In classical two-stage stochastic programming the expected value of the total costs is minimized. Recently, mean-risk models -- studied in mathematical finance for several decades -- have attracted attention in stochastic programming. We consider Conditional Value-at-Risk as risk measures in the framework of two-stage stochastic integer programming. The paper addresses structure, stability, and algorithms for this class of models. In particular, we study continuity properties of the objective function, both with respect to the first-stage decisions and the integrating probability measure. Further, we present an explicit mixed-integer linear programming formulation of the problem when the probability distribution is discrete and finite. Fina...
We consider empirical approximations of two-stage stochastic mixed-integer programs and derive centr...
In traditional two-stage mixed-integer recourse models, the expected value of the total costs is min...
In this paper, we consider an extension of the Markovitz model, in which the variance has been repla...
In classical two-stage stochastic programming the expected value of the total costs is minimized. Re...
In classical two-stage stochastic programming the expected value of the total costs is minimized. Re...
We consider linear two-stage stochastic programs with mixed-integer recourse. Instead of basing the ...
Title: Nonconvex stochastic programming problems - formulations, sample approximations and stability...
Stochastic programs that do not only minimize expected cost but also take into account risk are of g...
We consider a class of multistage stochastic linear programs in which at each stage a coherent risk ...
Traditional stochastic programming is risk neutral in the sense that it is concerned with the optimi...
In this thesis we consider two-stage stochastic linear programming models with integer recourse. Suc...
For two-stage stochastic programs with integrality constraints in the second stage we study continui...
In the setting of stochastic recourse programs, we consider the problem of minimizing the probabilit...
We identify multistage stochastic integer programs with risk objectives where the related wait-and-s...
Abstract Traditional models in multistage stochastic programming are directed to minimizing the expe...
We consider empirical approximations of two-stage stochastic mixed-integer programs and derive centr...
In traditional two-stage mixed-integer recourse models, the expected value of the total costs is min...
In this paper, we consider an extension of the Markovitz model, in which the variance has been repla...
In classical two-stage stochastic programming the expected value of the total costs is minimized. Re...
In classical two-stage stochastic programming the expected value of the total costs is minimized. Re...
We consider linear two-stage stochastic programs with mixed-integer recourse. Instead of basing the ...
Title: Nonconvex stochastic programming problems - formulations, sample approximations and stability...
Stochastic programs that do not only minimize expected cost but also take into account risk are of g...
We consider a class of multistage stochastic linear programs in which at each stage a coherent risk ...
Traditional stochastic programming is risk neutral in the sense that it is concerned with the optimi...
In this thesis we consider two-stage stochastic linear programming models with integer recourse. Suc...
For two-stage stochastic programs with integrality constraints in the second stage we study continui...
In the setting of stochastic recourse programs, we consider the problem of minimizing the probabilit...
We identify multistage stochastic integer programs with risk objectives where the related wait-and-s...
Abstract Traditional models in multistage stochastic programming are directed to minimizing the expe...
We consider empirical approximations of two-stage stochastic mixed-integer programs and derive centr...
In traditional two-stage mixed-integer recourse models, the expected value of the total costs is min...
In this paper, we consider an extension of the Markovitz model, in which the variance has been repla...