Independence, dimension and continuity in non-forking frames

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Journal of Symbolic Logic 78 (2):602-632 (2013)
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Abstract

The notion $J$ is independent in $(M,M_0,N)$ was established by Shelah, for an AEC (abstract elementary class) which is stable in some cardinal $\lambda$ and has a non-forking relation, satisfying the good $\lambda$-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

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10.2178/jsl.7802140

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Citations of this work

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Canonical forking in AECs.Will Boney, Rami Grossberg, Alexei Kolesnikov & Sebastien Vasey - 2016 - Annals of Pure and Applied Logic 167 (7):590-613.
Tameness and extending frames.Will Boney - 2014 - Journal of Mathematical Logic 14 (2):1450007.
Downward categoricity from a successor inside a good frame.Sebastien Vasey - 2017 - Annals of Pure and Applied Logic 168 (3):651-692.
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A dichotomy theorem for regular types.Ehud Hrushovski & Saharon Shelah - 1989 - Annals of Pure and Applied Logic 45 (2):157-169.
First-order theories of abstract dependence relations.John T. Baldwin - 1984 - Annals of Pure and Applied Logic 26 (3):215-243.

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