Deducibility and Independence in Beklemishev's Autonomous Provability Calculus

Abstract

Beklemishev introduced an ordinal notation system for the Feferman-Sch\"utte ordinal 0 based on the autonomous expansion of provability algebras. In this paper we present the logic BC (for Bracket Calculus). The language of BC extends said ordinal notation system to a strictly positive modal language. Thus, unlike other provability logics, BC is based on a self-contained signature that gives rise to an ordinal notation system instead of modalities indexed by some ordinal given a priori. The presented logic is proven to be equivalent to RC_0, that is, to the strictly positive fragment of GLP_0. We then define a combinatorial statement based on BC and show it to be independent of the theory ATR0 of Arithmetical Transfinite Recursion, a theory of second order arithmetic far more powerful than Peano Arithmetic.