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α-Degrees of maximal α-r.e. sets

Published online by Cambridge University Press:  12 March 2014

Anne Leggett
Anne Leggett*
Affiliation:
University of Texas, Austin, Texas 78712
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Extract

Martin [10] has computed the degrees of several classes of ω-r.e. sets. Lachlan [3] and Shoenfield [14] have obtained some additional results. For most of the examples, a class of r.e. sets is given by a property that is first-order definable over the lattice of ω-r.e. sets. Then the set of degrees of sets in this class is computed. The only sets of nonzero degrees which arise from the known examples are the following: ϕ, {aa is ω-r.e. and a ≠ 0}, {aa is ω-r.e. and a′ = 0″}, and {aa is ω-r.e. and a″ > 0″} (see [14]).

There have been some results in this direction for α an arbitrary admissible ordinal. Sacks [13] has shown that every nonzero α-r.e. α-degree contains a regular α-r.e. set. Thus regularity does not separate the α-r.e. α-degrees. Simpson [18] has several theorems which give information about the kinds of α-r.e. sets a given α-degree can contain. The classes of α-r.e. sets considered do separate the α-r.e. α-degrees into two nonempty pieces for some α's, but they are not necessarily given by properties which are definable over the lattice of α-r.e. sets. Using some definability results of Lerman [6], we shall make some comments about the definability of these classes of sets.

Type
Research Article
Information
The Journal of Symbolic Logic , Volume 43 , Issue 3 , September 1978 , pp. 456 - 474
Copyright
Copyright © Association for Symbolic Logic 1978

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References

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