The paper presents a new method for solving the 0–1 linear programming problems (LPs). The general 0–1 LPs are believed to be NP-hard and a consistent, efficient general-purpose algorithm for these models has not been found so far. Cutting planes and branch and bound approaches were the earliest exact methods for the 0–1 LP. Unfortunately, these methods on their own failed to solve the 0–1 LP model consistently and efficiently. The hybrids that are a combination of heuristics, cuts, branch and bound and pricing have been used successfully for some 0–1 models. The main challenge with these hybrids is that these hybrids cannot completely eliminate the threat of combinatorial explosion for very large practical 0–1 LPs. In this paper, a techniq...
Column generation is a linear programming method that, when combined with appropriate integer progra...
Linear programming (LP) is one of the most widely-applied techniques in operations research. Many me...
In this paper a new approach for obtaining an approximation global optimum solution of zero-one nonl...
The paper presents a new method for solving the 0–1 linear programming problems (LPs). The general 0...
For students familiar with linear programming, we give here a brief account of the basic exact solut...
The paper presents a new reformulation approach to reduce the complexity of a branch and bound algor...
This paper is concerned with the solution of linearly constrained zero-one quadratic programming pro...
A branch and bound algorithm is presented which is based on the extension of implicit enumeration te...
AbstractA hybrid algorithm to solve large scale zero–one integer programming problems has been devel...
We give an exact algorithm for the 0-1 Integer Linear Programming problem with a linear number of co...
An algorithm is presented for solving families of integer linear programming problems in which the p...
Linear programming is one of the most extensively used techniques in the toolbox of quantitative met...
The purpose of this thesis is to provide analysis of the modem development of the methods for soluti...
AbstractThis paper is concerned with the generation of tight equivalent representations for mixed-in...
We discuss a new simple method to solve linear programming (LP) problems, based on the so called dua...
Column generation is a linear programming method that, when combined with appropriate integer progra...
Linear programming (LP) is one of the most widely-applied techniques in operations research. Many me...
In this paper a new approach for obtaining an approximation global optimum solution of zero-one nonl...
The paper presents a new method for solving the 0–1 linear programming problems (LPs). The general 0...
For students familiar with linear programming, we give here a brief account of the basic exact solut...
The paper presents a new reformulation approach to reduce the complexity of a branch and bound algor...
This paper is concerned with the solution of linearly constrained zero-one quadratic programming pro...
A branch and bound algorithm is presented which is based on the extension of implicit enumeration te...
AbstractA hybrid algorithm to solve large scale zero–one integer programming problems has been devel...
We give an exact algorithm for the 0-1 Integer Linear Programming problem with a linear number of co...
An algorithm is presented for solving families of integer linear programming problems in which the p...
Linear programming is one of the most extensively used techniques in the toolbox of quantitative met...
The purpose of this thesis is to provide analysis of the modem development of the methods for soluti...
AbstractThis paper is concerned with the generation of tight equivalent representations for mixed-in...
We discuss a new simple method to solve linear programming (LP) problems, based on the so called dua...
Column generation is a linear programming method that, when combined with appropriate integer progra...
Linear programming (LP) is one of the most widely-applied techniques in operations research. Many me...
In this paper a new approach for obtaining an approximation global optimum solution of zero-one nonl...