Multiperiod portfolio optimization models in stochastic markets using the mean-variance approach

We consider several multiperiod portfolio optimization models where the market consists of a riskless asset and several risky assets. The returns in any period are random with a mean vector and a covariance matrix that depend on the prevailing economic conditions in the market during that period. An important feature of our model is that the stochastic evolution of the market is described by a Markov chain with perfectly observable states. Various models involving the safety-first approach, coefficient of variation and quadratic utility functions are considered where the objective functions depend only on the mean and the variance of the final wealth. An auxiliary problem that generates the same efficient frontier as our formulations is solved using dynamic programming to identify optimal portfolio management policies for each problem. Illustrative cases are presented to demonstrate the solution procedure with an interpretation of the optimal policies.

[1]  Duan Li,et al.  Safety-first dynamic portfolio selection , 1998 .

[2]  Süleyman Özekici,et al.  Portfolio optimization in stochastic markets , 2006, Math. Methods Oper. Res..

[3]  Mahfuzul Haque,et al.  Safety-first portfolio optimization for US investors in emerging global, Asian and Latin American markets , 2004 .

[4]  A. Roy SAFETY-FIRST AND HOLDING OF ASSETS , 1952 .

[5]  R. C. Merton,et al.  An Analytic Derivation of the Efficient Portfolio Frontier , 1972, Journal of Financial and Quantitative Analysis.

[6]  Shouyang Wang,et al.  Risk control over bankruptcy in dynamic portfolio selection: a generalized mean-variance formulation , 2004, IEEE Transactions on Automatic Control.

[7]  Gordon B. Pye A Markov Model of the Term Structure , 1966 .

[8]  Ralf Korn,et al.  A Stochastic Control Approach to Portfolio Problems with Stochastic Interest Rates , 2001, SIAM J. Control. Optim..

[9]  Duan Li,et al.  Optimal Dynamic Portfolio Selection: Multiperiod Mean‐Variance Formulation , 2000 .

[10]  L. Telser Safety First and Hedging , 1955 .

[11]  S. Kataoka A Stochastic Programming Model , 1963 .

[12]  A. Roy Safety first and the holding of assetts , 1952 .

[13]  Daniel Hernández-Hernández,et al.  An optimal consumption model with stochastic volatility , 2003, Finance Stochastics.

[14]  Q. Zhang,et al.  Stock Trading: An Optimal Selling Rule , 2001, SIAM J. Control. Optim..

[15]  S. Peng,et al.  Risk-Sinsitive Dynamic Portfolio Optimization with Partial Information on Infinite Time Horizon , 2002 .

[16]  X. Zhou,et al.  Continuous-Time Mean-Variance Portfolio Selection: A Stochastic LQ Framework , 2000 .

[17]  Lukasz Stettner Risk-sensitive portfolio optimization with completely and partially observed factors , 2004, IEEE Transactions on Automatic Control.

[18]  S. Turnovsky,et al.  Safety-First and Expected Utility Maximization in Mean-Standard Deviation Portfolio Analysis , 1970 .

[19]  Marc C. Steinbach,et al.  Markowitz Revisited: Mean-Variance Models in Financial Portfolio Analysis , 2001, SIAM Rev..

[20]  Ragnar Norberg,et al.  A time‐continuous markov chain interest model with applications to insurance , 1995 .

[21]  H. Kunzi,et al.  Lectu re Notes in Economics and Mathematical Systems , 1975 .

[22]  Lukasz Stettner,et al.  Risk sensitive portfolio optimization , 1999, Math. Methods Oper. Res..

[23]  N. H. Hakansson.,et al.  Optimal Growth Portfolios When Yields Are Serially Correlated , 1970 .

[24]  R. Elliott,et al.  A COMPLETE YIELD CURVE DESCRIPTION OF A MARKOV INTEREST RATE MODEL , 2003 .

[25]  Nicole Bäuerle,et al.  Portfolio optimization with Markov-modulated stock prices and interest rates , 2004, IEEE Transactions on Automatic Control.

[26]  E. Elton Modern portfolio theory and investment analysis , 1981 .

[27]  S. Marcus,et al.  Existence of Risk-Sensitive Optimal Stationary Policies for Controlled Markov Processes , 1999 .

[28]  S. Pliska,et al.  Risk-Sensitive Dynamic Asset Management , 1999 .

[29]  Daniel Hernández-Hernández,et al.  Risk sensitive control of finite state Markov chains in discrete time, with applications to portfolio management , 1999, Math. Methods Oper. Res..

[30]  Gang George Yin,et al.  Markowitz's mean-variance portfolio selection with regime switching: from discrete-time models to their continuous-time limits , 2004, IEEE Transactions on Automatic Control.

[31]  Thaleia Zariphopoulou,et al.  A solution approach to valuation with unhedgeable risks , 2001, Finance Stochastics.

[32]  Haim Levy,et al.  "SAFETY FIRST - AN EXPECTED UTILITY PRINCIPLE" , 1972 .

[33]  Shouyang Wang,et al.  Portfolio Selection and Asset Pricing , 2002 .

[34]  L. Stettner,et al.  Risk sensitive control of discrete time partially observed Markov processes with infinite horizon , 1999 .