二阶亨金逻辑中的 AC 和 WO 的独立性，第一部分

arXiv - MATH - Logic Pub Date : 2024-09-16 DOI:arxiv-2409.10276

Christine Gaßner

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摘要

本文关注具有亨金解释（HPL）的二阶谓词逻辑中的选择公理（AC）和井序定理（WO）。我们考虑了威廉-阿克曼（Wilhelm Ackermann，1935）提出的选择原则，大卫-希尔伯特和阿克曼（David Hilbert and Ackermann，1938）、本杰明-西斯金德（Benjamin Siskind）、保罗-曼科苏（Paolo Mancosu）和斯图尔特-夏皮罗（Stewart Shapiro，2020）也讨论了这一原则。讨论仅限于所谓的亨金-阿塞尔二阶结构。所使用的语言是多排序一阶语言，具有同一性。特别是，我们给出了在 2022 年逻辑学术讨论会（Colloquium Logicum）上提出的关于 WO 与 HPL 中所谓阿克曼公理的独立性证明的一些技术细节。

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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AC and the Independence of WO in Second-Order Henkin Logic, Part I

This article concerns with the Axiom of Choice (AC) and the well-ordering theorem (WO) in second-order predicate logic with Henkin interpretation (HPL). We consider a principle of choice introduced by Wilhelm Ackermann (1935) and discussed also by David Hilbert and Ackermann (1938), by G\"unter Asser (1981), and by Benjamin Siskind, Paolo Mancosu, and Stewart Shapiro (2020). The discussion is restricted to so-called Henkin-Asser structures of second order. The language used is a many-sorted first-order language with identity. In particular, we give some of the technical details for a proof of the independence of WO from the so-called Ackermann axioms in HPL presented at the Colloquium Logicum in 2022.

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arXiv - MATH - Logic

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