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Some two-cardinal results for o-minimal theories
Journal of Symbolic Logic 63 (2):543-548 (1998)
Abstract
We examine two-cardinal problems for the class of O-minimal theories. We prove that an O-minimal theory which admits some (κ, λ) must admit every (κ , λ ). We also prove that every “reasonable” variant of Chang’s Conjecture is true for O-minimal structures. Finally, we generalize these results from the two-cardinal case to the δ-cardinal case for arbitrary ordinals δAuthor's Profile
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References found in this work
A Löwenheim-Skolem Theorem for Cardinals for Apart.R. L. Vaught, J. W. Addison, Leon Henkin & Alfred Tarski - 1968 - Journal of Symbolic Logic 33 (3):476-477.
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