On the complexity of some colorful problems parameterized by treewidth

Fellows, Michael R. ; Fomin, Fedor V. ; Lokshtanov, Daniel ; Rosamond, Frances ; Saurabh, Saket ; Szeider, Stefan ; Thomassen, Carsten (2011) On the complexity of some colorful problems parameterized by treewidth Information and Computation, 209 (2). pp. 143-153. ISSN 0890-5401

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Official URL: http://doi.org/10.1016/j.ic.2010.11.026

Related URL: http://dx.doi.org/10.1016/j.ic.2010.11.026

Abstract

In this paper, we study the complexity of several coloring problems on graphs, parameterized by the treewidth of the graph. 1. The List Coloring problem takes as input a graph G, together with an assignment to each vertex v of a set of colors Cv. The problem is to determine whether it is possible to choose a color for vertex v from the set of permitted colors Cv, for each vertex, so that the obtained coloring of G is proper. We show that this problem is W[1]-hard, parameterized by the treewidth of G. The closely related Precoloring Extension problem is also shown to be W[1]-hard, parameterized by treewidth. 2. An equitable coloring of a graph G is a proper coloring of the vertices where the numbers of vertices having any two distinct colors differs by at most one. We show that the problem is hard for W[1], parameterized by the treewidth plus the number of colors. We also show that a list-based variation, List Equitable Coloring is W[1]-hard for forests, parameterized by the number of colors on the lists. 3. The list chromatic number χl(G) of a graph G is defined to be the smallest positive integer r, such that for every assignment to the vertices v of G, of a list Lv of colors, where each list has length at leastr, there is a choice of one color from each vertex list Lv yielding a proper coloring of G. We show that the problem of determining whether χl(G) ≤ r, the List Chromatic Number problem, is solvable in linear time on graphs of constant treewidth.

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