A result of Soare and Stob asserts that for any non-recursive r.e. set C , there exists a r.e.[ C ] set A such that A ⊕ C is not of r.e. degree. A set Y is called [of] m -REA ( m -REA[ C ] [degree] iff it is [Turing equivalent to] the result of applying m -many iterated ‘hops’ to the empty set (to C ), where a hop is any function of the form X → X ⊕ W e X . The cited result is the special case m =0, n =1 of our Theorem. For m =0,1, and any ( m +1)-REA set C , if C is not of m -REA degree, then for all n there exists a n -r.e.[ C ] set A such that A ⊕ C is not of ( m+n )-REA degree. We conjecture that this holds also for m ≥2.Peer Reviewedhttp://deepblue.lib.umich.edu/bitstream/2027.42/46068/1/153_2005_Article_BF01278463.pd
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This dissertation is a contribution to the theory of the Turing degrees of sets of natural numbers. ...
In [5] Soare and Stob prove that if $A$ is an r.e. set which isn't computable then there is a set of...
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We provide three new results about interpolating 2-r.e. (i.e. d-r.e.) or 2-REA (recursively enumerab...
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Abstract. We study low level nonde\u85nability in the Turing degrees. We prove a variety of results,...
AbstractAmbos-Spies (1984a) showed that the two basic nondistributive lattices can be embedded in Rp...
In Recursion Theory (Computability Theory), we study Turing degrees in terms of their degree-theoret...
AbstractWe consider the relationship of the lattice-theoretic properties and the jump-theoretic prop...
AbstractWe consider questions related to the rigidity of the structure R, the PTIME-Turing degrees o...
We study the degrees below 0$\sp\prime$ by examining some phenomena relating two well-known hierarch...
AbstractWe provide three new results about interpolating 2-r.e. (i.e. d-r.e.) or 2-REA (recursively ...
This dissertation is a contribution to the theory of the Turing degrees of sets of natural numbers. ...
In [5] Soare and Stob prove that if $A$ is an r.e. set which isn't computable then there is a set of...
AbstractWe construct a recursive model A, a recursive subset R of its domain, and a (nonzero) Turing...
We provide three new results about interpolating 2-r.e. (i.e. d-r.e.) or 2-REA (recursively enumerab...
We consider the set of jumps below a Turing degree, given by JB(a) = {x(1) : x <= a}, with a focus o...
AbstractLet A be a recursive structure, and let R be a recursive relation on A. Harizanov (1991) iso...
AbstractLet b and c be r.e. Turing degrees such that b>c. We show that there is an r.e. degree a suc...
We look at various properties of the computably enumerable (c.e.) not totally ω-c.e. Turing degrees....
Abstract. We study low level nonde\u85nability in the Turing degrees. We prove a variety of results,...
AbstractAmbos-Spies (1984a) showed that the two basic nondistributive lattices can be embedded in Rp...
In Recursion Theory (Computability Theory), we study Turing degrees in terms of their degree-theoret...
AbstractWe consider the relationship of the lattice-theoretic properties and the jump-theoretic prop...
AbstractWe consider questions related to the rigidity of the structure R, the PTIME-Turing degrees o...