AbstractLinear semi-infinite programming deals with the optimization of linear functionals on finite-dimensional spaces under infinitely many linear constraints. For such kind of programs, a positive duality gap can occur between them and their corresponding dual problems, which are linear programs posed on infinite-dimensional spaces. This paper exploits some recent existence theorems for systems of linear inequalities in order to obtain a complete classification of linear semi-infinite programming problems from the point of view of the duality gap and the viability of the discretization numerical approach. The elimination of the duality gap is also discussed
Fourier-Motzkin elimination is a projection algorithm for solving finite linear programs. We extend ...
This paper concerns applications of advanced techniques of variational analysis and generalized diff...
In this paper we consider a primal-dual infinite linear programming problem-pair, i.e. LPs on infini...
AbstractThis paper gives theorems on the boundedness of the feasible and the optimal solutions sets ...
Any linear (ordinary or semi-infinite) optimization problem, and also its dual problem, can be class...
We consider the class of linear programs with infinitely many variables and constraints having the p...
In this article we discuss weak and strong duality properties of convex semi-infinite programming pr...
AbstractIn this paper duality theory for infinite dimensional linear programs is discussed in a topo...
In this article, we consider the space of all the linear semi-infinite programming (LSIP) problems w...
AbstractIn this paper, we implement an extended version of the inexact approach proposed by Fang and...
AbstractA semi-infinite transportation dual-program pair is specified which involves general pairing...
AbstractIn this paper, we consider a primal–dual infinite linear programming problem-pair, i.e. LPs ...
Proponemos nuevos teoremas de alternativa para sistemas infinitos convexos que constituyen la genera...
AbstractWe study the infinite dimensional linear programming problem. The previous work done on this...
AbstractIn 1961, Clark proved that if either the feasible region of a linear program or its dual is ...
Fourier-Motzkin elimination is a projection algorithm for solving finite linear programs. We extend ...
This paper concerns applications of advanced techniques of variational analysis and generalized diff...
In this paper we consider a primal-dual infinite linear programming problem-pair, i.e. LPs on infini...
AbstractThis paper gives theorems on the boundedness of the feasible and the optimal solutions sets ...
Any linear (ordinary or semi-infinite) optimization problem, and also its dual problem, can be class...
We consider the class of linear programs with infinitely many variables and constraints having the p...
In this article we discuss weak and strong duality properties of convex semi-infinite programming pr...
AbstractIn this paper duality theory for infinite dimensional linear programs is discussed in a topo...
In this article, we consider the space of all the linear semi-infinite programming (LSIP) problems w...
AbstractIn this paper, we implement an extended version of the inexact approach proposed by Fang and...
AbstractA semi-infinite transportation dual-program pair is specified which involves general pairing...
AbstractIn this paper, we consider a primal–dual infinite linear programming problem-pair, i.e. LPs ...
Proponemos nuevos teoremas de alternativa para sistemas infinitos convexos que constituyen la genera...
AbstractWe study the infinite dimensional linear programming problem. The previous work done on this...
AbstractIn 1961, Clark proved that if either the feasible region of a linear program or its dual is ...
Fourier-Motzkin elimination is a projection algorithm for solving finite linear programs. We extend ...
This paper concerns applications of advanced techniques of variational analysis and generalized diff...
In this paper we consider a primal-dual infinite linear programming problem-pair, i.e. LPs on infini...