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  1. Algebraic Logic, I. Monadic Boolean Algebras.Paul R. Halmos - 1958 - Journal of Symbolic Logic 23 (2):219-222.
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  • (1 other version)Propositional quantifiers in modal logic.Kit Fine - 1970 - Theoria 36 (3):336-346.
    In this paper I shall present some of the results I have obtained on modal theories which contain quantifiers for propositions. The paper is in two parts: in the first part I consider theories whose non-quantificational part is S5; in the second part I consider theories whose non-quantificational part is weaker than or not contained in S5. Unless otherwise stated, each theory has the same language L. This consists of a countable set V of propositional variables pl, pa, ... , (...)
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  • On second order intuitionistic propositional logic without a universal quantifier.Konrad Zdanowski - 2009 - Journal of Symbolic Logic 74 (1):157-167.
    We examine second order intuitionistic propositional logic, IPC². Let $F_\exists $ be the set of formulas with no universal quantification. We prove Glivenko's theorem for formulas in $F_\exists $ that is, for φ € $F_\exists $ φ is a classical tautology if and only if ¬¬φ is a tautology of IPC². We show that for each sentence φ € $F_\exists $ (without free variables), φ is a classical tautology if and only if φ is an intuitionistic tautology. As a corollary (...)
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  • Propositional Quantification in the Topological Semantics for S.Philip Kremer - 1997 - Notre Dame Journal of Formal Logic 38 (2):295-313.
    Fine and Kripke extended S5, S4, S4.2 and such to produce propositionally quantified systems , , : given a Kripke frame, the quantifiers range over all the sets of possible worlds. is decidable and, as Fine and Kripke showed, many of the other systems are recursively isomorphic to second-order logic. In the present paper I consider the propositionally quantified system that arises from the topological semantics for S4, rather than from the Kripke semantics. The topological system, which I dub , (...)
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  • Extensions of the Lewis system S5.Schiller Joe Scroggs - 1951 - Journal of Symbolic Logic 16 (2):112-120.
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  • Propositional Quantification in Bimodal S5.Peter Fritz - 2020 - Erkenntnis 85 (2):455-465.
    Propositional quantifiers are added to a propositional modal language with two modal operators. The resulting language is interpreted over so-called products of Kripke frames whose accessibility relations are equivalence relations, letting propositional quantifiers range over the powerset of the set of worlds of the frame. It is first shown that full second-order logic can be recursively embedded in the resulting logic, which entails that the two logics are recursively isomorphic. The embedding is then extended to all sublogics containing the logic (...)
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  • Quantifying over propositions in relevance logic: nonaxiomatisability of primary interpretations of ∀ p and ∃ p.Philip Kremer - 1993 - Journal of Symbolic Logic 58 (1):334-349.
    A typical approach to semantics for relevance (and other) logics: specify a class of algebraic structures and take amodelto be one of these structures, α, together with some function or relation which associates with every formulaAa subset ofα. (This is the approach of, among others, Urquhart, Routley and Meyer and Fine.) In some cases there are restrictions on the class of subsets of α with which a formula can be associated: for example, in the semantics of Routley and Meyer [1973], (...)
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  • A Proof of the Completeness Theorem of Godel.H. Rasiowa & R. Sikorski - 1952 - Journal of Symbolic Logic 17 (1):72-72.
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  • Kripke Completeness of Infinitary Predicate Multimodal Logics.Yoshihito Tanaka - 1999 - Notre Dame Journal of Formal Logic 40 (3):326-340.
    Kripke completeness of some infinitary predicate modal logics is presented. More precisely, we prove that if a normal modal logic above is -persistent and universal, the infinitary and predicate extension of with BF and BF is Kripke complete, where BF and BF denote the formulas pi pi and x x, respectively. The results include the completeness of extensions of standard modal logics such as , and its extensions by the schemata T, B, 4, 5, D, and their combinations. The proof (...)
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  • Expressivity of second order propositional modal logic.Balder ten Cate - 2006 - Journal of Philosophical Logic 35 (2):209-223.
    We consider second-order propositional modal logic (SOPML), an extension of the basic modal language with propositional quantifiers introduced by Kit Fine in 1970. We determine the precise expressive power of SOPML by giving analogues of the Van Benthem–Rosen theorem and the Goldblatt Thomason theorem. Furthermore, we show that the basic modal language is the bisimulation invariant fragment of SOPML, and we characterize the bounded fragment of first-order logic as being the intersection of first-order logic and SOPML.
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  • Decidability of quantified propositional intuitionistic logic and s4 on trees of height and arity ≤ω.Richard Zach - 2004 - Journal of Philosophical Logic 33 (2):155-164.
    Quantified propositional intuitionistic logic is obtained from propositional intuitionistic logic by adding quantifiers ∀p, ∃p, where the propositional variables range over upward-closed subsets of the set of worlds in a Kripke structure. If the permitted accessibility relations are arbitrary partial orders, the resulting logic is known to be recursively isomorphic to full second-order logic (Kremer, 1997). It is shown that if the Kripke structures are restricted to trees of at height and width at most ω, the resulting logics are decidable. (...)
