The Gamma question for many-one degrees

Abstract

A set A is coarsely computable with density r ∈ [0,1] if there is an algorithm for deciding membership in A which always gives a (possibly incorrect) answer, and which gives a correct answer with density at least r. To any Turing degree a we can assign a value T(a): the minimum, over all sets A in a, of the highest density at which A is coarsely computable. The closer T(a) is to 1, the closer a is to being computable. Andrews, Cai, Diamondstone, Jockush, and Lempp noted that T can take on the values 0, 1/2, and 1, but not any values in strictly between 1/2 and 1. They asked whether the value of T can be strictly between 0 and 1/2. This is the Gamma question. Replacing Turing degrees by many-one degrees, we get an analogous question, and the same arguments show that m can take on the values 0, 1/2, and 1, but not any values strictly between 1/2 and 1. We will show that for any r ∈ [0,1/2], there is an m-degree a with m(a) = r. Thus the range of m is [0,1/2] \1\. Benoit Monin has recently announced a solution to the Gamma question for Turing degrees. Interestingly, his solution gives the opposite answer: the only possible values of T are 0, 1/2, and 1.