Completeness and Definability in the Logic of Noncontingency

Notre Dame Journal of Formal Logic 40 (4):533-547 (1999)
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Abstract

Hilbert-style axiomatic systems are presented for versions of the modal logics K, where {D, 4, 5}, with noncontingency as the sole modal primitive. The classes of frames characterized by the axioms of these systems are shown to be first-order definable, though not equal to the classes of serial, transitive, or euclidean frames. The canonical frame of the noncontingency logic of any logic containing the seriality axiom is proved to be nonserial. It is also shown that any class of frames definable in the noncontingency language contains the class of functional frames, and dually, there exists a greatest consistent normal noncontingency logic

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10.1305/ndjfl/1012429717

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Citations of this work

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Intuitionism and the Modal Logic of Vagueness.Susanne Bobzien & Ian Rumfitt - 2020 - Journal of Philosophical Logic 49 (2):221-248.
Bimodal Logics with Contingency and Accident.Jie Fan - 2019 - Journal of Philosophical Logic 48 (2):425-445.
Symmetric Contingency Logic with Unlimitedly Many Modalities.Jie Fan - 2019 - Journal of Philosophical Logic 48 (5):851-866.

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References found in this work

Some embedding theorems for modal logic.David Makinson - 1971 - Notre Dame Journal of Formal Logic 12 (2):252-254.
The Logic of Non-contingency.I. L. Humberstone - 1995 - Notre Dame Journal of Formal Logic 36 (2):214-229.
Minimal Non-contingency Logic.Steven T. Kuhn - 1995 - Notre Dame Journal of Formal Logic 36 (2):230-234.
Necessity and contingency.M. J. Cresswell - 1988 - Studia Logica 47 (2):145 - 149.

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