Taking the path computably traveled

descriptionPublicationkeyboard_double_arrow_right Article , Preprint 23 Aug 2019Embargo end date: 01 Jan 2019 English Publisher:Oxford University Press (OUP)Journal:Journal of Logic and Computation, volume 29, pages 969-973 (issn: 0955-792X, eissn: 1465-363X,

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Authors: Johanna N. Y. Franklin; Dan Turetsky;

doi: 10.1093/logcom/exz016 , 10.48550/arxiv.1905.12199

arXiv: 1905.12199

Taking the path computably traveled

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Abstract

Abstract We define a real $A$ to be low for paths in Baire space (or Cantor space) if every $\varPi ^0_1$ class with an $A$-computable element has a computable element. We prove that lowness for paths in Baire space and lowness for paths in Cantor space are equivalent and, furthermore, that these notions are also equivalent to lowness for isomorphism.

Related Organizations

Victoria University of Wellington
New Zealand
Hofstra University
United States

Keywords

03D45, 03C57, FOS: Mathematics, Mathematics - Logic, Logic (math.LO)

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