用强迫法对大基数理论的贡献

Alejandro Poveda
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引用次数: 3

摘要

这篇论文是对集合论领域的一个贡献,它关注的是强迫方法和所谓的大基数公理之间的相互作用。论文分为两个主题部分。在第一部分中,我们分析了第一个超紧基数和voponka原理(第一部分)之间的大基数层次。反过来,第二部分致力于研究奇异基数组合(第二部分和第三部分)引起的一些问题。我们从第一部分开始研究在第一个超紧基数和voponka原理之间组成的区域中的身份危机现象。因此,我们将Magidor的经典定理[2]推广到大基数层次的更高区域。此外,我们的分析可以解决b[1]中遗留的所有问题。最后,我们通过提出在类强制迭代下保持$C^{(n)}$ -可扩展基数的一般理论来总结第一部分。从这个分析中,我们得出了几个应用。例如,我们的论证被用来证明一个可扩展基数与“$(\lambda ^{+\omega })^{\mathrm {HOD}}<\lambda ^+$,对于每一个正则基数$\lambda $”是一致的。特别是,如果Woodin的HOD猜想成立,因此在ZFC +中可以证明“存在一个可扩展基数”,在第一个可扩展基数之上,每一个奇异基数$\lambda $在HOD和$(\lambda ^+)^{\textrm {{HOD}}}=\lambda ^+$中都是奇异的。V和HOD之间可能仍然没有就常规枢机主教的继任者达成一致。在第二部分和第三部分,我们分析了奇异基数假设与其他相关组合原理在奇异基数后继层次上的关系。其中两个是树性质和静止集的反射,它们是无限组合学的中心。具体来说,第二部分致力于证明树性质在$\kappa ^+$和$\kappa ^{++}$处的一致性,当$\kappa $是一个强极限奇异枢机时,见证了SCH的任意失效。这在两个意义上概括了[3]的主要结果:它允许$\kappa $的任意共性和SCH的任意失效。在论文的最后一部分(第三部分),我们引入了$\Sigma $ -Prikry强迫的概念。这个新概念为Prikry型强迫理论提供了一种抽象和统一的方法,并包含了Prikry型强迫概念的几个经典例子,如经典的Prikry强迫,Gitik-Sharon posset,或基于扩展器的Prikry强迫,等等。本论文的目的是在奇异基数的后继层次上证明一个迭代定理。具体来说,我们的目标是一个定理,断言每个支持大小$\leq \kappa $的$\kappa ^{++}$ -长度迭代都具有$\kappa ^{++}$ -cc,前提是迭代属于相关的$\kappa ^{++}$ -cc强制类。虽然有无数的作品在这方面的常规红衣主教,这与缺乏调查的平行背景下的单一红衣主教。我们的主要贡献是证明,只要所考虑的强迫类别是$\Sigma $ -Prikry强迫家族,这样的结果是可用的。最后,作为一个应用,我们证明了一个强极限基数$\kappa $的存在性是一致模大基数,它具有可数的共性,使得$\mathrm {SCH}_\kappa $失效,并且$\kappa ^+$的每一个有限族的平稳子集同时反映。
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Contributions to the Theory of Large Cardinals through the Method of Forcing
Abstract The dissertation under comment is a contribution to the area of Set Theory concerned with the interactions between the method of Forcing and the so-called Large Cardinal axioms. The dissertation is divided into two thematic blocks. In Block I we analyze the large-cardinal hierarchy between the first supercompact cardinal and Vopěnka’s Principle (Part I). In turn, Block II is devoted to the investigation of some problems arising from Singular Cardinal Combinatorics (Part II and Part III). We commence Part I by investigating the Identity Crisis phenomenon in the region comprised between the first supercompact cardinal and Vopěnka’s Principle. As a result, we generalize Magidor’s classical theorems [2] to this higher region of the large-cardinal hierarchy. Also, our analysis allows to settle all the questions that were left open in [1]. Finally, we conclude Part I by presenting a general theory of preservation of $C^{(n)}$ -extendible cardinals under class forcing iterations. From this analysis we derive several applications. For instance, our arguments are used to show that an extendible cardinal is consistent with “ $(\lambda ^{+\omega })^{\mathrm {HOD}}<\lambda ^+$ , for every regular cardinal $\lambda $ .” In particular, if Woodin’s HOD Conjecture holds, and therefore it is provable in ZFC + “There exists an extendible cardinal” that above the first extendible cardinal every singular cardinal $\lambda $ is singular in HOD and $(\lambda ^+)^{\textrm {{HOD}}}=\lambda ^+$ , there may still be no agreement at all between V and HOD about successors of regular cardinals. In Part II and Part III we analyse the relationship between the Singular Cardinal Hypothesis (SCH) with other relevant combinatorial principles at the level of successors of singular cardinals. Two of these are the Tree Property and the Reflection of Stationary sets, which are central in Infinite Combinatorics. Specifically, Part II is devoted to prove the consistency of the Tree Property at both $\kappa ^+$ and $\kappa ^{++}$ , whenever $\kappa $ is a strong limit singular cardinal witnessing an arbitrary failure of the SCH. This generalizes the main result of [3] in two senses: it allows arbitrary cofinalities for $\kappa $ and arbitrary failures for the SCH. In the last part of the dissertation (Part III) we introduce the notion of $\Sigma $ -Prikry forcing. This new concept allows an abstract and uniform approach to the theory of Prikry-type forcings and encompasses several classical examples of Prikry-type forcing notions, such as the classical Prikry forcing, the Gitik-Sharon poset, or the Extender Based Prikry forcing, among many others. Our motivation in this part of the dissertation is to prove an iteration theorem at the level of the successor of a singular cardinal. Specifically, we aim for a theorem asserting that every $\kappa ^{++}$ -length iteration with support of size $\leq \kappa $ has the $\kappa ^{++}$ -cc, provided the iterates belong to a relevant class of $\kappa ^{++}$ -cc forcings. While there are a myriad of works on this vein for regular cardinals, this contrasts with the dearth of investigations in the parallel context of singular cardinals. Our main contribution is the proof that such a result is available whenever the class of forcings under consideration is the family of $\Sigma $ -Prikry forcings. Finally, and as an application, we prove that it is consistent—modulo large cardinals—the existence of a strong limit cardinal $\kappa $ with countable cofinality such that $\mathrm {SCH}_\kappa $ fails and every finite family of stationary subsets of $\kappa ^+$ reflects simultaneously.
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POUR-EL’S LANDSCAPE CATEGORICAL QUANTIFICATION POINCARÉ-WEYL’S PREDICATIVITY: GOING BEYOND A TOPOLOGICAL APPROACH TO UNDEFINABILITY IN ALGEBRAIC EXTENSIONS OF John MacFarlane, Philosophical Logic: A Contemporary Introduction, Routledge Contemporary Introductions to Philosophy, Routledge, New York, and London, 2021, xx + 238 pp.
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