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  1. Kripke submodels and universal sentences.Ben Ellison, Jonathan Fleischmann, Dan McGinn & Wim Ruitenburg - 2007 - Mathematical Logic Quarterly 53 (3):311-320.
    We define two notions for intuitionistic predicate logic: that of a submodel of a Kripke model, and that of a universal sentence. We then prove a corresponding preservation theorem. If a Kripke model is viewed as a functor from a small category to the category of all classical models with morphisms between them, then we define a submodel of a Kripke model to be a restriction of the original Kripke model to a subcategory of its domain, where every node in (...)
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  • (1 other version)Submodels of Kripke models.Albert Visser - 2001 - Archive for Mathematical Logic 40 (4):277-295.
    A Kripke model ? is a submodel of another Kripke model ℳ if ? is obtained by restricting the set of nodes of ℳ. In this paper we show that the class of formulas of Intuitionistic Predicate Logic that is preserved under taking submodels of Kripke models is precisely the class of semipositive formulas. This result is an analogue of the Łoś-Tarski theorem for the Classical Predicate Calculus.In Appendix A we prove that for theories with decidable identity we can take (...)
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  • Quantifier Elimination for a Class of Intuitionistic Theories.Ben Ellison, Jonathan Fleischmann, Dan McGinn & Wim Ruitenburg - 2008 - Notre Dame Journal of Formal Logic 49 (3):281-293.
    From classical, Fraïissé-homogeneous, ($\leq \omega$)-categorical theories over finite relational languages, we construct intuitionistic theories that are complete, prove negations of classical tautologies, and admit quantifier elimination. We also determine the intuitionistic universal fragments of these theories.
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  • Partially-Elementary Extension Kripke Models: A Characterization and Applications.Tomasz Połacik - 2006 - Logic Journal of the IGPL 14 (1):73-86.
    A Kripke model for a first order language is called a partially-elementary extension model if its accessibility relation is not merely a submodel relation but a stronger relation of being an elementary submodel with respect to some class of fromulae. As a main result of the paper, we give a characterization of partially-elementary extension Kripke models. Throughout the paper we exploit a generalized version of the hierarchy of first order formulae introduced by W. Burr. We present some applications of partially-elementary (...)
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  • Back and Forth Between Modal Logic and Classical Logic.Hajnal Andreka, Johan van Benthem & Istvan Nemeti - 1995 - Logic Journal of the IGPL 3 (5):685-720.
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  • (1 other version)Fragments of Heyting arithmetic.Wolfgang Burr - 2000 - Journal of Symbolic Logic 65 (3):1223-1240.
    We define classes Φnof formulae of first-order arithmetic with the following properties:(i) Everyφϵ Φnis classically equivalent to a Πn-formula (n≠ 1, Φ1:= Σ1).(ii)(iii)IΠnandiΦn(i.e., Heyting arithmetic with induction schema restricted to Φn-formulae) prove the same Π2-formulae.We further generalize a result by Visser and Wehmeier. namely that prenex induction within intuitionistic arithmetic is rather weak: After closing Φnboth under existential and universal quantification (we call these classes Θn) the corresponding theoriesiΘnstill prove the same Π2-formulae. In a second part we consideriΔ0plus collection-principles. We (...)
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  • Theory of models with generalized atomic formulas.H. Jerome Keisler - 1960 - Journal of Symbolic Logic 25 (1):1-26.
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  • Some results on Kripke models over an arbitrary fixed frame.Seyed Mohammad Bagheri & Morteza Moniri - 2003 - Mathematical Logic Quarterly 49 (5):479-484.
    We study the relations of being substructure and elementary substructure between Kripke models of intuitionistic predicate logic with the same arbitrary frame. We prove analogues of Tarski's test and Löwenheim-Skolem's theorems as determined by our definitions. The relations between corresponding worlds of two Kripke models [MATHEMATICAL SCRIPT CAPITAL K] ⪯ [MATHEMATICAL SCRIPT CAPITAL K]′ are studied.
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