Worst-Case Value-At-Risk and Robust Portfolio Optimization: A Conic Programming Approach

Classical formulations of the portfolio optimization problem, such as mean-variance or Value-at-Risk (VaR) approaches, can result in a portfolio extremely sensitive to errors in the data, such as mean and covariance matrix of the returns. In this paper we propose a way to alleviate this problem in a tractable manner. We assume that the distribution of returns is partially known, in the sense that onlybounds on the mean and covariance matrix are available. We define the worst-case Value-at-Risk as the largest VaR attainable, given the partial information on the returns' distribution. We consider the problem of computing and optimizing the worst-case VaR, and we show that these problems can be cast as semidefinite programs. We extend our approach to various other partial information on the distribution, including uncertainty in factor models, support constraints, and relative entropy information.

[1]  J. Cockcroft Investment in Science , 1962, Nature.

[2]  Robert B. Litterman,et al.  Global Portfolio Optimization , 1992 .

[3]  J. Hiriart-Urruty,et al.  Convex analysis and minimization algorithms , 1993 .

[4]  Stephen P. Boyd,et al.  Linear Matrix Inequalities in Systems and Control Theory , 1994 .

[5]  James E. Smith,et al.  Generalized Chebychev Inequalities: Theory and Applications in Decision Analysis , 1995, Oper. Res..

[6]  Neil D. Pearson,et al.  Risk measurement: an introduction to value at risk , 1996 .

[7]  M. Pritsker Evaluating Value at Risk Methodologies: Accuracy versus Computational Time , 1996 .

[8]  Neil D. Pearson,et al.  Using Value-at-Risk to Control Risk Taking: How Wrong Can You Be? , 1998 .

[9]  E. Yaz Linear Matrix Inequalities In System And Control Theory , 1998, Proceedings of the IEEE.

[10]  Stephen P. Boyd,et al.  Applications of second-order cone programming , 1998 .

[11]  D. Hunter Using value-at-risk to control risk taking: how wrong can you be? , 1999 .

[12]  Stephen P. Boyd,et al.  The worst-case risk of a portfolio , 2000 .

[13]  M. Victoria-Feser,et al.  Robust Portfolio Selection , 2000 .

[14]  O. Costa,et al.  Robust portfolio selection using linear-matrix inequalities , 2002 .

[15]  M. Musiela,et al.  Martingale Methods in Financial Modelling , 2002 .

[16]  Ioana Popescu,et al.  On the Relation Between Option and Stock Prices: A Convex Optimization Approach , 2002, Oper. Res..

[17]  D. Goldfarb,et al.  CORC Technical Report TR-2002-03 Robust portfolio selection problems , 2002 .

[18]  Donald Goldfarb,et al.  Robust Portfolio Selection Problems , 2003, Math. Oper. Res..

[19]  B. Halldórsson,et al.  An Interior-Point Method for a Class of Saddle-Point Problems , 2003 .

[20]  Ioana Popescu,et al.  Optimal Inequalities in Probability Theory: A Convex Optimization Approach , 2005, SIAM J. Optim..