Indestructibility of Wholeness

IF 0.5 3区数学 Q3 MATHEMATICS

Fundamenta Mathematicae Pub Date : 2021-01-01 DOI:10.4064/fm604-3-2020

P. Corazza

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引用次数: 0

Abstract

. The Wholeness Axiom (WA) is an axiom schema that asserts the existence of a nontrivial elementary embedding from V to itself. The schema is formulated in the language {∈ , j } , where j is a unary function symbol intended to stand for the embedding. WA consists of an Elementarity schema that asserts j is an elementary embedding, a Critical Point axiom that asserts existence of a least ordinal moved, and a schema Separation j that asserts Separation holds for all instances of j -formulas. The theory ZFC + WA has been proposed in the author’s earlier papers as a natural axiomatic extension of ZFC to account for most of the known large cardinals. In this paper we oﬀer evidence for the naturalness of this theory by showing that it is, like ZFC itself, indestructible by set forcing. We show ﬁrst that if κ is the critical point of the embedding, then ZFC+WA is preserved by any notion of forcing that belongs to V κ . This step is nontrivial because to prove Separation j holds in the forcing extension after lifting the embedding, it is necessary to incorporate j into the deﬁnition of the forcing relation. Then for arbitrary notions of forcing, we introduce a diﬀerent technique of lifting that lifts one of the original embedding’s applicative iterates.

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整体的不可摧毁性

．整体性公理(WA)是一种公理模式，用来断言从V到自身的非平凡初等嵌入的存在性。模式是用语言{∈，j}来表述的，其中j是一个一元函数符号，用来表示嵌入。WA由断言j是基本嵌入的基本模式、断言存在最小序数移动的临界点公理和断言分离适用于j -公式的所有实例的模式Separation j组成。理论ZFC + WA已在作者早期的论文中提出，作为ZFC的自然公理化扩展，以解释大多数已知的大基数。在本文中，我们通过证明它像ZFC本身一样，不被集合强迫破坏，为这个理论的自然性提供了证据。我们首先证明，如果κ是嵌入的临界点，那么任何属于V κ的强迫概念都保留了ZFC+WA。这一步很重要，因为为了证明分离j在解除嵌入后的强制扩展中成立，有必要将j纳入强制关系的定义中。然后，对于任意的强制概念，我们引入了一种不同的提升技术，该技术可以提升原始嵌入的应用迭代之一。

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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来源期刊

Fundamenta Mathematicae 数学-数学

CiteScore

1.00

自引率

0.00%

发文量

审稿时长

6-12 weeks

期刊介绍： FUNDAMENTA MATHEMATICAE concentrates on papers devoted to Set Theory, Mathematical Logic and Foundations of Mathematics, Topology and its Interactions with Algebra, Dynamical Systems.