A family of non-cocycle conjugate E0-semigroups obtained from boundary weight doubles

Abstract

We have seen that if φ: Mn() → Mn() is a unital q-positive map and is a type II Powers weight, then the boundary weight double (φ, ) induces a unique (up to conjugacy) type II0 E0-semigroup. Let φ: Mn() → Mn() and : Mn'() → Mn'() be unital rank one q-positive maps, so for some states ∈ Mn()* and ' ∈ Mn'()*, we have φ(A)=(A)In and (D) = '(D)In' for all A ∈ Mn() and D ∈ Mn'(). We find that if and η are arbitrary type II Powers weights, then (φ, ) and (, η) induce non-cocycle conjugate E0-semigroups if and ' have different eigenvalue lists. We then completely classify the q-corners and hyper maximal q-corners from φ to , obtaining the following result: If is a type II Powers weight of the form (I - (1) B I - (1))=(f,Bf), then the E0-semigroups induced by (φ,) and (, ) are cocycle conjugate if and only if n=n' and φ and are conjugate.