A decomposition of the Rogers semilattice of a family of d.c.e. sets

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Journal of Symbolic Logic 74 (2):618-640 (2009)
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Abstract

Khutoretskii's Theorem states that the Rogers semilattice of any family of c.e. sets has either at most one or infinitely many elements. A lemma in the inductive step of the proof shows that no Rogers semilattice can be partitioned into a principal ideal and a principal filter. We show that such a partitioning is possible for some family of d.c.e. sets. In fact, we construct a family of c.e. sets which, when viewed as a family of d.c.e. sets, has (up to equivalence) exactly two computable Friedberg numberings ¼ and ν, and ¼ reduces to any computable numbering not equivalent to ν. The question of whether the full statement of Khutoretskii's Theorem fails for families of d.c.e. sets remains open

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10.2178/jsl/1243948330

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Citations of this work

Extremal numberings and fixed point theorems.Marat Faizrahmanov - 2022 - Mathematical Logic Quarterly 68 (4):398-408.
Reductions between types of numberings.Ian Herbert, Sanjay Jain, Steffen Lempp, Manat Mustafa & Frank Stephan - 2019 - Annals of Pure and Applied Logic 170 (12):102716.

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References found in this work

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Theorie der Numerierungen II.J. U. L. Eršov - 1975 - Mathematical Logic Quarterly 21 (1):473-584.
Theorie Der Numerierungen III.Ju L. Erš - 1976 - Mathematical Logic Quarterly 23 (19‐24):289-371.
Theorie Der Numerierungen III.Ju L. Erš - 1977 - Mathematical Logic Quarterly 23 (19-24):289-371.

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