Tensorially Absorbing Inclusions of C*-algebras
Abstract
When D is strongly self-absorbing we say an inclusion B ⊂eq A is D-stable if it is isomorphic to the inclusion B D ⊂eq A D. We give ultrapower characterizations and show that if a unital inclusion is D-stable, then D-stability can be exhibited for countably many intermediate C*-algebras concurrently. We show that such embeddings between D-stable C*-algebras are point-norm dense in the set of all embeddings, and that every embedding between D-stable C*-algebras is approximately unitarily equivalent to a D-stable embedding. Examples are provided.
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