We study quantitative stability of linear multistage stochastic programs underperturbations of the underlying stochastic processes. It is shown that the optimalvalues behave Lipschitz continuous with respect to an $L_p$-distance. Therefore, wehave to make a crucial regularity assumption on the conditional distributions, thatallows to establish continuity of the recourse function with respect to the currentstate of the stochastic process. The main stability result holds for nonanticipativediscretizations of the underlying process and thus represents a rigorous justificationof established discretization techniques
For two-stage stochastic programs with integrality constraints in the second stage we study continui...
We study perturbations of a stochastic program with a probabilistic constraint and $r$-concave origi...
In this paper we present a stability analysis of a stochastic optimization problem with stochastic s...
We study quantitative stability of linear multistage stochastic programs underperturbations of the u...
Quantitative stability of linear multistage stochastic programs is studied. It is shown that the inf...
Abstract. Quantitative stability of linear multistage stochastic programs is studied. It is shown th...
Multistage stochastic programs are regarded as mathematical programs in a Banach space X of summable...
Multistage stochastic programs are regarded as mathematical programs in a Banach space X of summable...
An analysis of convex stochastic programs is provided if the underlying proba-bility distribution is...
This paper investigates the stability of optimal-solution sets to stochastic programs with complete ...
We analyse stability aspects of linear multistage stochastic programs with polyhedral risk measures ...
Mixed-integer two-stage stochastic programs with fixed recourse matrix, random recourse costs, techno...
In this paper, we shall discuss the bounds for the optimal value of recourse problems from the point...
The vast majority of stochastic optimization problems require the approximation of the underlying pr...
A framework for the reduction of scenario trees as inputs of (linear) multistage stochastic programs...
For two-stage stochastic programs with integrality constraints in the second stage we study continui...
We study perturbations of a stochastic program with a probabilistic constraint and $r$-concave origi...
In this paper we present a stability analysis of a stochastic optimization problem with stochastic s...
We study quantitative stability of linear multistage stochastic programs underperturbations of the u...
Quantitative stability of linear multistage stochastic programs is studied. It is shown that the inf...
Abstract. Quantitative stability of linear multistage stochastic programs is studied. It is shown th...
Multistage stochastic programs are regarded as mathematical programs in a Banach space X of summable...
Multistage stochastic programs are regarded as mathematical programs in a Banach space X of summable...
An analysis of convex stochastic programs is provided if the underlying proba-bility distribution is...
This paper investigates the stability of optimal-solution sets to stochastic programs with complete ...
We analyse stability aspects of linear multistage stochastic programs with polyhedral risk measures ...
Mixed-integer two-stage stochastic programs with fixed recourse matrix, random recourse costs, techno...
In this paper, we shall discuss the bounds for the optimal value of recourse problems from the point...
The vast majority of stochastic optimization problems require the approximation of the underlying pr...
A framework for the reduction of scenario trees as inputs of (linear) multistage stochastic programs...
For two-stage stochastic programs with integrality constraints in the second stage we study continui...
We study perturbations of a stochastic program with a probabilistic constraint and $r$-concave origi...
In this paper we present a stability analysis of a stochastic optimization problem with stochastic s...