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Constant Regions in Models of Arithmetic
Notre Dame Journal of Formal Logic 56 (4):603-624 (2015)
Abstract
This paper introduces a new theory of constant regions, which generalizes that of interstices, in nonstandard models of arithmetic. In particular, we show that two homogeneity notions introduced by Richard Kaye and the author, namely, constantness and pregenericity, are equivalent. This led to some new characterizations of generic cuts in terms of existential closedness.Links
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References found in this work
Automorphisms of recursively saturated models of arithmetic.Richard Kaye, Roman Kossak & Henryk Kotlarski - 1991 - Annals of Pure and Applied Logic 55 (1):67-99.
On interstices of countable arithmetically saturated models of Peano arithmetic.Nicholas Bamber & Henryk Kotlarski - 1997 - Mathematical Logic Quarterly 43 (4):525-540.
The Model Theory of Generic Cuts.Tin Lok Wong & Richard Kaye - 2015 - In Åsa Hirvonen, Juha Kontinen, Roman Kossak & Andrés Villaveces (eds.), Logic Without Borders: Essays on Set Theory, Model Theory, Philosophical Logic and Philosophy of Mathematics. Boston: De Gruyter. pp. 281-296.
Generic cuts in models of arithmetic.Richard Kaye - 2008 - Mathematical Logic Quarterly 54 (2):129-144.
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