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.
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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
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© 2013 Springer International Publishing Switzerland
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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
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DOI: https://doi.org/10.1007/978-3-319-03898-8_26
Publisher Name: Springer, Cham
Print ISBN: 978-3-319-03897-1
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