Are the open-ended rules for negation categorical?

Synthese 198 (8):7249-7256 (2019)
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Abstract

Vann McGee has recently argued that Belnap’s criteria constrain the formal rules of classical natural deduction to uniquely determine the semantic values of the propositional logical connectives and quantifiers if the rules are taken to be open-ended, i.e., if they are truth-preserving within any mathematically possible extension of the original language. The main assumption of his argument is that for any class of models there is a mathematically possible language in which there is a sentence true in just those models. I show that this assumption does not hold for the class of models of classical propositional logic. In particular, I show that the existence of non-normal models for negation undermines McGee’s argument.

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2021

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10.1007/s11229-019-02519-9

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Author's Profile

Constantin C. Brîncuș
Institute of Philosophy and Psychology, Romanian Academy

Citations of this work

Categoricity by convention.Julien Murzi & Brett Topey - 2021 - Philosophical Studies 178 (10):3391-3420.

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References found in this work

The Connectives.Lloyd Humberstone - 2011 - MIT Press. Edited by Lloyd Humberstone.
Multiple Conclusion Logic.D. J. Shoesmith & Timothy Smiley - 1978 - Cambridge, England / New York London Melbourne: Cambridge University Press. Edited by T. J. Smiley.
Tonk, Plonk and Plink.Nuel Belnap - 1962 - Analysis 22 (6):130-134.
Formalization of logic.Rudolf Carnap - 1943 - Cambridge, Mass.,: Harvard university press.
Rejection.Timothy Smiley - 1996 - Analysis 56 (1):1–9.

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