In cutting plane methods, the question of how to generate the “best possible” set of cuts is both central and crucial. We propose a lexicographic multi-objective cutting plane generation scheme that generates, among all the maximally violated valid inequalities of a given family, an inequality that is undominated and maximally diverse w.r.t. the cuts that were previously found. By optimizing a diversity measure, we introduce a form of coordination between successive cuts. Our focus is on valid inequalities with 0–1 coefficients in the left-hand side and a constant right-hand side, which encompasses several families of valid inequalities. As cut diversity measure, we consider an aggregate of the 1-norm distances w.r.t. the normal vectors of ...
In the successful branch-and-cut approach to combinatorial optimization, linear inequalities are use...
The max-cut problem is an NP-hard combinatorial optimization problem defined on undirected weighted ...
The modularity proposed by Newman and Girvan is the most commonly used measure when the nodes of a g...
In cutting plane methods, the question of how to generate the best possible set of cuts is both cent...
This work was partially supported by EEC Contract SC1-CT-91-0620. In this paper we describe a cuttin...
Laurent & Poljak introduced a class of valid inequalities for the max-cut problem, called gap inequa...
The max-cut problem and the associated cut polytope on complete graphs have been extensively studied...
Cutting plane algorithms have turned out to be practically successful computational tools in combina...
The exact solution of the NP-hard (nondeterministic polynomial-time hard) maximum cut problem is imp...
A separation algorithm is a procedure for generating cutting planes. Up to now, only a few polynomia...
Cutting plane algorithms have turned out to be practically successful computational tools in combina...
In the successful branch-and-cut approach to combinatorial optimization, linear inequalities are use...
In this thesis, we develop efficient methods to generate cutting planes for unstructured mixed integ...
We propose new cutting planes for strengthening the linear relaxations that appear in the solution o...
International audienceWe explore the Projective Cutting-Planes algorithm proposed in Porumbel (2020)...
In the successful branch-and-cut approach to combinatorial optimization, linear inequalities are use...
The max-cut problem is an NP-hard combinatorial optimization problem defined on undirected weighted ...
The modularity proposed by Newman and Girvan is the most commonly used measure when the nodes of a g...
In cutting plane methods, the question of how to generate the best possible set of cuts is both cent...
This work was partially supported by EEC Contract SC1-CT-91-0620. In this paper we describe a cuttin...
Laurent & Poljak introduced a class of valid inequalities for the max-cut problem, called gap inequa...
The max-cut problem and the associated cut polytope on complete graphs have been extensively studied...
Cutting plane algorithms have turned out to be practically successful computational tools in combina...
The exact solution of the NP-hard (nondeterministic polynomial-time hard) maximum cut problem is imp...
A separation algorithm is a procedure for generating cutting planes. Up to now, only a few polynomia...
Cutting plane algorithms have turned out to be practically successful computational tools in combina...
In the successful branch-and-cut approach to combinatorial optimization, linear inequalities are use...
In this thesis, we develop efficient methods to generate cutting planes for unstructured mixed integ...
We propose new cutting planes for strengthening the linear relaxations that appear in the solution o...
International audienceWe explore the Projective Cutting-Planes algorithm proposed in Porumbel (2020)...
In the successful branch-and-cut approach to combinatorial optimization, linear inequalities are use...
The max-cut problem is an NP-hard combinatorial optimization problem defined on undirected weighted ...
The modularity proposed by Newman and Girvan is the most commonly used measure when the nodes of a g...