Non-mathematical Content by Mathematical Means

Abstract

In this paper, I consider the use of mathematical results in philosophical arguments arriving at conclusions with non-mathematical content, with the view that in general such usage requires additional justification. As a cautionary example, I examine Kreisel’s arguments that the Continuum Hypothesis is determined by the axioms of Zermelo-Fraenkel set theory, and interpret Weston’s 1976 reply as showing that Kreisel fails to provide sufficient justification for the use of his main technical result. If we take the perspective that mathematical results are used in the context of a modelling of something not necessarily mathematical, then the situation is clarified somewhat, and the procedure for arriving at justification for the use of such results becomes clear. I give an example of a particularly strong form this justification might take, using the idea of formalism independence due to Gödel and Kennedy.

Categories

Keywords

Reprint years

Links

PhilArchive

External links

  • This entry has no external links. Add one.
Setup an account with your affiliations in order to access resources via your University's proxy server

Through your library

  • Only published works are available at libraries.

My notes

Similar books and articles

Provability and mathematical truth.David Fair - 1984 - Synthese 61 (3):363 - 385.
The Notion of Explanation in Gödel’s Philosophy of Mathematics.Krzysztof Wójtowicz - 2019 - Studia Semiotyczne—English Supplement 30:85-106.
for Mathematical Documents.Michael Kohlhase - unknown
Independence and justification in mathematics.Krzysztof Wójtowicz - 2006 - Poznan Studies in the Philosophy of the Sciences and the Humanities 91 (1):349-373.
The Emergence of (Instrumental) Formalism and a New Conception of Science.David Svoboda & Prokop Sousedík - 2019 - Studia Neoaristotelica 16 (2):307-329.
Wittgenstein on Mathematical Meaningfulness, Decidability, and Application.Victor Rodych - 1997 - Notre Dame Journal of Formal Logic 38 (2):195-224.
Mathematical rigor and proof.Yacin Hamami - 2022 - Review of Symbolic Logic 15 (2):409-449.
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.
The Many Faces of Mathematical Constructivism.B. Kerkhove & J. P. Bendegem - 2012 - Constructivist Foundations 7 (2):97-103.
On Why Mathematics Can Not be Ontology.Shiva Rahman - 2019 - Axiomathes 29 (3):289-296.
The Many Faces of Mathematical Constructivism.Bart Van Kerkhove & Jean Van Bendegem - 2012 - Constructivist Foundations 7 (2):97-103.
Proof and Knowledge in Mathematics.Michael Detlefsen (ed.) - 1992 - New York: Routledge.
Mathematical and Moral Disagreement.Silvia Jonas - 2020 - Philosophical Quarterly 70 (279):302-327.
Is the Continuum Hypothesis a definite mathematical problem?Solomon Feferman - manuscript
An Easy Road to Nominalism.O. Bueno - 2012 - Mind 121 (484):967-982.

Analytics

Added to PP
2020-11-06

Downloads
246 (#78,481)

6 months
72 (#58,716)

Historical graph of downloads
How can I increase my downloads?

Author's Profile

Sam Adam-Day
Oxford University

Citations of this work

No citations found.

Add more citations

References found in this work

The set-theoretic multiverse.Joel David Hamkins - 2012 - Review of Symbolic Logic 5 (3):416-449.
Informal Rigour and Completeness Proofs.Georg Kreisel - 1967 - In Imre Lakatos (ed.), Problems in the Philosophy of Mathematics. North-Holland. pp. 138--157.
Kreisel, the continuum hypothesis and second order set theory.Thomas Weston - 1976 - Journal of Philosophical Logic 5 (2):281 - 298.

Add more references