There are many combinatorial problems which can be effectively dealt with via Integer Linear Programming by using column-generation or constraint-generation techniques. When the pricing for column generation can be solved by Linear Programming, it is possible to embed the positive reduced cost condition into the dual of the relaxed integer primal. Similarly, for constraint generation, if the separation problem is a Linear Program, it can be embedded into the integer primal. The new model has polynomial size and has the same lower bounds as the original exponential size model. We call \u201ccompact\u201d this reformulation. The compact reformulation may provide new insight into the problem structure and sometimes exhibits a computational bet...
We discuss formulations of integer programs with a huge number of variables and their solution by co...
Many discrete optimization problems can be formulated as either integer linear programming problems ...
Column generation has become a powerful tool in solving large scale integer programs. It is well kno...
The best formulations for some combinatorial optimization problems are integer linear programming ...
The best formulations for some combinatorial optimization problems are integer linear programming mo...
This book provides a handy, unified introduction to the theory of compact extended formulations of e...
We describe a new approach to produce integer feasible columns to a set partitioning problem directl...
In this paper we introduce by means of examples a new technique for formulating compact (i.e. polyno...
AbstractMany combinatorial optimization problems call for the optimization of a linear function over...
Integer programming is a powerful modeling tool for a variety of decision making problems such as i...
Column generation is a linear programming method that, when combined with appropriate integer progra...
AbstractLogic constraint satisfaction problems are in general NP-hard and a general deterministic po...
The paper presents a new approach to significantly reduce the number of sub-problems required to ver...
Robustness is about reducing the feasible set of a given nominal optimization problem by cutting \u2...
Both cutting plane methods and traditional decomposition methods are procedures that compute a bound...
We discuss formulations of integer programs with a huge number of variables and their solution by co...
Many discrete optimization problems can be formulated as either integer linear programming problems ...
Column generation has become a powerful tool in solving large scale integer programs. It is well kno...
The best formulations for some combinatorial optimization problems are integer linear programming ...
The best formulations for some combinatorial optimization problems are integer linear programming mo...
This book provides a handy, unified introduction to the theory of compact extended formulations of e...
We describe a new approach to produce integer feasible columns to a set partitioning problem directl...
In this paper we introduce by means of examples a new technique for formulating compact (i.e. polyno...
AbstractMany combinatorial optimization problems call for the optimization of a linear function over...
Integer programming is a powerful modeling tool for a variety of decision making problems such as i...
Column generation is a linear programming method that, when combined with appropriate integer progra...
AbstractLogic constraint satisfaction problems are in general NP-hard and a general deterministic po...
The paper presents a new approach to significantly reduce the number of sub-problems required to ver...
Robustness is about reducing the feasible set of a given nominal optimization problem by cutting \u2...
Both cutting plane methods and traditional decomposition methods are procedures that compute a bound...
We discuss formulations of integer programs with a huge number of variables and their solution by co...
Many discrete optimization problems can be formulated as either integer linear programming problems ...
Column generation has become a powerful tool in solving large scale integer programs. It is well kno...