Controlling the number of normal measures at successor cardinals
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Publication:6094155
DOI10.1002/malq.202000087zbMath1521.03172OpenAlexW4293149130MaRDI QIDQ6094155
Publication date: 12 September 2023
Published in: Mathematical Logic Quarterly (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1002/malq.202000087
Consistency and independence results (03E35) Large cardinals (03E55) Axiom of choice and related propositions (03E25)
Cites Work
- Infinitary combinatorics and the axiom of determinateness
- Set theory without choice: Not everything on cofinality is possible
- Instances of dependent choice and the measurability of \(\aleph _{\omega +1}\)
- A model with a measurable which does not carry a normal measure
- The ultrapower axiom UA and the number of normal measures over \(\aleph_1\) and \(\aleph_2\)
- KWithout the Measurable
- Structural Consequences of AD
- The number of normal measures
- Large cardinals with few measures
- How many normal measures can ℵω1+1 carry?
- Regular Cardinals in Models of ZF
- A Consistent Consequence of AD
- Sets constructible from sequences of ultrafilters
- Successive weakly compact or singular cardinals
- The linearity of the Mitchell order
- AD and patterns of singular cardinals below Θ
- How many normal measures can \alephω+ 1carry?
- Inverse limit reflection and the structure of L(Vλ+1)
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