On some standard objections to mathematical conventionalism

Belgrade Philosophical Annual 30:83-98 (2017)
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Abstract

According to Wittgenstein, mathematical propositions are rules of grammar, that is, conventions, or implications of conventions. So his position can be regarded as a form of conventionalism. However, mathematical conventionalism is widely thought to be untenable due to objections presented by Quine, Dummett and Crispin Wright. It has also been argued that only an implausibly radical form of conventionalism could withstand the critical implications of Wittgenstein’s rule-following considerations. In this article I discuss those objections to conventionalism and argue that none of them is convincing.

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Severin Schroeder
University of Reading

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References found in this work

The concept of law.Hla Hart - 1961 - New York: Oxford University Press.
Wittgenstein on rules and private language.Saul A. Kripke - 1982 - Revue Philosophique de la France Et de l'Etranger 173 (4):496-499.
Truth by Convention.W. V. Quine - 1936 - In Philosophical Essays for Alfred North Whitehead. London: Longmans, Green & Co.. pp. 90–124.

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