In this paper we consider a primal-dual infinite linear programming problem-pair, i.e. LPs on infinite dimensional spaces with infinitely many constraints. We present two duality theorems for the problem-pair: a weak and a strong duality theorem. We do not assume any topology on the vector spaces, therefore our results are algebraic duality theorems. As an application, we consider transferable utility cooperative games with arbitrarily many players
We associate with each convex optimization problem, posed on some locally convex space, with infinit...
AbstractA duality theory for algebraic linear (integer) programming (ALP) is developed which is of t...
In two recent papers Chabnes, Gbibie, and Kortanek studied a special class of infinite linear progra...
In this paper we consider a primal-dual infinite linear programming problem-pair, i.e. LPs on infini...
AbstractIn this paper, we consider a primal–dual infinite linear programming problem-pair, i.e. LPs ...
We consider the class of linear programs with infinitely many variables and constraints having the p...
AbstractIn this paper duality theory for infinite dimensional linear programs is discussed in a topo...
AbstractLinear semi-infinite programming deals with the optimization of linear functionals on finite...
AbstractWe study the infinite dimensional linear programming problem. The previous work done on this...
AbstractThis paper gives theorems on the boundedness of the feasible and the optimal solutions sets ...
AbstractA semi-infinite transportation dual-program pair is specified which involves general pairing...
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...
We study linear production situations with an infinite number of production techniques. Such a situa...
AbstractIn this note, it is shown that, for an arbitrary semi-infinite convex program, there exists ...
We associate with each convex optimization problem, posed on some locally convex space, with infinit...
AbstractA duality theory for algebraic linear (integer) programming (ALP) is developed which is of t...
In two recent papers Chabnes, Gbibie, and Kortanek studied a special class of infinite linear progra...
In this paper we consider a primal-dual infinite linear programming problem-pair, i.e. LPs on infini...
AbstractIn this paper, we consider a primal–dual infinite linear programming problem-pair, i.e. LPs ...
We consider the class of linear programs with infinitely many variables and constraints having the p...
AbstractIn this paper duality theory for infinite dimensional linear programs is discussed in a topo...
AbstractLinear semi-infinite programming deals with the optimization of linear functionals on finite...
AbstractWe study the infinite dimensional linear programming problem. The previous work done on this...
AbstractThis paper gives theorems on the boundedness of the feasible and the optimal solutions sets ...
AbstractA semi-infinite transportation dual-program pair is specified which involves general pairing...
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...
We study linear production situations with an infinite number of production techniques. Such a situa...
AbstractIn this note, it is shown that, for an arbitrary semi-infinite convex program, there exists ...
We associate with each convex optimization problem, posed on some locally convex space, with infinit...
AbstractA duality theory for algebraic linear (integer) programming (ALP) is developed which is of t...
In two recent papers Chabnes, Gbibie, and Kortanek studied a special class of infinite linear progra...