Proof Systems for Super- Strict Implication

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Studia Logica 112 (1):249-294 (2023)
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Abstract

This paper studies proof systems for the logics of super-strict implication ST2–ST5, which correspond to C.I. Lewis’ systems S2–S5 freed of paradoxes of strict implication. First, Hilbert-style axiomatic systems are introduced and shown to be sound and complete by simulating STn in Sn and backsimulating Sn in STn, respectively(for n=2,...,5). Next, G3-style labelled sequent calculi are investigated. It is shown that these calculi have the good structural properties that are distinctive of G3-style calculi, that they are sound and complete, and it is shown that the proof search for G3. ST2 is terminating and therefore the logic is decidable.

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2024

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10.1007/s11225-023-10048-3

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Author Profiles

Eugenio Orlandelli
University of Bologna
Raidl Eric
University Tübingen

Citations of this work

The Implicative Conditional.Eric Raidl & Gilberto Gomes - 2023 - Journal of Philosophical Logic 53 (1):1-47.

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References found in this work

Counterfactuals.David Lewis - 1973 - Philosophy of Science 42 (3):341-344.
The Evidential Conditional.Vincenzo Crupi & Andrea Iacona - 2022 - Erkenntnis 87 (6):2897-2921.
The Logic of the Evidential Conditional.Eric Raidl, Andrea Iacona & Vincenzo Crupi - 2022 - Review of Symbolic Logic 15 (3):758-770.
Symbolic Logic.C. I. Lewis & C. H. Langford - 1932 - Erkenntnis 4 (1):65-66.
A New Introduction to Modal Logic.G. E. Hughes & M. J. Cresswell - 1996 - Studia Logica 62 (3):439-441.

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