AbstractThis tutorial presents an introduction to generalized semi-infinite programming (GSIP) which in recent years became a vivid field of active research in mathematical programming. A GSIP problem is characterized by an infinite number of inequality constraints, and the corresponding index set depends additionally on the decision variables. There exist a wide range of applications which give rise to GSIP models; some of them are discussed in the present paper. Furthermore, geometric and topological properties of the feasible set and, in particular, the difference to the standard semi-infinite case are analyzed. By using first-order approximations of the feasible set corresponding constraint qualifications are developed. Then, necessary ...
This paper is devoted to the study of nonsmooth generalized semi-infinite programming problems in wh...
International audienceThis article deals with a generalized semi-infinite programming problem (S). U...
The feasible set M in Generalized Semi-Infinite Programming (GSIP) need not to be closed. Under the ...
This tutorial presents an introduction to generalized semi-infinite programming (GSIP) which in rece...
This paper surveys some basic properties of the class of generalized semi-infinite programming probl...
AbstractThis tutorial presents an introduction to generalized semi-infinite programming (GSIP) which...
Generalized semi-infinite optimization problems (GSIP) are considered. The difference between GSIP a...
Generalized semi-infinite optimization problems (GSIP) are considered. It is investigated how the nu...
We consider a generalized semi-infinite optimization problem (GSIP) of the form (GSIP) min{f(x) $x (...
Generalized semi-infinite programming, extended Mangasarian-Fromovitz, Kuhn-Tucker and Abadie constr...
Abstract. In this paper, we consider a generalized semi-infinite optimization problem where the inde...
A semi-infinite programming problem is an optimization problem in which finitely many variables appe...
We consider the feasible set of a generalized semi-infinite programming problem with a one-dimension...
We study General Semi-Infinite Programming (GSIP) from a topological point of view. Under the Symmet...
In this paper, we analyze the outer approximation property of the algorithm for generalized semi-inf...
This paper is devoted to the study of nonsmooth generalized semi-infinite programming problems in wh...
International audienceThis article deals with a generalized semi-infinite programming problem (S). U...
The feasible set M in Generalized Semi-Infinite Programming (GSIP) need not to be closed. Under the ...
This tutorial presents an introduction to generalized semi-infinite programming (GSIP) which in rece...
This paper surveys some basic properties of the class of generalized semi-infinite programming probl...
AbstractThis tutorial presents an introduction to generalized semi-infinite programming (GSIP) which...
Generalized semi-infinite optimization problems (GSIP) are considered. The difference between GSIP a...
Generalized semi-infinite optimization problems (GSIP) are considered. It is investigated how the nu...
We consider a generalized semi-infinite optimization problem (GSIP) of the form (GSIP) min{f(x) $x (...
Generalized semi-infinite programming, extended Mangasarian-Fromovitz, Kuhn-Tucker and Abadie constr...
Abstract. In this paper, we consider a generalized semi-infinite optimization problem where the inde...
A semi-infinite programming problem is an optimization problem in which finitely many variables appe...
We consider the feasible set of a generalized semi-infinite programming problem with a one-dimension...
We study General Semi-Infinite Programming (GSIP) from a topological point of view. Under the Symmet...
In this paper, we analyze the outer approximation property of the algorithm for generalized semi-inf...
This paper is devoted to the study of nonsmooth generalized semi-infinite programming problems in wh...
International audienceThis article deals with a generalized semi-infinite programming problem (S). U...
The feasible set M in Generalized Semi-Infinite Programming (GSIP) need not to be closed. Under the ...