Abstract
Boolean-width is similar to clique-width, rank-width and NLC-width in that all these graph parameters are constantly bounded on the same classes of graphs. In many classes where these parameters are not constantly bounded, boolean-width is distinguished by its much lower value, such as in permutation graphs and interval graphs where boolean-width was shown to be O(logn) [1]. Together with FPT algorithms having runtime O *(c boolw) for a constant c this helped explain why a variety of problems could be solved in polynomial-time on these graph classes.
In this paper we continue this line of research and establish non-trivial upper-bounds on the boolean-width and linear boolean-width of any graph. Again we combine these bounds with FPT algorithms having runtime O *(c boolw), now to give a common framework of moderately-exponential exact algorithms that beat brute-force search for several independence and domination-type problems, on general graphs.
Boolean-width is closely related to the number of maximal independent sets in bipartite graphs. Our main result breaking the triviality bound of n/3 for boolean-width and n/2 for linear boolean-width is proved by new techniques for bounding the number of maximal independent sets in bipartite graphs.
This is a preview of subscription content, log in via an institution.
Buying options
Tax calculation will be finalised at checkout
Purchases are for personal use only
Learn about institutional subscriptionsPreview
Unable to display preview. Download preview PDF.
References
Belmonte, R., Vatshelle, M.: Graph classes with structured neighborhoods and algorithmic applications. In: TCS (2013), http://dx.doi.org/10.1016/j.tcs.2013.01.011
Bui-Xuan, B.-M., Telle, J.A., Vatshelle, M.: Boolean-width of graphs. Theoretical Computer Science 412(39), 5187–5204 (2011)
Rödl, V., Duffus, D., Frankl, P.: Maximal independent sets in bipartite graphs obtained from boolean lattices. Eur. J. Comb. 32(1), 1–9 (2011)
Fomin, F.V., Kratsch, D.: Exact Exponential Algorithms, 1st edn. Texts in Theoretical Computer Science (2010)
Füredi, Z.: The number of maximal independent sets in connected graphs. Journal of Graph Theory 11(4), 463–470 (1987)
Hlinený, P., Oum, S.I.: Finding branch-decompositions and rank-decompositions. SIAM J. Comput. 38(3), 1012–1032 (2008)
Hoeffding, W.: Probability inequalities for sums of bounded random variables. Journal of the American Statistical Association 58(301), 13–30 (1963)
Ilinca, L., Kahn, J.: Counting maximal antichains and independent sets. Order 30(2), 427–435 (2013)
Kim, K.H.: Boolean matrix theory and its applications. Monographs and textbooks in pure and applied mathematics. Marcel Dekker (1982)
Vadhan, S.P.: The complexity of counting in sparse, regular, and planar graphs. SIAM Journal on Computing 31, 398–427 (1997)
Vatshelle, M.: New Width Parameters of Graphs. PhD thesis, University of Bergen (2012) ISBN:978-82-308-2098-8
Author information
Authors and Affiliations
Editor information
Editors and Affiliations
Rights and permissions
Copyright information
© 2013 Springer International Publishing Switzerland
About this paper
Cite this paper
Rabinovich, Y., Telle, J.A., Vatshelle, M. (2013). Upper Bounds on Boolean-Width with Applications to Exact Algorithms. In: Gutin, G., Szeider, S. (eds) Parameterized and Exact Computation. IPEC 2013. Lecture Notes in Computer Science, vol 8246. Springer, Cham. https://doi.org/10.1007/978-3-319-03898-8_26
Download citation
DOI: https://doi.org/10.1007/978-3-319-03898-8_26
Publisher Name: Springer, Cham
Print ISBN: 978-3-319-03897-1
Online ISBN: 978-3-319-03898-8
eBook Packages: Computer ScienceComputer Science (R0)