AF-embeddings into C*-algebras of real rank zero

Abstract

It is proved that every separable C*-algebra of real rank zero contains an AF-sub-C*-algebra such that the inclusion mapping induces an isomorphism of the ideal lattices of the two C*-algebras and such that every projection in a matrix algebra over the large C*-algebra is equivalent to a projection in a matrix algebra over the AF-sub-C*-algebra. This result is proved at the level of monoids, using that the monoid of Murray-von Neumann equivalence classes of projections in a C*-algebra of real rank zero has the refinement property. As an application of our result, we show that given a unital C*-algebra A of real rank zero and a natural number n, then there is a unital *-homomorphism Mn1 ... Mnr A for some natural numbers r,n1, ...,nr with nj n for all j if and only if A has no representation of dimension less than n.

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