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On automorphism groups of countable structures

Published:1998-09 Issue:3 Volume:63 Page:891-896
ISSN:0022-4812
Container-title:Journal of Symbolic Logic
language:en
Short-container-title:J. symb. log.

Author:

Gao Su

Abstract

AbstractStrengthening a theorem of D. W. Kueker, this paper completely charaterizes which countable structures do not admit uncountable Lω1ω-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 metrics.

Publisher

Cambridge University Press (CUP)

Subject

Logic,Philosophy

Reference8 articles.

1. Definability, automorphisms, and infinitary languages

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