Continuous-Time Mean-Variance Portfolio Selection with Random Horizon

被引:0
作者
Zhiyong Yu
机构
[1] Shandong University,School of Mathematics
来源
Applied Mathematics & Optimization | 2013年 / 68卷
关键词
Backward stochastic differential equation; Mean-variance portfolio selection; Random time horizon; Linear-quadratic control; Continuous time;
D O I
暂无
中图分类号
学科分类号
摘要
This paper examines the continuous-time mean-variance optimal portfolio selection problem with random market parameters and random time horizon. Treating this problem as a linearly constrained stochastic linear-quadratic optimal control problem, I explicitly derive the efficient portfolios and efficient frontier in closed forms based on the solutions of two backward stochastic differential equations. Some related issues such as a minimum variance portfolio and a mutual fund theorem are also addressed. All the results are markedly different from those in the problem with deterministic exit time. A key part of my analysis involves proving the global solvability of a stochastic Riccati equation, which is interesting in its own right.
引用
收藏
页码:333 / 359
页数:26
相关论文
共 45 条
  • [1] Bielecki T.R.(2005)Continuous-time mean-variance portfolio selection with bankruptcy prohibition Math. Finance 15 213-244
  • [2] Jin H.(1976)Linear quadratic optimal stochastic control with random coefficients SIAM J. Control Optim. 14 419-444
  • [3] Pliska S.R.(2008)Optimal investment decisions when time-horizon is uncertain J. Math. Econ. 44 1100-1113
  • [4] Zhou X.Y.(2004)Wealth-path dependent utility maximization in incomplete markets Finance Stoch. 4 579-603
  • [5] Bismut J.M.(1991)Mean-variance hedging in continuous time Ann. Appl. Probab. 1 1-15
  • [6] Blanchet-Scalliet C.(1997)Backward stochastic differential equations in finance Math. Finance 7 1-71
  • [7] El Karoui N.(1978)Existence and uniqueness of a solution for stochastic equations with respect to semimartingales Theory Probab. Appl. 23 751-763
  • [8] Jeanblanc M.(1969)Optimal investment and consumption strategies under risk, an uncertain lifetime, and insurance Int. Econ. Rev. 10 443-466
  • [9] Martellini L.(1971)Optimal entrepreneurial decisions in a completely stochastic environment Manag. Sci. 17 427-449
  • [10] Bouchard B.(2001)Utility maximization with discretionary stopping SIAM J. Control Optim. 39 306-329
12345