Why Is Proof the Only Way to Acquire Mathematical Knowledge?

Australasian Journal of Philosophy (forthcoming)
  Copy   BIBTEX

Abstract

This paper proposes an account of why proof is the only way to acquire knowledge of some mathematical proposition’s truth. Admittedly, non-deductive arguments for mathematical propositions can be strong and play important roles in mathematics. But this paper proposes a necessary condition for knowledge that can be satisfied by putative proofs (and proof sketches), as well as by non-deductive arguments in science, but not by non-deductive arguments from mathematical evidence. The necessary condition concerns whether we can justly expect that if the mathematical proposition is actually false, despite the evidence for its truth, then this fact has an explanation.

Categories

Add categories

Keywords

Reprint years

DOI

10.1080/00048402.2023.2233540

Links

PhilArchive



    Upload a copy of this work     Papers currently archived: 91,592

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

Knowledge of Mathematics without Proof.Alexander Paseau - 2015 - British Journal for the Philosophy of Science 66 (4):775-799.
Organisation, Transformation, and Propagation of Mathematical Knowledge in Omega.Serge Autexier, Christoph Benzmüller, Dominik Dietrich & Marc Wagner - 2008 - Mathematics in Computer Science 2 (2):253-277.
Proof, Reliability, and Mathematical Knowledge.Anthony Peressini - 2003 - Theoria 69 (3):211-232.
Explanation in mathematics: Proofs and practice.William D'Alessandro - 2019 - Philosophy Compass 14 (11):e12629.
Computer, Proof, and Testimony.Kai-Yee Wong - 2012 - Studies in Logic 5 (1):50-67.
Bayesian perspectives on mathematical practice.James Franklin - 2020 - Handbook of the History and Philosophy of Mathematical Practice.
Arguing Around Mathematical Proofs.Michel Dufour - 2013 - In Andrew Aberdein & Ian J. Dove (eds.), The Argument of Mathematics. Dordrecht: Springer. pp. 61-76.
Proof in Mathematics: An Introduction.James Franklin - 1996 - Sydney, Australia: Quakers Hill Press.
Proof, Logic and Formalization.Michael Detlefsen (ed.) - 1992 - London, England: Routledge.
Of Proofs, Mathematicians, and Computers.Astrik Yepremyan - unknown
Proof: Its nature and significance.Michael Detlefsen - 2008 - In Bonnie Gold & Roger A. Simons (eds.), Proof and Other Dilemmas: Mathematics and Philosophy. Mathematical Association of America. pp. 1.
The surveyability of long proofs.Edwin Coleman - 2009 - Foundations of Science 14 (1-2):27-43.
Probabilistic Proofs, Lottery Propositions, and Mathematical Knowledge.Yacin Hamami - 2021 - Philosophical Quarterly 72 (1):77-89.
Argument and explanation in mathematics.Michel Dufour - 2013 - In Dima Mohammed and Marcin Lewiński (ed.), Virtues of Argumentation. Proceedings of the 10th International Conference of the Ontario Society for the Study of Argumentation (OSSA), 22-26 May 2013. pp. pp. 1-14..
Legal evidence and knowledge.Georgi Gardiner - 2019 - In Maria Lasonen-Aarnio & Clayton Littlejohn (eds.), The Routledge Handbook of the Philosophy of Evidence. Routledge.

Analytics

Added to PP
2023-10-16

Downloads
98 (#175,624)

6 months
32 (#103,710)

Historical graph of downloads
How can I increase my downloads?

Author's Profile

Marc Lange
University of North Carolina, Chapel Hill

Citations of this work

Non-deductive justification in mathematics.A. C. Paseau - 2023 - Handbook of the History and Philosophy of Mathematical Practice.

Add more citations

References found in this work

Belief, credence, and norms.Lara Buchak - 2014 - Philosophical Studies 169 (2):1-27.
Justification, knowledge, and normality.Clayton Littlejohn & Julien Dutant - 2020 - Philosophical Studies 177 (6):1593-1609.
Scientific Explanation.P. Kitcher & W. C. Salmon - 1992 - British Journal for the Philosophy of Science 43 (1):85-98.

View all 29 references / Add more references