- . Review of Financial Studies, 1991, 4: 727–752.
Paper not yet in RePEc: Add citation now
Asmussen, S., Hojgaard, B., Taksar, M., Optimal risk control and dividend distribution policies: example of excess–of–loss reinsurance for an insurance corporation[J]. Finance and Stochastics, 2000, 4: 299-324.
Badaoui, M., FernaÃŒÂndez, B., An optimal investment strategy with maximal risk aversion and its ruin probability in the presence of stochastic volatility on investment[J]. Insurance: Mathematics and Economics, 2013 ,53: 1–13.
Bai, L.H., Guo, J.Y., Optimal proportional reinsurance and investment with multiple risky assets and no–shorting constraint[J]. Insurance: Mathematics and Economics, 2008, 42: 968– 975.
- Bebernes, J.W., and Schmitt, K., Invariant sets and the Hukuhara-Kneser property for systems of parabolic partial differential equations. Rocky Mountain J. Math.,1977, 7, 557-567.
Paper not yet in RePEc: Add citation now
- Bebernes, J.W., and Schmitt, K., On the existence of maximal and minimal solutions for parabolic partial differential equations. Proceedings of AMS.,1979,73, 211-218.
Paper not yet in RePEc: Add citation now
- Bielecki T R, Jang I., Portfolio optimization with a defaultable security[J]. Asia-Pacific Financial Markets, 2006, 13(2): 113-127.
Paper not yet in RePEc: Add citation now
- Bielecki, T.R., Rutkowski, M., Credit Risk: Modeling, Valuation and Hedging[M]. Springer, 2002: 225-227.
Paper not yet in RePEc: Add citation now
- Birge, J.R., Bo, L.J., Capponi, A., Risk Sensitive Asset Management and Cascading Defaults, Revised and Resubmitted to Mathematics of Operations Research, 2016. 30 NIAN YAO AND ZHIMING YANG
Paper not yet in RePEc: Add citation now
Bo L, Li X, Wang Y, et al. Optimal investment and consumption with default risk: HARA utility[J]. Asia-Pacific Financial Markets, 2013, 20(3): 261-281.
- Bo L, Wang Y, Yang X., An optimal portfolio problem in a defaultable market[J]. Advances in Applied Probability, 2010, 42(3): 689-705.
Paper not yet in RePEc: Add citation now
Browne, S., Optimal investment policies for a firm with a random risk process: exponential utility and minimizing the probability of ruin[J]. Mathematics of Operations Research, 1995, 20: 937–958.
- Cao, Y.S., Wan, N.Q., Optimal proportional reinsurance and investment based on Hamilton– Jacobi–Bellman equation[J]. Insurance: Mathematics and Economics, 2009, 45, 157–162.
Paper not yet in RePEc: Add citation now
- Capponi A, Figueroa–LoÃŒÂpez J E., Dynamic portfolio optimization with a defaultable security and regime–switching[J]. Mathematical Finance, 2014, 24(2): 207-249.
Paper not yet in RePEc: Add citation now
- Castaneda, N., Hernandez, D., Optimal consumption-investment problems in incomplete markets with stochastic coefficients[J]. SIAM Journal on Control and Optimization, 2005, 44 (4): 1322-1344.
Paper not yet in RePEc: Add citation now
Christensen J H E, Hansen E, Lando D., Confidence sets for continuous-time rating transition probabilities[J]. Journal of Banking and Finance, 2004, 28(11): 2575-2602.
Cox, J.C., Ross, S.A., The valuation of options for alternative stochasticprocesses[J]. Journal of Financial Economics, 1976, 3: 145–166.
Duffie D, Pedersen L H, Singleton K J., Modeling sovereign yield spreads: a case study of Russian debt[J]. The Journal of Finance, 2003, 58(1): 119-159.
- Duffie D, Singleton K J., Credit Risk: Pricing, Measurement, and Management: Pricing, Measurement, and Management[M]. Princeton University Press, 2012.
Paper not yet in RePEc: Add citation now
- FernaÃŒÂndez, B., HernaÃŒÂndez, D., Meda, A., Saavedra, P., An optimal investment strategy with maximal risk aversion and its ruin probability[J]. Mathematical Methods of Operations Research, 2008, 68: 159–179 .
Paper not yet in RePEc: Add citation now
- Fleming, W.H., Soner, H.M., Controlled Markov Processes and Viscosity Solutions[M]. Springer, Berlin, New York, 1993.