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  • (1 other version)A completeness theorem in modal logic.Saul Kripke - 1959 - Journal of Symbolic Logic 24 (1):1-14.
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  • On the complexity of propositional quantification in intuitionistic logic.Philip Kremer - 1997 - Journal of Symbolic Logic 62 (2):529-544.
    We define a propositionally quantified intuitionistic logic Hπ + by a natural extension of Kripke's semantics for propositional intutionistic logic. We then show that Hπ+ is recursively isomorphic to full second order classical logic. Hπ+ is the intuitionistic analogue of the modal systems S5π +, S4π +, S4.2π +, K4π +, Tπ +, Kπ + and Bπ +, studied by Fine.
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  • Representability in second-order propositional poly-modal logic.G. Aldo Antonelli & Richmond H. Thomason - 2002 - Journal of Symbolic Logic 67 (3):1039-1054.
    A propositional system of modal logic is second-order if it contains quantifiers ∀p and ∃p, which, in the standard interpretation, are construed as ranging over sets of possible worlds (propositions). Most second-order systems of modal logic are highly intractable; for instance, when augmented with propositional quantifiers, K, B, T, K4 and S4 all become effectively equivalent to full second-order logic. An exception is S5, which, being interpretable in monadic second-order logic, is decidable.
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  • Second-order propositional modal logic and monadic alternation hierarchies.Antti Kuusisto - 2015 - Annals of Pure and Applied Logic 166 (1):1-28.
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  • Categories of frames for modal logic.S. K. Thomason - 1975 - Journal of Symbolic Logic 40 (3):439-442.
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  • (1 other version)The identity of individuals in a strict functional calculus of second order.Ruth C. Barcan - 1947 - Journal of Symbolic Logic 12 (1):12-15.
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  • Montague Type Semantics for Modal Logics with Propositional Quantifiers.Dov M. Gabbay - 1971 - Mathematical Logic Quarterly 17 (1):245-249.
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  • An Algebraic Approach to Canonical Formulas: Modal Case.Guram Bezhanishvili & Nick Bezhanishvili - 2011 - Studia Logica 99 (1-3):93-125.
    We introduce relativized modal algebra homomorphisms and show that the category of modal algebras and relativized modal algebra homomorphisms is dually equivalent to the category of modal spaces and partial continuous p-morphisms, thus extending the standard duality between the category of modal algebras and modal algebra homomorphisms and the category of modal spaces and continuous p-morphisms. In the transitive case, this yields an algebraic characterization of Zakharyaschev’s subreductions, cofinal subreductions, dense subreductions, and the closed domain condition. As a consequence, we (...)
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  • On modal logic with propositional quantifiers.R. A. Bull - 1969 - Journal of Symbolic Logic 34 (2):257-263.
    I am interested in extending modal calculi by adding propositional quantifiers, given by the rules for quantifier introduction: provided that p does not occur free in A.
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  • Pitts' Quantifiers Are Not Topological Quantification.Tomasz Połacik - 1998 - Notre Dame Journal of Formal Logic 39 (4):531-544.
    We show that Pitts' modeling of propositional quantification in intuitionistic logic (as the appropriate interpolants) does not coincide with the topological interpretation. This contrasts with the case of the monadic language and the interpretation over sufficiently regular topological spaces. We also point to the difference between the topological interpretation over sufficiently regular spaces and the interpretation of propositional quantifiers in Kripke models.
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  • On 2nd order intuitionistic propositional calculus with full comprehension.Dov M. Gabbay - 1974 - Archive for Mathematical Logic 16 (3-4):177-186.
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  • Expressivity of Second Order Propositional Modal Logic.Balder Cate - 2006 - Journal of Philosophical Logic 35 (2):209-223.
    We consider second-order propositional modal logic (SOPML), an extension of the basic modal language with propositional quantifiers introduced by Kit Fine in 1970. We determine the precise expressive power of SOPML by giving analogues of the Van Benthem–Rosen theorem and the Goldblatt Thomason theorem. Furthermore, we show that the basic modal language is the bisimulation invariant fragment of SOPML, and we characterize the bounded fragment of first-order logic as being the intersection of first-order logic and SOPML.
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  • The Expressive Power of Second-Order Propositional Modal Logic.Michael Kaminski & Michael Tiomkin - 1996 - Notre Dame Journal of Formal Logic 37 (1):35-43.
    It is shown that the expressive power of second-order propositional modal logic whose modalities are S4.2 or weaker is the same as that of second-order predicate logic.
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  • Non-axiomatizable second order intuitionistic propositional logic.D. Skvortsov - 1997 - Annals of Pure and Applied Logic 86 (1):33-46.
    The second order intuitionistic propositional logic characterized by the class of all “principal” Kripke frames is non-recursively axiomatizable, as well as any logic of a class of principal Kripke frames containing every finite frame.
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