Tameness in generalized metric structures
Abstract
We broaden the framework of metric abstract elementary classes (mAECs) in several essential ways, chiefly by allowing the metric to take values in a well-behaved quantale. As a proof of concept we show that the result of Boney and Zambrano (Around the set-theoretical consistency of d-tameness of metric abstract elementary classes, arXiv:1508.05529, 2015) on (metric) tameness under a large cardinal assumption holds in this more general context. We briefly consider a further generalization to partial metric spaces, and hint at connections to classes of fuzzy structures, and structures on sheaves.Author's Profile
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References found in this work
On strong compactness and supercompactness.Telis K. Menas -1975 -Annals of Mathematical Logic 7 (4):327-359.
Galois-stability for Tame abstract elementary classes.Rami Grossberg &Monica Vandieren -2006 -Journal of Mathematical Logic 6 (01):25-48.
Categoricity from one successor cardinal in Tame abstract elementary classes.Rami Grossberg &Monica Vandieren -2006 -Journal of Mathematical Logic 6 (2):181-201.
Upward Stability Transfer for Tame Abstract Elementary Classes.John Baldwin,David Kueker &Monica VanDieren -2006 -Notre Dame Journal of Formal Logic 47 (2):291-298.
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