Relative to any non-arithmetic set
Abstract
Given a countable structure A, the degree spectrum of A is the set of all Turing degrees which can compute an isomorphic copy of A. One of the major programs in computable structure theory is to determine which (upwards closed, Borel) classes of degrees form a degree spectrum. We resolve one of the major open problems in this area by showing that the non-arithmetic degrees are a degree spectrum. Our main new tool is a new form of unfriendly jump inversions where the back-and-forth types are maximally complicated. This new tool has several other applications.
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