Add to ORKGInteger programming (IP) problems are difficult to solve due to the integer restrictions imposed on them. A technique for solving these problems is the cutting plane method. In this method, linear constraints are added to the associated linear programming (LP) problem until an integer optimal solution is found. These constraints cut off part of the LP solution space but do not eliminate any feasible integer solution. In this report algorithms for solving IP due to Gomory and to Dantzig are presented. Two other cutting plane approaches and two extensions to Gomory's algorithm are also discussed. Although these methods are mathematically elegant they are known to have slow convergence and an explosive storage requirement. As a result cutting ...
We investigate the use of cutting planes for integer programs with general integer variables. We sho...
A cutting-plane procedure for integer programming (IP) problems usually involves invoking a black-bo...
We propose an approximate lifting procedure for general integer programs. This lifting procedure use...
w9255960 Integer programming (IP) problems are difficult to solve due to the integer restrictions im...
Linear programming is a relatively new, very important branch of modern mathematics and is about twe...
Linear programming is a relatively new, very important branch of modern mathematics and is about twe...
In chapter 26 of his book, George Dantzig presented side by side (i) a number of difficult mathemati...
The purpose of this thesis is to provide analysis of the modem development of the methods for soluti...
A cutting plane technique with applicability to the solution of general integer programs is presente...
The Dantzig-Wolfe decomposition has been extended to Integer Linear Programming (ILP) and Mixed Inte...
Dual fractional cutting plane algorithms, in which cutting planes are used to iteratively tighten a ...
AbstractThis paper establishes a new class of finitely convergent cutting plane methods to solve int...
In this thesis, we study theoretical aspects of integer linear programming. This thesis consists of...
A cutting-plane procedure for integer programming (IP) problems usually involves invoking a black-bo...
We investigate the use of cutting planes for integer programs with general integer variables. We sho...
We investigate the use of cutting planes for integer programs with general integer variables. We sho...
A cutting-plane procedure for integer programming (IP) problems usually involves invoking a black-bo...
We propose an approximate lifting procedure for general integer programs. This lifting procedure use...
w9255960 Integer programming (IP) problems are difficult to solve due to the integer restrictions im...
Linear programming is a relatively new, very important branch of modern mathematics and is about twe...
Linear programming is a relatively new, very important branch of modern mathematics and is about twe...
In chapter 26 of his book, George Dantzig presented side by side (i) a number of difficult mathemati...
The purpose of this thesis is to provide analysis of the modem development of the methods for soluti...
A cutting plane technique with applicability to the solution of general integer programs is presente...
The Dantzig-Wolfe decomposition has been extended to Integer Linear Programming (ILP) and Mixed Inte...
Dual fractional cutting plane algorithms, in which cutting planes are used to iteratively tighten a ...
AbstractThis paper establishes a new class of finitely convergent cutting plane methods to solve int...
In this thesis, we study theoretical aspects of integer linear programming. This thesis consists of...
A cutting-plane procedure for integer programming (IP) problems usually involves invoking a black-bo...
We investigate the use of cutting planes for integer programs with general integer variables. We sho...
We investigate the use of cutting planes for integer programs with general integer variables. We sho...
A cutting-plane procedure for integer programming (IP) problems usually involves invoking a black-bo...
We propose an approximate lifting procedure for general integer programs. This lifting procedure use...