Pseudojump inversion in special r. b. 01 classes

Abstract

The Jump Inversion Theorem says that for every real A T 0' there is a real B such that A T B' T B 0'. A known refinement of this theorem says that we can choose B to be a member of any special 01 subclass of \0,1\ω. We now consider the possibility of analogous refinements of two other well-known theorems: the Join Theorem -- for all reals A and Z such that A T Z 0' and Z >T 0, there is a real B such that A T B' T B 0' T B Z -- and the Pseudojump Inversion Theorem -- for all reals A T 0' and every e ∈ ω, there is a real B such that A T B WeB T B 0'. We show that in these theorems, B can be found in some special 01 subclasses of \0,1\ω but not in others.