English

Reducing $\omega$-model reflection to iterated syntactic reflection

Logic 2022-06-16 v2

Abstract

In mathematical logic there are two seemingly distinct kinds of principles called "reflection principles." Semantic reflection principles assert that if a formula holds in the whole universe, then it holds in a set-sized model. Syntactic reflection principles assert that every provable sentence from some complexity class is true. In this paper we study connections between these two kinds of reflection principles in the setting of second-order arithmetic. We prove that, for a large swathe of theories, ω\omega-model reflection is equivalent to the claim that arbitrary iterations of uniform Π11\Pi^1_1 reflection along countable well-orderings are Π11\Pi^1_1-sound. This result yields uniform ordinal analyses of theories with strength between ACA0\mathsf{ACA}_0 and ATR\mathsf{ATR}. The main technical novelty of our analysis is the introduction of the notion of the proof-theoretic dilator of a theory TT, which is the operator on countable ordinals that maps the order-type of \prec to the proof-theoretic ordinal of T+WO()T+\mathsf{WO}(\prec). We obtain precise results about the growth of proof-theoretic dilators as a function of provable ω\omega-model reflection. This approach enables us to simultaneously obtain not only Π10\Pi^0_1, Π20\Pi^0_2, and Π11\Pi^1_1 ordinals but also reverse-mathematical theorems for well-ordering principles.

Keywords

Cite

@article{arxiv.2103.12147,
  title  = {Reducing $\omega$-model reflection to iterated syntactic reflection},
  author = {Fedor Pakhomov and James Walsh},
  journal= {arXiv preprint arXiv:2103.12147},
  year   = {2022}
}

Comments

The proof of Lemma 5.2. in V1 contains a gap that is now fixed. Lemma 2.9 from V1 has been split into multiple claims

R2 v1 2026-06-24T00:26:45.378Z