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  1. Harrington’s conservation theorem redone.Fernando Ferreira & Gilda Ferreira - 2008 - Archive for Mathematical Logic 47 (2):91-100.
    Leo Harrington showed that the second-order theory of arithmetic WKL 0 is ${\Pi^1_1}$ -conservative over the theory RCA 0. Harrington’s proof is model-theoretic, making use of a forcing argument. A purely proof-theoretic proof, avoiding forcing, has been eluding the efforts of researchers. In this short paper, we present a proof of Harrington’s result using a cut-elimination argument.
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  • Derived sequences and reverse mathematics.Jeffry L. Hirst - 1993 - Mathematical Logic Quarterly 39 (1):447-453.
    One of the earliest applications of transfinite numbers is in the construction of derived sequences by Cantor [2]. In [6], the existence of derived sequences for countable closed sets is proved in ATR0. This existence theorem is an intermediate step in a proof that a statement concerning topological comparability is equivalent to ATR0. In actuality, the full strength of ATR0 is used in proving the existence theorem. To show this, we will derive a statement known to be equivalent to ATR0, (...)
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  • On the logical and computational properties of the Vitali covering theorem.Dag Normann & Sam Sanders - 2025 - Annals of Pure and Applied Logic 176 (1):103505.
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  • (1 other version)Weak axioms of determinacy and subsystems of analysis I: δ20 games.Kazuyuki Tanaka - 1990 - Zeitschrift fur mathematische Logik und Grundlagen der Mathematik 36 (6):481-491.
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  • The Constructive Hilbert Program and the Limits of Martin-Löf Type Theory.Michael Rathjen - 2005 - Synthese 147 (1):81-120.
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  • Structure of semisimple rings in reverse and computable mathematics.Huishan Wu - 2023 - Archive for Mathematical Logic 62 (7):1083-1100.
    This paper studies the structure of semisimple rings using techniques of reverse mathematics, where a ring is left semisimple if the left regular module is a finite direct sum of simple submodules. The structure theorem of left semisimple rings, also called Wedderburn-Artin Theorem, is a famous theorem in noncommutative algebra, says that a ring is left semisimple if and only if it is isomorphic to a finite direct product of matrix rings over division rings. We provide a proof for the (...)
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  • The Dirac delta function in two settings of Reverse Mathematics.Sam Sanders & Keita Yokoyama - 2012 - Archive for Mathematical Logic 51 (1-2):99-121.
    The program of Reverse Mathematics (Simpson 2009) has provided us with the insight that most theorems of ordinary mathematics are either equivalent to one of a select few logical principles, or provable in a weak base theory. In this paper, we study the properties of the Dirac delta function (Dirac 1927; Schwartz 1951) in two settings of Reverse Mathematics. In particular, we consider the Dirac Delta Theorem, which formalizes the well-known property \documentclass[12pt]{minimal} \usepackage{amsmath} \usepackage{wasysym} \usepackage{amsfonts} \usepackage{amssymb} \usepackage{amsbsy} \usepackage{mathrsfs} \usepackage{upgreek} \setlength{\oddsidemargin}{-69pt} (...)
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  • An incompleteness theorem for β n -models.Carl Mummert & Stephen G. Simpson - 2004 - Journal of Symbolic Logic 69 (2):612-616.
    Let n be a positive integer. By a $\beta_{n}-model$ we mean an $\omega-model$ which is elementary with respect to $\sigma_{n}^{1}$ formulas. We prove the following $\beta_{n}-model$ version of $G\ddot{o}del's$ Second Incompleteness Theorem. For any recursively axiomatized theory S in the language of second order arithmetic, if there exists a $\beta_{n}-model$ of S, then there exists a $\beta_{n}-model$ of S + "there is no countable $\beta_{n}-model$ of S". We also prove a $\beta_{n}-model$ version of $L\ddot{o}b's$ Theorem. As a corollary, we obtain (...)
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  • Working foundations.Solomon Feferman - 1985 - Synthese 62 (2):229 - 254.
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  • (1 other version)On Weak Theories of Sets and Classes which are Based on Strict ∏11-REFLECTION.Andrea Cantini - 1985 - Zeitschrift fur mathematische Logik und Grundlagen der Mathematik 31 (21-23):321-332.
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