This paper deals with the stability of linear semi-infinite programming (LSIP, for short) problems. We characterize those LSIP problems from which we can obtain, under small perturbations in the data, different types of problems, namely, inconsistent, consistent unsolvable, and solvable problems. The problems of this class are highly unstable and, for this reason, we say that they are totally ill-posed. The characterization that we provide here is of geometrical nature, and it depends exclusively on the original data (i.e., on the coefficients of the nominal LSIP problem). Our results cover the case of linear programming problems, and they are mainly obtained via a new formula for the subdifferential mapping of the support function.Research...
Post-Optimal Analysis in Linear Semi-Infinite Optimization examines the following topics in regards ...
In this paper we consider the parameter space of all the linear inequality systems, in the n-dimensi...
AbstractCertain stability concepts for local minimizers of nonlinear programs require, on the one ha...
AbstractThis paper deals with the stability of linear semi-infinite programming (LSIP, for short) pr...
This paper deals with the stability of linear semi-infinite programming (LSIP, for short) problems. ...
This paper deals with the so-called total ill-posedness of linear optimization problems with an arbi...
This paper is a kind of biased survey of the most representative and recent results on stability for...
We characterize those linear optimization problems that are ill-posed in the sense that arbitrarily ...
AbstractWe characterize those linear optimization problems that are ill-posed in the sense that arbi...
This paper reviews the state-of-the-art in the theory of deterministic and uncertain linear semi-inf...
This paper presents an approach to the stability and the Hadamard well-posedness of the linear semi-...
This paper reviews the state-of-the-art in the theory of deterministic and uncertain linear semi-inf...
This paper concerns applications of advanced techniques of variational analysis and generalized diff...
A semi-infinite programming problem is an optimization problem in which finitely many variables appe...
In this paper we measure how much a linear optimization problem, in Rn, has to be perturbed in order...
Post-Optimal Analysis in Linear Semi-Infinite Optimization examines the following topics in regards ...
In this paper we consider the parameter space of all the linear inequality systems, in the n-dimensi...
AbstractCertain stability concepts for local minimizers of nonlinear programs require, on the one ha...
AbstractThis paper deals with the stability of linear semi-infinite programming (LSIP, for short) pr...
This paper deals with the stability of linear semi-infinite programming (LSIP, for short) problems. ...
This paper deals with the so-called total ill-posedness of linear optimization problems with an arbi...
This paper is a kind of biased survey of the most representative and recent results on stability for...
We characterize those linear optimization problems that are ill-posed in the sense that arbitrarily ...
AbstractWe characterize those linear optimization problems that are ill-posed in the sense that arbi...
This paper reviews the state-of-the-art in the theory of deterministic and uncertain linear semi-inf...
This paper presents an approach to the stability and the Hadamard well-posedness of the linear semi-...
This paper reviews the state-of-the-art in the theory of deterministic and uncertain linear semi-inf...
This paper concerns applications of advanced techniques of variational analysis and generalized diff...
A semi-infinite programming problem is an optimization problem in which finitely many variables appe...
In this paper we measure how much a linear optimization problem, in Rn, has to be perturbed in order...
Post-Optimal Analysis in Linear Semi-Infinite Optimization examines the following topics in regards ...
In this paper we consider the parameter space of all the linear inequality systems, in the n-dimensi...
AbstractCertain stability concepts for local minimizers of nonlinear programs require, on the one ha...