Strong tree properties, Kurepa trees, and guessing models

Chris Lambie-Hanson, Šárka Stejskalová
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Abstract

We investigate the generalized tree properties and guessing model properties introduced by Weiß and Viale, as well as natural weakenings thereof, studying the relationships among these properties and between these properties and other prominent combinatorial principles. We introduce a weakening of Viale and Weiß’s Guessing Model Property, which we call the Almost Guessing Property, and prove that it provides an alternate formulation of the slender tree property in the same way that the Guessing Model Property provides and alternate formulation of the ineffable slender tree property. We show that instances of the Almost Guessing Property have sufficient strength to imply, for example, failures of square or the nonexistence of weak Kurepa trees. We show that these instances of the Almost Guessing Property hold in the Mitchell model starting from a strongly compact cardinal and prove a number of other consistency results showing that certain implications between the principles under consideration are in general not reversible. In the process, we provide a new answer to a question of Viale by constructing a model in which, for all regular \(\theta \ge \omega _2\), there are stationarily many \(\omega _2\)-guessing models \(M \in {\mathscr {P}}_{\omega _2} H(\theta )\) that are not \(\omega _1\)-guessing models.

强树属性,Kurepa树和猜测模型
我们研究了Weiß和Viale引入的广义树性质和猜测模型性质,以及它们的自然弱点,研究了这些性质之间的关系以及这些性质与其他突出的组合原理之间的关系。我们引入了Viale和Weiß的猜测模型性质的弱化,我们称之为几乎猜测性质,并证明了它提供了细长树性质的替代表述,就像猜测模型性质提供了不可言说的细长树性质的替代表述一样。我们证明了几乎猜测性质的实例有足够的强度来暗示,例如,平方的失效或弱Kurepa树的不存在。我们表明,这些几乎猜测性质的实例在米切尔模型中成立,从一个强紧凑基数开始,并证明了许多其他一致性结果,表明所考虑的原则之间的某些含义通常是不可逆转的。在此过程中,我们通过构建一个模型为Viale的问题提供了一个新的答案,在这个模型中,对于所有规则\(\theta \ge \omega _2\),都有静态的许多\(\omega _2\) -猜测模型\(M \in {\mathscr {P}}_{\omega _2} H(\theta )\)而不是\(\omega _1\) -猜测模型。
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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