‘Mathematical Platonism’ Versus Gathering the Dead: What Socrates teaches Glaucon &dagger

Philosophia Mathematica 13 (2):115-134 (2005)
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Abstract

Glaucon in Plato's _Republic_ fails to grasp intermediates. He confuses pursuing a goal with achieving it, and so he adopts ‘mathematical platonism’. He says mathematical objects are eternal. Socrates urges a seriously debatable, and seriously defensible, alternative centered on the destruction of hypotheses. He offers his version of geometry and astronomy as refuting the charge that he impiously ‘ponders things up in the sky and investigates things under the earth and makes the weaker argument the stronger’. We relate his account briefly to mathematical developments by Plato's associates Theaetetus and Eudoxus, and then to the past 200 years' developments in geometry.

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10.1093/philmat/nki010

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Colin McLarty
Case Western Reserve University

Citations of this work

Recollection and the Mathematician's Method in Plato's Meno.E. Landry - 2012 - Philosophia Mathematica 20 (2):143-169.
Technology and Mathematics.Sven Ove Hansson - 2020 - Philosophy and Technology 33 (1):117-139.
Elaine Landry.*Plato Was Not a Mathematical Platonist.Colin McLarty - 2023 - Philosophia Mathematica 31 (3):417-424.

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References found in this work

L'irrationalité dans les mathématiques grecques jusqu'à Euclide.Maurice Caveing - 1999 - Revue Philosophique de la France Et de l'Etranger 189 (1):87-88.

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