In Vertex Coloring Problems, one is required to assign a color to each vertex of an undirected graph in such a way that adjacent vertices receive different colors, and the objective is to minimize the cost of the used colors. In this work we solve four different coloring problems formulated as Maximum Weight Stable Set Problems on an associated graph. We exploit the transformation proposed by Cornaz and Jost (2008), where given a graph G, an auxiliary graph Gˆ is constructed, such that the family of all stable sets of Gˆ is in one-to-one correspondence with the family of all feasible colorings of G. The transformation in Cornaz and Jost (2008) was originally proposed for the classical Vertex Coloring and the Max-Coloring problems; we extend...
AbstractWe design an O(nm) algorithm to find a minimum weighted colouring and a maximum weighted cli...
In this paper we present an improved branch and bound algorithm for the vertex coloring problem. The...
We consider two (0,1)-linear programming formulations of the graph (vertex-) coloring problem, in wh...
In Vertex Coloring Problems, one is required to assign a color to each vertex of an undirected graph...
Given a graph G = (V, E), a family of nonempty vertex-subsets S ⊆ 2 V , and a weight w : S → R+, the...
We describe a new branch-and-bound algorithm for the exact solution of the maximum cardinality stabl...
A very general technique for converting approximation algorithms for the vertex coloring problem in...
We study the following generalization of the classical edge coloring problem: Given a weighted graph...
A version of weighted coloring of a graph is introduced: each node υ of a graph G = (V,E) is provide...
AbstractA general technique for converting approximation algorithms for the vertex coloring problem ...
We study the following generalization of the classical edge coloring problem: Given a weighted graph...
Given a vertex-weighted graph G = (V,E;w), w(v) ≥ 0 for any v ∈ V, we consider a weighted version o...
Given an undirected graph, the "Vertex Coloring Problem"(VCP) requires to assign a color to each ver...
In this note, we use a reduction by Cornaz and Jost from the graph (max-)coloring problem to the max...
The problem of vertex coloring holds an important place in engineering as it models situations in wh...
AbstractWe design an O(nm) algorithm to find a minimum weighted colouring and a maximum weighted cli...
In this paper we present an improved branch and bound algorithm for the vertex coloring problem. The...
We consider two (0,1)-linear programming formulations of the graph (vertex-) coloring problem, in wh...
In Vertex Coloring Problems, one is required to assign a color to each vertex of an undirected graph...
Given a graph G = (V, E), a family of nonempty vertex-subsets S ⊆ 2 V , and a weight w : S → R+, the...
We describe a new branch-and-bound algorithm for the exact solution of the maximum cardinality stabl...
A very general technique for converting approximation algorithms for the vertex coloring problem in...
We study the following generalization of the classical edge coloring problem: Given a weighted graph...
A version of weighted coloring of a graph is introduced: each node υ of a graph G = (V,E) is provide...
AbstractA general technique for converting approximation algorithms for the vertex coloring problem ...
We study the following generalization of the classical edge coloring problem: Given a weighted graph...
Given a vertex-weighted graph G = (V,E;w), w(v) ≥ 0 for any v ∈ V, we consider a weighted version o...
Given an undirected graph, the "Vertex Coloring Problem"(VCP) requires to assign a color to each ver...
In this note, we use a reduction by Cornaz and Jost from the graph (max-)coloring problem to the max...
The problem of vertex coloring holds an important place in engineering as it models situations in wh...
AbstractWe design an O(nm) algorithm to find a minimum weighted colouring and a maximum weighted cli...
In this paper we present an improved branch and bound algorithm for the vertex coloring problem. The...
We consider two (0,1)-linear programming formulations of the graph (vertex-) coloring problem, in wh...