A formalization of Sambins's normalization for GL

&
Mathematical Logic Quarterly 39 (1):133-142 (1993)
  Copy   BIBTEX

Abstract

Sambin [6] proved the normalization theorem for GL, the modal logic of provability, in a sequent calculus version called by him GLS. His proof does not take into account the concept of reduction, commonly used in normalization proofs. Bellini [1], on the other hand, gave a normalization proof for GL using reductions. Indeed, Sambin's proof is a decision procedure which builds cut-free proofs. In this work we formalize this procedure as a recursive function and prove its recursiveness in an arithmetically formalizable way, concluding that the normalization of GL can be formalized in PA. MSC: 03F05, 03B35, 03B45

Categories

Keywords

Reprint years

DOI

10.1002/malq.19930390116

Other Versions

No versions found

Links

PhilArchive



    Upload a copy of this work     Papers currently archived: 100,865

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

A Formalization Of Sambins's Normalization For Gl.Edward Hauesler & Luiz Carlos Pereira - 1993 - Mathematical Logic Quarterly 39 (1):133-142.
An Analytic Calculus for the Intuitionistic Logic of Proofs.Brian Hill & Francesca Poggiolesi - 2019 - Notre Dame Journal of Formal Logic 60 (3):353-393.
On the proof-theory of a first-order extension of GL.Yehuda Schwartz & George Tourlakis - 2014 - Logic and Logical Philosophy 23 (3).
Cut Elimination for GLS Using the Terminability of its Regress Process.Jude Brighton - 2016 - Journal of Philosophical Logic 45 (2):147-153.
A Proof Theory for the Logic of Provability in True Arithmetic.Hirohiko Kushida - 2020 - Studia Logica 108 (4):857-875.
A purely syntactic and cut-free sequent calculus for the modal logic of provability.Francesca Poggiolesi - 2009 - Review of Symbolic Logic 2 (4):593-611.
A Short and Readable Proof of Cut Elimination for Two First-Order Modal Logics.Feng Gao & George Tourlakis - 2015 - Bulletin of the Section of Logic 44 (3/4):131-147.
Cut-elimination for Weak Grzegorczyk Logic Go.Rajeev Goré & Revantha Ramanayake - 2014 - Studia Logica 102 (1):1-27.
A modal sequent calculus for a fragment of arithmetic.G. Sambin & S. Valentini - 1980 - Studia Logica 39 (2-3):245-256.
A Natural Deduction Calculus for S4.2.Simone Martini, Andrea Masini & Margherita Zorzi - 2024 - Notre Dame Journal of Formal Logic 65 (2):127-150.

Analytics

Added to PP
2013-12-01

Downloads
53 (#407,997)

6 months
3 (#1,471,287)

Historical graph of downloads
How can I increase my downloads?

Author Profiles

Edward Haeusler
Pontifícia Universidade Católica do Rio de Janeiro
Luiz Carlos Pereira
PUC-Rio

Citations of this work

No citations found.

Add more citations

References found in this work

First-order logic.Raymond Merrill Smullyan - 1968 - New York [etc.]: Springer Verlag.
Proof Methods for Modal and Intuitionistic Logics.Melvin Fitting - 1985 - Journal of Symbolic Logic 50 (3):855-856.

Add more references