Badness and jump inversion in the enumeration degrees

Abstract

This paper continues the investigation into the relationship between good approximations and jump inversion initiated by Griffith. Firstly it is shown that there is a $${\Pi^{0}_{2}}$$ set A whose enumeration degree a is bad--i.e. such that no set $${X \in a}$$ is good approximable--and whose complement $${\overline{A}}$$ has lowest possible jump, in other words is low2. This also ensures that the degrees y ? a only contain $${\Delta^{0}_{3}}$$ sets and thus yields a tight lower bound for the complexity of both a set of bad enumeration degree, and of its complement, in terms of the high/low jump hierarchy. Extending the author's previous characterisation of the double jump of good approximable sets, the triple jump of a $${\Sigma^{0}_{2}}$$ set A is characterised in terms of the index set of coinfinite sets enumeration reducible to A. The paper concludes by using Griffith's jump interpolation technique to show that there exists a high quasiminimal $${\Delta^{0}_{2}}$$ enumeration degree.