A note on the differences of computably enumerable reals
Logic
2017-06-13 v2
Abstract
We show that given any non-computable left-c.e. real there exists a left-c.e. real such that for all left-c.e. reals and all right-c.e. reals . The proof is non-uniform, the dichotomy being whether the given real is Martin-Loef random or not. It follows that given any universal machine , there is another universal machine such that the halting probability of U is not a translation of the halting probability of V by a left-c.e. real. We do not know if there is a uniform proof of this fact.
Keywords
Cite
@article{arxiv.1604.05192,
title = {A note on the differences of computably enumerable reals},
author = {George Barmpalias and Andrew Lewis-Pye},
journal= {arXiv preprint arXiv:1604.05192},
year = {2017}
}