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Sibirskii Matematicheskii Zhurnal, 2009, Volume 50, Number 2, Pages 243–249
(Mi smj1953)
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This article is cited in 3 scientific papers (total in 3 papers)
The polynomial bounds of proof complexity in Frege systems
S. R. Aleksanyana, A. A. Chubaryanb a Faculty of Applied Mathematics of SEUA, Yerevan, Armenia
b Faculty of Informatics and Applied Mathematics of YeSU, Yerevan, Armenia
Abstract:
The concept of a determinative set of variables for a propositional formula was introduced by one of the authors, which made it possible to distinguish the set of hard-determinable formulas. The proof complexity of a formula of this sort has exponential lower bounds in some proof systems of classical propositional calculus (cut-free sequent system, resolution system, analytic tableaux, cutting planes, and bounded Frege systems). In this paper we prove that the property of hard-determinability is insufficient for obtaining a superpolynomial lower bound of proof lines (sizes) in Frege systems: an example of a sequence of hard-determinable formulas is given whose proof complexities are polynomially bounded in every Frege system.
Keywords:
proof complexity, Frege system, determinative conjunct, determinative set, hard-determinable formula.
Received: 02.02.2008 Revised: 08.10.2008
Citation:
S. R. Aleksanyan, A. A. Chubaryan, “The polynomial bounds of proof complexity in Frege systems”, Sibirsk. Mat. Zh., 50:2 (2009), 243–249; Siberian Math. J., 50:2 (2009), 193–198
Linking options:
https://www.mathnet.ru/eng/smj1953 https://www.mathnet.ru/eng/smj/v50/i2/p243
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