Paraconsistent G\"odel modal logic

Abstract

We introduce a~paraconsistent modal logic KG2, based on G\"odel logic with coimplication (bi-G\"odel logic) expanded with a De Morgan negation . We use the logic to formalise reasoning with graded, incomplete and inconsistent information. Semantics of KG2 is two-dimensional: we interpret KG2 on crisp frames with two valuations v1 and v2, connected via , that assign to each formula two values from the real-valued interval [0,1]. The first (resp., second) valuation encodes the positive (resp., negative) information the state gives to a~statement. We obtain that KG2 is strictly more expressive than the classical modal logic K by proving that finitely branching frames are definable and by establishing a faithful embedding of K into KG2. We also construct a~constraint tableau calculus for KG2 over finitely branching frames, establish its decidability and provide a~complexity evaluation.