Mathematics, Models and Zeno's Paradoxes

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Synthese 110 (1):143-166 (1997)
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Abstract

A version of nonstandard analysis, Internal Set Theory, has been used to provide a resolution of Zeno's paradoxes of motion. This resolution is inadequate because the application of Internal Set Theory to the paradoxes requires a model of the world that is not in accordance with either experience or intuition. A model of standard mathematics in which the ordinary real numbers are defined in terms of rational intervals does provide a formalism for understanding the paradoxes. This model suggests that in discussing motion, only intervals, rather than instants, of time are meaningful. The approach presented here reconciles resolutions of the paradoxes based on considering a finite number of acts with those based on analysis of the full infinite set Zeno seems to require. The paper concludes with a brief discussion of the classical and quantum mechanics of performing an infinite number of acts in a finite time.

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10.1023/a:1004967023017

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Citations of this work

Moving without being where you 're not; a non-bivalent way'.Constantin Antonopoulos - 2004 - Journal for General Philosophy of Science / Zeitschrift für Allgemeine Wissenschaftstheorie 35 (2):235 - 259.

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References found in this work

The analyst: A discourse addressed to an infidel mathematician.George Berkeley - 1734 - Wilkins, David R.. Edited by David R. Wilkins.
Tasks, super-tasks, and the modern eleatics.Paul Benacerraf - 1962 - Journal of Philosophy 59 (24):765-784.
Internal Set Theory: A New Approach to Nonstandard Analysis.Edward Nelson - 1977 - Journal of Symbolic Logic 48 (4):1203-1204.

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