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Computable structures in generic extensions

Julia Knight, Antonio Montalbán & Noah Schweber

Journal of Symbolic Logic 81 (3):814-832 (2016)

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Atomic models higher up.Jessica Millar & Gerald E. Sacks - 2008 - Annals of Pure and Applied Logic 155 (3):225-241.details There exists a countable structure of Scott rank where and where the -theory of is not ω-categorical. The Scott rank of a model is the least ordinal β where the model is prime in its -theory. Most well-known models with unbounded atoms below also realize a non-principal -type; such a model that preserves the Σ1-admissibility of will have Scott rank . Makkai [M. Makkai, An example concerning Scott heights, J. Symbolic Logic 46 301–318. [4]] produces a hyperarithmetical model of Scott (...) Download Export citation Bookmark 3 citations
Set Theory.Thomas Jech - 1999 - Studia Logica 63 (2):300-300.details Download Export citation Bookmark 327 citations
Book Reviews. [REVIEW]Wilfrid Hodges - 1997 - Studia Logica 64 (1):133-149.details Download Export citation Bookmark 109 citations
Bounds on Weak Scattering.Gerald E. Sacks - 2007 - Notre Dame Journal of Formal Logic 48 (1):5-31.details The notion of a weakly scattered theory T is defined. T need not be scattered. For each a model of T, let sr() be the Scott rank of . Assume sr() ≤ ω\sp A \sb 1 for all a model of T. Let σ\sp T \sb 2 be the least Σ₂ admissible ordinal relative to T. If T admits effective k-splitting as defined in this paper, then θσ\cal Aθ\cal A$ a model of T. Download Export citation Bookmark 7 citations

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