A tractable case of the Turing automorphism problem: bi-uniformly E0-invariant Cantor homeomorphisms

Abstract

A function F:2ω 2ω is an E0-isomorphism if for all x,y∈ 2ω, we have xE0y f(x)E0 f(y), where xE0y(∃ a)(∀ n b) x(n)=y(n). If such witnesses a for xE0 y and for f(x)E0 f(y) depend on each other but not on x, y, then F is called bi-uniform. It is shown that a homeomorphism of Cantor space which is a bi-uniform E0-isomorphism can induce only the trivial automorphism of the Turing degrees.