This survey is concerned with the size of perfect formulations for combinatorial optimization problems. By "perfect formulation", we mean a system of linear inequalities that describes the convex hull of feasible solutions, viewed as vectors. Natural perfect formulations often have a number of inequalities that is exponential in the size of the data needed to describe the problem. Here we are particularly interested in situations where the addition of a polynomial number of extra variables allows a formulation with a polynomial number of inequalities. Such formulations are called "compact extended formulations". We survey various tools for deriving and studying extended formulations, such as Fourier's procedure for projection, Minkowski-Wey...
A classical theorem in Combinatorial Optimization proves the existence of fully polynomialtime appro...
We explore one method for finding the convex hull of certain mixed integer sets. The approach is to ...
AbstractMany combinatorial optimization problems call for the optimization of a linear function over...
This survey is concerned with the size of perfect formulations for combinatorial optimization proble...
The best formulations for some combinatorial optimization problems are integer linear programming mo...
Dans cette habilitation à diriger des recherches, nous présentons nos contributions aux formulations...
The best formulations for some combinatorial optimization problems are integer linear programming ...
AbstractAn extended formulation of a polytope P is a system of linear inequalities and equations tha...
An extended formulation of a polytope is a linear description of this polytope using extra variables...
Exploring the power of linear programming for combinatorial optimization problems has been recently ...
In 1991, Yannakakis [17] proved that no symmetric extended formulation for the matching polytope of ...
Combinatorial optimization plays a central role in complexity theory, operations research, and algor...
Abstract. This is an overview of the significance and main uses of projection, lifting and extended ...
In this note, we consider the permutahedron, the convex hull of all permutations of {1,2…,n} . We sh...
We explore one method for finding the convex hull of certain mixed integer sets. The approach is to ...
A classical theorem in Combinatorial Optimization proves the existence of fully polynomialtime appro...
We explore one method for finding the convex hull of certain mixed integer sets. The approach is to ...
AbstractMany combinatorial optimization problems call for the optimization of a linear function over...
This survey is concerned with the size of perfect formulations for combinatorial optimization proble...
The best formulations for some combinatorial optimization problems are integer linear programming mo...
Dans cette habilitation à diriger des recherches, nous présentons nos contributions aux formulations...
The best formulations for some combinatorial optimization problems are integer linear programming ...
AbstractAn extended formulation of a polytope P is a system of linear inequalities and equations tha...
An extended formulation of a polytope is a linear description of this polytope using extra variables...
Exploring the power of linear programming for combinatorial optimization problems has been recently ...
In 1991, Yannakakis [17] proved that no symmetric extended formulation for the matching polytope of ...
Combinatorial optimization plays a central role in complexity theory, operations research, and algor...
Abstract. This is an overview of the significance and main uses of projection, lifting and extended ...
In this note, we consider the permutahedron, the convex hull of all permutations of {1,2…,n} . We sh...
We explore one method for finding the convex hull of certain mixed integer sets. The approach is to ...
A classical theorem in Combinatorial Optimization proves the existence of fully polynomialtime appro...
We explore one method for finding the convex hull of certain mixed integer sets. The approach is to ...
AbstractMany combinatorial optimization problems call for the optimization of a linear function over...