On gödel's theorems on lengths of proofs I: Number of lines and speedup for arithmetics

Journal of Symbolic Logic 59 (3):737-756 (1994)
  Copy   BIBTEX

Abstract

This paper discusses lower bounds for proof length, especially as measured by number of steps (inferences). We give the first publicly known proof of Gödel's claim that there is superrecursive (in fact. unbounded) proof speedup of (i + 1)st-order arithmetic over ith-order arithmetic, where arithmetic is formalized in Hilbert-style calculi with + and · as function symbols or with the language of PRA. The same results are established for any weakly schematic formalization of higher-order logic: this allows all tautologies as axioms and allows all generalizations of axioms as axioms. Our first proof of Gödel's claim is based on self-referential sentences: we give a second proof that avoids the use of self-reference based loosely on a method of Statman

Categories

Keywords

Reprint years

DOI

10.2307/2275906

Other Versions

No versions found

Links

PhilArchive



    Upload a copy of this work     Papers currently archived: 100,619

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 Formalization of Model-Theoretic Proofs of Gödel's Theorems.Makoto Kikuchi & Kazuyuki Tanaka - 1994 - Notre Dame Journal of Formal Logic 35 (3):403-412.
Review: Samuel R. Buss, Handbook of Proof Theory: First-Order Proof Theory of Arithmetic. [REVIEW]Toshiyasu Arai - 2000 - Bulletin of Symbolic Logic 6 (4):465-466.
Kurt gödel’s first steps in logic: Formal proofs in arithmetic and set theory through a system of natural deduction.Jan von Plato - 2018 - Bulletin of Symbolic Logic 24 (3):319-335.
The deduction rule and linear and near-linear proof simulations.Maria Luisa Bonet & Samuel R. Buss - 1993 - Journal of Symbolic Logic 58 (2):688-709.
Uniform self-reference.Raymond M. Smullyan - 1985 - Studia Logica 44 (4):439 - 445.
Arithmetic Proof and Open Sentences.Neil Thompson - 2012 - Philosophy Study 2 (1):43-50.
Formalizing forcing arguments in subsystems of second-order arithmetic.Jeremy Avigad - 1996 - Annals of Pure and Applied Logic 82 (2):165-191.
Samuel R. Buss. First-order proof theory of arithmetic. Handbook of proof theory, edited by Samuel R. Buss, Studies in logic and the foundations of mathematics, vol. 137, Elsevier, Amsterdam etc. 1998, pp. 79–147. [REVIEW]Toshiyasu Arai - 2000 - Bulletin of Symbolic Logic 6 (4):465-466.
A Rejection System for the First-Degree Formulae of some Relevant Logics.Ross T. Brady - 2008 - Australasian Journal of Logic 6:55-69.
Kurt Gödel, paper on the incompleteness theorems (1931).Richard Zach - 2004 - In Ivor Grattan-Guinness (ed.), Landmark Writings in Mathematics. North-Holland. pp. 917-925.

Analytics

Added to PP
2009-01-28

Downloads
101 (#206,993)

6 months
14 (#214,225)

Historical graph of downloads
How can I increase my downloads?

Citations of this work

Deflationary Truth and Pathologies.Cezary Cieśliński - 2010 - Journal of Philosophical Logic 39 (3):325-337.
Truth and speed-up.Martin Fischer - 2014 - Review of Symbolic Logic 7 (2):319-340.
Some more curious inferences.Jeffrey Ketland - 2005 - Analysis 65 (1):18–24.

View all 13 citations / Add more citations

References found in this work

Proof Theory.Gaisi Takeuti - 1990 - Studia Logica 49 (1):160-161.
On the scheme of induction for bounded arithmetic formulas.A. J. Wilkie & J. B. Paris - 1987 - Annals of Pure and Applied Logic 35 (C):261-302.
On me number of steps in proofs.Jan Krajíèek - 1989 - Annals of Pure and Applied Logic 41 (2):153-178.
Sentences Undecidable in Formalized Arithmetic: An Exposition of the Theory of Kurt Gödel.A. Mostowski - 1953 - British Journal for the Philosophy of Science 3 (12):364-374.

Add more references