AbstractIn this paper aK-theoretic classification is given of the simple real rank zeroC*-algebras that can be expressed as inductive limits of sequences of finite direct sums of matrix algebras over finite connected graphs (possibly with dimension drop). This class ofC*-algebras provides torsionK1. The special case that the graphs are intervals is due to Elliott
We consider inductive limits A of sequences A \ —> Ai — » of finite direct sums of C*-algebras of...
AbstractGiven a row-finite directed graph E, a universal C*-algebra C*(E) generated by a family of p...
Abstract. We describe a class of rank-2 graphs whose C∗-algebras are AT algebras. For a subclass whi...
AbstractIn this paper aK-theoretic classification is given of the simple real rank zeroC*-algebras t...
AbstractFor each integerp>1, we consider an algebraic invariant forC*-algebras. The invariant consis...
Abstract. It will be shown in this paper that certain real rank zero C*-algebras which are inductive...
AbstractWe study the limits of inductive sequences (Ai,ϕi) where each Ai is a direct sum of full mat...
AbstractThe concept of real rank of a C∗-algebra is introduced as a non-commutative analogue of dime...
AbstractA classification is given of certain separable nuclear C∗-algebras not necessarily of real r...
AbstractIt is proved that the Z2-graded ordered K-theory group with order unit (K∗(A),K∗(A)+,[1A]) i...
AbstractIn this article, we will give a complete classification of simple C*-algebras which can be w...
AbstractWe describe a class of rank-2 graphs whose C∗-algebras are AT algebras. For a subclass which...
A construction method is presented for a class of simple C*-algebras whose basic properties -includi...
AbstractFor each integerp>1, we consider an algebraic invariant forC*-algebras. The invariant consis...
In this paper we deal with C*-algebras of real rank zero that can be represented as inductive limits...
We consider inductive limits A of sequences A \ —> Ai — » of finite direct sums of C*-algebras of...
AbstractGiven a row-finite directed graph E, a universal C*-algebra C*(E) generated by a family of p...
Abstract. We describe a class of rank-2 graphs whose C∗-algebras are AT algebras. For a subclass whi...
AbstractIn this paper aK-theoretic classification is given of the simple real rank zeroC*-algebras t...
AbstractFor each integerp>1, we consider an algebraic invariant forC*-algebras. The invariant consis...
Abstract. It will be shown in this paper that certain real rank zero C*-algebras which are inductive...
AbstractWe study the limits of inductive sequences (Ai,ϕi) where each Ai is a direct sum of full mat...
AbstractThe concept of real rank of a C∗-algebra is introduced as a non-commutative analogue of dime...
AbstractA classification is given of certain separable nuclear C∗-algebras not necessarily of real r...
AbstractIt is proved that the Z2-graded ordered K-theory group with order unit (K∗(A),K∗(A)+,[1A]) i...
AbstractIn this article, we will give a complete classification of simple C*-algebras which can be w...
AbstractWe describe a class of rank-2 graphs whose C∗-algebras are AT algebras. For a subclass which...
A construction method is presented for a class of simple C*-algebras whose basic properties -includi...
AbstractFor each integerp>1, we consider an algebraic invariant forC*-algebras. The invariant consis...
In this paper we deal with C*-algebras of real rank zero that can be represented as inductive limits...
We consider inductive limits A of sequences A \ —> Ai — » of finite direct sums of C*-algebras of...
AbstractGiven a row-finite directed graph E, a universal C*-algebra C*(E) generated by a family of p...
Abstract. We describe a class of rank-2 graphs whose C∗-algebras are AT algebras. For a subclass whi...
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