A fixed point for the jump operator on structures

Abstract

Assuming that 0# exists, we prove that there is a structure that can effectively interpret its own jump. In particular, we get a structure A such that \[ Sp( A) = \ x': x∈ Sp ( A)\, \] where Sp ( A) is the set of Turing degrees which compute a copy of A. It turns out that, more interesting than the result itself, is its unexpected complexity. We prove that higher-order arithmetic, which is the union of full nth-order arithmetic for all n, cannot prove the existence of such a structure.