Open AccessDistributionally Robust Return-Risk Optimization Models and Their Applications
Author(s) -
Li Yang,
Yanxi Li,
Zhengyong Zhou,
Kejing Chen
Publication year - 2014
Publication title -
journal of applied mathematics
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.307
H-Index - 43
eISSN - 1687-0042
pISSN - 1110-757X
DOI - 10.1155/2014/784715
Subject(s) - robust optimization , mathematical optimization , portfolio optimization , semidefinite programming , conic section , minimax , covariance matrix , computer science , interior point method , mathematics , duality (order theory) , portfolio , algorithm , finance , geometry , economics , discrete mathematics
Based on the risk control of conditional value-at-risk, distributionally robust return-risk optimization models with box constraints of random vector are proposed. They describe uncertainty in both the distribution form and moments (mean and covariance matrix of random vector). It is difficult to solve them directly. Using the conic duality theory and the minimax theorem, the models are reformulated as semidefinite programming problems, which can be solved by interior point algorithms in polynomial time. An important theoretical basis is therefore provided for applications of the models. Moreover, an application of the models to a practical example of portfolio selection is considered, and the example is evaluated using a historical data set of four stocks. Numerical results show that proposed methods are robust and the investment strategy is safe
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