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  1. Pure type systems with more liberal rules.Martin Bunder & Wil Dekkers - 2001 - Journal of Symbolic Logic 66 (4):1561-1580.
    Pure Type Systems, PTSs, introduced as a generalisation of the type systems of Barendregt's lambda-cube, provide a foundation for actual proof assistants, aiming at the mechanic verification of formal proofs. In this paper we consider simplifications of some of the rules of PTSs. This is of independent interest for PTSs as this produces more flexible PTS-like systems, but it will also help, in a later paper, to bridge the gap between PTSs and systems of Illative Combinatory Logic. First we consider (...)
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  • A weak absolute consistency proof for some systems of illative combinatory logic.M. W. Bunder - 1983 - Journal of Symbolic Logic 48 (3):771-776.
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  • Arithmetic based on the church numerals in illative combinatory logic.M. W. Bunder - 1988 - Studia Logica 47 (2):129 - 143.
    In the early thirties, Church developed predicate calculus within a system based on lambda calculus. Rosser and Kleene developed Arithmetic within this system, but using a Godelization technique showed the system to be inconsistent.Alternative systems to that of Church have been developed, but so far more complex definitions of the natural numbers have had to be used. The present paper based on a system of illative combinatory logic developed previously by the author, does allow the use of the Church numerals. (...)
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  • (1 other version)Some Inconsistencies in Illative Combinatory Logic.M. W. Bunder - 1974 - Zeitschrift fur mathematische Logik und Grundlagen der Mathematik 20 (13-18):199-201.
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  • Equivalences between Pure Type Systems and Systems of Illative Combinatory Logic.M. W. Bunder & W. J. M. Dekkers - 2005 - Notre Dame Journal of Formal Logic 46 (2):181-205.
    Pure Type Systems, PTSs, were introduced as a generalization of the type systems of Barendregt's lambda cube and were designed to provide a foundation for actual proof assistants which will verify proofs. Systems of illative combinatory logic or lambda calculus, ICLs, were introduced by Curry and Church as a foundation for logic and mathematics. In an earlier paper we considered two changes to the rules of the PTSs which made these rules more like ICL rules. This led to four kinds (...)
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  • Systems of illative combinatory logic complete for first-order propositional and predicate calculus.Henk Barendregt, Martin Bunder & Wil Dekkers - 1993 - Journal of Symbolic Logic 58 (3):769-788.
    Illative combinatory logic consists of the theory of combinators or lambda calculus extended by extra constants (and corresponding axioms and rules) intended to capture inference. The paper considers systems of illative combinatory logic that are sound for first-order propositional and predicate calculus. The interpretation from ordinary logic into the illative systems can be done in two ways: following the propositions-as-types paradigm, in which derivations become combinators or, in a more direct way, in which derivations are not translated. Both translations are (...)
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  • (1 other version)Some Inconsistencies in Illative Combinatory Logic.M. W. Bunder - 1974 - Mathematical Logic Quarterly 20 (13‐18):199-201.
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  • Some consistency proofs and a characterization of inconsistency proofs in illative combinatory logic.M. W. Bunder - 1987 - Journal of Symbolic Logic 52 (1):89-110.
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  • Paraconsistent Combinatory Logic,„.M. W. Bunder - 1979 - Bulletin of the Section of Logic 8 (4):177-180.
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