Abstract
In a recent paper, Barrio, Pailos and Szmuc (BPS) show that there are logics that have exactly the validities of classical logic up to arbitrarily high levels of inference. They suggest that a logic therefore must be identified by its valid inferences at every inferential level. However, Scambler shows that there are logics with all the validities of classical logic at every inferential level, but with no antivalidities at any inferential level. Scambler concludes that in order to identify a logic, we at least need to look at the validities and the antivalidities of every inferential level. In this paper, I argue that this is still not enough to identify a logic. I apply BPS’s techniques in a super/sub-valuationist setting to construct a logic that has exactly the validities and antivalidities of classical logic at every inferential level. I argue that the resulting logic is nevertheless distinct from classical logic.
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References
Arruda, A. In R. Priest (Ed.) (1989). Norma aspects of the historical development of paraconsistent logic. Philosophia: Munchen.
Barrio, E., Pailos, F., & Szmuc, D. (2019). A hierarchy of classical and paraconsistent logics. Journal of Philosophical Logic, 49, 93–120.
Barrio, E., Pailos, F., & Szmuc, D. (2018). What is a paraconsistent logic?. In J. Malinowski W. Carnielli (Eds.) Contradictions, from Consistency to Inconsistency. Verlag: Springer.
Carroll, L. (1895). What the tortoise said to achilles. Mind, 4 (14), 278–280.
Cobreros, P. (2013). Vagueness: Subvaluationism. Philosophy Compass, 8(5), 472–485.
Cobreros, P. (2011). Paraconsistent vagueness: a positive argument. Synthese, 183(2), 211–227.
Cobreros, P., Egré, P., Ripley, D., & van Rooij, R. (2012). Tolerant, classical, strict. Journal of Philosophical Logic, 41, 347–385.
Cobreros, P., Egré, P., Ripley, D., & van Rooij, R. (2013). Reaching Transparent Truth. Mind, 122(488), 841–866.
Cobreros, P., Egré, P., Ripley, D., & van Rooij, R. (2012). Tolerance and mixed consequence in the S’valuationist setting. Studia Logica, 100(4), 855–877.
Fine, K. (1975). Vagueness, truth and logic. Synthese, 30, 265–300.
Humberstone, L. (1996). Valuational semantics of rule derivability. Journal of Philosophical Logic, 25(5), 451–461.
Hyde, D. (2008). Vagueness logic and ontology. Ashgate: Aldershot.
Hyde, D. (1997). From heaps and gaps to heaps of gluts. Mind, 106(424), 641–660.
Hyde, D., & Colyvan, M. (2008). Paraconsistent Vagueness: Why not?. Australasian Journal of Logic, 6, 107–121.
Keefe, R. (2008). Vagueness: Supervaluationism. Philosophy Compass, 3, 315–324.
Keefe, R. (2000). Theories of vagueness. Cambridge: Cambridge University Press.
McGee, V., & McLaughlin, B. (1995). Distinctions without a difference. Southern Journal of Philosophy, 33, 203–251.
Pailos, F. (2019). A fully classical truth theory characterized by substructural means. The Review of Symbolic Logic.
Restall, G. (2005). Multiple conclusions. In P. Hajek, L. Valdes-Villanueva, & D. Westerstȧhl (Eds.) Logic, Methodology, and Philosophy of Science: Proceedings of the Twelfth International Congress (pp. 189–205). London: Kings College Publications.
Ripley, D. (2018). On the ‘Transitivity’ of consequence relations. Journal of Logic and Computation, 28(2), 433–450.
Ripley, D. (2015). Paraconsistent logic. Journal of Philosophical Logic, 44, 771–780.
Ripley, D. (2013). Paradoxes and failures of cut. Australasian Journal of Philosophy, 91(1), 139–164.
Rumfitt, I. (2000). Yes” and No”. Mind, 104(436), 781–823.
Scambler, C. (2020). Classical logic and the strict tolerant hierarchy. Journal of Philosophical Logic, 49, 351–370.
Scambler, C. (forthcoming). Transfinite Meta-inferences. Journal of Philosophical Logic. https://doi.org/10.1007/s10992-020-09548-7.
Van Fraassen, B. C. Singular Terms, Truth-Value Gaps, and Free Logic, (Vol. 63.
Varzi, A. (2007). Supervaluationism and its Logics. Mind, 116, 633–676.
Varzi, A. (1997). Inconsistency without contradiction. Notre Dame Journal of Formal Logic, 38, 621–640.
Williamson, T. (1994). Vagueness. London: Routledge.
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Porter, B. Supervaluations and the Strict-Tolerant Hierarchy. J Philos Logic 51, 1367–1386 (2022). https://doi.org/10.1007/s10992-021-09624-6
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DOI: https://doi.org/10.1007/s10992-021-09624-6