Eberhard Kirchberg scite author profile

A C *-algebra A is defined to be purely infinite if there are no characters on A , and if for every pair of positive elements a, b in A , such that b lies in the closed two-sided ideal generated by a , there exists a sequence { r n } in A such that r * n ar n → b . This definition agrees with the usual definition by J. Cuntz when A is simple. It is shown that the property of being purely infinite is preserved under extensions, Morita equivalence, inductive limits, and it passes to quotients, and to hereditary sub- C *-algebras. It is shown that A ⊗ O ∞ is purely infinite for every C *-algebra A . Purely infinite C *-algebras admit no traces, and, conversely, an approximately divisible exact C *-algebra is purely infinite if it admits no nonzero trace.

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On non-semisplit extensions, tensor products and exactness of groupC *-algebras

Kirchberg¹

1993

Invent Math

254

309

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Generalized inductive limits of finite-dimensional C * -algebras

Blackadar

Kirchberg

1997

Mathematische Annalen

167

296

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Embedding of exact C* -algebras in the Cuntz algebra 𝒪2

Kirchberg¹,

Phillips²

2000

296

257

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Covering Dimension and Quasidiagonality

2004

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Abstract. We introduce the decomposition rank, a notion of covering dimension for nuclear C * -algebras. The decomposition rank generalizes ordinary covering dimension and has nice permanence properties; in particular, it behaves well with respect to direct sums, quotients, inductive limits, unitization and quasidiagonal extensions. Moreover, it passes to hereditary subalgebras and is invariant under stabilization. It turns out that the decomposition rank can be finite only for strongly quasidiagonal C * -algebras and that it is closely related to the classification program.

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