Depth — A Gaussian Tradition in Mathematics

Philosophia Mathematica 23 (2):177-195 (2015)
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Abstract

Mathematicians use the word ‘deep’ to convey a high appreciation of a concept, theorem, or proof. This paper investigates the extent to which the term can be said to have an objective character by examining its first use in mathematics. It was a consequence of Gauss's work on number theory and the agreement among his successors that specific parts of Gauss's work were deep, on grounds that indicate that depth was a structural feature of mathematics for them. In contrast, French mathematicians had a less structural, more problem-oriented approach to mathematics and did not speak of depth so readily

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10.1093/philmat/nku035

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Citations of this work

On the Depth of Gödel’s Incompleteness Theorems.Yong Cheng - forthcoming - Philosophia Mathematica.

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References found in this work

Henri Poincaré: A Scientific Biography.Jeremy Gray - 2012 - Princeton University Press.
Why do mathematicians re-prove theorems?John W. Dawson Jr - 2006 - Philosophia Mathematica 14 (3):269-286.
Théorie des nombres. Tome premier.Édouard Lucas & Georges Bouligand - 1961 - Revue de Métaphysique et de Morale 66 (3):369-371.

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