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  1. Higher complexity search problems for bounded arithmetic and a formalized no-gap theorem.Neil Thapen - 2011 - Archive for Mathematical Logic 50 (7):665-680.
    We give a new characterization of the strict $$\forall {\Sigma^b_j}$$ sentences provable using $${\Sigma^b_k}$$ induction, for 1 ≤ j ≤ k. As a small application we show that, in a certain sense, Buss’s witnessing theorem for strict $${\Sigma^b_k}$$ formulas already holds over the relatively weak theory PV. We exhibit a combinatorial principle with the property that a lower bound for it in constant-depth Frege would imply that the narrow CNFs with short depth j Frege refutations form a strict hierarchy with (...)
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  • Interpolation theorems, lower Bounds for proof systems, and independence results for bounded arithmetic.Jan Krajíček - 1997 - Journal of Symbolic Logic 62 (2):457-486.
    A proof of the (propositional) Craig interpolation theorem for cut-free sequent calculus yields that a sequent with a cut-free proof (or with a proof with cut-formulas of restricted form; in particular, with only analytic cuts) with k inferences has an interpolant whose circuit-size is at most k. We give a new proof of the interpolation theorem based on a communication complexity approach which allows a similar estimate for a larger class of proofs. We derive from it several corollaries: (1) Feasible (...)
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  • On the correspondence between arithmetic theories and propositional proof systems – a survey.Olaf Beyersdorff - 2009 - Mathematical Logic Quarterly 55 (2):116-137.
    The purpose of this paper is to survey the correspondence between bounded arithmetic and propositional proof systems. In addition, it also contains some new results which have appeared as an extended abstract in the proceedings of the conference TAMC 2008 [11].Bounded arithmetic is closely related to propositional proof systems; this relation has found many fruitful applications. The aim of this paper is to explain and develop the general correspondence between propositional proof systems and arithmetic theories, as introduced by Krajíček and (...)
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  • Induction rules in bounded arithmetic.Emil Jeřábek - 2020 - Archive for Mathematical Logic 59 (3-4):461-501.
    We study variants of Buss’s theories of bounded arithmetic axiomatized by induction schemes disallowing the use of parameters, and closely related induction inference rules. We put particular emphasis on \ induction schemes, which were so far neglected in the literature. We present inclusions and conservation results between the systems and \ of a new form), results on numbers of instances of the axioms or rules, connections to reflection principles for quantified propositional calculi, and separations between the systems.
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  • A Note on Conservativity Relations among Bounded Arithmetic Theories.Russell Impagliazzo & Jan Krajíček - 2002 - Mathematical Logic Quarterly 48 (3):375-377.
    For all i ≥ 1, Ti+11 is not ∀Σb2-conservative over Ti1.
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  • An unexpected separation result in Linearly Bounded Arithmetic.Arnold Beckmann & Jan Johannsen - 2005 - Mathematical Logic Quarterly 51 (2):191-200.
    The theories Si1 and Ti1 are the analogues of Buss' relativized bounded arithmetic theories in the language where every term is bounded by a polynomial, and thus all definable functions grow linearly in length. For every i, a Σbi+1-formula TOPi, which expresses a form of the total ordering principle, is exhibited that is provable in Si+11 , but unprovable in Ti1. This is in contrast with the classical situation, where Si+12 is conservative over Ti2 w. r. t. Σbi+1-sentences. The independence (...)
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  • Approximate counting and NP search problems.Leszek Aleksander Kołodziejczyk & Neil Thapen - 2022 - Journal of Mathematical Logic 22 (3).
    Journal of Mathematical Logic, Volume 22, Issue 03, December 2022. We study a new class of NP search problems, those which can be proved total using standard combinatorial reasoning based on approximate counting. Our model for this kind of reasoning is the bounded arithmetic theory [math] of [E. Jeřábek, Approximate counting by hashing in bounded arithmetic, J. Symb. Log. 74(3) (2009) 829–860]. In particular, the Ramsey and weak pigeonhole search problems lie in the new class. We give a purely computational (...)
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  • Quantified propositional calculus and a second-order theory for NC1.Stephen Cook & Tsuyoshi Morioka - 2005 - Archive for Mathematical Logic 44 (6):711-749.
    Let H be a proof system for quantified propositional calculus (QPC). We define the Σqj-witnessing problem for H to be: given a prenex Σqj-formula A, an H-proof of A, and a truth assignment to the free variables in A, find a witness for the outermost existential quantifiers in A. We point out that the Σq1-witnessing problems for the systems G*1and G1 are complete for polynomial time and PLS (polynomial local search), respectively. We introduce and study the systems G*0 and G0, (...)
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