Abstract
We show that for all natural numbers n, the theory “ZF + DC \(_{\aleph_n}\) + \(\aleph_{\omega}\) is a Rowbottom cardinal carrying a Rowbottom filter” has the same consistency strength as the theory “ZFC + There exists a measurable cardinal”. In addition, we show that the theory “ZF + \(\aleph_{\omega_1}\) is an ω 2-Rowbottom cardinal carrying an ω 2-Rowbottom filter and ω 1 is regular” has the same consistency strength as the theory “ZFC + There exist ω 1 measurable cardinals”. We also discuss some generalizations of these results.
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The first author’s research was partially supported by PSC-CUNY Grant 66489-00-35 and a CUNY Collaborative Incentive Grant. In addition, the first author wishes to thank the members of the set theory group in Bonn for all of the hospitality shown him during his visits to the Mathematisches Institut.
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Apter, A.W., Koepke, P. The Consistency Strength of \(\aleph_{\omega}\) and \(\aleph_{{\omega}_1}\) Being Rowbottom Cardinals Without the Axiom of Choice. Arch. Math. Logic 45, 721–737 (2006). https://doi.org/10.1007/s00153-006-0005-3
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DOI: https://doi.org/10.1007/s00153-006-0005-3
Keywords
- Jonsson cardinal
- Rowbottom cardinal
- Rowbottom filter
- Prikry forcing
- Coherent sequence of Ramsey cardinals
- Core model