Cut--free sequent calculus and natural deduction for the tetravalent modal logic

Abstract

The tetravalent modal logic ( TML) is one of the two logics defined by Font and Rius (FR2) (the other is the normal tetravalent modal logic TMLN) in connection with Monteiro's tetravalent modal algebras. These logics are expansions of the well--known Belnap--Dunn's four--valued logic that combine a many-valued character (tetravalence) with a modal character. In fact, TML is the logic that preserve degrees of truth with respect to tetravalent modal algebras. As Font and Rius observed, the connection between the logic TML and the algebras is not so good as in TMLN, but, as a compensation, it has a better proof-theoretic behavior, since it has a strongly adequate Gentzen calculus (see FR2). In this work, we prove that the sequent calculus given by Font and Rius does not enjoy the cut--elimination property. Then, using a general method proposed by Avron, Ben-Naim and Konikowska (Avron02), we provide a sequent calculus for TML with the cut--elimination property. Finally, inspired by the latter, we present a natural deduction system, sound and complete with respect to the tetravalent modal logic.

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