Generalized coloring for tree-like graphs
Identifieur interne : 002444 ( Main/Exploration ); précédent : 002443; suivant : 002445Generalized coloring for tree-like graphs
Auteurs : Klaus Jansen [Allemagne] ; Petra Scheffler [Allemagne]Source :
- Discrete Applied Mathematics [ 0166-218X ] ; 1997.
Descripteurs français
- Pascal (Inist)
English descriptors
- KwdEn :
Abstract
We discuss the Precoloring Extension (PrExt) and the List Coloring (LiCol) problems for trees, partial k-trees and cographs in the decision and the construction versions. Both problems for partial k-trees are solved in linear time when the number of colors is bounded by a constant and in polynomial time for an unbounded number of colors. For trees, we improve this to linear time. In contrast to that, the two problems differ in complexity for cographs. While PrExt has a linear-time decision algorithm, LiCol is shown to be NP-complete. We give polynomial-time algorithms for the corresponding enumeration problems # PrExt and # LiCol on partial k-trees and trees and for # PrExt on cographs.
Url:
DOI: 10.1016/S0166-218X(96)00085-6
Affiliations:
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Le document en format XML
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<front><div type="abstract" xml:lang="en">We discuss the Precoloring Extension (PrExt) and the List Coloring (LiCol) problems for trees, partial k-trees and cographs in the decision and the construction versions. Both problems for partial k-trees are solved in linear time when the number of colors is bounded by a constant and in polynomial time for an unbounded number of colors. For trees, we improve this to linear time. In contrast to that, the two problems differ in complexity for cographs. While PrExt has a linear-time decision algorithm, LiCol is shown to be NP-complete. We give polynomial-time algorithms for the corresponding enumeration problems # PrExt and # LiCol on partial k-trees and trees and for # PrExt on cographs.</div>
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