Separating NE from Some Nonuniform Nondeterministic Complexity Classes

Fu, Bin; Li, Angsheng; Zhang, Liyu

doi:10.1007/978-3-642-02882-3_48

Bin Fu¹⁷,
Angsheng Li¹⁸ &
Liyu Zhang¹⁹

Part of the book series: Lecture Notes in Computer Science ((LNTCS,volume 5609))

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International Computing and Combinatorics Conference

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Abstract

We investigate the question whether NE can be separated from the reduction closures of tally sets, sparse sets and NP. We show that (1) \({\rm NE}\not\subseteq R^{{\rm NP}}_{n^{o(1)}-T}({\rm TALLY})\); (2)\({\rm NE}\not\subseteq R^{SN}_m({\rm SPARSE})\); and (3) \({\rm NE}\not\subseteq {\rm P}^{{\rm NP}}_{n^k-T}/n^k\) for all k ≥ 1. Result (3) extends a previous result by Mocas to nonuniform reductions. We also investigate how different an NE-hard set is from an NP-set. We show that for any NP subset A of a many-one-hard set H for NE, there exists another NP subset A′ of H such that A′ ⊇ A and A′ − A is not of sub-exponential density.

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References

Berman, L., Hartmanis, J.: On isomorphisms and density of NP and other complete sets. SIAM Journal on Computing 6(2), 305–322 (1977)
Google Scholar
Burtschick, H.-J., Lindner, W.: On sets Turing reducible to p-selective sets. Theory of Computing Systems 30, 135–143 (1997)
Google Scholar
Buhrman, H., Torenvliet, L.: On the Cutting Edge of Relativization: The Resource Bounded Injury Method. In: Shamir, E., Abiteboul, S. (eds.) ICALP 1994. LNCS, vol. 820, pp. 263–273. Springer, Heidelberg (1994)
Google Scholar
Cook, S.: A Hierarchy for Nondeterministic Time Complexity. J. Comput. Syst. Sci. 7(4), 343–353 (1973)
Google Scholar
Cai, J., Sivakumar, D.: Sparse hard sets for P: resolution of a conjecture of hartmanis. Journal of Computer and System Sciences (0022-0000) 58(2), 280–296 (1999)
Google Scholar
Fu, B.: On lower bounds of the closeness between complexity classes. Mathematical Systems Theory 26(2), 187–202 (1993)
Google Scholar
Fu, B., Li, H., Zhong, Y.: Some properties of exponential time complexity classes. In: Proceedings 7th IEEE Annual Conference on Structure in Complexity Theory, pp. 50–57 (1992)
Google Scholar
Ganesan, K., Homer, S.: Complete Problems and Strong Polynomial Reducibilities. SIAM J. Comput. 21(4), 733–742 (1992)
Google Scholar
Hemaspaandra, L., Ogihara, M.: The Complexity Theory Companion. Texts in Theoretical Computer Science - An EATCS Series. Springer, Heidelberg (2002)
Google Scholar
Hemaspaandra, L., Torenvliet, L.: Theory of Semi-Feasible Algorithms. Springer, Heidelberg (2003)
Google Scholar
Homer, S., Selman, A.: Computability and Complexity Theory. In: Texts in Computer Science. Springer, New York (2001)
Google Scholar
Karp, R., Lipton, R.: Some connections between nonuniform and uniform complexity classes. In: Proceedings of the twelfth annual ACM symposium on theory of computing, pp. 302–309 (1980)
Google Scholar
Mahaney, S.: Sparse complete sets for NP: Solution of a conjecture of berman and hartmanis. Journal of Computer and Systems Sciences 25(2), 130–143 (1982)
Google Scholar
Mocas, S.: Separating classes in the exponential-time hierarchy from classes in PH. Theoretical Computer Science 158, 221–231 (1996)
Google Scholar
Ogihara, M., Tantau, T.: On the reducibility of sets inside NP to sets with low information content. Journal of Computer and System Sciences 69, 499–524 (2004)
Google Scholar
Ogiwara, M.: On P-closeness of polynomial-time hard sets (unpublished manuscript, 1991)
Google Scholar
Ogiwara, M., Watanabe, O.: On polynomial-time bounded truth-table reducibility of NP sets to sparse sets. SIAM Journal on Computing 20(3), 471–483 (1991)
Google Scholar
Selman, A.: P-selective sets, tally languages and the behavior of polynomial time reducebilities on NP. Mathematical Systems Theory 13, 55–65 (1979)
Google Scholar
Yesha, Y.: On certain polynomial-time truth-table reducibilities of complete sets to sparse sets. SIAM Journal on Computing 12(3), 411–425 (1983)
Google Scholar

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Authors and Affiliations

Dept. of Computer Science, University of Texas, Pan American, TX, 78539, USA
Bin Fu
Institute of Software, Chinese Academy of Sciences, Beijing, P.R. China
Angsheng Li
Department of Computer and Information Sciences, University of Texas at Brownsville, Brownsville, TX, 78520, USA
Liyu Zhang

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Bin Fu
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Angsheng Li
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Liyu Zhang
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Computer Science and Engineering Department, State University of New York at Buffalo, 201 Bell Hall, 14260, Amherst, NY, USA
Hung Q. Ngo

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Fu, B., Li, A., Zhang, L. (2009). Separating NE from Some Nonuniform Nondeterministic Complexity Classes. In: Ngo, H.Q. (eds) Computing and Combinatorics. COCOON 2009. Lecture Notes in Computer Science, vol 5609. Springer, Berlin, Heidelberg. https://doi.org/10.1007/978-3-642-02882-3_48

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DOI: https://doi.org/10.1007/978-3-642-02882-3_48
Publisher Name: Springer, Berlin, Heidelberg
Print ISBN: 978-3-642-02881-6
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