Uniform Lyndon interpolation property in propositional modal logics

Abstract: We introduce and investigate the notion of uniform Lyndon interpolation property (ULIP) which is a strengthening of both uniform interpolation property and Lyndon interpolation property. We prove several propositional modal logics including ${\bf K}$, ${\bf KB}$, ${\bf GL}$ and ${\bf Grz}$ enjoy ULIP. Our proofs are modifications of Visser's proofs of uniform interpolation property using layered bisimulations. Also we give a new upper bound on the complexity of uniform interpolants for ${\bf GL}$ and ${\bf Grz}$.