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The finite model property for the implicational fragment of IPC without exchange and contraction
Studia Logica 63 (2):213-222 (1999)
Abstract
The aim of this paper is to show that the implicational fragment BKof the intuitionistic propositional calculus (IPC) without the rules of exchange and contraction has the finite model property with respect to the quasivariety of left residuation algebras (its equivalent algebraic semantics). It follows that the variety generated by all left residuation algebras is generated by the finite left residuation algebras. We also establish that BKhas the finite model property with respect to a class of structures that constitute a Kripke-style relational semantics for it. The results settle a question of Ono and Komori [OK85].My notes
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Citations of this work
On Categorical Equivalence of Weak Monadic Residuated Distributive Lattices and Weak Monadic c-Differential Residuated Distributive Lattices.Jun Tao Wang, Yan Hong She, Peng Fei He & Na Na Ma - 2023 - Studia Logica 111 (3):361-390.
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