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Sets with no subset of higher degree1

Published online by Cambridge University Press:  12 March 2014

Robert I. Soare*
Affiliation:
University of Illinois at Chicago Circle

Extract

The problem of finding an infinite set of natural numbers which contains no subsets of higher (Turing) degree was first posed by W. Miller [3] and was brought to our attention by C. G. Jockusch, Jr., who proved that such a set, if it existed, could not be hyperarithmetic.2 In this paper we construct an infinite set which is not recursive in any of its coinfinite subsets, and thus contains no subset of higher degree. Our original proof made use of the result (attributed to Ehrenfeucht) that every subset of 2ω which is open (in the standard topology) is “Ramsey”.

Information

Type
Research Article
Copyright
Copyright © Association for Symbolic Logic 1969

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