A General Axiomatization for the logics of the Hierarchy In Pk
Abstract
In this paper, the logics of the family In Pk:=\ In Pk\(n,k) ∈ ω2 are formally defined by means of finite matrices, as a simultaneous generalization of the weakly-intuitionistic logic I1 and of the paraconsistent logic P1. It is proved that this family can be naturally ordered, and it is shown an adequate axiomatics for each logic of the form In Pk.
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