A Note on Leibniz's Argument Against Infinite Wholes

British Journal for the History of Philosophy 19 (1):121-129 (2011)
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Abstract

Leibniz had a well-known argument against the existence of infinite wholes that is based on the part-whole axiom: the whole is greater than the part. The refutation of this argument by Russell and others is equally well known. In this note, I argue (against positions recently defended by Arthur, Breger, and Brown) for the following three claims: (1) Leibniz himself had all the means to devise and accept this refutation; (2) This refutation does not presuppose the consistency of Cantorian set theory; (3) This refutation does not cast doubt on the part-whole axiom. Hence, should there be an obstacle to Gödel's wish to integrate Cantorian set theory within Leibniz' philosophy, it will not be this famous argument of Leibniz'.

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10.1080/09608788.2011.533015

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Mark van Atten
Centre National de la Recherche Scientifique

Citations of this work

Leibniz’s Argument Against Infinite Number.Filippo Costantini - 2019 - History of Philosophy & Logical Analysis 22 (1):203-218.

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References found in this work

Introduction to mathematical philosophy.Bertrand Russell - 1919 - New York: Dover Publications.
Introduction to Mathematical Philosophy.Bertrand Russell - 1919 - Revue Philosophique de la France Et de l'Etranger 89:465-466.
Philosophical papers and letters.Gottfried Wilhelm Leibniz & Leroy E. Loemker - 1956 - Chicago,: University of Chicago Press. Edited by Leroy E. Loemker.
Introduction to mathematical philosophy.Bertrand Russell - 1920 - Revue de Métaphysique et de Morale 27 (2):4-5.

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