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16Tight stationarity and tree-like scalesAnnals of Pure and Applied Logic 166 (10): 1019-1036. 2015.
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15On the relationship between mutual and tight stationarityAnnals of Pure and Applied Logic 102963. 2021.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 statio…Read more
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8Some Results on Tight Stationarity, University of California, Los Angeles, USA, 2016. Supervised by Itay NeemanBulletin of Symbolic Logic 24 (2): 198-199. 2018.
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