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Sentential constants in systems near R
Studia Logica 52 (3):443 - 455 (1993)
Abstract
An Ackermann constant is a formula of sentential logic built up from the sentential constant t by closing under connectives. It is known that there are only finitely many non-equivalent Ackermann constants in the relevant logic R. In this paper it is shown that the most natural systems close to R but weaker than it-in particular the non-distributive system LR and the modalised system NR-allow infinitely many Ackermann constants to be distinguished. The argument in each case proceeds by construction of an algebraic model, infinite in the case of LR and of arbitrary finite size in the case of NR. The search for these models was aided by the computer program MaGIC (Matrix Generator for Implication Connectives) developed by the author at the Australian National University.Other Versions
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Citations of this work
Varieties of de Morgan monoids: Covers of atoms.T. Moraschini, J. G. Raftery & J. J. Wannenburg - 2020 - Review of Symbolic Logic 13 (2):338-374.
The 2007 Annual Conference of the Australasian Association for Logic.Greg Restall - 2008 - Bulletin of Symbolic Logic 14 (3):438-443.
Free Algebras Corresponding to Multiplicative Classical Linear Logic and Some of Its Extensions.Andreja Prijatelj - 1996 - Notre Dame Journal of Formal Logic 37 (1):53-70.
References found in this work
On formulas of one variable in intuitionistic propositional calculus.Iwao Nishimura - 1960 - Journal of Symbolic Logic 25 (4):327-331.
Automated Theorem-proving in Non-classical Logics.Paul B. Thistlewaite, Michael A. McRobbie & Robert K. Meyer - 1988 - Pitman Publishing.
3088 varieties a solution to the Ackermann constant problem.John K. Slaney - 1985 - Journal of Symbolic Logic 50 (2):487-501.
On the structure of De Morgan monoids with corollaries on relevant logic and theories.John K. Slaney - 1988 - Notre Dame Journal of Formal Logic 30 (1):117-129.
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