Uniform interpolation with constructive diamond
First positive uniform interpolation results for intuitionistic modal logics with diamond, addressing a known open problem for logicians working on modal logic and proof theory.
The paper proves uniform interpolation for two intuitionistic modal logics (CK and WK) with independent diamond, filling a gap in the literature. All results are formalized in the Rocq proof assistant.
Uniform interpolation is a strong form of interpolation providing an interpretation of propositional quantifiers within a propositional logic. Pitts' seminal work establishes this property for intuitionistic propositional logic relying on a sequent calculus in which naïve backward proof-search terminates. This constructive approach has been adapted to a wide range of logics, including intuitionistic modal logics. Surprisingly, no intuitionistic modal logic with independent box and diamond has yet been shown to satisfy uniform interpolation. We fill in this gap by proving the uniform interpolation property for Constructive K (CK) and Wijesekera's K (WK). We build on Pitts' technique by exploiting existing terminating calculi for CK and WK, which we prove to eliminate cut, and formalise all our results in the proof assistant Rocq. Together, our results constitute the first positive uniform interpolation results for intuitionistic modal logics with diamond.