The Number of Atomic Models of Uncountable Theories
Abstract
We show there exists a complete theory in a language of size continuum possessing a unique atomic model which is not constructible. We also show it is consistent with ZFC + 1 < 20 that there is a complete theory in a language of size 1 possessing a unique atomic model which is not constructible. Finally we show it is consistent with ZFC + 1 < 20 that for every complete theory T in a language of size 1, if T has uncountable atomic models but no constructible models, then T has 21 atomic models of size 1.
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