English

Randomness notions and reverse mathematics

Logic 2019-09-04 v2

Abstract

We investigate the strength of a randomness notion R\mathcal R as a set-existence principle in second-order arithmetic: for each ZZ there is an XX that is R\mathcal R-random relative to ZZ. We show that the equivalence between 22-randomness and being infinitely often CC-incompressible is provable in RCA0\mathsf{RCA}_0. We verify that RCA0\mathsf{RCA}_0 proves the basic implications among randomness notions: 22-random \Rightarrow weakly 22-random \Rightarrow Martin-L\"{o}f random \Rightarrow computably random \Rightarrow Schnorr random. Also, over RCA0\mathsf{RCA}_0 the existence of computable randoms is equivalent to the existence of Schnorr randoms. We show that the existence of balanced randoms is equivalent to the existence of Martin-L\"{o}f randoms, and we describe a sense in which this result is nearly optimal.

Keywords

Cite

@article{arxiv.1808.02746,
  title  = {Randomness notions and reverse mathematics},
  author = {André Nies and Paul Shafer},
  journal= {arXiv preprint arXiv:1808.02746},
  year   = {2019}
}
R2 v1 2026-06-23T03:27:48.679Z