Up with Categories, Down with Sets; Out with Categories, In with Sets!

IF 0.8 1区 哲学 Q2 HISTORY & PHILOSOPHY OF SCIENCE Philosophia Mathematica Pub Date : 2024-04-13 DOI:10.1093/philmat/nkae010
Jonathan Kirby
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引用次数: 0

Abstract

Practical approaches to the notions of subsets and extension sets are compared, coming from broadly set-theoretic and category-theoretic traditions of mathematics. I argue that the set-theoretic approach is the most practical for ‘looking down’ or ‘in’ at subsets and the category-theoretic approach is the most practical for ‘looking up’ or ‘out’ at extensions, and suggest some guiding principles for using these approaches without recourse to either category theory or axiomatic set theory.
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分类向上,集合向下;分类向外,集合向内!
本文比较了来自广义集合论和范畴论数学传统的子集和外延集概念的实用方法。我认为,对于 "向下 "或 "向内 "看子集,集合论方法是最实用的;而对于 "向上 "或 "向外 "看扩展集,范畴论方法是最实用的。
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来源期刊
Philosophia Mathematica
Philosophia Mathematica HISTORY & PHILOSOPHY OF SCIENCE-
CiteScore
1.70
自引率
9.10%
发文量
26
审稿时长
>12 weeks
期刊介绍: Philosophia Mathematica is the only journal in the world devoted specifically to philosophy of mathematics. The journal publishes peer-reviewed new work in philosophy of mathematics, the application of mathematics, and computing. In addition to main articles, sometimes grouped on a single theme, there are shorter discussion notes, letters, and book reviews. The journal is published online-only, with three issues published per year.
期刊最新文献
A Taxonomy for Set-Theoretic Potentialism Up with Categories, Down with Sets; Out with Categories, In with Sets! Chris Pincock.  Mathematics and Explanation Donald Gillies.Lakatos and the Historical Approach to Philosophy of Mathematics Felix Lev.Finite Mathematics as the Foundation of Classical Mathematics and Quantum Theory
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