Polyhedral studies on the convex recoloring problem |
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| Affiliation: | 1. Departamento de Estatística e Matemática Aplicada, Universidade Federal do Ceará, Brazil;2. Escola de Artes, Ciências e Humanidades – Universidade de São Paulo, Brazil;3. Instituto de Matemática e Estatística – Universidade de São Paulo, Brazil;1. Institute of Math. Sciences, IV Cross Road, Taramani, Chennai 600 113, India;2. School of Comp. Science, Simon Fraser University, Burnaby, Canada V5A 1S6;3. DIMAP and Math. Institute, University of Warwick, Coventry CV4 7AL, UK |
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| Abstract: | ![]()
A coloring of the vertices of a graph G is convex if, for each assigned color d, the vertices with color d induce a connected subgraph of G. We address the convex recoloring problem, defined as follows. Given a graph G and a coloring of its vertices, recolor a minimum number of vertices of G, so that the resulting coloring is convex. This problem is known to be NP-hard even when G is a path. We show an integer programming formulation for the weighted version of this problem on arbitrary graphs, and then specialize it for trees. We study the facial structure of the polytope defined as the convex hull of the integer points satisfying the restrictions of the proposed ILP formulation, present several classes of facet-defining inequalities and discuss separation algorithms. |
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| Keywords: | Convex coloring facets integer linear programming polyhedral study |
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