-在更高基数上的可定义性:薄集,几乎不相交的族和长良序

IF 1.2 2区 数学 Q1 MATHEMATICS
Philipp Lücke, Sandra Müller
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引用次数: 2

摘要

给定一个不可数基数$\kappa $,我们考虑一个问题,即通常借助于选择公理构造的$\kappa $的幂集的子集是否可由$\Sigma _1$定义——仅使用基数$\kappa $和小于$\kappa $的遗传基数集作为参数的公式。对于可测基数的极限,我们证明了可定义集合的一个完美集合定理,并利用它将两个经典的不可定义性结果推广到更高的基数。首先,我们证明了Mathias关于自然数集的极大几乎不相交族的复杂性的一个经典结果可以推广到可测物的可测极限。其次,我们证明了对于可数多个可测基数的极限,长度至少为$\kappa ^+$的$\kappa $子集的可简定义良序的存在性暗示了实数的射影良序的存在性。此外,我们还确定了某些对象在奇异强极限基数处$\Sigma _1$ -定义不存在的确切一致性强度。最后,我们证明了大基数假设和强制公理导致这些陈述的类比在第一个不可数基数$\omega _1$处成立。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
-definability at higher cardinals: Thin sets, almost disjoint families and long well-orders
Abstract Given an uncountable cardinal $\kappa $ , we consider the question of whether subsets of the power set of $\kappa $ that are usually constructed with the help of the axiom of choice are definable by $\Sigma _1$ -formulas that only use the cardinal $\kappa $ and sets of hereditary cardinality less than $\kappa $ as parameters. For limits of measurable cardinals, we prove a perfect set theorem for sets definable in this way and use it to generalize two classical nondefinability results to higher cardinals. First, we show that a classical result of Mathias on the complexity of maximal almost disjoint families of sets of natural numbers can be generalized to measurable limits of measurables. Second, we prove that for a limit of countably many measurable cardinals, the existence of a simply definable well-ordering of subsets of $\kappa $ of length at least $\kappa ^+$ implies the existence of a projective well-ordering of the reals. In addition, we determine the exact consistency strength of the nonexistence of $\Sigma _1$ -definitions of certain objects at singular strong limit cardinals. Finally, we show that both large cardinal assumptions and forcing axioms cause analogs of these statements to hold at the first uncountable cardinal $\omega _1$ .
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来源期刊
Forum of Mathematics Sigma
Forum of Mathematics Sigma Mathematics-Statistics and Probability
CiteScore
1.90
自引率
5.90%
发文量
79
审稿时长
40 weeks
期刊介绍: Forum of Mathematics, Sigma is the open access alternative to the leading specialist mathematics journals. Editorial decisions are made by dedicated clusters of editors concentrated in the following areas: foundations of mathematics, discrete mathematics, algebra, number theory, algebraic and complex geometry, differential geometry and geometric analysis, topology, analysis, probability, differential equations, computational mathematics, applied analysis, mathematical physics, and theoretical computer science. This classification exists to aid the peer review process. Contributions which do not neatly fit within these categories are still welcome. Forum of Mathematics, Pi and Forum of Mathematics, Sigma are an exciting new development in journal publishing. Together they offer fully open access publication combined with peer-review standards set by an international editorial board of the highest calibre, and all backed by Cambridge University Press and our commitment to quality. Strong research papers from all parts of pure mathematics and related areas will be welcomed. All published papers will be free online to readers in perpetuity.
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