Very weak subintuitionistic logics
Abstract
We introduce a new propositional logic, called very weak subintuitionistic logic VF, by adapting the relational semantics of Fitting, Marek, and Truszczyński for the pure logic of necessitation N to the propositional setting. We prove that VF and its closed negative extensions are sound and complete with respect to this semantics, and that they have the disjunction property and the finite frame property. We also prove that VF is strictly weaker than the weak subintuitionistic logic WF of Shirmohammadzadeh Maleki and de Jongh. Finally, we study modal companions of VF and its closed negative extensions via Corsi's modified Gödel translation.
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