Abstract. Optimality functions define stationarity in nonlinear programming, semi-infinite opti-mization, and optimal control in some sense. In this paper, we consider optimality functions for stochastic programs with nonlinear, possibly nonconvex, expected value objective and constraint functions. We show that an optimality function directly relates to the difference in function values at a candidate point and a local minimizer. We construct confidence intervals for the value of the optimality function at a candidate point and, hence, provide a quantitative measure of solution quality. Based on sample average approximations, we develop an algorithm for classes of stochastic programs that include CVaR-problems and utilize optimality functio...
We consider a stochastic mathematical program with equilibrium constraints (SMPEC) and show that, un...
We propose an alternative approach to stochastic programming based on Monte-Carlo sampling and stoch...
Determining whether a solution is of high quality (optimal or near optimal) is a fundamental questio...
Abstract. Optimality functions in nonlinear programming conveniently measure, in some sense, the dis...
In this paper we consider stochastic programming problems where the objec-tive function is given as ...
In this paper we consider stochastic programming problems where the objective function is given as a...
Stochastic programming combines ideas from deterministic optimization with probability and statistic...
Stochastic problems (both two-stage and multistage) can be formulated in several di erent ways which...
International audienceWe discuss a general approach to building non-asymptotic confidence bounds for...
Stochastic programming is a mathematical optimization model for decision making when the uncertainty...
In this paper we present stability and sensitivity analysis of a stochastic optimization problem wit...
In this paper we study optimization problems with second-order stochastic dominance con-straints. Th...
In this paper we present a stability analysis of a stochastic optimization problem with stochastic s...
summary:The aim of this paper is to present some ideas how to relax the notion of the optimal soluti...
ABSTRACT: The aim of this study is to analyse the resolution of Stochastic Programming Problems in w...
We consider a stochastic mathematical program with equilibrium constraints (SMPEC) and show that, un...
We propose an alternative approach to stochastic programming based on Monte-Carlo sampling and stoch...
Determining whether a solution is of high quality (optimal or near optimal) is a fundamental questio...
Abstract. Optimality functions in nonlinear programming conveniently measure, in some sense, the dis...
In this paper we consider stochastic programming problems where the objec-tive function is given as ...
In this paper we consider stochastic programming problems where the objective function is given as a...
Stochastic programming combines ideas from deterministic optimization with probability and statistic...
Stochastic problems (both two-stage and multistage) can be formulated in several di erent ways which...
International audienceWe discuss a general approach to building non-asymptotic confidence bounds for...
Stochastic programming is a mathematical optimization model for decision making when the uncertainty...
In this paper we present stability and sensitivity analysis of a stochastic optimization problem wit...
In this paper we study optimization problems with second-order stochastic dominance con-straints. Th...
In this paper we present a stability analysis of a stochastic optimization problem with stochastic s...
summary:The aim of this paper is to present some ideas how to relax the notion of the optimal soluti...
ABSTRACT: The aim of this study is to analyse the resolution of Stochastic Programming Problems in w...
We consider a stochastic mathematical program with equilibrium constraints (SMPEC) and show that, un...
We propose an alternative approach to stochastic programming based on Monte-Carlo sampling and stoch...
Determining whether a solution is of high quality (optimal or near optimal) is a fundamental questio...