论文信息 - Mean-absolute deviation portfolio optimization model and its applications to Tokyo stock market

Mean-absolute deviation portfolio optimization model and its applications to Tokyo stock market

The purpose of this paper is to demonstrate that a portfolio optimization model using the L 1 risk (mean absolute deviation risk) function can remove most of the difficulties associated with the classical Markowitz's model while maintaining its advantages over equilibrium models. In particular, the L 1 risk model leads to a linear program instead of a quadratic program, so that a large-scale optimization problem consisting of more than 1,000 stocks may be solved on a real time basis. Numerical experiments using the historical data of NIKKEI 225 stocks show that the L 1 risk model generates a portfolio quite similar to that of the Markowitz's model within a fraction of time required to solve the latter.

H. Konno | H. Yamazaki

[1] A. Stuart,et al. Portfolio Selection: Efficient Diversification of Investments , 1959 .

[2] George B. Dantzig,et al. Linear programming and extensions , 1965 .

[3] W. Sharpe. A Simplified Model for Portfolio Analysis , 1963 .

[4] W. Sharpe. CAPITAL ASSET PRICES: A THEORY OF MARKET EQUILIBRIUM UNDER CONDITIONS OF RISK* , 1964 .

[5] Calyampudi Radhakrishna Rao,et al. Linear Statistical Inference and its Applications , 1967 .

[6] B. Stone. A Linear Programming Formulation of the General Portfolio Selection Problem , 1973, Journal of Financial and Quantitative Analysis.

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

[8] H. Markowitz,et al. Mean-Variance versus Direct Utility Maximization , 1984 .

[9] André F. Perold,et al. Large-Scale Portfolio Optimization , 1984 .

[10] W. Sharpe,et al. Mean-Variance Analysis in Portfolio Choice and Capital Markets , 1987 .

[11] Hiroshi Konno,et al. PIECEWISE LINEAR RISK FUNCTION AND PORTFOLIO OPTIMIZATION , 1990 .