Add to ORKGThe max-cut problem and the associated cut polytope on complete graphs have been extensively studied over the last 25 years. However, little research has been conducted for the cut polytope on arbitrary graphs. In this study we describe new separation and lifting procedures for the cut polytope on such graphs. These procedures exploit algorithmic and structural results known for the cut polytope on complete graphs to generate valid, and sometimes facet defining, inequalities for the cut polytope on arbitrary graphs in a cutting plane framework. We report computational results on a set of well-established benchmark problems
The max-cut problem asks for partitioning the nodes V of a graph G=(V,E) into two sets (one of which...
International audienceWe consider the Max-Cut problem on an undirected graph G = (V, E) with |V | = ...
International audienceWe consider the Max-Cut problem on an undirected graph G = (V, E) with |V | = ...
This work was partially supported by EEC Contract SC1-CT-91-0620. In this paper we describe a cuttin...
Cut problems on graphs are a well-known and intensively studied class of optimization problems. In ...
The max-cut problem is a fundamental and much-studied NP-hard combinatorial optimisation problem, wi...
The max-cut problem is a fundamental combinatorial optimisation problem, with many applications. Pol...
Polyhedral cutting-plane algorithms for hard combinatorial problems have scored notable successes. H...
Let G=(V,E) be an undirected connected graph. Let W be a subset of V, distinct from V. The set W is ...
International audienceLet G=(V,E) be an undirected connected graph. Let W be a subset of V, distinct...
International audienceLet G=(V,E) be an undirected connected graph. Let W be a subset of V, distinct...
The max-cut problem is an NP-hard combinatorial optimization problem defined on undirected weighted ...
Abstract. The max-cut and stable set problems are two fundamental NP-hard problems in combinatorial ...
The max-cut problem asks for partitioning the nodes V of a graph G=(V,E) into two sets (one of which...
Laurent & Poljak introduced a class of valid inequalities for the max-cut problem, called gap inequa...
The max-cut problem asks for partitioning the nodes V of a graph G=(V,E) into two sets (one of which...
International audienceWe consider the Max-Cut problem on an undirected graph G = (V, E) with |V | = ...
International audienceWe consider the Max-Cut problem on an undirected graph G = (V, E) with |V | = ...
This work was partially supported by EEC Contract SC1-CT-91-0620. In this paper we describe a cuttin...
Cut problems on graphs are a well-known and intensively studied class of optimization problems. In ...
The max-cut problem is a fundamental and much-studied NP-hard combinatorial optimisation problem, wi...
The max-cut problem is a fundamental combinatorial optimisation problem, with many applications. Pol...
Polyhedral cutting-plane algorithms for hard combinatorial problems have scored notable successes. H...
Let G=(V,E) be an undirected connected graph. Let W be a subset of V, distinct from V. The set W is ...
International audienceLet G=(V,E) be an undirected connected graph. Let W be a subset of V, distinct...
International audienceLet G=(V,E) be an undirected connected graph. Let W be a subset of V, distinct...
The max-cut problem is an NP-hard combinatorial optimization problem defined on undirected weighted ...
Abstract. The max-cut and stable set problems are two fundamental NP-hard problems in combinatorial ...
The max-cut problem asks for partitioning the nodes V of a graph G=(V,E) into two sets (one of which...
Laurent & Poljak introduced a class of valid inequalities for the max-cut problem, called gap inequa...
The max-cut problem asks for partitioning the nodes V of a graph G=(V,E) into two sets (one of which...
International audienceWe consider the Max-Cut problem on an undirected graph G = (V, E) with |V | = ...
International audienceWe consider the Max-Cut problem on an undirected graph G = (V, E) with |V | = ...