On the decidability of implicational ticket entailment

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Journal of Symbolic Logic 78 (1):214-236 (2013)
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Abstract

The implicational fragment of the logic of relevant implication, $R_\to$ is known to be decidable. We show that the implicational fragment of the logic of ticket entailment, $T_\to$ is decidable. Our proof is based on the consecution calculus that we introduced specifically to solve this 50-year old open problem. We reduce the decidability problem of $T_\to$ to the decidability problem of $R_\to$. The decidability of $T_\to$ is equivalent to the decidability of the inhabitation problem of implicational types by combinators over the base $\{\textsf{B},\textsf{B}',\textsf{I},\textsf{W}\}$.

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10.2178/jsl.7801150

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Author Profiles

Jon Michael Dunn
PhD: University of Pittsburgh; Last affiliation: Indiana University, Bloomington
Katalin Bimbo
University of Alberta

Citations of this work

Recent Work in Relevant Logic.Mark Jago - 2013 - Analysis 73 (3):526-541.
An alternative Gentzenisation of RW+∘.Mirjana Ilić - 2016 - Mathematical Logic Quarterly 62 (6):465-480.
Combinatory logic.Katalin Bimbó - 2009 - Stanford Encyclopedia of Philosophy.
Current Trends in Substructural Logics.Katalin Bimbó - 2015 - Journal of Philosophical Logic 44 (6):609-624.

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References found in this work

Relevant Logics and Their Rivals.Richard Routley, Val Plumwood, Robert K. Meyer & Ross T. Brady - 1982 - Ridgeview. Edited by Richard Sylvan & Ross Brady.
Entailment: The Logic of Relevance and Necessity.[author unknown] - 1975 - Studia Logica 54 (2):261-266.
Foundations of Mathematical Logic.William Craig - 1963 - Journal of Symbolic Logic 45 (2):377-378.
Relevant Logics.Edwin D. Mares & Robert K. Meyer - 2001 - In Lou Goble (ed.), The Blackwell Guide to Philosophical Logic. Malden, Mass.: Wiley-Blackwell. pp. 280–308.
Algebraic analysis of entailment I.Robert K. Meyer & Richard Routley - 1972 - Logique Et Analyse 15 (59/60):407-428.

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