DocumentCode
2264290
Title
Graph decompositions and factorizing permutations
Author
Capelle, Christian ; Habib, Michel
Author_Institution
LIRMM, CNRS, Montpellier, France
fYear
1997
fDate
17-19 Jun 1997
Firstpage
132
Lastpage
143
Abstract
A factorizing permutation of a given undirected graph is simply a permutation of the vertices in which all decomposition sets appear to be factors. Such a concept seems to play a central role in recent papers dealing with graph decomposition. We apply it to modular decomposition and we propose a linear algorithm that computes the whole decomposition tree when a factorizing permutation is provided. This algorithm can be seen as a common generalization of (Ma and Hsu, 1991) for modular decomposition of chordal graphs and (Habib et al., 1995) for inheritance graph decomposition. It also suggests many new decomposition algorithms for various notions of graph decompositions
Keywords
graph theory; optimisation; trees (mathematics); chordal graphs; decomposition algorithms; decomposition sets; decomposition tree; factorizing permutations; graph decompositions; inheritance graph decomposition; linear algorithm; modular decomposition; optimization; undirected graph; vertices; Genetic mutations; Optimization methods; Tree graphs;
fLanguage
English
Publisher
ieee
Conference_Titel
Theory of Computing and Systems, 1997., Proceedings of the Fifth Israeli Symposium on
Conference_Location
Ramat-Gan
Print_ISBN
0-8186-8037-7
Type
conf
DOI
10.1109/ISTCS.1997.595165
Filename
595165
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