Two Approaches to Foundations in Greek Mathematics: Apollonius and Geminus

Science in Context 23 (2):151-186 (2010)
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Abstract

ArgumentThis article is the sequel to an article published in the previous issue ofScience in Contextthat dealt with homeomeric lines (Acerbi 2010). The present article deals with foundational issues in Greek mathematics. It considers two key characters in the study of mathematical homeomery, namely, Apollonius and Geminus, and analyzes in detail their approaches to foundational themes as they are attested in ancient sources. The main historiographical result of this paper is to show thatthere wasa well-establishedmathematicalfield of discourse in “foundations of mathematics,” a fact that is by no means obvious. The paper argues that the authors involved in this field of discourse set up a variety of philosophical, scholarly, and mathematical tools that they used in developing their investigations.

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10.1017/s0269889710000037

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The Menaechmi.Leonid Zhmud - 2023 - Apeiron 56 (3):577-586.

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References found in this work

Truth, etc.Jonathan Barnes - 2007 - Bulletin of Symbolic Logic 13 (4):549-552.
Something and nothing: the Stoics on concepts and universals.Victor Caston - 1999 - Oxford Studies in Ancient Philosophy 17:145-213.
Saving the Appearances.G. E. R. Lloyd - 1978 - Classical Quarterly 28 (01):202-.
Truth, Etc. Six Lectures on Ancient Logic.Jonathan Barnes - 2007 - Oxford, England: Oxford University Press UK.

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