Frege's theorem and foundations for arithmetic

In Peter Adamson (ed.), Stanford Encyclopedia of Philosophy. Stanford Encyclopedia of Philosophy (2012)
  Copy   BIBTEX

Abstract

The principal goal of this entry is to present Frege's Theorem (i.e., the proof that the Dedekind-Peano axioms for number theory can be derived in second-order logic supplemented only by Hume's Principle) in the most logically perspicuous manner. We strive to present Frege's Theorem by representing the ideas and claims involved in the proof in clear and well-established modern logical notation. This prepares one to better prepared to understand Frege's own notation and derivations, and read Frege's original work (whether in German or in translation). Moreover, this should prepare the reader to understand a number of scholarly books and articles in the secondary literature on Frege's work.

Categories

Keywords

Reprint years

Links

PhilArchive



    Upload a copy of this work     Papers currently archived: 92,197

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

Frege's Result: Frege's Theorem and Related Matters.Hirotoshi Tabata - 2012 - Frontiers of Philosophy in China 7 (3):351-366.
Frege's logic, theorem, and foundations for arithmetic.Edward N. Zalta - 2008 - Stanford Encyclopedia of Philosophy.
Frege's Basic Law V and Cantor's Theorem.Manuel Bremer - manuscript
The Contemporary Interest of an Old Doctrine.William Demopoulos - 1994 - PSA: Proceedings of the Biennial Meeting of the Philosophy of Science Association 1994:209 - 216.
Predicative fragments of Frege arithmetic.Øystein Linnebo - 2004 - Bulletin of Symbolic Logic 10 (2):153-174.
Critical Notice of Michael Dummett's Frege: Philosophy of Mathematics.Crispin Wright - 1995 - Philosophical Books 1995 (2):89-102.
Frege's theorem and the peano postulates.George Boolos - 1995 - Bulletin of Symbolic Logic 1 (3):317-326.
Frege's theorem and his logicism.Hirotoshi Tabata - 2000 - History and Philosophy of Logic 21 (4):265-295.
A Logic for Frege's Theorem.Richard Heck - 1999 - In Richard G. Heck (ed.), Frege’s Theorem: An Introduction. The Harvard Review of Philosophy.
Induction and comparison.Paul Pietrowski - 2007 - University of Maryland Working Papers in Linguistics 15:154-188.
Diagrammatic reasoning in Frege’s Begriffsschrift.Danielle Macbeth - 2012 - Synthese 186 (1):289-314.
Hans Sluga (ed.), The philosophy of Frege. A four-volume collection of scholarly articles on all aspects of Frege's philosophy, vol.1: General assessments and historical accounts of Frege's philosophy, vol.2: Logic and foundations of mathematics in Frege's philosophy, vol.3: Meaning and ontology in Frege's philosophy, vol.4: Sense and reference in Frege's philosophy. [REVIEW]Jan Wolenński - 1997 - Erkenntnis 46 (3):407-410.
Frege's theorem.Richard G. Heck - 2011 - New York: Clarendon Press.

Analytics

Added to PP
2014-01-31

Downloads
48 (#332,941)

6 months
10 (#275,239)

Historical graph of downloads
How can I increase my downloads?

Author's Profile

Edward Zalta
Stanford University

Citations of this work

There Is No Knowledge From Falsehood.Ian Schnee - 2015 - Episteme 12 (1):53-74.
On the concept of a spirit.Andrew M. Bailey - 2017 - Religious Studies 53 (4):449-457.
Logic in mathematics and computer science.Richard Zach - forthcoming - In Filippo Ferrari, Elke Brendel, Massimiliano Carrara, Ole Hjortland, Gil Sagi, Gila Sher & Florian Steinberger (eds.), Oxford Handbook of Philosophy of Logic. Oxford, UK: Oxford University Press.

View all 11 citations / Add more citations

References found in this work

No references found.

Add more references