A short proof of Glivenko theorems for intermediate predicate logics

Archive for Mathematical Logic 52 (7-8):823-826 (2013)
  Copy   BIBTEX

Abstract

We give a simple proof-theoretic argument showing that Glivenko’s theorem for propositional logic and its version for predicate logic follow as an easy consequence of the deduction theorem, which also proves some Glivenko type theorems relating intermediate predicate logics between intuitionistic and classical logic. We consider two schemata, the double negation shift (DNS) and the one consisting of instances of the principle of excluded middle for sentences (REM). We prove that both schemata combined derive classical logic, while each one of them provides a strictly weaker intermediate logic, and neither of them is derivable from the other. We show that over every intermediate logic there exists a maximal intermediate logic for which Glivenko’s theorem holds. We deduce as well a characterization of DNS, as the weakest (with respect to derivability) scheme that added to REM derives classical logic

Categories

Keywords

Reprint years

DOI

10.1007/s00153-013-0346-7

Links

PhilArchive



    Upload a copy of this work     Papers currently archived: 91,386

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

Glivenko theorems and negative translations in substructural predicate logics.Hadi Farahani & Hiroakira Ono - 2012 - Archive for Mathematical Logic 51 (7-8):695-707.
Glivenko type theorems for intuitionistic modal logics.Guram Bezhanishvili - 2001 - Studia Logica 67 (1):89-109.
On the proof theory of the intermediate logic MH.Jonathan P. Seldin - 1986 - Journal of Symbolic Logic 51 (3):626-647.
Glivenko Theorems for Substructural Logics over FL.Nikolaos Galatos & Hiroakira Ono - 2006 - Journal of Symbolic Logic 71 (4):1353 - 1384.
An Approach to Glivenko’s Theorem in Algebraizable Logics.Antoni Torrens - 2008 - Studia Logica 88 (3):349-383.
An Approach to Glivenko's Theorem in Algebraizable Logics.Antoni Torrens Torrell - 2008 - Studia Logica 88 (3):349 - 383.
Completeness and incompleteness for intuitionistic logic.Charles Mccarty - 2008 - Journal of Symbolic Logic 73 (4):1315-1327.
A proof-search procedure for intuitionistic propositional logic.R. Alonderis - 2013 - Archive for Mathematical Logic 52 (7-8):759-778.
Proof analysis in intermediate logics.Roy Dyckhoff & Sara Negri - 2012 - Archive for Mathematical Logic 51 (1):71-92.
Reflexive Intermediate First-Order Logics.Nathan C. Carter - 2008 - Notre Dame Journal of Formal Logic 49 (1):75-95.
On second order intuitionistic propositional logic without a universal quantifier.Konrad Zdanowski - 2009 - Journal of Symbolic Logic 74 (1):157-167.
Glivenko like theorems in natural expansions of BCK‐logic.Roberto Cignoli & Antoni Torrens Torrell - 2004 - Mathematical Logic Quarterly 50 (2):111-125.
Constructing a continuum of predicate extensions of each intermediate propositional logic.Nobu-Yuki Suzuki - 1995 - Studia Logica 54 (2):173 - 198.
On maximal intermediate predicate constructive logics.Alessandro Avellone, Camillo Fiorentini, Paolo Mantovani & Pierangelo Miglioli - 1996 - Studia Logica 57 (2-3):373 - 408.

Analytics

Added to PP
2013-11-23

Downloads
38 (#409,607)

6 months
6 (#504,917)

Historical graph of downloads
How can I increase my downloads?

Citations of this work

Decidable variables for constructive logics.Satoru Niki - 2020 - Mathematical Logic Quarterly 66 (4):484-493.

Add more citations

References found in this work

Introduction to metamathematics.Stephen Cole Kleene - 1952 - Groningen: P. Noordhoff N.V..
Introduction to mathematical logic..Alonzo Church - 1944 - Princeton,: Princeton university press: London, H. Milford, Oxford university press. Edited by C. Truesdell.
Basic proof theory.A. S. Troelstra - 1996 - New York: Cambridge University Press. Edited by Helmut Schwichtenberg.
Applications of trees to intermediate logics.Dov M. Gabbay - 1972 - Journal of Symbolic Logic 37 (1):135-138.

View all 8 references / Add more references