Computably strongly self-absorbing C*-algebras
Abstract
We introduce the notion of a computably strongly self-absorbing C*-algebra and show that the following C*-algebras are computably strongly self-absorbing: the Cuntz algebras O2 and O∞, the UHF algebra Mn(C) and the tensor product Mn(C) O∞, where n is a supernatural number of infinite type with computably enumerable support, and the Jiang-Su algebra Z. In connection with the last example, we show that Z has a computable presentation. The results above are a special instance of a computable version of the standard approximate intertwining argument due to Elliott.
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