Isomorphism types of Rogers semilattices in the analytical hierarchy

Abstract

A numbering of a countable family S is a surjective map from the set of natural numbers ω onto S. A numbering is reducible to a numbering μ if there is an effective procedure which given a -index of an object from S, computes a μ-index for the same object. The reducibility between numberings gives rise to a class of upper semilattices, which are usually called Rogers semilattices. The paper studies Rogers semilattices for families S ⊂ P(ω) belonging to various levels of the analytical hierarchy. We prove that for any non-zero natural numbers m≠ n, any non-trivial Rogers semilattice of a 1m-computable family cannot be isomorphic to a Rogers semilattice of a 1n-computable family. One of the key ingredients of the proof is an application of the result by Downey and Knight on degree spectra of linear orders.