Simple tableaux for two expansions of G\"odel modal logic

Abstract

This paper considers two logics. The first one, KGinv, is an expansion of the G\"odel modal logic KG with the involutive negation i defined as v(iφ,w)=1-v(φ,w). The second one, KGbl, is the expansion of KGinv with the bi-lattice connectives and modalities. We explore their semantical properties w.r.t. the standard semantics on [0,1]-valued Kripke frames and define a unified tableaux calculus that allows for the explicit countermodel construction. For this, we use an alternative semantics with the finite model property. Using the tableaux calculus, we construct a decision algorithm and show that satisfiability and validity in KGinv and KGbl are PSpace-complete.