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  1. A generalization of the Second Incompleteness Theorem and some exceptions to it.Dan E. Willard - 2006 - Annals of Pure and Applied Logic 141 (3):472-496.
    This paper will introduce the notion of a naming convention and use this paradigm to both develop a new version of the Second Incompleteness Theorem and to describe when an axiom system can partially evade the Second Incompleteness Theorem.
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  • Passive induction and a solution to a Paris–Wilkie open question.Dan E. Willard - 2007 - Annals of Pure and Applied Logic 146 (2-3):124-149.
    In 1981, Paris and Wilkie raised the open question about whether and to what extent the axiom system did satisfy the Second Incompleteness Theorem under Semantic Tableaux deduction. Our prior work showed that the semantic tableaux version of the Second Incompleteness Theorem did generalize for the most common definition of appearing in the standard textbooks.However, there was an alternate interesting definition of this axiom system in the Wilkie–Paris article in the Annals of Pure and Applied Logic 35 , pp. 261–302 (...)
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  • On the Herbrand Notion of Consistency for Finitely Axiomatizable Fragments of Bounded Arithmetic Theories.Leszek Aleksander Kołodziejczyk - 2006 - Journal of Symbolic Logic 71 (2):624 - 638.
    Modifying the methods of Z. Adamowicz's paper Herbrand consistency and bounded arithmetic [3] we show that there exists a number n such that ⋃m Sm (the union of the bounded arithmetic theories Sm) does not prove the Herbrand consistency of the finitely axiomatizable theory $S_{3}^{n}$.
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  • Delineating classes of computational complexity via second order theories with weak set existence principles. I.Aleksandar Ignjatović - 1995 - Journal of Symbolic Logic 60 (1):103-121.
    Aleksandar Ignjatović. Delineating Classes of Computational Complexity via Second Order Theories with Weak Set Existence Principles (I).
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  • Consistency proof of a fragment of pv with substitution in bounded arithmetic.Yoriyuki Yamagata - 2018 - Journal of Symbolic Logic 83 (3):1063-1090.
    This paper presents proof that Buss's S22 can prove the consistency of a fragment of Cook and Urquhart's PV from which induction has been removed but substitution has been retained. This result improves Beckmann's result, which proves the consistency of such a system without substitution in bounded arithmetic S12. Our proof relies on the notion of "computation" of the terms of PV. In our work, we first prove that, in the system under consideration, if an equation is proved and either (...)
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  • An exploration of the partial respects in which an axiom system recognizing solely addition as a total function can verify its own consistency.Dan E. Willard - 2005 - Journal of Symbolic Logic 70 (4):1171-1209.
    This article will study a class of deduction systems that allow for a limited use of the modus ponens method of deduction. We will show that it is possible to devise axiom systems α that can recognize their consistency under a deduction system D provided that: (1) α treats multiplication as a 3-way relation (rather than as a total function), and that (2) D does not allow for the use of a modus ponens methodology above essentially the levels of Π1 (...)
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  • A Model of $\widehat{R}^2_3$ inside a Subexponential Time Resource.Eugenio Chinchilla - 1998 - Notre Dame Journal of Formal Logic 39 (3):307-324.
    Using nonstandard methods we construct a model of an induction scheme called inside a "resource" of the form is a Turing machine of code is calculated in less than , where means the length of the binary expansion of and are nonstandard parameters in a model of . As a consequence we obtain a model theoretic proof of a witnessing theorem for this theory by functions computable in time , a result first obtained by Buss, Krajícek, and Takeuti using proof (...)
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  • (1 other version)Proving consistency of equational theories in bounded arithmetic.Arnold Beckmann† - 2002 - Journal of Symbolic Logic 67 (1):279-296.
    We consider equational theories for functions defined via recursion involving equations between closed terms with natural rules based on recursive definitions of the function symbols. We show that consistency of such equational theories can be proved in the weak fragment of arithmetic S 1 2 . In particular this solves an open problem formulated by TAKEUTI (c.f. [5, p.5 problem 9.]).
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