Relative consistency of a finite nonclassical theory incorporating ZF and category theory with ZF

arXiv - MATH - General Mathematics Pub Date : 2024-07-21 DOI:arxiv-2407.18969

Marcoen J. T. F. Cabbolet, Adrian R. D. Mathias

引用次数: 0

Abstract

Recently, in Axioms 10(2): 119 (2021), a nonclassical first-order theory T of sets and functions has been introduced as the collection of axioms we have to accept if we want a foundational theory for (all of) mathematics that is not weaker than ZF, that is finitely axiomatized, and that does not have a countable model (if it has a model at all, that is). Here we prove that T is relatively consistent with ZF. We conclude that this is an important step towards showing that T is an advancement in the foundations of mathematics.

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包含 ZF 的有限非经典理论与包含 ZF 的范畴理论的相对一致性

最近，在《公理 10(2)：119 (2021)一文中，介绍了一个关于集合与函数的非经典一阶理论T，如果我们想要一个不弱于ZF、有限公理化、没有可解释模型（如果它有模型的话）的（所有）数学基础理论，那么T就是我们必须接受的公理集合。在此，我们证明 T 与 ZF 相对一致。我们的结论是，这是朝着证明 T 是数学基础的进步迈出的重要一步。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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arXiv - MATH - General Mathematics

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