Higher indescribability and derived topologies

IF 0.9 1区 数学 Q1 LOGIC Journal of Mathematical Logic Pub Date : 2021-02-18 DOI:10.1142/s0219061323500010
Brent Cody
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Abstract

We introduce reflection properties of cardinals in which the attributes that reflect are expressible by infinitary formulas whose lengths can be strictly larger than the cardinal under consideration. This kind of generalized reflection principle leads to the definitions of $L_{\kappa^+,\kappa^+}$-indescribability and $\Pi^1_\xi$-indescribability of a cardinal $\kappa$ for all $\xi<\kappa^+$. In this context, universal $\Pi^1_\xi$ formulas exist, there is a normal ideal associated to $\Pi^1_\xi$-indescribability and the notions of $\Pi^1_\xi$-indescribability yield a strict hierarchy below a measurable cardinal. Additionally, given a regular cardinal $\mu$, we introduce a diagonal version of Cantor's derivative operator and use it to extend Bagaria's \cite{MR3894041} sequence $langle\tau_\xi:\xi<\mu\rangle$ of derived topologies on $\mu$ to $\langle\tau_\xi:\xi<\mu^+\rangle$. Finally, we prove that for all $\xi<\mu^+$, if there is a stationary set of $\alpha<\mu$ that have a high enough degree of indescribability, then there are stationarily-many $\alpha<\mu$ that are nonisolated points in the space $(\mu,\tau_{\xi+1})$.
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更高的不可描述性和派生拓扑
我们引入基数的反射性质,其中反射的属性可以用无限的公式表示,其长度可以严格大于所考虑的基数。这种广义反射原理导致了对所有$\xi<\kappa^+$的基数$\kappa$的$L_{\kappa^+,\kappa^+}$ -不可描述性和$\Pi^1_\xi$ -不可描述性的定义。在这种情况下,存在普遍的$\Pi^1_\xi$公式,存在与$\Pi^1_\xi$ -不可描述性相关的正常理想,并且$\Pi^1_\xi$ -不可描述性的概念在可测量基数以下产生严格的层次结构。此外,给定一个正则基数$\mu$,我们引入Cantor的导数算子的对角线版本,并使用它将$\mu$上派生拓扑的Bagaria的\cite{MR3894041}序列$langle\tau_\xi:\xi<\mu\rangle$扩展到$\langle\tau_\xi:\xi<\mu^+\rangle$。最后,我们证明了对于所有$\xi<\mu^+$,如果存在一个具有足够高不可描述度的平稳集合$\alpha<\mu$,则在空间$(\mu,\tau_{\xi+1})$中存在平稳的多个$\alpha<\mu$,它们是非孤立点。
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来源期刊
Journal of Mathematical Logic
Journal of Mathematical Logic MATHEMATICS-LOGIC
CiteScore
1.60
自引率
11.10%
发文量
23
审稿时长
>12 weeks
期刊介绍: The Journal of Mathematical Logic (JML) provides an important forum for the communication of original contributions in all areas of mathematical logic and its applications. It aims at publishing papers at the highest level of mathematical creativity and sophistication. JML intends to represent the most important and innovative developments in the subject.
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