Possible size of an ultrapower of $\omega$

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Archive for Mathematical Logic 38 (1):61-77 (1999)
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Abstract

Let $\omega$ be the first infinite ordinal (or the set of all natural numbers) with the usual order $<$ . In § 1 we show that, assuming the consistency of a supercompact cardinal, there may exist an ultrapower of $\omega$ , whose cardinality is (1) a singular strong limit cardinal, (2) a strongly inaccessible cardinal. This answers two questions in [1], modulo the assumption of supercompactness. In § 2 we construct several $\lambda$ -Archimedean ultrapowers of $\omega$ under some large cardinal assumptions. For example, we show that, assuming the consistency of a measurable cardinal, there may exist a $\lambda$ -Archimedean ultrapower of $\omega$ for some uncountable cardinal $\lambda$ . This answers a question in [8], modulo the assumption of measurability

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10.1007/s001530050115

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Citations of this work

Σ‐algebraically compact modules and ‐compact cardinals.Jan Šaroch - 2015 - Mathematical Logic Quarterly 61 (3):196-201.
Maharam spectra of Loeb spaces.Renling Jin & H. Keisler - 2000 - Journal of Symbolic Logic 65 (2):550-566.

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References found in this work

Set Theory.T. Jech - 2005 - Bulletin of Symbolic Logic 11 (2):243-245.
Strong axioms of infinity and elementary embeddings.Robert M. Solovay - 1978 - Annals of Mathematical Logic 13 (1):73.
Set Theory.Thomas Jech - 1999 - Studia Logica 63 (2):300-300.
Classification Theory and the Number of Nonisomorphic Models.S. Shelah - 1982 - Journal of Symbolic Logic 47 (3):694-696.

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