English

Arithmetical and Hyperarithmetical Worm Battles

Logic 2022-06-30 v3

Abstract

Japaridze's provability logic GLPGLP has one modality [n][n] for each natural number and has been used by Beklemishev for a proof theoretic analysis of Peano aritmetic (PA)(PA) and related theories. Among other benefits, this analysis yields the so-called Every Worm Dies (EWD)(EWD) principle, a natural combinatorial statement independent of PAPA. Recently, Beklemishev and Pakhomov have studied notions of provability corresponding to transfinite modalities in GLPGLP. We show that indeed the natural transfinite extension of GLPGLP is sound for this interpretation, and yields independent combinatorial principles for the second order theory ACAACA of arithmetical comprehension with full induction. We also provide restricted versions of EWDEWD related to the fragments IΣnI\Sigma_n of Peano arithmetic. In order to prove the latter, we show that standard Hardy functions majorize their variants based on tree ordinals.

Cite

@article{arxiv.2112.07473,
  title  = {Arithmetical and Hyperarithmetical Worm Battles},
  author = {David Fernández-Duque and Joost J. Joosten and Fedor Pakhomov and Konstnatinos Papafilippou and Andreas Weiermann},
  journal= {arXiv preprint arXiv:2112.07473},
  year   = {2022}
}

Comments

24 pages. Additions have been made for a proof of the equivalence on the variants corresponding to the fragments of $PA$

R2 v1 2026-06-24T08:16:56.958Z