Authors: | Tanović, Predrag | Affiliations: | Mathematical Institute of the Serbian Academy of Sciences and Arts | Title: | Non-isolated types in stable theories | Journal: | Annals of Pure and Applied Logic | Volume: | 145 | Issue: | 1 | First page: | 1 | Last page: | 15 | Issue Date: | 1-Jan-2007 | Rank: | M22 | ISSN: | 0168-0072 | DOI: | 10.1016/j.apal.2006.05.014 | Abstract: | We introduce notions of strong and eventual strong non-isolation for types in countable, stable theories. For T superstable or small stable we prove a dichotomy theorem: a regular type over a finite domain is either eventually strongly non-isolated or is non-orthogonal to a NENI type (in T e q ). As an application we obtain the upper bound for Lascar's rank of a superstable theory which is one-based or trivial, and has fewer than 2 א0 non-isomorphic countable models. |
Keywords: | Fundamental order | Lascar's rank | Regular type | Small theory | Strongly non-isolated type | Superstable theory | Publisher: | Elsevier |
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