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Undecidability and 1-types in the recursively enumerable degrees
Annals of Pure and Applied Logic 63 (1):3-37 (1993)
Abstract
Ambos-Spies, K. and R.A. Shore, Undecidability and 1-types in the recursively enumerable degrees, Annals of Pure and Applied Logic 63 3–37. We show that the theory of the partial ordering of recursively enumerable Turing degrees is undecidable and has uncountably many 1-types. In contrast to the original proof of the former which used a very complicated O''' argument our proof proceeds by a much simpler infinite injury argument. Moreover, it combines with the permitting technique to get similar results for any ideal of the r.e. degreesMy notes
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Citations of this work
Degree structures: Local and global investigations.Richard A. Shore - 2006 - Bulletin of Symbolic Logic 12 (3):369-389.
Definability in the recursively enumerable degrees.André Nies, Richard A. Shore & Theodore A. Slaman - 1996 - Bulletin of Symbolic Logic 2 (4):392-404.
Interpreting true arithmetic in the theory of the r.e. truth table degrees.André Nies & Richard A. Shore - 1995 - Annals of Pure and Applied Logic 75 (3):269-311.
The Undecidability of the II$^_4$ Theory for the R. E. Wtt and Turing Degrees.Steffen Lempp & André Nies - 1995 - Journal of Symbolic Logic 60 (4):1118-1136.
Undecidability and 1-types in intervals of the computably enumerable degrees.Klaus Ambos-Spies, Denis R. Hirschfeldt & Richard A. Shore - 2000 - Annals of Pure and Applied Logic 106 (1-3):1-47.
References found in this work
A minimal pair of recursively enumerable degrees.C. E. M. Yates - 1966 - Journal of Symbolic Logic 31 (2):159-168.
The density of the nonbranching degrees.Peter A. Fejer - 1983 - Annals of Pure and Applied Logic 24 (2):113-130.
The density of infima in the recursively enumerable degrees.Theodore A. Slaman - 1991 - Annals of Pure and Applied Logic 52 (1-2):155-179.
The recursively enumerable degrees have infinitely many one-types.Klaus Ambos-Spies & Robert I. Soare - 1989 - Annals of Pure and Applied Logic 44 (1-2):1-23.
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