A Deep Inference System for the Modal Logic S5

Studia Logica 85 (2):199-214 (2007)
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Abstract

We present a cut-admissible system for the modal logic S5 in a formalism that makes explicit and intensive use of deep inference. Deep inference is induced by the methods applied so far in conceptually pure systems for this logic. The system enjoys systematicity and modularity, two important properties that should be satisfied by modal systems. Furthermore, it enjoys a simple and direct design: the rules are few and the modal rules are in exact correspondence to the modal axioms.

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10.1007/s11225-007-9028-y

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Citations of this work

Deep sequent systems for modal logic.Kai Brünnler - 2009 - Archive for Mathematical Logic 48 (6):551-577.
Proof Theory for Modal Logic.Sara Negri - 2011 - Philosophy Compass 6 (8):523-538.
Linear time in hypersequent framework.Andrzej Indrzejczak - 2016 - Bulletin of Symbolic Logic 22 (1):121-144.

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References found in this work

Investigations into Logical Deduction.Gerhard Gentzen - 1964 - American Philosophical Quarterly 1 (4):288 - 306.
Proof Analysis in Modal Logic.Sara Negri - 2005 - Journal of Philosophical Logic 34 (5-6):507-544.
Provability in logic.Stig Kanger - 1957 - Stockholm,: Almqvist & Wiksell.
The method of hypersequents in the proof theory of propositional non-classical logics.Arnon Avron - 1996 - In Wilfrid Hodges (ed.), Logic: Foundations to Applications. Oxford: pp. 1-32.
Investigations into Logical Deduction.Gerhard Gentzen, M. E. Szabo & Paul Bernays - 1970 - Journal of Symbolic Logic 35 (1):144-145.

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