Internal Categoricity, Truth and Determinacy

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Journal of Philosophical Logic 52 (5):1295-1325 (2023)
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Abstract

This paper focuses on the categoricity of arithmetic and determinacy of arithmetical truth. Several ‘internal’ categoricity results have been discussed in the recent literature. Against the background of the philosophical position called internalism, we propose and investigate truth-theoretic versions of internal categoricity based on a primitive truth predicate. We argue for the compatibility of a primitive truth predicate with internalism and provide a novel argument for (and proof of) a truth-theoretic version of internal categoricity and internal determinacy with some positive properties.

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10.1007/s10992-023-09707-6

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Author Profiles

Matteo Zicchetti
University of Warsaw
Martin Fischer
Ludwig Maximilians Universität, München

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References found in this work

Models and reality.Hilary Putnam - 1980 - Journal of Symbolic Logic 45 (3):464-482.
Subsystems of Second Order Arithmetic.Stephen G. Simpson - 1999 - Studia Logica 77 (1):129-129.
Models and reality.Hilary Putnam - 1983 - In Realism and reason. New York: Cambridge University Press. pp. 1-25.
How we learn mathematical language.Vann McGee - 1997 - Philosophical Review 106 (1):35-68.
Mathematical Internal Realism.Tim Button - 2022 - In Sanjit Chakraborty & James Ferguson Conant, Engaging Putnam. Berlin, Germany: De Gruyter. pp. 157-182.

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