Logical Methods in Computer Science (Sep 2014)

Random strings and tt-degrees of Turing complete C.E. sets

  • Mingzhong Cai,
  • Rodney G Downey,
  • Rachel Epstein,
  • Steffen Lempp,
  • Joseph Miller

DOI
https://doi.org/10.2168/LMCS-10(3:15)2014
Journal volume & issue
Vol. Volume 10, Issue 3

Abstract

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We investigate the truth-table degrees of (co-)c.e.\ sets, in particular, sets of random strings. It is known that the set of random strings with respect to any universal prefix-free machine is Turing complete, but that truth-table completeness depends on the choice of universal machine. We show that for such sets of random strings, any finite set of their truth-table degrees do not meet to the degree~0, even within the c.e. truth-table degrees, but when taking the meet over all such truth-table degrees, the infinite meet is indeed~0. The latter result proves a conjecture of Allender, Friedman and Gasarch. We also show that there are two Turing complete c.e. sets whose truth-table degrees form a minimal pair.

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