Coronas and strongly self-absorbing C*-algebras
Abstract
Let D be a strongly self-absorbing C*-algebra. Given any separable C*-algebra A, our two main results assert the following. If A is D-stable, then the corona algebra of A is D-saturated, i.e., D embeds unitally into the relative commutant of every separable C*-subalgebra. Conversely, assuming that the stable corona of A is separably D-stable, we prove that A is D-stable. This generalizes recent work by the first-named author on the structure of the Calkin algebra. As an immediate corollary, it follows that the multiplier algebra of a separable D-stable C*-algebra is separably D-stable. Appropriate versions of the aforementioned results are also obtained when A is not necessarily separable. The article ends with some non-trivial applications.
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