In this survey we examine ways to reformulate integer and mixed integer programs. Typically, but not exclusively, one reformulates so as to obtain stronger linear programming relaxations, and hence better bounds for use in a branch-and-bound based algorithm. First we cover in detail reformulations based on decomposition, such as Lagrangean relaxation, Dantzig-Wolfe and the resulting column generation and branch-and-price algorithms. This is followed by an examination of Benders ’ type algorithms based on projection. Finally we discuss in detail extended formulations involving additional variables that are based on problem structure. These can often be used to provide strengthened a priori formulations. Reformulations obtained by adding cutt...
We discuss formulations of integer programs with a huge number of variables and their solution by co...
This final thesis work is dealing with the problems of mixed integer linear programming and their po...
The thesis argues the case for exploiting certain structures in integer linear programs.\ud \ud Inte...
In this survey we examine ways to reformulate integer and mixed integer programs. Typically, but not...
Dantzig-Wolfe decomposition as applied to an integer program is a specific form of problem reformula...
We provide an overview of our recent efforts to automatize Dantzig-Wolfe reformulation and column ge...
Abstract. Creating good integer programming formulations had, as a basic axiom, the rule “Find formu...
Creating good integer programming formulations had, as a basic axiom, the rule “Find formulations wi...
Dantzig-Wolfe decomposition (or reformulation) is well-known to provide strong dual bounds for speci...
Dantzig–Wolfe decomposition (or reformulation) is well-known to provide strong dual bounds for speci...
Dantzig\u2013Wolfe decomposition (or reformulation) is well-known to provide strong dual bounds for ...
Integer programming is a powerful modeling tool for a variety of decision making problems such as i...
Decomposition algorithms such as Lagrangian relaxation and Dantzig-Wolfe decomposition are well-know...
Two practical problems are described, each of which can be formulated in more than one way as a mixe...
In recent years many advances have been made in solution techniques for specially structured 0–1 int...
We discuss formulations of integer programs with a huge number of variables and their solution by co...
This final thesis work is dealing with the problems of mixed integer linear programming and their po...
The thesis argues the case for exploiting certain structures in integer linear programs.\ud \ud Inte...
In this survey we examine ways to reformulate integer and mixed integer programs. Typically, but not...
Dantzig-Wolfe decomposition as applied to an integer program is a specific form of problem reformula...
We provide an overview of our recent efforts to automatize Dantzig-Wolfe reformulation and column ge...
Abstract. Creating good integer programming formulations had, as a basic axiom, the rule “Find formu...
Creating good integer programming formulations had, as a basic axiom, the rule “Find formulations wi...
Dantzig-Wolfe decomposition (or reformulation) is well-known to provide strong dual bounds for speci...
Dantzig–Wolfe decomposition (or reformulation) is well-known to provide strong dual bounds for speci...
Dantzig\u2013Wolfe decomposition (or reformulation) is well-known to provide strong dual bounds for ...
Integer programming is a powerful modeling tool for a variety of decision making problems such as i...
Decomposition algorithms such as Lagrangian relaxation and Dantzig-Wolfe decomposition are well-know...
Two practical problems are described, each of which can be formulated in more than one way as a mixe...
In recent years many advances have been made in solution techniques for specially structured 0–1 int...
We discuss formulations of integer programs with a huge number of variables and their solution by co...
This final thesis work is dealing with the problems of mixed integer linear programming and their po...
The thesis argues the case for exploiting certain structures in integer linear programs.\ud \ud Inte...