Reflection ranks and ordinal analysis

Abstract

It is well-known that natural axiomatic theories are well-ordered by consistency strength. However, it is possible to construct descending chains of artificial theories with respect to consistency strength. We provide an explanation of this well-orderness phenomenon by studying a coarsening of the consistency strength order, namely, the 11 reflection strength order. We prove that there are no descending sequences of 11 sound extensions of ACA0 in this order. Accordingly, we can attach a rank in this order, which we call reflection rank, to any 11 sound extension of ACA0. We prove that for any 11 sound theory T extending ACA0+, the reflection rank of T equals the proof-theoretic ordinal of T. We also prove that the proof-theoretic ordinal of α iterated 11 reflection is α. Finally, we use our results to provide straightforward well-foundedness proofs of ordinal notation systems based on reflection principles.