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On automorphism groups of countable structures
Journal of Symbolic Logic 63 (3):891-896 (1998)
Abstract
Strengthening a theorem of D.W. Kueker, this paper completely characterizes which countable structures do not admit uncountable L ω 1 ω -elementarily equivalent models. In particular, it is shown that if the automorphism group of a countable structure M is abelian, or even just solvable, then there is no uncountable model of the Scott sentence of M. These results arise as part of a study of Polish groups with compatible left-invariant complete metricsOther Versions
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Citations of this work
Knight's model, its automorphism group, and characterizing the uncountable cardinals.Greg Hjorth - 2002 - Journal of Mathematical Logic 2 (01):113-144.
The Nonabsoluteness of Model Existence in Uncountable Cardinals for $L{omega{1},omega}$.Sy-David Friedman, Tapani Hyttinen & Martin Koerwien - 2013 - Notre Dame Journal of Formal Logic 54 (2):137-151.
The Vaught Conjecture: Do Uncountable Models Count?John T. Baldwin - 2007 - Notre Dame Journal of Formal Logic 48 (1):79-92.
A model of $$\mathsf {ZFA}+ \mathsf {PAC}$$ ZFA + PAC with no outer model of $$\mathsf {ZFAC}$$ ZFAC with the same pure part.Paul Larson & Saharon Shelah - 2018 - Archive for Mathematical Logic 57 (7-8):853-859.
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