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References (7)
-
T. Jech (1984)
Stationary Subsets of Inaccessible Cardinals, Axiomatic Set theory (Contemporary Mathematics 31) -
T. Jech, S. Shelah (1990)
Full reflection of stationary sets below ℵωJournal of Symbolic Logic, 55
-
Azriel Levy, R. Solovay (1967)
Measurable cardinals and the continuum hypothesisIsrael Journal of Mathematics, 5
-
R. Jensen (1972)
The fine structure of the constructible hierarchyAnnals of Mathematical Logic, 4
-
M. Magidor (1982)
Reflecting stationary setsJournal of Symbolic Logic, 47
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R. Laver (1978)
Making the supercompactness of κ indestructible under κ-directed closed forcingIsrael Journal of Mathematics, 29
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J. Cummings, M. Foreman (1998)
The Tree PropertyAdvances in Mathematics, 133
- Publisher
- Springer Journals
- Copyright
- Copyright © 2010 by Springer-Verlag
- Subject
- Mathematics; Algebra; Mathematics, general; Mathematical Logic and Foundations
- ISSN
- 0933-5846
- eISSN
- 1432-0665
- DOI
- 10.1007/s00153-010-0191-x
- Publisher site
- See Article on Publisher Site
Abstract
Jech and Shelah in J Symb Log, 55, 822–830 (1990) studied full reflection below $${\aleph_\omega}$$ , and produced a model in which the extent of full reflection is maximal in a certain sense. We produce a model in which full reflection is maximised in a different direction.
Journal
Archive for Mathematical Logic – Springer Journals
Published: Jun 11, 2010