内在主义与数学的确定性

IF 1.8 1区哲学 0 PHILOSOPHY

MIND Pub Date : 2023-08-10 DOI:10.1093/mind/fzac073

Lavinia Picollo, Daniel Waxman

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引用次数: 0

摘要

数学哲学的一个主要挑战是解释数学语言如何挑选出独特的结构并获得确定的内容。在最近的工作中，巴顿和沃尔什引入了一种他们称之为“内部主义”的观点，根据这种观点，数学内容是由二阶逻辑中表述和证明的内部范畴性结果来解释的。在本文中，我们批判性地审视了内部主义者对这一挑战的回应，并讨论了内部范畴结果的哲学意义。令人惊讶的是，正如我们所说，虽然内在主义可以解释我们如何挑选出独特的数学结构，但这不足以解释数学话语的确定性。

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Internalism and the Determinacy of Mathematics

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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来源期刊

MIND PHILOSOPHY-

CiteScore

3.10

自引率

5.60%

发文量

期刊介绍： Mind has long been a leading journal in philosophy. For well over 100 years it has presented the best of cutting edge thought from epistemology, metaphysics, philosophy of language, philosophy of logic, and philosophy of mind. Mind continues its tradition of excellence today. Mind has always enjoyed a strong reputation for the high standards established by its editors and receives around 350 submissions each year. The editor seeks advice from a large number of expert referees, including members of the network of Associate Editors and his international advisers. Mind is published quarterly.