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  1. (1 other version)Second‐Order Logic and Set Theory.Jouko Väänänen - 2015 - Philosophy Compass 10 (7):463-478.
    Both second-order logic and set theory can be used as a foundation for mathematics, that is, as a formal language in which propositions of mathematics can be expressed and proved. We take it upon ourselves in this paper to compare the two approaches, second-order logic on one hand and set theory on the other hand, evaluating their merits and weaknesses. We argue that we should think of first-order set theory as a very high-order logic.
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  • Tracing Internal Categoricity.Jouko Väänänen - 2020 - Theoria 87 (4):986-1000.
    Theoria, Volume 87, Issue 4, Page 986-1000, August 2021.
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  • Completeness and categoricity (in power): Formalization without foundationalism.John T. Baldwin - 2014 - Bulletin of Symbolic Logic 20 (1):39-79.
    We propose a criterion to regard a property of a theory (in first or second order logic) as virtuous: the property must have significant mathematical consequences for the theory (or its models). We then rehearse results of Ajtai, Marek, Magidor, H. Friedman and Solovay to argue that for second order logic, ‘categoricity’ has little virtue. For first order logic, categoricity is trivial; but ‘categoricity in power’ has enormous structural consequences for any of the theories satisfying it. The stability hierarchy extends (...)
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