Title :
Dynamic Portfolio Selection under Conditional Capital at Risk Constraint
Author_Institution :
Sch. of Appl. Math., Central Univ. of Finance & Econ., Beijing, China
Abstract :
In this paper, we investigate the dynamic optimal portfolio selection. In a Black-Scholes setting, a conditional capital at risk constraint is imposed continuously over time. Making use of conditional information, the risk of trading portfolio is reevaluated dynamically to influence the investment decision. We apply the dynamic programming technique and optimal theory to obtain the optimal constrained portfolio allocation strategies in closed form. We find that two-fund separation also holds and the proportions invested in risky assets are lower than they would have been without the risk constraint. Numerical examples are presented.
Keywords :
constraint theory; decision making; dynamic programming; investment; risk management; Black-Scholes setting; conditional capital; conditional information; dynamic optimal portfolio selection; dynamic programming; investment decision; optimal constrained portfolio allocation strategies; risk constraint; risky assets; two fund separation; Discrete wavelet transforms; Economics; Equations; Heuristic algorithms; Mathematical model; Optimization; Portfolios; Black-Scholes setting; conditional capital at risk; dynamic portfolio selection; dynamic programming;
Conference_Titel :
Business Intelligence and Financial Engineering (BIFE), 2010 Third International Conference on
Conference_Location :
Hong Kong
Print_ISBN :
978-1-4244-7575-9
DOI :
10.1109/BIFE.2010.60
