Intermediate logics admitting a structural hypersequent calculus
Frederik Möllerström Lauridsen

Abstract:
We characterise the intermediate logics which admit a cut-free hypersequent calculus of the form HLJ + R, where HLJ is the hypersequent counterpart of the sequent calculus LJ for propositional intuitionistic logic, and R is a set of so-called structural hypersequent rules, i.e., rules not involving any logical connectives. The characterisation of this class of intermediate logics is presented both in terms of the algebraic and the relational semantics for intermediate logics. We discuss various— positive as well as negative—consequences of this characterisation.