FIRST-ORDER RELEVANT REASONERS IN CLASSICAL WORLDS.

Sedlár and Vigiani [18] have developed an approach to propositional epistemic logics wherein (i) an agent's beliefs are closed under relevant implication and (ii) the agent is located in a classical possible world (i.e., the non-modal fragment is classical). Here I construct first-order extensions of these logics using the non-Tarskian interpretation of the quantifiers introduced by Mares and Goldblatt [12], and later extended to quantified modal relevant logics by Ferenz [6]. Modular soundness and completeness are proved for constant domain semantics, using non-general frames with Mares–Goldblatt truth conditions. I further detail the relation between the demand that classical possible worlds have Tarskian truth conditions and incompleteness results in quantified relevant logics. [ABSTRACT FROM AUTHOR]