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  1. (1 other version)Semistationary and stationary reflection.Hiroshi Sakai - 2008 - Journal of Symbolic Logic 73 (1):181-192.
    We study the relationship between the semistationary reflection principle and stationary reflection principles. We show that for all regular cardinals Λ ≥ ω₂ the semistationary reflection principle in the space [Λ](1) implies that every stationary subset of $E_{\omega}^{\lambda}\coloneq \{\alpha \in \lambda \,|\,{\rm cf}(\alpha)=\omega \}$ reflects. We also show that for all cardinals Λ ≥ ω₃ the semistationary reflection principle in [Λ](1) does not imply the stationary reflection principle in [Λ](1).
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  • Barwise: Abstract model theory and generalized quantifiers.Jouko Väänänen - 2004 - Bulletin of Symbolic Logic 10 (1):37-53.
    §1. Introduction. After the pioneering work of Mostowski [29] and Lindström [23] it was Jon Barwise's papers [2] and [3] that brought abstract model theory and generalized quantifiers to the attention of logicians in the early seventies. These papers were greeted with enthusiasm at the prospect that model theory could be developed by introducing a multitude of extensions of first order logic, and by proving abstract results about relationships holding between properties of these logics. Examples of such properties areκ-compactness.Any set (...)
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  • Rado's Conjecture implies that all stationary set preserving forcings are semiproper.Philipp Doebler - 2013 - Journal of Mathematical Logic 13 (1):1350001.
    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.
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  • Generic compactness reformulated.Bernhard König - 2004 - Archive for Mathematical Logic 43 (3):311-326.
    We point out a connection between reflection principles and generic large cardinals. One principle of pure reflection is introduced that is as strong as generic supercompactness of ω2 by Σ-closed forcing. This new concept implies CH and extends the reflection principles for stationary sets in a canonical way.
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  • Barwise: Abstract Model Theory and Generalized Quantifiers.Jouko Va An Anen - 2004 - Bulletin of Symbolic Logic 10 (1):37-53.
    §1. Introduction. After the pioneering work of Mostowski [29] and Lindström [23] it was Jon Barwise's papers [2] and [3] that brought abstract model theory and generalized quantifiers to the attention of logicians in the early seventies. These papers were greeted with enthusiasm at the prospect that model theory could be developed by introducing a multitude of extensions of first order logic, and by proving abstract results about relationships holding between properties of these logics. Examples of such properties areκ-compactness.Any set (...)
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  • On chromatic number of graphs and set systems.P. Erdös, A. Hajnal & B. Rothchild - 1973 - In A. R. D. Mathias & Hartley Rogers (eds.), Cambridge Summer School in Mathematical Logic. New York,: Springer Verlag. pp. 531--538.
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