The Unreasonable Efficacy of the Lifting Condition in Higher Categorical Galois Theory I: a Quasi-categorical Galois Theorem

Joseph Rennie
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Abstract

In (Borceux-Janelidze 2001) they prove a Categorical Galois Theorem for ordinary categories, and establish the main result of (Joyal-Tierney 1984), along with the classical Galois theory of Rings, as instances of this more general result. The main result of the present work refines this to a Quasicategorical Galois Theorem, by drawing heavily on the foundation laid in (Lurie 2024). More importantly, the argument used to prove the result is intended to highlight a deep connection between factorization systems (specifically the lex modalities of (Anel-Biedermann-Finster-Joyal 2021)), higher-categorical Galois Theorems, and Galois theories internal to higher toposes. This is the first part in a series of works, intended merely to motivate the lens and prove Theorem 3.4. In future work, we will delve into a generalization of the argument, and offer tools for producing applications.
高分类伽罗瓦理论 I 中解除条件的不合理效力:一个准分类伽罗瓦定理
在(Borceux-Janelidze 2001)中,他们证明了普通范畴的分类伽罗瓦定理,并建立了(Joyal-Tierney 1984)的主要结果,以及经典的环伽罗瓦理论,作为这个更一般结果的实例。本研究的主要结果在很大程度上借鉴了(Lurie 2024)中奠定的基础,将其细化为准范畴伽罗瓦定理。更重要的是,用于证明这一结果的论证旨在强调因式分解系统(特别是(阿奈尔-比德尔曼-芬斯特-乔亚尔 2021)的列克斯模)、高分类伽罗瓦定理和高分类内部伽罗瓦理论之间的深刻联系。这是一系列工作的第一部分,目的只是为了激发透镜并证明定理 3.4。在未来的工作中,我们将深入研究论证的广义化,并提供应用工具。
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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