The main purpose of this paper is to extend the John theorem on nonlinear programming with inequality contraints and the Mangasarian-Fromovitz theorem on nonlinear programming with mixed constraints to any real normed linear space. In addition, for the John theorem assuming Frechet differentiability, the standard conclusion that the multiplier vector is not zero is sharpened to the nonvanishing of the subvector of those components corresponding to the constraints which are not linear affine. The only tools used are generalizations of the duality theorem of linear programming, and hence of the Farkas lemma, to the case of a primal real linear space of any dimension with no topological restrictions. It is shown that these generalizations are ...
ABSTRACT: We study a problem of linear programming in the setting of a vector space over a linearly ...
Any linear (ordinary or semi-infinite) optimization problem, and also its dual problem, can be class...
In linear programming it is known that an appropriate non-homogeneous Farkas Lemma leads to a short ...
AbstractIn this paper duality theory for infinite dimensional linear programs is discussed in a topo...
AbstractLinear programming is formulated with the vector variable replaced by a matrix variable, wit...
The purpose of this note is to present a proposition on a sort of duality relation concerning system...
AbstractThis paper gives theorems on the boundedness of the feasible and the optimal solutions sets ...
AbstractIn the first three sections, relationships between the feasible sets of primaldual linear pr...
AbstractTwo dual problems are proposed for the minimax problem: minimize maxy ϵ Y φ(x, y), subject t...
We consider the class of linear programs with infinitely many variables and constraints having the p...
AbstractNecessary and sufficient conditions, without convexity requirements, are given for a multiob...
AbstractFor a multiobjective nonlinear program which involved inequality and equality constraints, W...
AbstractThe intersections of the nonnegative orthant in En with pairs of complementary orthogonal su...
AbstractLinear semi-infinite programming deals with the optimization of linear functionals on finite...
In this note we give an elementary proof of the Fritz-John and Karush-Kuhn-Tucker conditions for non...
ABSTRACT: We study a problem of linear programming in the setting of a vector space over a linearly ...
Any linear (ordinary or semi-infinite) optimization problem, and also its dual problem, can be class...
In linear programming it is known that an appropriate non-homogeneous Farkas Lemma leads to a short ...
AbstractIn this paper duality theory for infinite dimensional linear programs is discussed in a topo...
AbstractLinear programming is formulated with the vector variable replaced by a matrix variable, wit...
The purpose of this note is to present a proposition on a sort of duality relation concerning system...
AbstractThis paper gives theorems on the boundedness of the feasible and the optimal solutions sets ...
AbstractIn the first three sections, relationships between the feasible sets of primaldual linear pr...
AbstractTwo dual problems are proposed for the minimax problem: minimize maxy ϵ Y φ(x, y), subject t...
We consider the class of linear programs with infinitely many variables and constraints having the p...
AbstractNecessary and sufficient conditions, without convexity requirements, are given for a multiob...
AbstractFor a multiobjective nonlinear program which involved inequality and equality constraints, W...
AbstractThe intersections of the nonnegative orthant in En with pairs of complementary orthogonal su...
AbstractLinear semi-infinite programming deals with the optimization of linear functionals on finite...
In this note we give an elementary proof of the Fritz-John and Karush-Kuhn-Tucker conditions for non...
ABSTRACT: We study a problem of linear programming in the setting of a vector space over a linearly ...
Any linear (ordinary or semi-infinite) optimization problem, and also its dual problem, can be class...
In linear programming it is known that an appropriate non-homogeneous Farkas Lemma leads to a short ...