There may be infinitely many near-coherence classes underu< ∂
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Publication:5444698
DOI10.2178/JSL/1203350784zbMath1149.03038OpenAlexW2048458596MaRDI QIDQ5444698
Publication date: 25 February 2008
Published in: Journal of Symbolic Logic (Search for Journal in Brave)
Full work available at URL: https://projecteuclid.org/euclid.jsl/1203350784
Related Items (6)
Composants of the Stone-Čech remainder of the reals ⋮ A continuum without non-block points ⋮ Ideal weak QN-spaces ⋮ Finite powers and products of Menger sets ⋮ Cardinal characteristics for Menger-bounded subgroups ⋮ 2009 North American Annual Meeting of the Association for Symbolic Logic
Cites Work
- Near coherence of filters. III: A simplified consistency proof
- Near coherence of filters. I: Cofinal equivalence of models of arithmetic
- There may be simple \(P_{\aleph _ 1}\)- and \(P_{\aleph _ 2}\)-points and the Rudin-Keisler ordering may be downward directed
- On minimal \(\pi\)-character of points in extremally disconnected compact spaces
- Ultrafilters with small generating sets
- Consistency results about filters and the number of inequivalent growth types
- On the cofinality of ultrapowers
- Forcing and stable ordered–union ultrafilters
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