Given an inclusion D ⊆ C of unital C*-algebras, a unital completely
positive linear map Φ of C into the injective envelope I(D) of D which
extends the inclusion of D into I(D) is a pseudo-expectation. The set
PsExp(C,D) of all pseudo-expectations is a convex set, and for abelian D, we
prove a Krein-Milman type theorem showing that PsExp(C,D) can be recovered from
its extreme points. When C is abelian, the extreme pseudo-expectations coincide
with the homomorphisms of C into I(D) which extend the inclusion of D into
I(D), and these are in bijective correspondence with the ideals of C which are
maximal with respect to having trivial intersection with D.
Natural classes of inclusions have a unique pseudo-expectation (e.g., when D
is a regular MASA in C). Uniqueness of the pseudo-expectation implies
interesting structural properties for the inclusion. For example, when D
⊆ C ⊆ B(H) are W*-algebras, uniqueness of the
pseudo-expectation implies that D' ∩ C is the center of D; moreover, when
H is separable and D is abelian, we characterize which W*-inclusions have the
unique pseudo-expectation property.
For general inclusions of C*-algebras with D abelian, we characterize the
unique pseudo-expectation property in terms of order structure; and when C is
abelian, we are able to give a topological description of the unique
pseudo-expectation property.
Applications include: a) if an inclusion D ⊆ C has a unique
pseudo-expectation Φ which is also faithful, then the C*-envelope of any
operator space X with D ⊆ X ⊆ C is the C*-subalgebra of C
generated by X; b) for many interesting classes of C*-inclusions, having a
faithful unique pseudo-expectation implies that D norms C. We give examples to
illustrate the theory, and conclude with several unresolved questions.Comment: 26 page