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Nondeterministic Graph Searching: From Pathwidth to Treewidth.

Authors :
Fedor Fomin
Pierre Fraigniaud
Nicolas Nisse
Source :
Algorithmica; Mar2009, Vol. 53 Issue 3, p358-373, 16p
Publication Year :
2009

Abstract

Abstract   We introduce nondeterministic graph searching with a controlled amount of nondeterminism and show how this new tool can be used in algorithm design and combinatorial analysis applying to both pathwidth and treewidth. We prove equivalence between this game-theoretic approach and graph decompositions called q -branched tree decompositions, which can be interpreted as a parameterized version of tree decompositions. Path decomposition and (standard) tree decomposition are two extreme cases of q-branched tree decompositions. The equivalence between nondeterministic graph searching and q-branched tree decomposition enables us to design an exact (exponential time) algorithm computing q-branched treewidth for all q≥0, which is thus valid for both treewidth and pathwidth. This algorithm performs as fast as the best known exact algorithm for pathwidth. Conversely, this equivalence also enables us to design a lower bound on the amount of nondeterminism required to search a graph with the minimum number of searchers. [ABSTRACT FROM AUTHOR]

Details

Language :
English
ISSN :
01784617
Volume :
53
Issue :
3
Database :
Complementary Index
Journal :
Algorithmica
Publication Type :
Academic Journal
Accession number :
36637841
Full Text :
https://doi.org/10.1007/s00453-007-9041-6