A computably enumerable many-one degree with no least finite-one degree

Abstract

Richter, Stephan, and Zhang asked whether every nonrecursive many-one degree contains a least finite-one degree. We solve this question in the negative, already within the class of computably enumerable many-one degrees. Positive answers are known in two disjoint natural settings: for a measure-one and comeager class of m-rigid sets, and, in a companion paper, for computably enumerable many-one degrees containing a D-maximal set. We construct a nonrecursive \ set A such that for every set X A there exists a c.e.\ set B A with X B. Hence the many-one degree of A contains no least finite-one degree. The proof is a finite-injury priority construction based on virtual target sets and a dynamic trap mechanism forcing any putative finite-one reduction either to violate finite-oneness or to compute an incorrect reduction.