Mathematical Rigor and Proof

Hamami, Yacin

doi:10.1017/S1755020319000443

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Mathematical Rigor and Proof

Hamami, Yacin

2019 • In Review of Symbolic Logic, p. 1-41

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https://hdl.handle.net/2268/290267

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10.1017/S1755020319000443

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Keywords :

formal proof; mathematical practice; mathematical proof; mathematical rigor; Mathematics (miscellaneous); Philosophy; Logic

Abstract :

[en] Mathematical proof is the primary form of justification for mathematical knowledge, but in order to count as a proper justification for a piece of mathematical knowledge, a mathematical proof must be rigorous. What does it mean then for a mathematical proof to be rigorous? According to what I shall call the standard view, a mathematical proof is rigorous if and only if it can be routinely translated into a formal proof. The standard view is almost an orthodoxy among contemporary mathematicians, and is endorsed by many logicians and philosophers, but it has also been heavily criticized in the philosophy of mathematics literature. Progress on the debate between the proponents and opponents of the standard view is, however, currently blocked by a major obstacle, namely the absence of a precise formulation of it. To remedy this deficiency, I undertake in this paper to provide a precise formulation and a thorough evaluation of the standard view of mathematical rigor. The upshot of this study is that the standard view is more robust to criticisms than it transpires from the various arguments advanced against it, but that it also requires a certain conception of how mathematical proofs are judged to be rigorous in mathematical practice, a conception that can be challenged on empirical grounds by exhibiting rigor judgments of mathematical proofs in mathematical practice conflicting with it.

Disciplines :

Philosophy & ethics

Author, co-author :

Hamami, Yacin ; Université de Liège - ULiège > Traverses ; Centre for Logic and Philosophy of Science, Vrije Universiteit Brussel, Brussels, Belgium

Language :

English

Title :

Mathematical Rigor and Proof

Publication date :

2019

Journal title :

Review of Symbolic Logic

ISSN :

1755-0203

eISSN :

1755-0211

Publisher :

Cambridge University Press

Pages :

1-41

Peer reviewed :

Peer Reviewed verified by ORBi

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https://www.cambridge.org/core/services/aop-cambridge-core/content/view/S1755020319000443

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since 04 May 2022

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