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Correspondence, Canonicity, and Model Theory for Monotonic Modal Logics
Studia Logica 109 (2):397-421 (2020)
Abstract
We investigate the role of coalgebraic predicate logic, a logic for neighborhood frames first proposed by Chang, in the study of monotonic modal logics. We prove analogues of the Goldblatt–Thomason theorem and Fine’s canonicity theorem for classes of monotonic neighborhood frames closed under elementary equivalence in coalgebraic predicate logic. The elementary equivalence here can be relativized to the classes of monotonic, quasi-filter, augmented quasi-filter, filter, or augmented filter neighborhood frames, respectively. The original, Kripke-semantic versions of the theorems follow as a special case concerning the classes of augmented filter neighborhood frames.Other Versions
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References found in this work
Duality between modal algebras and neighbourhood frames.Kosta Došen - 1989 - Studia Logica 48 (2):219 - 234.
Modal languages for topology: Expressivity and definability.Balder ten Cate, David Gabelaia & Dmitry Sustretov - 2009 - Annals of Pure and Applied Logic 159 (1-2):146-170.
An extension of S4 complete for the neighbourhood semantics but incomplete for the relational semantics.Martin Serastian Gerson - 1975 - Studia Logica 34 (4):333-342.
A Neighbourhood Frame for T with No Equivalent Relational Frame.Martin Gerson - 1976 - Zeitschrift fur mathematische Logik und Grundlagen der Mathematik 22 (1):29-34.
A Neighbourhood Frame for T with No Equivalent Relational Frame.Martin Gerson - 1976 - Mathematical Logic Quarterly 22 (1):29-34.
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