Abstract
AbstractWe present a countable complete first order theory T which is model theoretically very well behaved: it eliminates quantifiers, is ω-stable, it has NDOP and is shallow of depth two. On the other hand, there is no countable bound on the Scott heights of its countable models, which implies that the isomorphism relation for countable models is not Borel.
Publisher
Cambridge University Press (CUP)
Cited by
4 articles.
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1. A descriptive Main Gap Theorem;Journal of Mathematical Logic;2020-06-24
2. Borel $$^{*}$$ Sets in the Generalized Baire Space and Infinitary Languages;Jaakko Hintikka on Knowledge and Game-Theoretical Semantics;2018
3. Borel complexity and potential canonical Scott sentences;Fundamenta Mathematicae;2017
4. History and Motivation;Memoirs of the American Mathematical Society;2013-12-16