The isomorphism class of the shift map

Abstract

The shift map σ is the self-homeomorphism of ω* = βω ω induced by the successor function n n+1 on ω. We prove that the isomorphism classes of σ and σ-1 cannot be separated by a Borel set in H(ω*), the space of all self-homeomorphisms of ω* equipped with the compact-open topology. Van Douwen proved it is consistent for σ and σ-1 not to be isomorphic. Whether it is also consistent for them to be isomorphic is an open problem. The theorem stated above can be thought of as a counterpoint to van Douwen's result: while σ and σ-1 may not be isomorphic, there is no simple topological property that distinguishes them. As a relatively straightforward consequence of the main theorem, we deduce that OCA+MA implies the set of continuous images of σ fails to be Borel in H(ω*). (Here a ``continuous image'' of σ is meant in the sense of topological dynamics: any h ∈ H(ω*) such that q σ = h q for some continuous surjection q: ω* ω*.) This contrasts starkly with a recent theorem of the author showing that under CH, the continuous images of σ form a closed subset of H(ω*).