-Lundberg model with transaction and administration costs[J]. Journal of Light Industry, 2014, 29(4): 100-104. doi: 10.3969/j.issn.2095-476X.2014.04.023 shu

Optimal dividend strategies in a Cramer-Lundberg model with transaction and administration costs

YUE Yi-meng

Department of Mathematics and Computational Science, Shangluo University, Shangluo 726000, China

Received Date: 2014-04-30
Available Online: 2014-07-15

Abstract

Considering the Cramer-Lundberg model with dividend payments and capital injections in the presence of both transaction and administration costs,in order to maximize the discounted dividend payments minus the penalized discounted capital injections and the costs,by stochastic control theory and the corresponding Hamilton-Jacobi-Bellman equation,a method to determine numerically the solution to the integro-differential equation was derived and showed that the optimal strategy was band type.This conclusion which put forwords the theory of former researchers was widely used,and made the risk model more realistic.
- Cramer-Lundberg model,
- stochastic control theory,
- Hamilton-Jacobi-Bellman equation,
- dividend strategy,
- capital injection strategy
References
1. [1]
  Schmidli H.Optimal dividend strategies in a Cramer-Lundberg modelwith capital injections[J].Insurance:Mathematics and Economics,2008(5):1.
2. [2]
  Scheer N,Schmidli H.Optimal dividend strategies in a Cramer-Lundbergmodel with capital injections and administration costs[J].European Actuarial Journal,2011,1(1):57.
3. [3]
  Li Y,Liu G X.Optimal dividend and capital injection strategies Cramer-Lundbergmodel with minimal reserve requirement[C]//Proeeeding of the 4th International Conference on Optimization and Control with Applications(OCA2009),[s.l.]:[s.n.],2009:257-285.
4. [4]
  Hunting M,Paulsen J.Optimal dividend policies with transaction costs for a class of jump-diffusion processes[J].Finance and Stochastics,2013,17(1):73.
5. [5]
  Zhu J.Optimal dividend control for a generalized risk model with investment incomes and debit interest[J].Scandinavian Actuarial Journal,2013(2):140.
6. [6]
  Eisenberg J,Schmidli H.Optimal control of capital injections by reinsurance in a diffusion approximation[J].Blätter der DGVFM,2009,30(1):1.
7. [7]
  Eisenberg J,Schmidli H.Minimising expected discounted capital injections by reinsurance in a classical risk model[J].Scandinavian Actuarial Journal,2011,(3):155.
8. [8]
  Albrecher H,Thonhauser S.Optimality results for dividend problems in insurance[J].Rev R Acad Cien Serie A Math,2009,103(2):295.
9. [9]
  Azcue P,Muler N.Optimal reinsurance and dividend distribution policies in the Cramer-Lundberg model[J].Math Finance,2005,15(2):261.
10. [10]
  Paulsen J.Optimal dividend payments and reinvestments of diffusion processes with both fixed and proportional costs[J].SIAM J Control Optim,2008,47(5):2201.
11. [11]
  Bayraktar E,Kyprianou A E,Yamazaki K.Optimal dividends in the dual model under transaction costs[J].Insurance:Mathematics and Economics,2014,54:133.
Proportional views

Get Citation

PDF

XML

Article Metrics

Article views(1225) PDF downloads(41) Cited by()

Ralated

通讯作者: 陈斌, bchen63@163.com

1.
沈阳化工大学材料科学与工程学院沈阳 110142

Optimal dividend strategies in a Cramer-Lundberg model with transaction and administration costs

Abstract

References

Proportional views

Article Metrics

Ralated

Proportional views

通讯作者: 陈斌, bchen63@163.com