Index sets and universal numberings

作者:

Highlights:

摘要

This paper studies the Turing degrees of various properties defined for universal numberings, that is, for numberings which list all partial-recursive functions. In particular properties relating to the domain of the corresponding functions are investigated like the set DEQ of all pairs of indices of functions with the same domain, the set DMIN of all minimal indices of sets and DMIN⁎ of all indices which are minimal with respect to equality of the domain modulo finitely many differences. A partial solution to a question of Schaefer is obtained by showing that for every universal numbering with the Kolmogorov property, the set DMIN⁎ is Turing equivalent to the double jump of the halting problem. Furthermore, it is shown that the join of DEQ and the halting problem is Turing equivalent to the jump of the halting problem and that there are numberings for which DEQ itself has 1-generic Turing degree.

论文关键词:1-generic,Index sets,Kolmogorov property,Minimal indices,MIN⁎,Universal numberings,Turing degrees

论文评审过程:Received 30 November 2009, Revised 6 July 2010, Accepted 8 July 2010, Available online 10 July 2010.

论文官网地址:https://doi.org/10.1016/j.jcss.2010.07.001