Real rank of extensions of C*-algebras

Abstract

Given a closed ideal I in a C*-algebra A, we develop techniques to bound the real rank of A in terms of the real ranks of I and A/I. Building on work of Brown, Lin and Zhang, we obtain complete solutions if I belongs to any of the following classes: (1) C*-algebras with real rank zero, stable rank one and vanishing K1-group; (2) simple, purely infinite C*-algebras; (3) simple, Z-stable C*-algebras with real rank zero; (4) separable, stable C*-algebras with an approximate unit of projections and the Corona Factorization Property.

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