Characterising SJT reducibility

Abstract

SJT reducibility between sets A,B ⊂eq N is defined by A SJT B if for each computable function h that is unbounded and nondecreasing, there is an h-bounded uniformly B-c.e.\ trace (Tn)n ∈ N such that for each n, the value JA(n) of the jump is in Tn, if defined. This reducibility is slightly weaker than Turing reducibility. We study SJT reducibility, and as a main result give several characterisations of it on the K-trivial sets. This is the first case of extending the three lowness paradigms, weak as an oracle, computed by many, and inert, to the setting of weak reducibilities.