The strong and super tree properties at successors of singular cardinals
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Publication:6642885
DOI10.1017/JSL.2023.96MaRDI QIDQ6642885
Publication date: 25 November 2024
Published in: Journal of Symbolic Logic (Search for Journal in Brave)
Cites Work
- The combinatorial essence of supercompactness
- Strong tree properties for two successive cardinals
- The tree property and the failure of SCH at uncountable cofinality
- The tree property at the successor of a singular limit of measurable cardinals
- A model of Cummings and Foreman revisited
- Aronszajn trees on \(\aleph_2\) and \(\aleph_3\).
- The tree property at successors of singular cardinals
- The tree property
- The super tree property at the successor of a singular
- THE TREE PROPERTY UP TO אω+1
- THE STRONG TREE PROPERTY AT SUCCESSORS OF SINGULAR CARDINALS
- ARONSZAJN TREES AND FAILURE OF THE SINGULAR CARDINAL HYPOTHESIS
- Combinatorial Characterization of Supercompact Cardinals
- The tree property on a countable segment of successors of singular cardinals
- Strong tree properties for small cardinals
- The tree property at ℵω+1
- Aronszajn trees and the independence of the transfer property
- Some combinatorial problems concerning uncountable cardinals
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