Completeness, Categoricity and Imaginary Numbers: The Debate on Husserl

Bulletin of the Section of Logic 49 (2):109-125 (2020)
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Abstract

Husserl's two notions of "definiteness" enabled him to clarify the problem of imaginary numbers. The exact meaning of these notions is a topic of much controversy. A "definite" axiom system has been interpreted as a syntactically complete theory, and also as a categorical one. I discuss whether and how far these readings manage to capture Husserl's goal of elucidating the problem of imaginary numbers, raising objections to both positions. Then, I suggest an interpretation of "absolute definiteness" as semantic completeness and argue that this notion does not suffice to explain Husserl's solution to the problem of imaginary numbers.

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10.18778/0138-0680.2020.07

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Citations of this work

Husserl, Model Theory, and Formal Essences.Kyle Banick - 2020 - Husserl Studies 37 (2):103-125.
Completeness: From Husserl to Carnap.Víctor Aranda - 2022 - Logica Universalis 16 (1):57-83.

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References found in this work

[Introduction].Wilfrid Hodges - 1988 - Journal of Symbolic Logic 53 (1):1.
Truth in a Structure.Wilfrid Hodges - 1986 - Proceedings of the Aristotelian Society 86:135 - 151.

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