An ω-rule for the logic of provability and its models

Abstract

In this paper, we discuss a proof system NGL for the logic GL of provability, which is equipped with an ω-rule. We show the three classes of transitive Kripke frames, the class which strongly validates the ω-rule, the class which weakly validates the ω-rule, and the class which is defined by the L\"ob formula, are mutually different, while all of them characterize GL. This gives an example of a proof system P and a class C of Kripke frames such that P is sound with respect to C but the soundness cannot be proved by simple induction on the height of the derivations in P. We also show Kripke completeness of NGL in an algebraic manner. As a corollary, we show that the class of modal algebras which is defined by equations x≤ x and n∈ωn1=0 is not a variety.