Internalism and the Determinacy of Mathematics

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Mind 132 (528):1028-1052 (2023)
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Abstract

A major challenge in the philosophy of mathematics is to explain how mathematical language can pick out unique structures and acquire determinate content. In recent work, Button and Walsh have introduced a view they call ‘internalism’, according to which mathematical content is explained by internal categoricity results formulated and proven in second-order logic. In this paper, we critically examine the internalist response to the challenge and discuss the philosophical significance of internal categoricity results. Surprisingly, as we argue, while internalism arguably explains how we pick out unique mathematical structures, this does not suffice to account for the determinacy of mathematical discourse.

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10.1093/mind/fzac073

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Author Profiles

Lavinia Maria Picollo
National University of Singapore
Daniel Waxman
National University of Singapore

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References found in this work

Mathematical truth.Paul Benacerraf - 1973 - Journal of Philosophy 70 (19):661-679.
Vagueness.Timothy Williamson - 1994 - British Journal for the Philosophy of Science 46 (4):589-601.
Models and reality.Hilary Putnam - 1980 - Journal of Symbolic Logic 45 (3):464-482.
Minds, Machines and Gödel.John R. Lucas - 1961 - Philosophy 36 (137):112-127.

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