Abstract
We give an overview of the development over the last 15 years of the theory of simple C.-algebras, in particular in regards to their classification and structure. We discuss dimension theory for (simple) C.-algebras, in particular the so-called stable and real ranks, and we explain how properties of C.-algebras of low dimension (stable rank one and real rank zero) was used by the author and P. Friis to give a new and simple proof of a theorem of H. Lin that almost commuting self-adjoint matrices are close to exactly commuting self-adjoint matrices. Elliotti¯s classification program is explained and is contrasted with recent examples of C.-algebras of i°high dimensioni±, including an example of a simple C.-algebra with a finite and an infinite projection.
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