Bi-intuitionistic logics through the abstract algebraic logic lens

Since the discovery of critical mistakes in Rauszer's work on bi-intuitionistic logics, solid foundations for these have progressively been rebuilt. However, the algebraic treatment of these logics has not yet been tended to. We fill this gap by algebraically analysing the bi-intuitionistic logics wBIL and sBIL. Given that these logics are only distinguished as consequence relations, and not as sets of theorems (hence the conflation in Rauszer's work), the algebraic tools we use are tailored to the treatment of such relations. We mainly inspect these logics through the lens of abstract algebraic logic, but we also provide an alternative algebraic analysis of wBIL and sBIL as logic preserving degrees of truth and truth, respectively. Our results pertaining to wBIL and sBIL are formalised in the interactive theorem prover Rocq.

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