Frege’s permutation argument revisited

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Synthese 147 (1):43-61 (2005)
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Abstract

In Section 10 of Grundgesetze, Volume I, Frege advances a mathematical argument (known as the permutation argument), by means of which he intends to show that an arbitrary value-range may be identified with the True, and any other one with the False, without contradicting any stipulations previously introduced (we shall call this claim the identifiability thesis, following Schroeder-Heister (1987)). As far as we are aware, there is no consensus in the literature as to (i) the proper interpretation of the permutation argument and the identifiability thesis, (ii) the validity of the permutation argument, and (iii) the truth of the identifiability thesis. In this paper, we undertake a detailed technical study of the two main lines of interpretation, and gather some evidence for favoring one interpretation over the other.

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10.1007/s11229-004-6206-6

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Kai Wehmeier
University of California, Irvine

Citations of this work

Frege's Contribution to Philosophy of Language.Richard Heck & Robert May - 2005 - In Ernie Lepore & Barry C. Smith (eds.), The Oxford Handbook of Philosophy of Language. Oxford, England: Oxford University Press. pp. 3-39.

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References found in this work

Frege.Michael Dummett - 1981 - Cambridge: Harvard University Press.
The basic laws of arithmetic.Gottlob Frege - 1893 - Berkeley,: University of California Press. Edited by Montgomery Furth.
Frege: Philosophy of Mathematics.Michael DUMMETT - 1991 - Philosophy 68 (265):405-411.

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