Unique Pseudo-Expectations for Hereditarily Essential C*-Inclusions

Abstract

The C*-inclusion A ⊂eq B is said to be hereditarily essential if for every intermediate C*-algebra A ⊂eq C ⊂eq B and every non-zero ideal \0\ ≠ J C, we have that J A ≠ \0\. That is, A detects ideals in every intermediate C*-algebra A ⊂eq C ⊂eq B. By a result of Pitts and Zarikian, a unital C*-inclusion A ⊂eq B is hereditarily essential if and only if every pseudo-expectation θ:B I(A) for A ⊂eq B is faithful. A decade-old open question asks whether hereditarily essential C*-inclusions must have unique pseudo-expectations? In this note, we answer the question affirmatively for some important classes of C*-inclusions, in particular those of the form A ⊂eq A α,rσ G, for a twisted C*-dynamical system (A,G,α,σ). On the other hand, we settle the general question negatively by exhibiting C*-irreducible inclusions of the form Cr*(G) ⊂eq C(X) α,r G with multiple conditional expectations. Our results leave open the possibility that the question might have a positive answer for regular hereditarily essential C*-inclusions.