Add to ORKGHerbert Scarf has recently introduced an algorithm for integer programs based on the concept of primitive sets. We show that as the choice variables become continuous, this algorithm converges to a dual simplex algorithm. This result is robust in the sense that even before the limit is reached, the simplex path is contained in the primitive sets which define Scarf’s path to the solution of the integer program
We present a finitely convergent cutting plane algorithm for 0-1 mixed integer programming. The algo...
The thesis begins by giving background in linear programming and Simplex methods. Topics covered inc...
We generalise polyhedral projection (Fourier-Motzkin elimination) to integer programming (IP) and de...
Herbert Scarf has recently introduced an algorithm for integer programs based on the concept of prim...
The dual simplex algorithm is an attractive alternative method for solving linear programming proble...
AbstractWe introduce the framework for a primal dual integer programming algorithm. We prove converg...
For many of us, modern-day linear programming (LP) started with the work of George Dantzig in 1947. ...
Many fundamental NP-hard problems can be formulated as integer linear programs (ILPs). A famous algo...
Summary form only given. Integer programming is the problem of maximizing a linear function over the...
In the first part of the paper we survey some far-reaching applications of the basic facts of linear...
In the first part of the paper we survey some far reaching applications of the basis facts of linear...
The purpose of this paper is to show that tbe conceptual foundations and presentation of R. D. Young...
In recent years many advances have been made in solution techniques for specially structured 0–1 int...
It is shown that the optimum of an integer program in fixed dimension, which is defined by a fixed n...
Binary integer programming is a class of algorithms that are used to solve problems where we have se...
We present a finitely convergent cutting plane algorithm for 0-1 mixed integer programming. The algo...
The thesis begins by giving background in linear programming and Simplex methods. Topics covered inc...
We generalise polyhedral projection (Fourier-Motzkin elimination) to integer programming (IP) and de...
Herbert Scarf has recently introduced an algorithm for integer programs based on the concept of prim...
The dual simplex algorithm is an attractive alternative method for solving linear programming proble...
AbstractWe introduce the framework for a primal dual integer programming algorithm. We prove converg...
For many of us, modern-day linear programming (LP) started with the work of George Dantzig in 1947. ...
Many fundamental NP-hard problems can be formulated as integer linear programs (ILPs). A famous algo...
Summary form only given. Integer programming is the problem of maximizing a linear function over the...
In the first part of the paper we survey some far-reaching applications of the basic facts of linear...
In the first part of the paper we survey some far reaching applications of the basis facts of linear...
The purpose of this paper is to show that tbe conceptual foundations and presentation of R. D. Young...
In recent years many advances have been made in solution techniques for specially structured 0–1 int...
It is shown that the optimum of an integer program in fixed dimension, which is defined by a fixed n...
Binary integer programming is a class of algorithms that are used to solve problems where we have se...
We present a finitely convergent cutting plane algorithm for 0-1 mixed integer programming. The algo...
The thesis begins by giving background in linear programming and Simplex methods. Topics covered inc...
We generalise polyhedral projection (Fourier-Motzkin elimination) to integer programming (IP) and de...