Uniform Lyndon interpolation for the pure logic of necessitation with a modal reduction principle

Abstract

We prove the uniform Lyndon interpolation property (ULIP) of some extensions of the pure logic of necessitation N. For any m, n ∈ N, N+Am,n is the logic obtained from N by adding a single axiom n m , -free modal reduction principle, together with a rule , required to make the logic complete with respect to its Kripke-like semantics. We first introduce a sequent calculus GN+Am,n for N+Am,n and show that it enjoys cut elimination, proving Craig and Lyndon interpolation properties as a consequence. We then introduce a general method, called propositionalization, that enables one to reduce ULIP of a logic to some weaker logic. Lastly, we construct a propositionalization of N+Am,n into classical propositional logic Cl, proving ULIP as a corollary. We also prove ULIP of NAm,n = N + n m and NRAm,n = N + n m + in the same manner.

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