Sigma-Prikry强迫II:迭代方案

IF 0.9 1区 数学 Q1 LOGIC Journal of Mathematical Logic Pub Date : 2019-12-06 DOI:10.1142/S0219061321500197
Alejandro Poveda, A. Rinot, Dima Sinapova
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引用次数: 5

摘要

在本系列的第一部分[5]中,我们介绍了一类强迫概念,我们称之为[公式:见文]-Prikry,并展示了许多已知的以可数共度的奇异基数为中心的prikry型强迫概念是[公式:见文]-Prikry。我们证明了对于一个非反射平稳集[公式:见文],给定一个[公式:见文]-Prikry偏序集[公式:见文]和一个[公式:见文]名称,存在一个对应的[公式:见文]-Prikry偏序集,它投射到[公式:见文]并杀死[公式:见文]的平稳性。在本文中,我们开发了一种迭代[公式:见文]-Prikry偏置集的通用方案,并验证了基于扩展器的Prikry强迫是[公式:见文]-Prikry。作为一个应用,我们放大了laver -不可破坏超紧基数的可数极限幂,然后迭代杀死了其后继的所有非反射平稳子集。这就产生了一个奇异基数假设失效的模型,在这个模型中,固定集合有限族的同时反射成立。
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Sigma-Prikry forcing II: Iteration Scheme
In Part I of this series [5], we introduced a class of notions of forcing which we call [Formula: see text]-Prikry, and showed that many of the known Prikry-type notions of forcing that centers around singular cardinals of countable cofinality are [Formula: see text]-Prikry. We proved that given a [Formula: see text]-Prikry poset [Formula: see text] and a [Formula: see text]-name for a nonreflecting stationary set [Formula: see text], there exists a corresponding [Formula: see text]-Prikry poset that projects to [Formula: see text] and kills the stationarity of [Formula: see text]. In this paper, we develop a general scheme for iterating [Formula: see text]-Prikry posets, as well as verify that the Extender-based Prikry forcing is [Formula: see text]-Prikry. As an application, we blow-up the power of a countable limit of Laver-indestructible supercompact cardinals, and then iteratively kill all nonreflecting stationary subsets of its successor. This yields a model in which the singular cardinal hypothesis fails and simultaneous reflection of finite families of stationary sets holds.
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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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