Remarks on structure theorems for \(\omega_ 1\)-saturated models (Q1903589)
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scientific article; zbMATH DE number 824602
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Remarks on structure theorems for \(\omega_ 1\)-saturated models |
scientific article; zbMATH DE number 824602 |
Statements
Remarks on structure theorems for \(\omega_ 1\)-saturated models (English)
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13 January 1997
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The paper is concerned with the problem of classifying those complete countable stable theories \(T\) whose \(\omega_1\)-saturated models satisfy a structure property SP in the sense of Shelah. Several characterizations of SP are proved when \(T\) admits both ndop and ndidip (if ndop -- or ndidip -- fails, then SP does not hold). This provides a new proof of a result of Hart, Pillay and Starchenko saying that, if \(T\) is 1-based (with ndop and ndidip), then the \(\omega_1\)-saturated models of \(T\) satisfy SP.
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\(\omega_ 1\)-saturated models
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countable stable theories
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structure property
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ndop
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ndidip
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