In this paper, we apply the concept of coderivative and other tools from the generalized differentiation theory for set-valued mappings to study the stability of the feasible sets of both the primal and the dual problem in infinite-dimensional linear optimization with infinitely many explicit constraints and an additional conic constraint. After providing some specific duality results for our dual pair, we study the Lipschitz-like property of both mappings and also give bounds for the associated Lipschitz moduli. The situation for the dual shows much more involved than the case of the primal problem. © 2011 Elsevier Ltd. All rights reserved
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In this note we analyze the simultaneous preservation of the consistency (and of the inconsistency) ...
Abstract. This paper is mainly devoted to the study of the so-called full Lipschitzian stability of ...
Any linear (ordinary or semi-infinite) optimization problem, and also its dual problem, can be class...
Abstract In this paper, we study the duality theorems of a nondifferentiable semi-infinite interval-...
In this paper we make use of subdifferential calculus and other variational techniques, traced out f...
In this paper, we apply the concept of coderivative and other tools from the generalized differentia...
This paper concerns applications of advanced techniques of variational analysis and generalized diff...
Abstract. This paper concerns applications of advanced techniques of variational analysis and genera...
In this paper, two conjugate dual problems are proposed by considering the different perturbations t...
The paper develops a stability theory for the optimal value and the optimal set mapping of optimizat...
We consider the parametric space of all the linear semi-infinite programming problems with constrain...
Robust Lipschitzian properties of set-valued mappings and marginal functions play a crucial role in ...
This paper is a kind of biased survey of the most representative and recent results on stability for...
This paper is focused on the stability of the optimal value, and its immediate repercussion on the s...
AbstractWe study the infinite dimensional linear programming problem. The previous work done on this...
In this note we analyze the simultaneous preservation of the consistency (and of the inconsistency) ...
Abstract. This paper is mainly devoted to the study of the so-called full Lipschitzian stability of ...
Any linear (ordinary or semi-infinite) optimization problem, and also its dual problem, can be class...
Abstract In this paper, we study the duality theorems of a nondifferentiable semi-infinite interval-...
In this paper we make use of subdifferential calculus and other variational techniques, traced out f...