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Tight stationarity and tree-like scales

Annals of Pure and Applied Logic 166 (10):1019-1036 (2015)

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On the relationship between mutual and tight stationarity.William Chen-Mertens & Itay Neeman - 2021 - Annals of Pure and Applied Logic:102963.details We construct a model where every increasing ω-sequence of regular cardinals carries a mutually stationary sequence which is not tightly stationary, and show that this property is preserved under a class of Prikry-type forcings. Along the way, we give examples in the Cohen and Prikry models of ω-sequences of regular cardinals for which there is a non-tightly stationary sequence of stationary subsets consisting of cofinality ω_1 ordinals, and show that such stationary sequences are mutually stationary in the presence of interleaved (...) supercompact cardinals. (shrink) Download Export citation Bookmark
On Singular Stationarity II (Tight Stationarity and Extenders-Based Methods).Omer Ben-Neria - 2019 - Journal of Symbolic Logic 84 (1):320-342.details We study the notion of tightly stationary sets which was introduced by Foreman and Magidor in [8]. We obtain two consistency results showing that certain sequences of regular cardinals${\langle {\kappa _n}\rangle _{n < \omega }}$can have the property that in some generic extension, every ground-model sequence of fixed-cofinality stationary sets${S_n} \subseteq {\kappa _n}$is tightly stationary. The results are obtained using variations of the short-extenders forcing method. Download Export citation Bookmark 3 citations

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