Title :
Mean-variance portfolio selection via LQ optimal control
Author :
Lim, Andrew E B ; Zhou, Xun Yu
Author_Institution :
Dept. of Ind. Eng. & Oper. Res., Columbia Univ., New York, NY, USA
Abstract :
Concerns the problem of mean-variance portfolio selection in an incomplete market. Asset prices are solutions of stochastic differential equations and the parameters in these equations may be random. We approach this problem from the perspective of linear-quadratic (LQ) optimal control and backward stochastic differential equations (BSDEs); that is, we focus on the so-called stochastic Riccati equation (SRE) associated with the problem. Excepting certain special cases, solvability of the SRE remains an open question. Our primary theoretical contribution is a proof of existence and uniqueness of solutions of the SRE associated with the mean-variance problem. In addition, we derive closed form expressions for the optimal portfolios and efficient frontier in terms of the solution of the SRE. A generalization of the Mutual Fund Theorem and financial interpretations of the SRE are also obtained
Keywords :
Riccati equations; differential equations; investment; linear quadratic control; stochastic processes; LQ optimal control; Mutual Fund Theorem; asset prices; backward stochastic differential equations; incomplete market; investment; linear-quadratic optimal control; mean-variance portfolio selection; stochastic Riccati equation; stochastic differential equations; stochastic processes; Differential equations; Finance; Mutual funds; Nonlinear equations; Optimal control; Portfolios; Riccati equations; Stochastic processes; Stochastic systems; Systems engineering and theory;
Conference_Titel :
Decision and Control, 2001. Proceedings of the 40th IEEE Conference on
Conference_Location :
Orlando, FL
Print_ISBN :
0-7803-7061-9
DOI :
10.1109/.2001.980921
