AbstractIt is shown how the dual of Fourier–Motzkin elimination can be applied to eliminating the constraints of an Integer Linear Program. The result will, in general, be to reduce the Integer Program to a single Diophantine equation together with a series of Linear homogeneous congruences. Extreme continuous solutions to the Diophantine equation give extreme solutions to the Linear Programming relaxation. Integral solutions to the Diophantine equation which also satisfy the congruences give all the solutions to the Integer Program
For certain integer programs, one way to obtain a strong dual bound is to use an extended formulatio...
Gauss and Fourier have together provided us with the essential techniques for symbolic computation w...
International audienceIn this book the author analyzes and compares four closely related problems, n...
It is shown how the dual of Fourier–Motzkin elimination can be applied to eliminating the constraint...
AbstractIt is shown how the dual of Fourier–Motzkin elimination can be applied to eliminating the co...
This paper describes how the Fourier-Motzkin Elimination Method, which can be used for solving Linea...
AbstractThis paper describes how the Fourier-Motzkin Elimination Method, which can be used for solvi...
AbstractIt is shown how to transform the set of all feasible solution to an integer program represen...
Fourier-Motzkin elimination is a projection algorithm for solving finite linear programs. We extend ...
The need for eliminating redundancies in systems of linear inequalities arises in many applications....
Abstract: Two algorithms for solving Diophantine linear equations and five algorithms for solving Di...
We describe a new algorithm for solving a conjunction of linear diophantine equations, inequations a...
We present a method to determine whether a set of equations has a non-negative integer solution. The...
AbstractIt is shown that any bounded integer linear programming problem can be trans- formed to an e...
Gauss and Fourier have together provided us with the essential techniques for symbolic computation w...
For certain integer programs, one way to obtain a strong dual bound is to use an extended formulatio...
Gauss and Fourier have together provided us with the essential techniques for symbolic computation w...
International audienceIn this book the author analyzes and compares four closely related problems, n...
It is shown how the dual of Fourier–Motzkin elimination can be applied to eliminating the constraint...
AbstractIt is shown how the dual of Fourier–Motzkin elimination can be applied to eliminating the co...
This paper describes how the Fourier-Motzkin Elimination Method, which can be used for solving Linea...
AbstractThis paper describes how the Fourier-Motzkin Elimination Method, which can be used for solvi...
AbstractIt is shown how to transform the set of all feasible solution to an integer program represen...
Fourier-Motzkin elimination is a projection algorithm for solving finite linear programs. We extend ...
The need for eliminating redundancies in systems of linear inequalities arises in many applications....
Abstract: Two algorithms for solving Diophantine linear equations and five algorithms for solving Di...
We describe a new algorithm for solving a conjunction of linear diophantine equations, inequations a...
We present a method to determine whether a set of equations has a non-negative integer solution. The...
AbstractIt is shown that any bounded integer linear programming problem can be trans- formed to an e...
Gauss and Fourier have together provided us with the essential techniques for symbolic computation w...
For certain integer programs, one way to obtain a strong dual bound is to use an extended formulatio...
Gauss and Fourier have together provided us with the essential techniques for symbolic computation w...
International audienceIn this book the author analyzes and compares four closely related problems, n...