Independence, dimension and continuity in non-forking frames

Independence, dimension and continuity in non-forking frames

The notion J is independent in (M, M₀, N) was established by Shelah, for an AEC (abstract elementary class) which is stable in some cardinal λ and has a non-forking relation, satisfying the good λ-frame axioms and some additional hypotheses. Shelah uses independence to define dimension. Here, we sho...

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Veröffentlicht in:The Journal of symbolic logic 2013-06, Vol.78 (2), p.602-632
Hauptverfasser: Jarden, Adi, Sitton, Alon
Format: Artikel
Sprache:eng
Schlagworte:
Abstract logic
Cardinality
Categoricity
College mathematics
First order theories
Induction assumption
Logic
Logical theorems
Mathematical logic
Mathematics
Philosophy
Preprints
Uniqueness
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Zusammenfassung:The notion J is independent in (M, M₀, N) was established by Shelah, for an AEC (abstract elementary class) which is stable in some cardinal λ and has a non-forking relation, satisfying the good λ-frame axioms and some additional hypotheses. Shelah uses independence to define dimension. Here, we show the connection between the continuity property and dimension: if a non-forking satisfies natural conditions and the continuity property, then the dimension is well-behaved. As a corollary, we weaken the stability hypothesis and two additional hypotheses, that appear in Shelah's theorem.
ISSN:0022-4812
1943-5886
DOI:10.2178/jsl.7802140