Axiomatizing provable $n$-provability
Abstract
A formula is called \emph{-provable} in a formal arithmetical theory if is provable in together with all true arithmetical -sentences taken as additional axioms. While in general the set of all -provable formulas, for a fixed , is not recursively enumerable, the set of formulas whose -provability is provable in a given r.e.\ metatheory is r.e. This set is deductively closed and will be, in general, an extension of . 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 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 -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