The algebraic significance of weak excluded middle laws

Mathematical Logic Quarterly 68 (1):79-94 (2022)
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Abstract

For (finitary) deductive systems, we formulate a signature‐independent abstraction of the weak excluded middle law (WEML), which strengthens the existing general notion of an inconsistency lemma (IL). Of special interest is the case where a quasivariety algebraizes a deductive system ⊢. We prove that, in this case, if ⊢ has a WEML (in the general sense) then every relatively subdirectly irreducible member of has a greatest proper ‐congruence; the converse holds if ⊢ has an inconsistency lemma. The result extends, in a suitable form, to all protoalgebraic logics. A super‐intuitionistic logic possesses a WEML iff it extends. We characterize the IL and the WEML for normal modal logics and for relevance logics. A normal extension of has a global consequence relation with a WEML iff it extends, while every axiomatic extension of with an IL has a WEML.

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Bi-intermediate logics of trees and co-trees.Nick Bezhanishvili, Miguel Martins & Tommaso Moraschini - 2024 - Annals of Pure and Applied Logic 175 (10):103490.

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References found in this work

Protoalgebraic logics.W. J. Blok & Don Pigozzi - 1986 - Studia Logica 45 (4):337 - 369.
Modal Logics Between S 4 and S 5.M. A. E. Dummett & E. J. Lemmon - 1959 - Mathematical Logic Quarterly 5 (14-24):250-264.
Algebraic aspects of deduction theorems.Janusz Czelakowski - 1985 - Studia Logica 44 (4):369 - 387.
Local deductions theorems.Janusz Czelakowski - 1986 - Studia Logica 45 (4):377 - 391.

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