Abstract
AbstractIt is well known that saturation of ideals is closely related to the “antichain-catching” phenomenon from Foreman–Magidor–Shelah [10]. We consider several antichain-catching properties that are weaker than saturation, and prove:(1)If${\cal I}$is a normal ideal on$\omega _2 $which satisfiesstationary antichain catching, then there is an inner model with a Woodin cardinal;(2)For any$n \in \omega $, it is consistent relative to large cardinals that there is a normal ideal${\cal I}$on$\omega _n $which satisfiesprojective antichain catching, yet${\cal I}$is not saturated (or even strong). This provides a negative answer to Open Question number 13 from Foreman’s chapter in the Handbook of Set Theory ([7]).
Publisher
Cambridge University Press (CUP)
Reference24 articles.
1. Weak covering without countable closure
2. [18] Larson Paul B. , The stationary tower , University Lecture Series, vol. 32, American Mathematical Society, Providence, RI, 2004. Notes on a course by W. Hugh Woodin.
3. [24] Zeman Martin , Inner models and large cardinals , de Gruyter Series in Logic and its Applications, vol. 5, Walter de Gruyter & Co., Berlin, 2002.
4. The maximality of the core model
5. Handbook of Set Theory
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