Understanding the Infinite I: Niceness, Robustness, and Realism†: Articles

Philosophia Mathematica 18 (3):253-275 (2010)
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Abstract

This paper treats the situation where a single mathematical construction satisfies a multitude of interesting mathematical properties. The examples treated are all infinitely large entities. The clustering of properties is termed ‘niceness’ by the mathematician Michiel Hazewinkel, a concept we compare to the ‘robustness’ described by the philosopher of science William Wimsatt. In the final part of the paper, we bring our findings to bear on the question of realism which concerns not whether mathematical entities exist as abstract objects, but rather whether the choice of our concepts is forced upon us.

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10.1093/philmat/nkq014

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David Corfield
University of Kent at Canterbury

Citations of this work

The Volterra Principle Generalized.Tim Räz - 2017 - Philosophy of Science 84 (4):737-760.
Understanding the infinite II: Coalgebra.David Corfield - 2011 - Studies in History and Philosophy of Science Part A 42 (4):571-579.

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References found in this work

A confutation of convergent realism.Larry Laudan - 1981 - Philosophy of Science 48 (1):19-49.
A Confutation of Convergent Realism.Larry Laudan - 2001 - In Yuri Balashov & Alexander Rosenberg (eds.), Philosophy of Science: Contemporary Readings. New York: Routledge. pp. 211.
Lautman et la réalité des mathématiques.David Corfield - 2010 - Philosophiques 37 (1):95-109.

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