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OPTIMAL DIVIDEND AND REINSURANCE STRATEGIES WITH FINANCING AND LIQUIDATION VALUE

Published online by Cambridge University Press:  25 January 2016

Dingjun Yao
Affiliation:
School of Finance, Nanjing University of Finance and Economics, Nanjing 210023, ChinaThe Center of Cooperative Innovation for Modern Service Industry, Nanjing 210023, China E-Mail: [email protected]
Hailiang Yang*
Affiliation:
Department of Statistics and Actuarial Science, The University of Hong Kong, Hong Kong, China
Rongming Wang
Affiliation:
School of Statistics, Faculty of Economics and Management, East China Normal University, Shanghai 200241, China E-Mail: [email protected]

Abstract

This study investigates a combined optimal financing, reinsurance and dividend distribution problem for a big insurance portfolio. A manager can control the surplus by buying proportional reinsurance, paying dividends and raising money dynamically. The transaction costs and liquidation values at bankruptcy are included in the risk model. Under the objective of maximising the insurance company's value, we identify the insurer's joint optimal strategies using stochastic control methods. The results reveal that managers should consider financing if and only if the terminal value and the transaction costs are not too high, less reinsurance is bought when the surplus increases or dividends are always distributed using the barrier strategy.

Type
Research Article
Copyright
Copyright © Astin Bulletin 2016 

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References

Asmussen, S., Høgaard, B. and Taksar, M. (2000) Optimal risk control and dividend distribution policies: Example of excess-of-loss reinsurance for an insurance corporation. Finance and Stochastics, 4 (3), 299324.Google Scholar
Bai, L., Guo, J. and Zhang, H. (2010) Optimal excess-of-loss reinsurance and dividend payments with both transaction costs and taxes. Quantitative Finance, 10 (10), 11631172.Google Scholar
Barth, A. and Moreno-Bromberg, S. (2014) Optimal risk and liquidity management with costly refinancing opportunities. Insurance: Mathematics and Economics, 57 (3), 3145.Google Scholar
Cadenillas, A., Choulli, T., Taksar, M. and Zhang, L. (2006) Classical and impulse stochastic control for the optimization of the dividend and risk policies of an insurance firm. Mathematical Finance, 16 (1), 181202.Google Scholar
Chen, M., Peng, X. and Guo, J. (2013) Optimal dividend problem with a nonlinear regular-singular stochastic control. Insurance: Mathematics and Economics, 52 (3), 448456.Google Scholar
Choulli, T., Taksar, M. and Zhou, X. (2003) A diffusion model for optimal dividend distribution for a company with constraints on risk control. SIAM Journal on Control and Optimization, 41 (6), 19461979.Google Scholar
Fleming, W. and Soner, H. (1993) Controlled Markov Process and Viscosity Solutions. London: Springer-Verlag.Google Scholar
Grandell, J. (1991) Aspects of Risk Theory. London: Springer-Verlag.Google Scholar
Guan, H. and Liang, Z. (2014) Viscosity solution and impulse control of the diffusion model with reinsurance and fixed transaction costs. Insurance: Mathematics and Economics, 54 (1), 109122.Google Scholar
He, L. and Liang, Z. (2009) Optimal financing and dividend control of the insurance company with fixed and proportional transaction costs. Insurance: Mathematics and Economics, 42 (3), 8894.Google Scholar
Høgaard, B. and Taksar, M. (1999) Controlling risk exposure and dividends payout schemes: Insurance company example. Mathematical Finance, 9 (2), 153182.Google Scholar
Høgaard, B. and Taksar, M. (2004) Optimal dynamic portfolio selection for a corporation with controllable risk and dividend distribution policy. Quantitative Finance, 9 (2), 153182.Google Scholar
Liang, Z. and Young, V. (2012) Dividends and reinsurance under a penalty for ruin. Insurance: Mathematics and Economics, 50 (3), 437445.Google Scholar
Liu, W. and Hu, Y. (2014) Optimal financing and dividend control of the insurance company with excess-of-loss reinsurance policy. Statistics and Probability Letters, 84 (1), 121130.CrossRefGoogle Scholar
Løkka, A. and Zervos, M. (2008) Optimal dividend and issuance of equity policies in the presence of proportional costs. Insurance: Mathematics and Economics, 42 (3), 954961.Google Scholar
Meng, H. and Siu, T. (2011) On optimal reinsurance, dividend and reinvestment strategies. Economic Modelling, 28 (28), 211218.Google Scholar
Mnif, M. and Sulem, M. (2005) Optimal risk control and dividend policies under excess of loss reinsurance. Stochastics, 77 (5), 455476.Google Scholar
Peng, X., Chen, M. and Guo, J. (2012) Optimal dividend and equity issuance problem with proportional and fixed transaction costs. Insurance: Mathematics and Economics, 51 (3), 576585.Google Scholar
Taksar, M. (2000a) Optimal risk and dividend distribution control models for an insurance company. Mathematical Methods of Operations Research, 51 (1), 142.Google Scholar
Taksar, M. (2000b) Dependence of the optimal risk control decisions on the terminal value for a financial corporation. Annals of Operations Research, 98 (1), 8999.Google Scholar
Taksar, M. and Hunderup, C. (2007) The influence of bankruptcy value on optimal risk control for diffusion models with proportional reinsurance. Insurance: Mathematics and Economics, 40 (2), 311321.Google Scholar
Taksar, M. and Zhou, X. (1998) Optimal risk and dividend control for a company with a debt liability. Insurance: Mathematics and Economics, 22 (1), 105122.Google Scholar
Xu, J. and Zhou, M. (2012) Optimal risk control and dividend distribution policies for a diffusion model with terminal value. Mathematical and Computer Modelling, 56 (7–8), 180190.Google Scholar
Yao, D., Yang, H. and Wang, R. (2014) Optimal risk and dividend control problem with fixed costs and salvage value: Variance premium principle. Economic Modelling, 37, 5364.Google Scholar
Zhou, M. and Yuen, K.C. (2012) Optimal reinsurance and dividend for a diffusion model with capital injection: Variance premium principle. Economic Modelling, 29 (2), 198207.Google Scholar