Integrals of optimal values of random optimization problems depending on a finite dimensional parameter are approximated by using empirical distributions instead of the original measure. Under fairly broad conditions, it is proved that uniform convergence of empirical approximations of the right hand sides of the constraints implies uniform convergence of the optimal values in the linear and convex case
In this work we study optimization problems subject to a failure constraint. This constraint is expr...
summary:The aim of this paper is to present some ideas how to relax the notion of the optimal soluti...
We consider the problem of bounding the expected value of a linear program (LP) containing random co...
Integrals of optimal values of random linear programming problems depending on a finite dimensional ...
AbstractIn this paper we shall deal with statistical estimates in stochastic programming problems. T...
In this paper, we shall discuss the bounds for the optimal value of recourse problems from the point...
The paper deals with the solution of a stochastic optimization problem under incomplete information....
An analysis of convex stochastic programs is provided if the underlying proba-bility distribution is...
This article elaborates a bounding approximation scheme for convexmultistage stochastic programs (MS...
This paper supplements the results of a new statistical approach to the problem of incomplete inform...
Many planning problems involve choosing a set of optimal decisions for a system in the face of uncer...
Mixed-integer two-stage stochastic programs with fixed recourse matrix, random recourse costs, techno...
Let ξ: = ξ(ω) (s×1) be a random vector defined on a probability space (Ω, S, P); F, PF the distribut...
Solutions techniques for stochastic programs are reviewed. Particular emphasis is placed on those me...
We consider empirical approximations of two-stage stochastic mixed-integer programs and derive centr...
In this work we study optimization problems subject to a failure constraint. This constraint is expr...
summary:The aim of this paper is to present some ideas how to relax the notion of the optimal soluti...
We consider the problem of bounding the expected value of a linear program (LP) containing random co...
Integrals of optimal values of random linear programming problems depending on a finite dimensional ...
AbstractIn this paper we shall deal with statistical estimates in stochastic programming problems. T...
In this paper, we shall discuss the bounds for the optimal value of recourse problems from the point...
The paper deals with the solution of a stochastic optimization problem under incomplete information....
An analysis of convex stochastic programs is provided if the underlying proba-bility distribution is...
This article elaborates a bounding approximation scheme for convexmultistage stochastic programs (MS...
This paper supplements the results of a new statistical approach to the problem of incomplete inform...
Many planning problems involve choosing a set of optimal decisions for a system in the face of uncer...
Mixed-integer two-stage stochastic programs with fixed recourse matrix, random recourse costs, techno...
Let ξ: = ξ(ω) (s×1) be a random vector defined on a probability space (Ω, S, P); F, PF the distribut...
Solutions techniques for stochastic programs are reviewed. Particular emphasis is placed on those me...
We consider empirical approximations of two-stage stochastic mixed-integer programs and derive centr...
In this work we study optimization problems subject to a failure constraint. This constraint is expr...
summary:The aim of this paper is to present some ideas how to relax the notion of the optimal soluti...
We consider the problem of bounding the expected value of a linear program (LP) containing random co...