On the quantified version of the Belnap-Dunn modal logic and some extensions of it

Abstract

We consider a quantified version of the (propositional) modal logic BK, proposed earlier by S. P. Odintsov and H. Wansing; this version will be denoted by QBK. Using the canonical model method, we prove the strong completeness of QBK with respect to a suitable possible world semantics with expanding domains. Similar results are obtained for some natural QBK-extensions. In particular, it is proved that the extension of QBK with Barcan scheme is strongly complete with respect to a suitable possible world semantics with constant domains. Moreover, we define faithful embeddings (\`a la G\"odel-McKinsey-Tarski) of the quantified versions of Nelson's constructive logics into appropriate QBK-extensions.