Reflection ranks via infinitary derivations

Abstract

There is no infinite sequence of 11-sound extensions of ACA0 each of which proves 11-reflection of the next. This engenders a well-founded ``reflection ranking'' of 11-sound extensions of ACA0. For any 11-sound theory T extending ACA+0, the reflection rank of T equals the proof-theoretic ordinal of T. This provides an alternative characterization of the notion of ``proof-theoretic ordinal,'' which is one of the central concepts of proof theory. In this note we provide an alternative proof of this theorem using cut-elimination for infinitary derivations.