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Countable 
-admissible Ordinals
Published online by Cambridge University Press: 22 January 2016
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In [3], Platek constructs a hierarchy of jumps 
indexed by elements a of a set 
of ordinal notations. He asserts that a real X ⊆ ω is recursive in the superjump S if and only if it is recursive in some . Unfortunately, his assertion is not correct as is shown in [1]. In [1], it also has been shown that an ordinal > ω is -admissible if it is |a|S-recursively inaccessible, where |a|s- is the ordinal denoted by a.
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- Research Article
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- Copyright © Editorial Board of Nagoya Mathematical Journal 1985
References
[ 1 ]
Aczel, P. and Hinman, P. G., Recursion in the super jump, in: Generalized Recursion Theory, edited by Fenstad, J. E. and Hinman, P. G. (North-Holland, Amsterdam, 1974), 3–41.Google Scholar
[ 3 ]
Platek, R., A countable hierarchy for the superjump, in : Logic Colloquium ’69, edited by Gandy, R. O. and Yates, C. E. M. (North-Holland, Amsterdam, 1971), 257–271.Google Scholar
[ 4 ]
Sacks, G. E., Countable admissible ordinals and hyperdegrees, Adv. in Math., 19 (1976), 213–262.Google Scholar
[ 5 ]
Shinoda, J., On the upper semi-lattice of 
-degrees, Nagoya Math. J., 80 (1980), 75–106.Google Scholar
-degrees, Nagoya Math. J., 80 (1980), 75–106.Google Scholar
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