English

On topologically finite-dimensional simple C*-algebras

Operator Algebras 2007-05-23 v1 K-Theory and Homology

Abstract

We show that, if a simple CC^{*}-algebra AA is topologically finite-dimensional in a suitable sense, then not only K0(A)K_{0}(A) has certain good properties, but AA is even accessible to Elliott's classification program. More precisely, we prove the following results: If AA is simple, separable and unital with finite decomposition rank and real rank zero, then K0(A)K_{0}(A) is weakly unperforated. If AA has finite decomposition rank, real rank zero and the space of extremal tracial states is compact and zero-dimensional, then AA has stable rank one and tracial rank zero. As a consequence, if BB is another such algebra, and if AA and BB have isomorphic Elliott invariants and satisfy the Universal coefficient theorem, then they are isomorphic. In the case where AA has finite decomposition rank and the space of extremal tracial states is compact and zero-dimensional, we also give a criterion (in terms of the ordered K0K_{0}-group) for AA to have real rank zero. As a byproduct, we show that there are examples of simple, stably finite and quasidiagonal CC^{*}-algebras with infinite decomposition rank.

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Cite

@article{arxiv.math/0311501,
  title  = {On topologically finite-dimensional simple C*-algebras},
  author = {Wilhelm Winter},
  journal= {arXiv preprint arXiv:math/0311501},
  year   = {2007}
}

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31 pages