Add to ORKGIn this paper, we continue the investigation made in [MT05] about the approximability of Pk partition problems, but focusing here on their complexity. Precisely, we aim at designing the frontier between polynomial and NP-complete versions of the Pk partition problem in bipartite graphs, according to both the constant k and the maximum degree of the input graph. We actually extend the obtained results to more general classes of problems, namely, the minimum k-path partition problem and the maximum Pk packing problem. Moreover, we propose some simple approximation algorithms for those problems.ou
Graph partitioning problems enjoy many practical applications as well as algorithmic and theoretical...
AbstractThis article presents an infinite family of combinatorial problems that shows abrupt changes...
The Satisfactory Partition problem consists in deciding if a given graph has apartition of its verte...
Abstract. In this paper, we continue the investigation made in [11] about the approximability of Pk ...
In this paper, we continue the investigation made in [MT05] about the approximability of Pk partitio...
In this paper, we continue the investigation made in [MT05] about the approximability of Pk partitio...
International audienceIn this paper, we continue the investigation made in [MT05] about the approxim...
In this paper, we continue the investigation proposed in [15] about the approximability of P k p...
We prove that it is NP-complete to decide whether a bipartite graph of maximum degree three on nk ve...
AbstractExtending previous NP-completeness results for the harmonious coloring problem and the pair-...
Given a graph and a positive integer k, the biclique vertex-partition problem asks whether the verte...
International audienceWe prove that it is NP-complete to decide whether a bipartite graph of maximum...
AbstractThe k-path partition problem is to partition a graph into the minimum number of paths, so th...
Given a positive integer k, the {k}-packing function problem ({k}PF) is to find in a given graph G, ...
AbstractIn this paper partition problems into k independent sets or cliques of bounded size k′ are a...
Graph partitioning problems enjoy many practical applications as well as algorithmic and theoretical...
AbstractThis article presents an infinite family of combinatorial problems that shows abrupt changes...
The Satisfactory Partition problem consists in deciding if a given graph has apartition of its verte...
Abstract. In this paper, we continue the investigation made in [11] about the approximability of Pk ...
In this paper, we continue the investigation made in [MT05] about the approximability of Pk partitio...
In this paper, we continue the investigation made in [MT05] about the approximability of Pk partitio...
International audienceIn this paper, we continue the investigation made in [MT05] about the approxim...
In this paper, we continue the investigation proposed in [15] about the approximability of P k p...
We prove that it is NP-complete to decide whether a bipartite graph of maximum degree three on nk ve...
AbstractExtending previous NP-completeness results for the harmonious coloring problem and the pair-...
Given a graph and a positive integer k, the biclique vertex-partition problem asks whether the verte...
International audienceWe prove that it is NP-complete to decide whether a bipartite graph of maximum...
AbstractThe k-path partition problem is to partition a graph into the minimum number of paths, so th...
Given a positive integer k, the {k}-packing function problem ({k}PF) is to find in a given graph G, ...
AbstractIn this paper partition problems into k independent sets or cliques of bounded size k′ are a...
Graph partitioning problems enjoy many practical applications as well as algorithmic and theoretical...
AbstractThis article presents an infinite family of combinatorial problems that shows abrupt changes...
The Satisfactory Partition problem consists in deciding if a given graph has apartition of its verte...