AbstractWe consider two (0, 1)-linear programming formulations of the graph (vertex-) coloring problem, in which variables are associated with stable sets of the input graph. The first one is a set covering formulation, where the set of vertices has to be covered by a minimum number of stable sets. The second is a set packing formulation, in which constraints express that two stable sets cannot have a common vertex, and large stable sets are preferred in the objective function. We identify facets with small coefficients for the polytopes associated with both formulations. We show by computational experiments that both formulations are about equally efficient when used in a branch-and-price algorithm. Next we propose some preprocessing, and ...
We study the Partition Coloring Problem (PCP), a generalization of the Vertex Coloring Problem where...
Extensions and variations of the basic problem of graph coloring are introduced. The problem consis...
AbstractMany combinatorial optimization problems call for the optimization of a linear function over...
International audienceWe consider two (0, 1)-linear programming formulations of the graph (vertex-) ...
AbstractWe consider two (0, 1)-linear programming formulations of the graph (vertex-) coloring probl...
AbstractWe present an approach based on integer programming formulations of the graph coloring probl...
A total coloring of a graph G = (V, E) is an assignment of colors to vertices and edges such that ne...
AbstractIn this paper a Branch-and-Cut algorithm, based on a formulation previously introduced by us...
We formulate the edge coloring problem on a simple graph as the integer program of covering edges by...
International audienceIn Vertex Coloring Problems, one is required to assign a color to each vertex ...
AbstractIn this paper we describe a collection of efficient algorithms that deliver approximate solu...
This note addresses the selective graph coloring problem, which is a generalization of the well-know...
Given an undirected graph, the Vertex Coloring Problem (VCP) consists of assigning a color to each v...
Dans un graphe non orienté, le Problème de Coloration de Graphe (PCG) consiste à assigner à chaque s...
This paper considers the polyhedral results and the min–max results on packing and covering problems...
We study the Partition Coloring Problem (PCP), a generalization of the Vertex Coloring Problem where...
Extensions and variations of the basic problem of graph coloring are introduced. The problem consis...
AbstractMany combinatorial optimization problems call for the optimization of a linear function over...
International audienceWe consider two (0, 1)-linear programming formulations of the graph (vertex-) ...
AbstractWe consider two (0, 1)-linear programming formulations of the graph (vertex-) coloring probl...
AbstractWe present an approach based on integer programming formulations of the graph coloring probl...
A total coloring of a graph G = (V, E) is an assignment of colors to vertices and edges such that ne...
AbstractIn this paper a Branch-and-Cut algorithm, based on a formulation previously introduced by us...
We formulate the edge coloring problem on a simple graph as the integer program of covering edges by...
International audienceIn Vertex Coloring Problems, one is required to assign a color to each vertex ...
AbstractIn this paper we describe a collection of efficient algorithms that deliver approximate solu...
This note addresses the selective graph coloring problem, which is a generalization of the well-know...
Given an undirected graph, the Vertex Coloring Problem (VCP) consists of assigning a color to each v...
Dans un graphe non orienté, le Problème de Coloration de Graphe (PCG) consiste à assigner à chaque s...
This paper considers the polyhedral results and the min–max results on packing and covering problems...
We study the Partition Coloring Problem (PCP), a generalization of the Vertex Coloring Problem where...
Extensions and variations of the basic problem of graph coloring are introduced. The problem consis...
AbstractMany combinatorial optimization problems call for the optimization of a linear function over...