End extensions and numbers of countable models

Journal of Symbolic Logic 43 (3):550-562 (1978)
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Abstract

We prove that every model of $T = \mathrm{Th}(\omega, countable) has an end extension; and that every countable theory with an infinite order and Skolem functions has 2 ℵ 0 nonisomorphic countable models; and that if every model of T has an end extension, then every |T|-universal model of T has an end extension definable with parameters

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DOI

10.2307/2273531

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reprint Shelah, Saharon (1981) "End Extensions and Numbers of Countable Models". Journal of Symbolic Logic 46(3):663-663

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References found in this work

Annals of Mathematical Logic: Announcement of a New Periodical.[author unknown] - 1969 - Journal of Symbolic Logic 34 (3):532-532.

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