Listing the hyperarithmetical functions

Abstract

Given a countable Turing ideal I ⊂eq ωω, we say that x is a list (resp. weak list) of I if I=\x[n] : n ∈ ω\ (resp. if I ⊂eq \x[n] :n ∈ ω\). We show that, for several natural ideals I, x computes a list of I if and only if it computes a function dominating all the functions in I. On the other hand, we provide reals which are HYP-strongly null engulfing (and hence HYP-dominating, by results of Greenberg, Kuyper and Turetsky) but which cannot compute a weak list for HYP, solving a problem left open in a recent paper by Greenberg and the second author. This result can be generalized to any countable ideal which is downward closed under ≤HYP. We also give a characterization of reals which compute a list of HYP: x computes a list of HYP if and only if x is HYP-dominating and O is Σ02(x).