Thesis (Ph.D.)--Massachusetts Institute of Technology, Sloan School of Management, Operations Research Center, 2002.Includes bibliographical references (p. 137-141).An important issue in real-world optimization problems is how to treat uncertain coefficients. Robust optimization is a modeling methodology that takes a deterministic view: the optimal solution is required to remain feasible for any realization of the uncertain coefficients within prescribed uncertainty sets. The focus of this thesis is on robust linear programming problems in which the uncertainty sets are polytopes. The assumption of polyhedral uncertainty leads to compact, efficiently solvable linear formulations. In the first part of the thesis, we study special types of po...
Robust portfolio optimization aims to maximize the worst-case portfolio return given that the asset ...
The Markowitz mean-variance portfolio optimization is a well known and also widely used investment t...
Many decision problems can be formulated as mathematical optimization models. While deterministic op...
Using optimization techniques in portfolio selection has attracted significant attention in financia...
In financial markets with high uncertainties, the trade-off between maximizing expected return and m...
Many financial optimization problems involve future values of security prices, interest rates and ex...
Many financial optimization problems involve future values of security prices, interest rates and ex...
In this paper we focus on robust linear optimization problems with uncertainty regions defined by φ-...
We solve a linear chance constrained portfolio optimization problem using Robust Optimization (RO) m...
Samenvatting In this paper we focus on robust linear optimization problems with uncertainty regions ...
A robust optimization has emerged as a powerful tool for managing un- certainty in many optimization...
The “separable ” uncertainty sets have been widely used in robust portfolio selection models (e.g., ...
We illustrate the correspondence between uncertainty sets in robust optimization and some pop-ular r...
Robust optimization is a valuable alternative to stochastic programming, where all underlying probab...
In this thesis, a portfolio optimization with integer variables which influ- ence optimal assets all...
Robust portfolio optimization aims to maximize the worst-case portfolio return given that the asset ...
The Markowitz mean-variance portfolio optimization is a well known and also widely used investment t...
Many decision problems can be formulated as mathematical optimization models. While deterministic op...
Using optimization techniques in portfolio selection has attracted significant attention in financia...
In financial markets with high uncertainties, the trade-off between maximizing expected return and m...
Many financial optimization problems involve future values of security prices, interest rates and ex...
Many financial optimization problems involve future values of security prices, interest rates and ex...
In this paper we focus on robust linear optimization problems with uncertainty regions defined by φ-...
We solve a linear chance constrained portfolio optimization problem using Robust Optimization (RO) m...
Samenvatting In this paper we focus on robust linear optimization problems with uncertainty regions ...
A robust optimization has emerged as a powerful tool for managing un- certainty in many optimization...
The “separable ” uncertainty sets have been widely used in robust portfolio selection models (e.g., ...
We illustrate the correspondence between uncertainty sets in robust optimization and some pop-ular r...
Robust optimization is a valuable alternative to stochastic programming, where all underlying probab...
In this thesis, a portfolio optimization with integer variables which influ- ence optimal assets all...
Robust portfolio optimization aims to maximize the worst-case portfolio return given that the asset ...
The Markowitz mean-variance portfolio optimization is a well known and also widely used investment t...
Many decision problems can be formulated as mathematical optimization models. While deterministic op...