Shushang Zhu scite author profile

This paper considers the worst-case Conditional Value-at-Risk (CVaR) in the situation where only partial information on the underlying probability distribution is available. The minimization of the worst-case CVaR under mixture distribution uncertainty, box uncertainty, and ellipsoidal uncertainty are investigated. The application of the worst-case CVaR to robust portfolio optimization is proposed, and the corresponding problems are cast as linear programs and second-order cone programs that can be solved efficiently. Market data simulation and Monte Carlo simulation examples are presented to illustrate the proposed approach.

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Better Than Dynamic Mean‐variance: Time Inconsistency and Free Cash Flow Stream

Cui

Wang

et al. 2010

Mathematical Finance

139

106

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As the dynamic mean-variance portfolio selection formulation does not satisfy the principle of optimality of dynamic programming, phenomena of time inconsistency occur, i.e., investors may have incentives to deviate from the precommitted optimal mean-variance portfolio policy during the investment process under certain circumstances. By introducing the concept of time inconsistency in efficiency and defining the induced trade-off, we further demonstrate in this paper that investors behave irrationally under the precommitted optimal mean-variance portfolio policy when their wealth is above certain threshold during the investment process. By relaxing the selffinancing restriction to allow withdrawal of money out of the market, we develop a revised mean-variance policy which dominates the precommitted optimal mean-variance portfolio policy in the sense that, while the two achieve the same mean-variance pair of the terminal wealth, the revised policy enables the investor to receive a free cash flow stream (FCFS) during the investment process. The analytical expressions of the probability of receiving FCFS and the expected value of FCFS are derived.

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Risk Control Over Bankruptcy in Dynamic Portfolio Selection: A Generalized Mean-Variance Formulation

Zhu

Wang

2004

IEEE Trans. Automat. Contr.

155

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Convex relaxations and MIQCQP reformulations for a class of cardinality-constrained portfolio selection problems

et al. 2012

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A class of linear interval programming problems and its application to portfolio selection

Lai

Wang

et al. 2002

IEEE Trans. Fuzzy Syst.

144

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Shushang Zhu

Worst-Case Conditional Value-at-Risk with Application to Robust Portfolio Management

Better Than Dynamic Mean‐variance: Time Inconsistency and Free Cash Flow Stream

Risk Control Over Bankruptcy in Dynamic Portfolio Selection: A Generalized Mean-Variance Formulation

Convex relaxations and MIQCQP reformulations for a class of cardinality-constrained portfolio selection problems

A class of linear interval programming problems and its application to portfolio selection

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