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JSYML
2002

Maximal Contiguous Degrees

13 years 11 months ago
Maximal Contiguous Degrees
A computably enumerable (c.e.) degree is a maximal contiguous degree if it is contiguous and no c.e. degree strictly above it is contiguous. We show that there are infinitely many maximal contiguous degrees. Since the contiguous degrees are definable, the class of maximal contiguous degrees provides the first example of a definable infinite anti-chain in the c.e. degrees. In addition, we show that the class of maximal contiguous degrees forms an automorphism base for the c.e. degrees and therefore for the Turing degrees in general. Finally we note that the construction of a maximal contiguous degree can be modified to answer a question of Walk about the array computable degrees and a question of Li about isolated formulas.
Peter Cholak, Rodney G. Downey, Stephen Walk
Added 22 Dec 2010
Updated 22 Dec 2010
Type Journal
Year 2002
Where JSYML
Authors Peter Cholak, Rodney G. Downey, Stephen Walk
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