A Generalization of Whyburn's Theorem, and Aperiodicity for Abelian C*-Inclusions

Abstract

Let j:Y X be a continuous surjection of compact metric spaces. Whyburn proved that j is irreducible, meaning that j(F) ⊂neq X for any proper closed subset F ⊂neq Y, if and only if j is almost one-to-one, in the sense that \[ \y ∈ Y: j-1(j(y)) = y\ = Y. \] In this note we prove the following generalization: There exists a unique minimal closed set K ⊂eq Y such that j(K) = X if and only if \[ \x ∈ X: card(j-1(x)) = 1\ = X. \] Translated to the language of operator algebras, this says that if A ⊂eq B is a unital inclusion of separable abelian C*-algebras, then there exists a unique pseudo-expectation (in the sense of Pitts) if and only if the almost extension property of Nagy-Reznikoff holds. More generally, we prove that a unital inclusion of (not necessarily separable) abelian C*-algebras has a unique pseudo-expectation if and only if it is aperiodic (in the sense of Kwa\'sniewski-Meyer).