On the uniqueness property of forking in abstract elementary classes

On the uniqueness property of forking in abstract elementary classes

In the setup of elementary classes satisfying a local version of superstability, we prove the uniqueness property for μ‐forking, a certain independence notion arising from splitting. This had been a longstanding technical difficulty when constructing forking‐like notions in this setup. As an applica...

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Veröffentlicht in:Mathematical logic quarterly 2017-12, Vol.63 (6), p.598-604
1. Verfasser: Vasey, Sebastien
Format: Artikel
Sprache:eng
Schlagworte:
Splitting
Uniqueness
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Zusammenfassung:In the setup of elementary classes satisfying a local version of superstability, we prove the uniqueness property for μ‐forking, a certain independence notion arising from splitting. This had been a longstanding technical difficulty when constructing forking‐like notions in this setup. As an application, we show that the two versions of forking symmetry appearing in the literature (the one defined by Shelah for good frames and the one defined by VanDieren for splitting) are equivalent.
ISSN:0942-5616
1521-3870
DOI:10.1002/malq.201700020