summary:This paper deals with stability of stochastic optimization problems in a general setting. Objective function is defined on a metric space and depends on a probability measure which is unknown, but, estimated from empirical observations. We try to derive stability results without precise knowledge of problem structure and without measurability assumption. Moreover, $\varepsilon $-optimal solutions are considered. The setup is illustrated on consistency of a $\varepsilon $-$M$-estimator in linear regression model
In this work we study optimization problems subject to a failure constraint. This constraint is expr...
Quantitative stability of optimal values and solution sets to stochastic programming problems is stu...
summary:Economic and financial processes are mostly simultaneously influenced by a random factor and...
summary:This paper deals with stability of stochastic optimization problems in a general setting. Ob...
The vast majority of stochastic optimization problems require the approximation of the underlying pr...
The paper deals with a statistical approach to stability analysis in nonlinear stochastic programmin...
We consider the use of the Fortet-Mourier metric between two probability measures to bound the error...
summary:The aim of this paper is to present some ideas how to relax the notion of the optimal soluti...
This paper supplements the results of a new statistical approach to the problem of incomplete inform...
AbstractA random optimization problem P0 minx∈Г0(ω) ƒ0(x,ω), ω∈Ω, is approximated by a sequence of r...
In this paper we present stability and sensitivity analysis of a stochastic optimizationproblem with...
An analysis of convex stochastic programs is provided if the underlying proba-bility distribution is...
Standard stochastic optimization methods are brittle, sensitive to stepsize choices and other algori...
Classical optimization problems depending on a probability measure belong mostly to nonlinear determ...
Quantitative stability of optimal values and solution sets to stochastic programming problems is stu...
In this work we study optimization problems subject to a failure constraint. This constraint is expr...
Quantitative stability of optimal values and solution sets to stochastic programming problems is stu...
summary:Economic and financial processes are mostly simultaneously influenced by a random factor and...
summary:This paper deals with stability of stochastic optimization problems in a general setting. Ob...
The vast majority of stochastic optimization problems require the approximation of the underlying pr...
The paper deals with a statistical approach to stability analysis in nonlinear stochastic programmin...
We consider the use of the Fortet-Mourier metric between two probability measures to bound the error...
summary:The aim of this paper is to present some ideas how to relax the notion of the optimal soluti...
This paper supplements the results of a new statistical approach to the problem of incomplete inform...
AbstractA random optimization problem P0 minx∈Г0(ω) ƒ0(x,ω), ω∈Ω, is approximated by a sequence of r...
In this paper we present stability and sensitivity analysis of a stochastic optimizationproblem with...
An analysis of convex stochastic programs is provided if the underlying proba-bility distribution is...
Standard stochastic optimization methods are brittle, sensitive to stepsize choices and other algori...
Classical optimization problems depending on a probability measure belong mostly to nonlinear determ...
Quantitative stability of optimal values and solution sets to stochastic programming problems is stu...
In this work we study optimization problems subject to a failure constraint. This constraint is expr...
Quantitative stability of optimal values and solution sets to stochastic programming problems is stu...
summary:Economic and financial processes are mostly simultaneously influenced by a random factor and...