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  1. Hypersequents and the proof theory of intuitionistic fuzzy logic.Matthias Baaz & Richard Zach - 2000 - In Clote Peter G. & Schwichtenberg Helmut (eds.), Computer Science Logic. 14th International Workshop, CSL 2000. Springer. pp. 187– 201.
    Takeuti and Titani have introduced and investigated a logic they called intuitionistic fuzzy logic. This logic is characterized as the first-order Gödel logic based on the truth value set [0,1]. The logic is known to be axiomatizable, but no deduction system amenable to proof-theoretic, and hence, computational treatment, has been known. Such a system is presented here, based on previous work on hypersequent calculi for propositional Gödel logics by Avron. It is shown that the system is sound and complete, and (...)
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  • Recherches Sur la Th”Eorie de la D”Emonstration.J. Herbrand - 1930 - Dissertation, Universit’e de Paris
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  • Identity and Existence in Intuitionistic Logic.Dana Scott, M. P. Fourman, C. J. Mulvey & D. S. Scott - 1985 - Journal of Symbolic Logic 50 (2):548-549.
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  • Gentzen Calculi for the Existence Predicate.Matthias Baaz & Rosalie Iemhoff - 2006 - Studia Logica 82 (1):7-23.
    We introduce Gentzen calculi for intuitionistic logic extended with an existence predicate. Such a logic was first introduced by Dana Scott, who provided a proof system for it in Hilbert style. We prove that the Gentzen calculus has cut elimination in so far that all cuts can be restricted to very simple ones. Applications of this logic to Skolemization, truth value logics and linear frames are also discussed.
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  • On Skolemization in constructive theories.Matthias Baaz & Rosalie Iemhoff - 2008 - Journal of Symbolic Logic 73 (3):969-998.
    In this paper a method for the replacement, in formulas, of strong quantifiers by functions is introduced that can be considered as an alternative to Skolemization in the setting of constructive theories. A constructive extension of intuitionistic predicate logic that captures the notions of preorder and existence is introduced and the method, orderization, is shown to be sound and complete with respect to this logic. This implies an analogue of Herbrand's theorem for intuitionistic logic. The orderization method is applied to (...)
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  • Sequent calculus proof theory of intuitionistic apartness and order relations.Sara Negri - 1999 - Archive for Mathematical Logic 38 (8):521-547.
    Contraction-free sequent calculi for intuitionistic theories of apartness and order are given and cut-elimination for the calculi proved. Among the consequences of the result is the disjunction property for these theories. Through methods of proof analysis and permutation of rules, we establish conservativity of the theory of apartness over the theory of equality defined as the negation of apartness, for sequents in which all atomic formulas appear negated. The proof extends to conservativity results for the theories of constructive order over (...)
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  • Elementary intuitionistic theories.C. Smorynski - 1973 - Journal of Symbolic Logic 38 (1):102-134.
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  • The Skolemization of existential quantifiers in intuitionistic logic.Matthias Baaz & Rosalie Iemhoff - 2006 - Annals of Pure and Applied Logic 142 (1):269-295.
    In this paper an alternative Skolemization method is introduced that, for a large class of formulas, is sound and complete with respect to intuitionistic logic. This class extends the class of formulas for which standard Skolemization is sound and complete and includes all formulas in which all strong quantifiers are existential. The method makes use of an existence predicate first introduced by Dana Scott.
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