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NETWORKS
2010
2010
A branch-and-cut algorithm for partition coloring
Let G = (V, E, Q) be a undirected graph, where V is the set of vertices, E is the set of edges, and Q = {Q1, . . . , Qq} is a partition of V into q subsets. We refer to Q1, . . . , Qq as the components of the partition. The Partition Coloring Problem (PCP) consists of finding a subset V ′ of V with exactly one vertex from each component Q1, . . . , Qq and such that the chromatic number of the graph induced in G by V ′ is minimum. This problem is a generalization of the graph coloring problem. This work presents a branchand-cut algorithm proposed for PCP. An integer programming formulation and valid inequalities are proposed. A tabu search heuristic is used for providing primal bounds. Computational experiments are reported for random graphs and for PCP instances originating from the problem of routing and wavelength assignment in all-optical WDM networks.
Real-time TrafficAll-optical Wdm Networks | Computer Networks | Integer Programming Formulation | NETWORKS 2010 | Partition Coloring Problem |
| Added | 29 Jan 2011 |
| Updated | 29 Jan 2011 |
| Type | Journal |
| Year | 2010 |
| Where | NETWORKS |
| Authors | Yuri Frota, Nelson Maculan, Thiago F. Noronha, Celso C. Ribeiro |
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