Axiomatizing Changing Conceptions of the Geometric Continuum I: Euclid-Hilbert†

Philosophia Mathematica 26 (3):346-374 (2018)
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Abstract

We give a general account of the goals of axiomatization, introducing a variant on Detlefsen’s notion of ‘complete descriptive axiomatization’. We describe how distinctions between the Greek and modern view of number, magnitude, and proportion impact the interpretation of Hilbert’s axiomatization of geometry. We argue, as did Hilbert, that Euclid’s propositions concerning polygons, area, and similar triangles are derivable from Hilbert’s first-order axioms. We argue that Hilbert’s axioms including continuity show much more than the geometrical propositions of Euclid’s theorems and thus are an immodest complete descriptive axiomatization of that subject.

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10.1093/philmat/nkx030

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David Hilbert and the foundations of the theory of plane area.Eduardo N. Giovannini - 2021 - Archive for History of Exact Sciences 75 (6):649-698.

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