On Mathematicians' Different Standards When Evaluating Elementary Proofs

, , &
Topics in Cognitive Science 5 (2):270-282 (2013)
  Copy   BIBTEX

Abstract

In this article, we report a study in which 109 research-active mathematicians were asked to judge the validity of a purported proof in undergraduate calculus. Significant results from our study were as follows: (a) there was substantial disagreement among mathematicians regarding whether the argument was a valid proof, (b) applied mathematicians were more likely than pure mathematicians to judge the argument valid, (c) participants who judged the argument invalid were more confident in their judgments than those who judged it valid, and (d) participants who judged the argument valid usually did not change their judgment when presented with a reason raised by other mathematicians for why the proof should be judged invalid. These findings suggest that, contrary to some claims in the literature, there is not a single standard of validity among contemporary mathematicians

Categories

Keywords

Reprint years

DOI

10.1111/tops.12019

Links

PhilArchive



    Upload a copy of this work     Papers currently archived: 92,497

External links

Setup an account with your affiliations in order to access resources via your University's proxy server

Through your library

My notes

Similar books and articles

On the persuasiveness of visual arguments in mathematics.Matthew Inglis & Juan Pablo Mejía-Ramos - 2009 - Foundations of Science 14 (1-2):97-110.
What do mathematicians teach us about the world? An anthropological perspective.Paul Jorion - 1999 - Dialectical Anthropology 24 (1):45-98.
What Do Mathematicians Want? Probabilistic Proofs and the Epistemic Goals of Mathematicians.Don Fallis - 2002 - Logique Et Analyse 45.
A Critique of a Formalist-Mechanist Version of the Justification of Arguments in Mathematicians' Proof Practices.Yehuda Rav - 2007 - Philosophia Mathematica 15 (3):291-320.
Why do mathematicians re-prove theorems?John W. Dawson Jr - 2006 - Philosophia Mathematica 14 (3):269-286.
The Problem is not Mathematics, but Mathematicians: Plato and the Mathematicians Again.H. H. Benson - 2012 - Philosophia Mathematica 20 (2):170-199.
Vigre Lectures.Harvey M. Friedman - unknown
Logic for mathematicians.Alan G. Hamilton - 1978 - New York: Cambridge University Press.
Commitment of Mathematicians in Medicine: A Personal Experience, and Generalisations.Jean Clairambault - 2011 - Acta Biotheoretica 59 (3):201-211.
The phenomenology of mathematical beauty.Gian-Carlo Rota - 1997 - Synthese 111 (2):171-182.
Review of D. Corfield's Toward A Philosophy Of Real Mathematics. [REVIEW]Andrew Arana - 2007 - Mathematical Intelligencer 29 (2).
Logical and semantic purity.Andrew Arana - 2008 - ProtoSociology 25:36-48.
Which Mathematical Logic is the Logic of Mathematics?Jaakko Hintikka - 2012 - Logica Universalis 6 (3-4):459-475.

Analytics

Added to PP
2013-04-18

Downloads
148 (#128,649)

6 months
5 (#649,144)

Historical graph of downloads
How can I increase my downloads?

Author Profiles

Citations of this work

Mathematical consensus: a research program.Roy Wagner - 2022 - Axiomathes 32 (3):1185-1204.

View all 8 citations / Add more citations

References found in this work

The nature of mathematical knowledge.Philip Kitcher - 1983 - Oxford: Oxford University Press.
The mathematical experience.Philip J. Davis - 1981 - Boston: Birkhäuser. Edited by Reuben Hersh & Elena Marchisotto.
Why Do We Prove Theorems?Yehuda Rav - 1999 - Philosophia Mathematica 7 (1):5-41.
The derivation-indicator view of mathematical practice.Jody Azzouni - 2004 - Philosophia Mathematica 12 (2):81-106.

View all 8 references / Add more references