The Instrumentalist and Formalist Elements of Berkeley's Philosophy of Mathematics

Studies in History and Philosophy of Science Part A 3 (2):119 (1972)
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Abstract

The main thesis of this paper is that, Contrary to general belief, George berkeley did in fact express a coherent philosophy of mathematics in his major published works. He treated arithmetic and geometry separately and differently, And this paper focuses on his philosophy of arithmetic, Which is shown to be strikingly similar to the 19th and 20th century philosophies of mathematics known as 'formalism' and 'instrumentalism'. A major portion of the paper is devoted to showing how this philosophy of mathematics follows directly from berkeley 's theory of signs and his philosophy of language, And from his discovery of an alternative to the correspondence theory of truth used by most of his predecessors

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10.1016/0039-3681(72)90019-2

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Berkeley, the Ends of Language, and the Principles of Human Knowledge.P. J. E. Kail - 2007 - Proceedings of the Aristotelian Society 107 (1pt3):265-278.
Berkeley et les idées générales mathématiques.Claire Schwartz - 2010 - Revue Philosophique de la France Et de l'Etranger 1 (1):31-44.

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References found in this work

The Development of Logic.William Kneale & Martha Kneale - 1962 - Studia Logica 15:308-310.
A note on Berkeley as precursor of Mach.K. R. Popper - 1953 - British Journal for the Philosophy of Science 4 (13):26-36.
The Development of Logic.Benson Mates - 1962 - Journal of Symbolic Logic 27 (2):213-217.

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