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Solution to a Problem of Spector

Published online by Cambridge University Press:  20 November 2018

A. H. Lachlan*
Affiliation:
Simon Fraser University, Burnaby, British Columbia
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In [6, p. 586] Spector asked whether given a number e there exists a unary partial function from the natural numbers into {0, 1} with coinfinite domain such that for any function ƒ into {0, 1} extending it is the case that

We answer this question affirmatively in Corollary 1 below and show that can be made partial recursive (p.r.) with recursive domain. The reader who is familiar with Spector's paper [6] will find the new trick that is required in the first paragraph of the proof of Lemma 2 below.

From one point of view, this is a theorem about trees which branch twice at every node. We shall formulate a generalization which applies to trees which branch n times at every node.

Type
Research Article
Copyright
Copyright © Canadian Mathematical Society 1971

References

1. Lachlan, A. H., Distributive initial segments of the degrees of unsolvability, Z. Math. Logik Grundlagen Math. 14 (1968), 457472.Google Scholar
2. Lachlan, A. H., Initial segments of many-one degrees, Can. J. Math. 22 (1970), 7585.Google Scholar
3. Lerman, M., Some non-distributive lattices as initial segments of the degrees of unsolvability, J. Symbolic Logic 34 (1969), 8598.Google Scholar
4. Lerman, M., Initial segments of the degrees of unsolvability (to appear in Ann. of Math.).Google Scholar
5. Shoenfield, J. R., A theorem on minimal degrees, J. Symbolic Logic 31 (1966), 539544.Google Scholar
6. Spector, C., On degrees of recursive unsolvability, Ann. of Math. (2) 64 (1956), 581592.Google Scholar
7. Thomason, S. K., Sublattices and initial segments of the degrees of unsolvability, Can. J. Math. 22 (1970), 569581.Google Scholar