The Dividing Line Methodology: Model Theory Motivating Set Theory

Theoria 87 (2):361-393 (2021)
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Abstract

We explore Shelah's model‐theoretic dividing line methodology. In particular, we discuss how problems in model theory motivated new techniques in model theory, for example classifying theories by their potential (consistently with Zermelo–Fraenkel set theory with the axiom of choice (ZFC)) spectrum of cardinals in which there is a universal model. Two other examples are the study (with Malliaris) of the Keisler order leading to a new ZFC result on cardinal invariants and attempts to clarify the “main gap” by reducing the dependence of certain versions on (highly independent) cardinal arithmetic.

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10.1111/theo.12297

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Between Pathology and Well-Behaviour – a Possible Foundation for Tame Mathematics.Angelo-Vlad Moldovan - 2022 - Studia Universitatis Babeş-Bolyai Philosophia 67 (Special Issue):63-75.

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References found in this work

Set Theory.T. Jech - 2005 - Bulletin of Symbolic Logic 11 (2):243-245.
Simple theories.Byunghan Kim & Anand Pillay - 1997 - Annals of Pure and Applied Logic 88 (2-3):149-164.
What Do We Want a Foundation to Do?Penelope Maddy - 2019 - In Stefania Centrone, Deborah Kant & Deniz Sarikaya (eds.), Reflections on the Foundations of Mathematics: Univalent Foundations, Set Theory and General Thoughts. Springer Verlag. pp. 293-311.
On model-theoretic tree properties.Artem Chernikov & Nicholas Ramsey - 2016 - Journal of Mathematical Logic 16 (2):1650009.

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