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  1. Decidability by filtrations for graded normal logics (graded modalities V).Claudio Cerrato - 1994 - Studia Logica 53 (1):61 - 73.
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  • General canonical models for graded normal logics (graded modalities IV).C. Cerrato - 1990 - Studia Logica 49 (2):241 - 252.
    We prove the canonical models introduced in [D] do not exist for some graded normal logics with symmetric models, namelyKB°, KBD°, KBT°, so that we define a new kind of canonical models, the general ones, and show they exist and work well in every case.
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  • Counting to Infinity: Graded Modal Logic with an Infinity Diamond.Ignacio Bellas Acosta & Yde Venema - 2024 - Review of Symbolic Logic 17 (1):1-35.
    We extend the languages of both basic and graded modal logic with the infinity diamond, a modality that expresses the existence of infinitely many successors having a certain property. In both cases we define a natural notion of bisimilarity for the resulting formalisms, that we dub $\mathtt {ML}^{\infty }$ and $\mathtt {GML}^{\infty }$, respectively. We then characterise these logics as the bisimulation-invariant fragments of the naturally corresponding predicate logic, viz., the extension of first-order logic with the infinity quantifier. Furthermore, for (...)
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  • Toward Model-Theoretic Modal Logics.M. A. Minghui - 2010 - Frontiers of Philosophy in China 5 (2):294-311.
    Adding certain cardinality quantifiers into first-order language will give substantially more expressive languages. Thus, many mathematical concepts beyond first-order logic can be handled. Since basic modal logic can be seen as the bisimular invariant fragment of first-order logic on the level of models, it has no ability to handle modally these mathematical concepts beyond first-order logic. By adding modalities regarding the cardinalities of successor states, we can, in principle, investigate modal logics of all cardinalities. Thus ways of exploring model-theoretic logics (...)
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  • Toward model-theoretic modal logics.Minghui Ma - 2010 - Frontiers of Philosophy in China 5 (2):294-311.
    Adding certain cardinality quantifiers into first-order language will give substantially more expressive languages. Thus, many mathematical concepts beyond first-order logic can be handled. Since basic modal logic can be seen as the bisimular invariant fragment of first-order logic on the level of models, it has no ability to handle modally these mathematical concepts beyond first-order logic. By adding modalities regarding the cardinalities of successor states, we can, in principle, investigate modal logics of all cardinalities. Thus ways of exploring model-theoretic logics (...)
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  • Dynamic graded epistemic logic.Minghui Ma & Hans van Ditmarsch - 2019 - Review of Symbolic Logic 12 (4):663-684.
    Graded epistemic logic is a logic for reasoning about uncertainties. Graded epistemic logic is interpreted on graded models. These models are generalizations of Kripke models. We obtain completeness of some graded epistemic logics. We further develop dynamic extensions of graded epistemic logics, along the framework of dynamic epistemic logic. We give an extension with public announcements, i.e., public events, and an extension with graded event models, a generalization also including nonpublic events. We present complete axiomatizations for both logics.
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  • Model Theoretical Aspects of Weakly Aggregative Modal Logic.Jixin Liu, Yifeng Ding & Yanjing Wang - 2022 - Journal of Logic, Language and Information 31 (2):261-286.
    Weakly Aggregative Modal Logic ) is a collection of disguised polyadic modal logics with n-ary modalities whose arguments are all the same. \ has interesting applications on epistemic logic, deontic logic, and the logic of belief. In this paper, we study some basic model theoretical aspects of \. Specifically, we first give a van Benthem–Rosen characterization theorem of \ based on an intuitive notion of bisimulation. Then, in contrast to many well known normal or non-normal modal logics, we show that (...)
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  • Do We Need Mathematical Facts?Wojciech Krysztofiak - 2014 - History and Philosophy of Logic 35 (1):1-32.
    The main purpose of the paper concerns the question of the existence of hard mathematical facts as truth-makers of mathematical sentences. The paper defends the standpoint according to which hard mathematical facts do not exist in semantic models of mathematical theories. The argumentative line in favour of the defended thesis proceeds as follows: slingshot arguments supply us with some reasons to reject various ontological theories of mathematical facts; there are two ways of blocking these arguments: through the rejection of the (...)
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  • A study of modal logic with semantics based on rough set theory.Md Aquil Khan, Ranjan & Amal Talukdar - 2024 - Journal of Applied Non-Classical Logics 34 (2):223-247.
    Volume 34, Issue 2-3, June - September 2024.
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  • Graded Modalities. III.M. Fattorosi-Barnaba & C. Cerrato - 1988 - Studia Logica 47 (2):99-110.
    We go on along the trend of [2] and [1], giving an axiomatization of S4⁰ and proving its completeness and compactness with respect to the usual reflexive and transitive Kripke models. To reach this results, we use techniques from [1], with suitable adaptations to our specific case.
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  • Neighbourhood Semantics for Graded Modal Logic.Jinsheng Chen, Hans Van Ditmarsch, Giuseppe Greco & Apostolos Tzimoulis - 2021 - Bulletin of the Section of Logic 50 (3):373-395.
    We introduce a class of neighbourhood frames for graded modal logic embedding Kripke frames into neighbourhood frames. This class of neighbourhood frames is shown to be first-order definable but not modally definable. We also obtain a new definition of graded bisimulation with respect to Kripke frames by modifying the definition of monotonic bisimulation.
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  • Adequacy of the logic K (e.Micha L. Zawidzki - 2012 - Bulletin of the Section of Logic 41 (3/4):155-172.
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