English

Axiomatizing provable $n$-provability

Logic 2019-07-16 v1

Abstract

A formula ϕ\phi is called \emph{nn-provable} in a formal arithmetical theory SS if ϕ\phi is provable in SS together with all true arithmetical Πn\Pi_{n}-sentences taken as additional axioms. While in general the set of all nn-provable formulas, for a fixed n>0n>0, is not recursively enumerable, the set of formulas ϕ\phi whose nn-provability is provable in a given r.e.\ metatheory TT is r.e. This set is deductively closed and will be, in general, an extension of SS. We prove that these theories can be naturally axiomatized in terms of progressions of iterated local reflection principles. In particular, the set of provably 1-provable sentences of Peano arithmetic PA can be axiomatized by ε0\varepsilon_0 times iterated local reflection schema over PA. Our characterizations yield additional information on the proof-theoretic strength of these theories (w.r.t. various measures of it) and on their axiomatizability. We also study the question of speed-up of proofs and show that in some cases a proof of nn-provability of a sentence can be much shorter than its proof from iterated reflection principles.

Keywords

Cite

@article{arxiv.1805.00381,
  title  = {Axiomatizing provable $n$-provability},
  author = {Evgeny Kolmakov and Lev Beklemishev},
  journal= {arXiv preprint arXiv:1805.00381},
  year   = {2019}
}

Comments

20 pages

R2 v1 2026-06-23T01:41:44.041Z