Decision-makers who usually face model/parameter risk may prefer to act prudently by identifying optimal contracts that are robust to such sources of uncertainty. In this paper, we tackle this issue under a finite uncertainty set that contains a number of probability models that are candidates for the “true”, but unknown model. Various robust optimisation models are proposed, some of which are already known in the literature, and we show that all of them can be efficiently solved via Second Order Conic Programming (SOCP). Numerical experiments are run for various risk preference choices and it is found that for relatively large sample size, the modeler should focus on finding the best possible fit for the unknown probability model in order ...
We propose a Bayesian framework for assessing the relative strengths of data-driven ambiguity sets i...
In optimization problems appearing in fields such as economics, finance, or engineering, it is often...
Thesis (Ph.D.)--Massachusetts Institute of Technology, Sloan School of Management, Operations Resear...
In stochastic optimization models, the optimal solution heavily depends on the selected probability ...
The optimal insurance problem represents a fast growing topic that explains the most efficient contr...
The optimal insurance problem represents a fast growing topic that explains the most efficient contr...
The “separable ” uncertainty sets have been widely used in robust portfolio selection models (e.g., ...
A robust optimization has emerged as a powerful tool for managing un- certainty in many optimization...
AbstractIn typical robust portfolio selection problems, one mainly finds portfolios with the worst-c...
We illustrate the correspondence between uncertainty sets in robust optimization and some pop-ular r...
In this paper we study ambiguous chance constrained problems where the distributions of the random p...
Robust portfolio optimization aims to maximize the worst-case portfolio return given that the asset ...
Robust portfolio optimization aims to maximize the worst-case portfolio return given that the asset ...
In optimization problems appearing in fields such as economics, finance, or engineering, it is often...
In this paper, we consider the robust portfolio selection problem for an insurer in the sense of max...
We propose a Bayesian framework for assessing the relative strengths of data-driven ambiguity sets i...
In optimization problems appearing in fields such as economics, finance, or engineering, it is often...
Thesis (Ph.D.)--Massachusetts Institute of Technology, Sloan School of Management, Operations Resear...
In stochastic optimization models, the optimal solution heavily depends on the selected probability ...
The optimal insurance problem represents a fast growing topic that explains the most efficient contr...
The optimal insurance problem represents a fast growing topic that explains the most efficient contr...
The “separable ” uncertainty sets have been widely used in robust portfolio selection models (e.g., ...
A robust optimization has emerged as a powerful tool for managing un- certainty in many optimization...
AbstractIn typical robust portfolio selection problems, one mainly finds portfolios with the worst-c...
We illustrate the correspondence between uncertainty sets in robust optimization and some pop-ular r...
In this paper we study ambiguous chance constrained problems where the distributions of the random p...
Robust portfolio optimization aims to maximize the worst-case portfolio return given that the asset ...
Robust portfolio optimization aims to maximize the worst-case portfolio return given that the asset ...
In optimization problems appearing in fields such as economics, finance, or engineering, it is often...
In this paper, we consider the robust portfolio selection problem for an insurer in the sense of max...
We propose a Bayesian framework for assessing the relative strengths of data-driven ambiguity sets i...
In optimization problems appearing in fields such as economics, finance, or engineering, it is often...
Thesis (Ph.D.)--Massachusetts Institute of Technology, Sloan School of Management, Operations Resear...