Two theorems on truth table degrees

Downey, R. G.

doi:10.1090/S0002-9939-1988-0938684-6

Two theorems on truth table degrees
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Proc. Amer. Math. Soc. 103 (1988), 281-287 Request permission

Abstract:

In this article we solve two questions of Odifreddi on the r.e. ${\text {tt}}$-degrees. First we construct an r.e. ${\text {tt}}$-degree with anticupping property. In fact, we construct r.e. ${\text {tt}}$-degrees ${\mathbf {a}},{\mathbf {b}}$ with ${\mathbf {0}} < {\mathbf {a}} < {\mathbf {b}}$ and such that for all (not necessarily r.e.) ${\text {tt}}$-degrees ${\mathbf {c}}$ if ${\mathbf {a}} \cup {\mathbf {c}} \geq {\mathbf {b}}$ then ${\mathbf {a}} \leq {\mathbf {c}}$. This result also has ramifications in, for example, the r.e. ${\text {wtt}}$-degrees. Finally we solve another question of Odifreddi by constructing an r.e. ${\text {tt}}$-degree with no greatest r.e. $m$-degree.

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Recursively enumerable

- and

-degrees

the distribution of singular degrees