Paper not yet in RePEc: Add citation now
- Fouque, J.-P., Papanicolaou, G., Sircar, K.R., Derivatives in Financial Markets with Stochastic Volatility[M]. Cambridge University Press, 2000.
Paper not yet in RePEc: Add citation now
- Friedman, A., Stochastic Differential Equations and Applications[M]. Academic Press., 1975:139-144.
Paper not yet in RePEc: Add citation now
- Friedman, Avner, Partial Differential Equations of Parabolic Type[M]. 1983.
Paper not yet in RePEc: Add citation now
Gu, M.D., Yang, Y.P., Li, S.D., Zhang, J.Y., Constant elasticity of variance model for proportional reinsurance and investment strategies[J]. Insurance: Mathematics and Economics, 2010, 46: 580–587.
Heston, S.L., A closed-form solution for options with stochastic volatility with applications to bond and currency options[J]. Review of Financial Studies, 1993, 6: 327–343.
Hipp, C., Plum, M., Optimal investment for insurers[J]. Insurance: Mathematics and Economics, 2000, 27 : 215–228.
Hull, J., White, A., The pricing of options on assets with stochastic volatilities[J]. The Journal of Finance, 1987, 42: 281–300.
- Ikeda, N., Watanabe, S., Stochastic differential equations and diffusion processes[J]. 1989.
Paper not yet in RePEc: Add citation now
- Klebaner,F.C, Introduction to Stochastic Calculus with Applications. Imperial College Press, London, 2005.
Paper not yet in RePEc: Add citation now
Li, Z.F., Zeng, Y., Lai, Y.Z., Optimal time–consistent investment and reinsurance strategies for insurers under Heston’s SV model[J]. Insurance: Mathematics and Economics, 2012, 51: 191–203. OPTIMAL EXCESS-OF-LOSS REINSURANCE AND INVESTMENT PROBLEM FOR AN INSURER WITH DEFAULT RISK U
- Liang, Z.B., Yuen, K.C., Cheung, K.C., Optimal reinsurance–investment problem in a constant elasticity of variance stock market for jump–diffusion risk model[J]. Applied Stochastic Models in Business and Industry, 2012, 28: 585–597.
Paper not yet in RePEc: Add citation now
- Lin, X., Li, Y.F., Optimal reinsurance and investment for a jump diffusion risk process under the CEV model[J]. North American Actuarial Journal, 2004, 15: 417–431.
Paper not yet in RePEc: Add citation now
Liu, C.S., Yang, H., Optimal investment for an insurer to minimize its probability of ruin[J]. North American Actuarial Journal, 2004, 8: 11–31.
Promislow, D.S., Young, V.R., Minimizing the probability of ruin when claims follow Brownian motion with drift[J]. North American Actuarial Journal, 2005, 9 : 109–128.
- Rama, C., Peter, T., Financial Modelling with Jump Processes. Chapman and Hall, 2003.
Paper not yet in RePEc: Add citation now
Yang, H., Zhang, L., Optimal investment for insurer with jump-diffusion risk process[J]. Insurance: Mathematics and Economics, 2005, 37: 615–634.
- Zeng, X.D., Taksar, M., A stochastic volatility model and optimal portfolio selection[J]. Quant. Finance, 2003, 13: 1547-1558.
Paper not yet in RePEc: Add citation now
Zeng, Y., Li, Z.F., Optimal time-consistent investment and reinsurance policies for mean– variance insurers[J]. Insurance: Mathematics and Economics, 2011, 49: 145–154.
Zhao, H., Rong, X., Zhao, Y., Optimal excess-of-loss reinsurance and investment problem for an insurer with jump–diffusion risk process under the Heston model[J]. Insurance: Mathematics and Economics, 2013, 53: 504-514. Nian Yao, School of Mathematics and Statistics, Shenzhen University, Shenzhen, Guangdong Province, 518060, China. E-mail address: yaonian@szu.edu.cn Zhiming Yang, School of Mathematics and Statistics, Shenzhen University, Shenzhen, Guangdong Province, 518060, China. E-mail address: yzm1991317@qq.com
Zhu, H., Deng, C., Yue, S., et al. Optimal reinsurance and investment problem for an insurer with counterparty risk[J]. Insurance: Mathematics and Economics, 2015, 61: 242-254.