A Dilemma for Mathematical Constructivism

Axiomathes 31 (1):63-72 (2021)
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Abstract

In this paper I argue that constructivism in mathematics faces a dilemma. In particular, I maintain that constructivism is unable to explain (i) the application of mathematics to nature and (ii) the intersubjectivity of mathematics unless (iii) it is conjoined with two theses that reduce it to a form of mathematical Platonism. The paper is divided into five sections. In the first section of the paper, I explain the difference between mathematical constructivism and mathematical Platonism and I outline my argument. In the second, I argue that the best explanation of how mathematics applies to nature for a constructivist is a thesis I call Copernicanism. In the third, I argue that the best explanation of how mathematics can be intersubjective for a constructivist is a thesis I call Ideality. In the fourth, I argue that once constructivism is conjoined with these two theses, it collapses into a form of mathematical Platonism. In the fifth, I confront some objections.

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10.1007/s10516-020-09475-x

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Samuel J. M. Kahn
Indiana University Purdue University, Indianapolis

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References found in this work

What numbers could not be.Paul Benacerraf - 1965 - Philosophical Review 74 (1):47-73.
Kant and the exact sciences.Michael Friedman - 1992 - Cambridge: Harvard University Press.
Kant and the Claims of Knowledge.Paul Guyer - 1987 - New York: Cambridge University Press.

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