On parse trees and Myhill-Nerode-type tools for handling graphs of bounded rank-width

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Authors	GANIAN Robert HLINĚNÝ Petr
Year of publication	2010
Type	Article in Periodical
Magazine / Source	Discrete Applied Mathematics
MU Faculty or unit	Faculty of Informatics
Citation
Web	DOI
Field	Informatics
Keywords	rank-width; parameterized algorithms; graphs
Description	Rank-width is a structural graph measure introduced by Oum and Seymour and aimed at better handling of graphs of bounded clique-width. We propose a formal mathematical framework and tools for easy design of dynamic algorithms running directly on a rankdecomposition of a graph (on contrary to the usual approach which translates a rank decomposition into a clique-width expression, with a possible exponential jump in the parameter). The main advantage of this framework is a fine control over the runtime dependency on the rank-width parameter. Our new approach is linked to a work of Courcelle and Kanté [7] who first proposed algebraic expressions with a so-called bilinear graph product as a better way of handling rank-decompositions, and to a parallel recent research of Bui-Xuan, Telle and Vatshelle.
Related projects:	Highly Parallel and Distributed Computing Systems Utilization of Structural and Width Parametres in Combinatorics and Algorithmic Complexity Structural graph theory and parameterized complexity Parameterized Algorithms and Width measures on Graphs Rozsáhlé výpočetní systémy: modely, aplikace a verifikace