A simple approach towards recapturing consistent theories in paraconsistent settings

Review of Symbolic Logic 6 (4):755-764 (2013)
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Abstract

I believe that, for reasons elaborated elsewhere (Beall, 2009; Priest, 2006a, 2006b), the logic LP (Asenjo, 1966; Asenjo & Tamburino, 1975; Priest, 1979) is roughly right as far as logic goes.1 But logic cannot go everywhere; we need to provide nonlogical axioms to specify our (axiomatic) theories. This is uncontroversial, but it has also been the source of discomfort for LP-based theorists, particularly with respect to true mathematical theories which we take to be consistent. My example, throughout, is arithmetic; but the more general case is also considered

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10.1017/s1755020313000208

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Jc Beall
University of Notre Dame

Citations of this work

There is no Logical Negation: True, False, Both, and Neither.Jc Beall - 2017 - Australasian Journal of Logic 14 (1):Article no. 1.
Theism and Dialetheism.A. J. Cotnoir - 2018 - Australasian Journal of Philosophy 96 (3):592-609.
Paraconsistency and its Philosophical Interpretations.Eduardo Barrio & Bruno Da Re - 2018 - Australasian Journal of Logic 15 (2):151-170.

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References found in this work

The logic of paradox.Graham Priest - 1979 - Journal of Philosophical Logic 8 (1):219 - 241.
Doubt Truth to Be a Liar.Graham Priest - 2007 - Studia Logica 87 (1):129-134.
Entailment: The Logic of Relevance and Necessity.[author unknown] - 1975 - Studia Logica 54 (2):261-266.
Introduction to Metamathematics.Ann Singleterry Ferebee - 1968 - Journal of Symbolic Logic 33 (2):290-291.

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