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Rado's Conjecture implies that all stationary set preserving forcings are semiproper
Journal of Mathematical Logic 13 (1):1350001 (2013)
Abstract
Todorčević showed that Rado's Conjecture implies CC*, a strengthening of Chang's Conjecture. We generalize this by showing that also CC**, a global version of CC*, follows from RC. As a corollary we obtain that RC implies Semistationary Reflection and, i.e. the statement that all forcings that preserve the stationarity of subsets of ω1 are semiproper.Links
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Citations of this work
Combinatorial dichotomies in set theory.Stevo Todorcevic - 2011 - Bulletin of Symbolic Logic 17 (1):1-72.
Strong downward Löwenheim–Skolem theorems for stationary logics, I.Sakaé Fuchino, André Ottenbreit Maschio Rodrigues & Hiroshi Sakai - 2020 - Archive for Mathematical Logic 60 (1-2):17-47.
Rado’s Conjecture and its Baire version.Jing Zhang - 2019 - Journal of Mathematical Logic 20 (1):1950015.
A variant of Shelah's characterization of Strong Chang's Conjecture.Sean Cox & Hiroshi Sakai - 2019 - Mathematical Logic Quarterly 65 (2):251-257.
References found in this work
Semistationary and stationary reflection.Hiroshi Sakai - 2008 - Journal of Symbolic Logic 73 (1):181-192.
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