The behavior of condition numbers for free optimization problems under perturbations is considered in the innite - dimensional setting. Semicontinuity properties via distance to ill - conditioning are obtained. Convergence theorems of the condition numbers are proved under variational convergence of the perturbed problems and suitable behavior of the gradients of the corresponding functionals. The particular case of convex quadratic forms is presented
This paper is concerned with the Lipschitzian behavior of the optimal set of convex semi-infinite op...
Abstract. Our paper deals with the interrelation of optimization methods and Lipschitz stability of ...
Abstract. This paper is mainly devoted to the study of the so-called full Lipschitzian stability of ...
The behavior of condition numbers for free optimization problems under perturbations is considered i...
AbstractThis paper studies stability properties of solutions for optimization problems subject to pe...
This paper is a kind of biased survey of the most representative and recent results on stability for...
We present a perturbation theory for finite dimensional optimization problems subject to abstract co...
Various notions of condition numbers are used to study some sensitivity aspects of scalar optimizati...
: This paper is devoted to the study of perturbed semi-infinite optimization problems, i.e. minimiza...
AbstractA certain convergence notion for extended real-valued functions, which has been studied by a...
This paper studies stability properties of linear optimization problems with finitely many variables...
This paper provides stability theorems for the feasible set of optimization problems posed in locall...
Using techniques of variational analysis, necessary and sufficient subdifferential conditions for Hö...
Various notions of condition numbers are used to study some sensitivity aspects of scalar optimizati...
The paper develops a stability theory for the optimal value and the optimal set mapping of optimizat...
This paper is concerned with the Lipschitzian behavior of the optimal set of convex semi-infinite op...
Abstract. Our paper deals with the interrelation of optimization methods and Lipschitz stability of ...
Abstract. This paper is mainly devoted to the study of the so-called full Lipschitzian stability of ...
The behavior of condition numbers for free optimization problems under perturbations is considered i...
AbstractThis paper studies stability properties of solutions for optimization problems subject to pe...
This paper is a kind of biased survey of the most representative and recent results on stability for...
We present a perturbation theory for finite dimensional optimization problems subject to abstract co...
Various notions of condition numbers are used to study some sensitivity aspects of scalar optimizati...
: This paper is devoted to the study of perturbed semi-infinite optimization problems, i.e. minimiza...
AbstractA certain convergence notion for extended real-valued functions, which has been studied by a...
This paper studies stability properties of linear optimization problems with finitely many variables...
This paper provides stability theorems for the feasible set of optimization problems posed in locall...
Using techniques of variational analysis, necessary and sufficient subdifferential conditions for Hö...
Various notions of condition numbers are used to study some sensitivity aspects of scalar optimizati...
The paper develops a stability theory for the optimal value and the optimal set mapping of optimizat...
This paper is concerned with the Lipschitzian behavior of the optimal set of convex semi-infinite op...
Abstract. Our paper deals with the interrelation of optimization methods and Lipschitz stability of ...
Abstract. This paper is mainly devoted to the study of the so-called full Lipschitzian stability of ...