Fourier-Motzkin elimination is a projection algorithm for solving finite linear programs. We extend Fourier-Motzkin elimination to semi-infinite linear programs which are linear programs with finitely many variables and infinitely many constraints. Applying projection leads to new characterizations of important properties for primal-dual pairs of semi-infinite programs such as zero duality gap, feasibility, boundedness, and solvability. Extending the Fourier-Motzkin elimination procedure to semi-infinite linear programs yields a new classification of variables that is used to determine the existence of duality gaps. In particular, the existence of what the authors term dirty variables can lead to duality gaps. Our approach has interesting a...
In semidefinite programming one minimizes a linear function subject to the constraint that an affine...
New results are established for multiobjective DC programs with infinite convex constraints (MOPIC) ...
It is well known that the duality theory for linear programming (LP) is powerful and elegant and lie...
AbstractIt is shown how the dual of Fourier–Motzkin elimination can be applied to eliminating the co...
The need for eliminating redundancies in systems of linear inequalities arises in many applications....
The duality principle provides that optimization problems may be viewed from either of two perspecti...
It is shown how the dual of Fourier–Motzkin elimination can be applied to eliminating the constraint...
This paper describes how the Fourier-Motzkin Elimination Method, which can be used for solving Linea...
AbstractLinear semi-infinite programming deals with the optimization of linear functionals on finite...
AbstractIn 1961, Clark proved that if either the feasible region of a linear program or its dual is ...
AbstractThis paper describes how the Fourier-Motzkin Elimination Method, which can be used for solvi...
In this article we discuss weak and strong duality properties of convex semi-infinite programming pr...
International audienceThis article uses classical notions of convex analysis over Euclidean spaces, ...
In this short paper, we present a new constraint qualification (CQ) for linear semi-infinite program...
In Part I of this work we derived a duality theorem for partially finite convex programs, problems f...
In semidefinite programming one minimizes a linear function subject to the constraint that an affine...
New results are established for multiobjective DC programs with infinite convex constraints (MOPIC) ...
It is well known that the duality theory for linear programming (LP) is powerful and elegant and lie...
AbstractIt is shown how the dual of Fourier–Motzkin elimination can be applied to eliminating the co...
The need for eliminating redundancies in systems of linear inequalities arises in many applications....
The duality principle provides that optimization problems may be viewed from either of two perspecti...
It is shown how the dual of Fourier–Motzkin elimination can be applied to eliminating the constraint...
This paper describes how the Fourier-Motzkin Elimination Method, which can be used for solving Linea...
AbstractLinear semi-infinite programming deals with the optimization of linear functionals on finite...
AbstractIn 1961, Clark proved that if either the feasible region of a linear program or its dual is ...
AbstractThis paper describes how the Fourier-Motzkin Elimination Method, which can be used for solvi...
In this article we discuss weak and strong duality properties of convex semi-infinite programming pr...
International audienceThis article uses classical notions of convex analysis over Euclidean spaces, ...
In this short paper, we present a new constraint qualification (CQ) for linear semi-infinite program...
In Part I of this work we derived a duality theorem for partially finite convex programs, problems f...
In semidefinite programming one minimizes a linear function subject to the constraint that an affine...
New results are established for multiobjective DC programs with infinite convex constraints (MOPIC) ...
It is well known that the duality theory for linear programming (LP) is powerful and elegant and lie...