This paper considers the worst-case CVaR in situation where only partial information on the underlying probability distribution is given. It is shown that, like CVaR, worst-case CVaR remains a coherent risk measure. The minimization of worst-case CVaR under mix-ture distribution uncertainty, box uncertainty and ellipsoidal uncertainty are investigated. The application of worst-case CVaR to robust portfolio optimization is proposed, and the corresponding problems are cast as linear programs and second-order cone programs which can be efficiently solved. Market data simulation and Monte Carlo simulation examples are presented to illustrate the methods. Our approaches can be applied in many situations, including those outside of financial risk...
Value at risk (VaR) and conditional value at risk (CVaR) are the most frequently used risk measures...
In times of great insecurity and turbulence on every major stock exchange, it is evident that contro...
Abstract. Value at risk (VaR) and conditional value at risk (CVaR) are the most frequently used risk...
This paper considers the worst-case CVaR in the case where only partial information on the underlyin...
This article studies three robust portfolio optimization models under partially known distributions....
01 Abstract: This thesis is concerned with the robust methods in portfolio theory. Different risk me...
Robust optimization, one of the most popular topics in the field of optimization and control since t...
Abstract We evaluate conditional value-at-risk (CVaR) as a risk measure in data-driven portfolio opt...
It is unrealistic to formulate the problems arising under uncertain environments as deterministic op...
The objective of this thesis has been the study of risk analysis and optimization under uncertainty....
This paper deals with a portfolio selection model in which the methodologies of robust optimization ...
This paper deals with a portfolio selection model in which the methodologies of robust optimization ...
This paper deals with a Portfolio Selection model in which the methodologies of Robust Optimization ...
The main purpose of this thesis is to develop methodological and practical improvements on robust po...
The work describes conditional value at risk, its robustification with respect to the probability di...
Value at risk (VaR) and conditional value at risk (CVaR) are the most frequently used risk measures...
In times of great insecurity and turbulence on every major stock exchange, it is evident that contro...
Abstract. Value at risk (VaR) and conditional value at risk (CVaR) are the most frequently used risk...
This paper considers the worst-case CVaR in the case where only partial information on the underlyin...
This article studies three robust portfolio optimization models under partially known distributions....
01 Abstract: This thesis is concerned with the robust methods in portfolio theory. Different risk me...
Robust optimization, one of the most popular topics in the field of optimization and control since t...
Abstract We evaluate conditional value-at-risk (CVaR) as a risk measure in data-driven portfolio opt...
It is unrealistic to formulate the problems arising under uncertain environments as deterministic op...
The objective of this thesis has been the study of risk analysis and optimization under uncertainty....
This paper deals with a portfolio selection model in which the methodologies of robust optimization ...
This paper deals with a portfolio selection model in which the methodologies of robust optimization ...
This paper deals with a Portfolio Selection model in which the methodologies of Robust Optimization ...
The main purpose of this thesis is to develop methodological and practical improvements on robust po...
The work describes conditional value at risk, its robustification with respect to the probability di...
Value at risk (VaR) and conditional value at risk (CVaR) are the most frequently used risk measures...
In times of great insecurity and turbulence on every major stock exchange, it is evident that contro...
Abstract. Value at risk (VaR) and conditional value at risk (CVaR) are the most frequently used risk...