Randomness notions and reverse mathematics
Logic
2019-09-04 v2
Abstract
We investigate the strength of a randomness notion as a set-existence principle in second-order arithmetic: for each there is an that is -random relative to . We show that the equivalence between -randomness and being infinitely often -incompressible is provable in . We verify that proves the basic implications among randomness notions: -random weakly -random Martin-L\"{o}f random computably random Schnorr random. Also, over 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}
}