Domain Extension and Ideal Elements in Mathematics†

Philosophia Mathematica 29 (3):366-391 (2021)
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Abstract

Domain extension in mathematics occurs whenever a given mathematical domain is augmented so as to include new elements. Manders argues that the advantages of important cases of domain extension are captured by the model-theoretic notions of existential closure and model completion. In the specific case of domain extension via ideal elements, I argue, Manders’s proposed explanation does not suffice. I then develop and formalize a different approach to domain extension based on Dedekind’s Habilitationsrede, to which Manders’s account is compared. I conclude with an examination of three possible stances towards extensions via ideal elements.

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10.1093/philmat/nkab018

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Anna Bellomo
University of Vienna

Citations of this work

Deep Disagreement in Mathematics.Andrew Aberdein - 2023 - Global Philosophy 33 (1):1-27.
Peacock's Principle of Permanence and Hankel's Reception.Anna Bellomo - forthcoming - Hopos: The Journal of the International Society for the History of Philosophy of Science.

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References found in this work

Model theory.Wilfrid Hodges - 2008 - Stanford Encyclopedia of Philosophy.
Frege versus Cantor and Dedekind: On the Concept of Number.W. W. Tait - 1996 - In Matthias Schirn (ed.), Frege: Importance and Legacy. New York: De Gruyter. pp. 70-113.

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