A categorical equivalence for monadic algebras of first-order substructural logics motivated by Kalman's construction

Abstract

The category DRDL', whose objects are c-differential residuated distributive lattices that satisfy the condition CK, is the image of the category RDL, whose objects are residuated distributive lattices, under the categorical equivalence (Kalman functor) K. The main goal of this paper is to lift this equivalence K to the category MRDL, whose objects are monadic residuated distributive lattices, and the category MDRDL', whose objects are pairs formed by an object of DRDL' and a center universal quantifier. Firstly, based on the variety of monadic FLe-algebras, we introduce the concept of monadic residuated lattices and study some of their further algebraic properties, proving the classes of monadic residuated distributive lattices and monadic c-differential residuated distributive lattices are in one-to-one correspondence. Subsequently, based on this corresponding relation, we prove that there exists a categorical equivalence between the categories MRDL and MDRDL'. The results of this paper not only generalizes the works of Sagastume and San Mart\'in in [Mathematical Logic Quarterly, 60(2014), 375--388], but also addresses and overcomes the limitations identified in the works of [Studia Logica, 111(2023), 361--390]. Finally, this paper concludes with some applications regarding descriptions of a 2-contextual translation.