AbstractIn this paper, we study the minimum sum set coloring (MSSC) problem which consists in assigning a set of x(v) positive integers to each vertex v of a graph so that the intersection of sets assigned to adjacent vertices is empty and the sum of the assigned set of numbers to each vertex of the graph is minimum. The MSSC problem occurs in two versions: non-preemptive and preemptive. We show that the MSSC problem is strongly NP-hard both in the preemptive case on trees and in the non-preemptive case in line graphs of trees. Finally, we give exact parameterized algorithms for these two versions on trees and line graphs of trees
AbstractWe consider the sum coloring (chromatic sum) problem and the sum multi-coloring problem for ...
Given an undirected graph G = ( V , E ) , the minimum sum coloring problem (MSCP) is to find a legal...
We study two Integer Linear Programming (ILP) formulations for the Minimum Sum Coloring Problem (MSC...
In this paper, we study the minimum sum set coloring (MSSC) problem which consists in assigning a s...
AbstractIn this paper, we study the minimum sum set coloring (MSSC) problem which consists in assign...
AbstractThe edge multicoloring problem is that given a graph G and integer demands x(e) for every ed...
Abstract. The edge multicoloring problem is that given a graph G and integer demands x(e) for every ...
AbstractThe sum coloring problem asks to find a vertex coloring of a given graph G, using natural nu...
A proper coloring of a given graph is an assignment of a positive integer number (color) to each ver...
grantor: University of TorontoThe sum coloring problem asks to find a vertex coloring of ...
AbstractIn the Minimum Sum Edge Coloring problem we have to assign positive integers to the edges of...
In the Minimum Sum Edge Coloring problem we have to assign positive integers to the edges of a graph...
International audienceThe minimum sum coloring problem (MSCP) is a variant of the well-known vertex ...
Given an undirected graph G, the Minimum Sum Coloring Problem (MSCP) is to find a legal assignment o...
In this paper, we study the Minimum Sum Coloring (MSC) problem on P4-sparse graphs. In the MSC probl...
AbstractWe consider the sum coloring (chromatic sum) problem and the sum multi-coloring problem for ...
Given an undirected graph G = ( V , E ) , the minimum sum coloring problem (MSCP) is to find a legal...
We study two Integer Linear Programming (ILP) formulations for the Minimum Sum Coloring Problem (MSC...
In this paper, we study the minimum sum set coloring (MSSC) problem which consists in assigning a s...
AbstractIn this paper, we study the minimum sum set coloring (MSSC) problem which consists in assign...
AbstractThe edge multicoloring problem is that given a graph G and integer demands x(e) for every ed...
Abstract. The edge multicoloring problem is that given a graph G and integer demands x(e) for every ...
AbstractThe sum coloring problem asks to find a vertex coloring of a given graph G, using natural nu...
A proper coloring of a given graph is an assignment of a positive integer number (color) to each ver...
grantor: University of TorontoThe sum coloring problem asks to find a vertex coloring of ...
AbstractIn the Minimum Sum Edge Coloring problem we have to assign positive integers to the edges of...
In the Minimum Sum Edge Coloring problem we have to assign positive integers to the edges of a graph...
International audienceThe minimum sum coloring problem (MSCP) is a variant of the well-known vertex ...
Given an undirected graph G, the Minimum Sum Coloring Problem (MSCP) is to find a legal assignment o...
In this paper, we study the Minimum Sum Coloring (MSC) problem on P4-sparse graphs. In the MSC probl...
AbstractWe consider the sum coloring (chromatic sum) problem and the sum multi-coloring problem for ...
Given an undirected graph G = ( V , E ) , the minimum sum coloring problem (MSCP) is to find a legal...
We study two Integer Linear Programming (ILP) formulations for the Minimum Sum Coloring Problem (MSC...