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On the definability of the quantifier “there exist uncountably many”
Studia Logica 44 (3):257 - 264 (1985)
Abstract
In paper [5] it was shown that a great part of model theory of logic with the generalized quantifier Q x = there exist uncountably many x is reducible to the model theory of first order logic with an extra binary relation symbol. In this paper we consider when the quantifier Q x can be syntactically defined in a first order theory T. That problem was raised by Kosta Doen when he asked if the quantifier Q x can be eliminated in Peano arithmetic. We answer that question fully in this paper.My notes
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Citations of this work
Generalized Quantification as Substructural Logic.Natasha Alechina & Michiel Van Lambalgen - 1996 - Journal of Symbolic Logic 61 (3):1006 - 1044.
European Summer Meeting of the Association for Symbolic Logic, Paris, 1985.K. R. Apt - 1987 - Journal of Symbolic Logic 52 (1):295-349.
References found in this work
Logic with the quantifier “there exist uncountably many”.H. Jerome Keisler - 1970 - Annals of Mathematical Logic 1 (1):1-93.
Logic with the quantifier "there exist uncountably many".H. Jerome Keisler - 1970 - Annals of Mathematical Logic 1 (1):1.
Regular relations and the quantifier “there exist uncountably many”.Zarko Mijajlović & Valentina Harizanov - 1983 - Mathematical Logic Quarterly 29 (3):151-161.
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