English

A Feiner Look at the Intermediate Degrees

Logic 2021-10-14 v1

Abstract

We say that a set SS is Δ(n)0(X)\Delta^0_{(n)}(X) if membership of nn in SS is a Δn0(X)\Delta^0_{n}(X) question, uniformly in nn. A set XX is low for Δ\Delta-Feiner if every set SS that is Δ(n)0(X)\Delta^0_{(n)}(X) is also Δ(n)0()\Delta^0_{(n)}(\emptyset). It is easy to see that every lown_n set is low for Δ\Delta-Feiner, but we show that the converse is not true by constructing an intermediate c.e. set that is low for Δ\Delta-Feiner. We also study variations on this notion, such as the sets that are Δ(bn+a)0(X)\Delta^0_{(bn+a)}(X), Σ(bn+a)0(X)\Sigma^0_{(bn+a)}(X), or Π(bn+a)0(X)\Pi^0_{(bn+a)}(X), and the sets that are low, intermediate, and high for these classes. In doing so, we obtain a result on the computability of Boolean algebras, namely that there is a Boolean algebra of intermediate c.e. degree with no computable copy.

Keywords

Cite

@article{arxiv.2110.06402,
  title  = {A Feiner Look at the Intermediate Degrees},
  author = {Denis R. Hirschfeldt and Asher M. Kach and Antonio Montalbán},
  journal= {arXiv preprint arXiv:2110.06402},
  year   = {2021}
}
R2 v1 2026-06-24T06:50:42.837Z