This paper proposes an approach to information-based logics using many-logic modal structures (). These structures can express accessibility relations between worlds with different underlying logics by anchoring them to a base lattice, which contains the semantics of each logic as a down-complete sublattice. are suitable for representing connections between information states (i.e., configurations of databases) and the evolution of information states over time. We will illustrate the application…
Read moreThis paper proposes an approach to information-based logics using many-logic modal structures (). These structures can express accessibility relations between worlds with different underlying logics by anchoring them to a base lattice, which contains the semantics of each logic as a down-complete sublattice. are suitable for representing connections between information states (i.e., configurations of databases) and the evolution of information states over time. We will illustrate the application of by means of the six-valued logic of evidence and truth $${ LET}_{K}^+$$ LET K +, related to the lattice L6, and some four-, three-, and two-valued logics related to down-complete sublattices of L6. These logics are capable of representing paracomplete, paraconsistent, and classical contexts with six-, four-, three-, and two-valued scenarios.
