Empiricism in arithmetic and analysis

Philosophia Mathematica 11 (1):53-66 (2003)
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Abstract

We discuss the philosophical status of the statement that (9n – 1) is divisible by 8 for various sizes of the number n. We argue that even this simple problem reveals deep tensions between truth and verification. Using Gillies's empiricist classification of theories into levels, we propose that statements in arithmetic should be classified into three different levels depending on the sizes of the numbers involved. We conclude by discussing the relationship between the real number system and the physical continuum.

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10.1093/philmat/11.1.53

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Emily Davies
University of Birmingham

Citations of this work

Some remarks on the foundations of quantum theory.E. B. Davies - 2005 - British Journal for the Philosophy of Science 56 (3):521-539.

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References found in this work

Perception and mathematical intuition.Penelope Maddy - 1980 - Philosophical Review 89 (2):163-196.
Foundations of Constructive Analysis.Errett Bishop - 1967 - New York, NY, USA: Mcgraw-Hill.
The Reliability of Randomized Algorithms.D. Fallis - 2000 - British Journal for the Philosophy of Science 51 (2):255-271.
An empiricist philosophy of mathematics and its implications for the history of mathematics.Donald Gillies - 2000 - In Emily Grosholz & Herbert Breger (eds.), The growth of mathematical knowledge. Boston: Kluwer Academic Publishers. pp. 41--57.

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