English

Upper bound on some hightness notions

Logic 2021-02-03 v2

Abstract

We give upper bound for several highness properties in computability randomness theory. First, we prove that discrete covering property does not imply the ability to compute a 1-random real, answering a question of Greenberg, Miller and Nies. This also implies that an infinite set of incompressible strings does not necessarily extract a 1-random real. Second, we prove that given a homogeneous binary tree that does not admit an infinite computable path, a sequence of bounded martingale whose initial capital tends to zero, there exists a martingale SS majorizing infinitely any of them such that SS does not compute an infinite path of the tree. This implies that 1) High(CR,MLR) does not imply PA-completeness, answering a question of Miller; 2) CR\leq_{\mathsf{CR}} does not imply T\leq_T, answering a question of Nies. The proof of the second result suggests that the coding power of the universal c.e. martingale lies in its infinite variance.

Keywords

Cite

@article{arxiv.2001.09709,
  title  = {Upper bound on some hightness notions},
  author = {Lu Liu},
  journal= {arXiv preprint arXiv:2001.09709},
  year   = {2021}
}

Comments

16 pages

R2 v1 2026-06-23T13:21:29.116Z