Graph C*-Algebras with Real Rank Zero

We show that every \(C^{*}\)-algebra with real rank zero has exponential rank \(\leqslant 1+\varepsilon\). Consequently, \(C^{*}\)-algebras with real rank zero have the property weak (FU). We also show that if \(A\) is a \(\sigma\)-unital \(C^{*}\)-algebra with real rank zero, stable rank one, and t

In this article, examples are given to prove that the graded scaled ordered K-group is not the complete invariant for a C\*-algebra in the class of unital separable nuclear C\*-algebras of real rank zero and stable rank one, even for a C\*-algebra in the subclass which consists of those real rank ze

For each integer p>1, we consider an algebraic invariant for C\*-algebras. The invariant consists of K 0 , K 1 , the K 0 -group with ZÂp coefficients, the order structures these groups possess, and the natural maps between the three groups. We prove that this invariant is complete for the class of A