We associate with each natural number n and each compact Hausdorff topological space T the space of linear optimization problems with n primal variables and index set T (for the constraints) equipped with the topology of the uniform convergence. We consider three different partitions of this metric space. The primal and the dual partitions are the result of classifying a given optimization problem and its dual as either inconsistent or bounded or unbounded, whereas the primal-dual partition is formed by the nonempty intersections of the elements of both partitions. The elements of the three partitions are neither open nor closed and their topological interiors are formed by those problems for which sufficiently small perturbations maintain ...
This book deals with nonsmooth structures arising within the optimization setting. It considers four...
In this paper, we establish a continuous selection theorem and use it to derive five equivalent resu...
This paper is focused on the stability of the optimal value, and its immediate repercussion on the s...
We associate with each natural number n and each compact Hausdorff topological space T the space of ...
In this paper we consider the parameter space of continuous linear optimization problems with a give...
In this article, we consider the space of all the linear semi-infinite programming (LSIP) problems w...
This paper provides stability theorems for the feasible set of optimization problems posed in locall...
Any linear (ordinary or semi-infinite) optimization problem, and also its dual problem, can be class...
This paper studies stability properties of linear optimization problems with finitely many variables...
In this paper, we apply the concept of coderivative and other tools from the generalized differentia...
AbstractOne extension of a constrained optimization problem defined on a uniform space is proposed. ...
In this paper we discuss necessary and sufficient conditions for different minimax results to hold u...
The multiple objective linear program (MOLP) will be considered as: maximize Cx subject to x (ELEM) ...
<p><span>The duality principle provides that optimization problems may be viewed from either of two ...
The main goal of our study is an attempt to understand and classify nonsmooth structures arising wit...
This book deals with nonsmooth structures arising within the optimization setting. It considers four...
In this paper, we establish a continuous selection theorem and use it to derive five equivalent resu...
This paper is focused on the stability of the optimal value, and its immediate repercussion on the s...
We associate with each natural number n and each compact Hausdorff topological space T the space of ...
In this paper we consider the parameter space of continuous linear optimization problems with a give...
In this article, we consider the space of all the linear semi-infinite programming (LSIP) problems w...
This paper provides stability theorems for the feasible set of optimization problems posed in locall...
Any linear (ordinary or semi-infinite) optimization problem, and also its dual problem, can be class...
This paper studies stability properties of linear optimization problems with finitely many variables...
In this paper, we apply the concept of coderivative and other tools from the generalized differentia...
AbstractOne extension of a constrained optimization problem defined on a uniform space is proposed. ...
In this paper we discuss necessary and sufficient conditions for different minimax results to hold u...
The multiple objective linear program (MOLP) will be considered as: maximize Cx subject to x (ELEM) ...
<p><span>The duality principle provides that optimization problems may be viewed from either of two ...
The main goal of our study is an attempt to understand and classify nonsmooth structures arising wit...
This book deals with nonsmooth structures arising within the optimization setting. It considers four...
In this paper, we establish a continuous selection theorem and use it to derive five equivalent resu...
This paper is focused on the stability of the optimal value, and its immediate repercussion on the s...