Incompleteness and Jump Hierarchies

Abstract

This paper is an investigation of the relationship between G\"odel's second incompleteness theorem and the well-foundedness of jump hierarchies. It follows from a classic theorem of Spector's that the relation \(A,B) ∈ R2 : OA ≤H B\ is well-founded. We provide an alternative proof of this fact that uses G\"odel's second incompleteness theorem instead of the theory of admissible ordinals. We then derive a semantic version of the second incompleteness theorem, originally due to Mummert and Simpson, from this result. Finally, we turn to the calculation of the ranks of reals in this well-founded relation. We prove that, for any A∈R, if the rank of A is α, then ω1A is the (1 + α)th admissible ordinal. It follows, assuming suitable large cardinal hypotheses, that, on a cone, the rank of X is ω1X.