Degree theoretical splitting properties of recursively enumerable sets
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Publication:3826534
DOI10.2307/2274608zbMath0673.03027OpenAlexW4230583065MaRDI QIDQ3826534
Peter A. Fejer, Ambos-Spies, Klaus
Publication date: 1988
Published in: The Journal of Symbolic Logic (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.2307/2274608
Related Items (13)
Structural interactions of the recursively enumerable T- and W-degrees ⋮ Completely mitotic r. e. degrees ⋮ Classification of degree classes associated with r.e. subspaces ⋮ Lattice embeddings below a nonlow\(_ 2\) recursively enumerable degree ⋮ Localization of a theorem of Ambos-Spies and the strong anti-splitting property ⋮ Some reducibilities and splittings of recursively enumerable sets ⋮ Automorphisms of the lattice of recursively enumerable sets: Orbits ⋮ The distribution of the generic recursively enumerable degrees ⋮ Completely mitotic c.e. degrees and non-jump inversion ⋮ Embeddings of \(N_5\) and the contiguous degrees ⋮ T-Degrees, Jump Classes, and Strong Reducibilities ⋮ Splitting theorems and the jump operator ⋮ Splitting theorems in recursion theory
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