Add to ORKG1. For thirty-five years, one of the most interesting and rewarding classes of oper-ator algebras to study has been the approximately finite-dimensional C*-algebras of Glimm and Bratteli ([39], [7]). Recall that a separable C*-algebra A is said to be approximately finite-dimensional (or AF) if it is generated by an increasing sequenc
AbstractA classification is given of certain separable nuclear C∗-algebras not necessarily of real r...
abstract: C*-algebras of categories of paths were introduced by Spielberg in 2014 and generalize C*-...
Abstract. Any unital separable continuous C(X)-algebra with properly infinite fi-bres is properly in...
Abstract. We give an overview of the development over the last 15 years of the theory of simple C∗-a...
Abstract. We give an overview of the development over the last 15 years of the theory of simple C∗-a...
The infinite product of matrices with integer entries, known as a modified Glimm–Bratteli symbol n, ...
AbstractThe paper gives a complete classification of all separable C∗-algebras with countable spectr...
Abstract. We show that every separable nuclear residually nite dimensional C-algebras satisfying the...
AbstractWe introduce the growth rank of a C∗-algebra—a (N∪{∞})-valued invariant whose minimal instan...
Abstract. We show that semiprojectivity of a C∗-algebra is preserved when passing to C∗-subalgebras ...
AbstractThe class of C*-algebras, that arise as the crossed product of a stable simple AF-algebra wi...
AbstractThe class of C*-algebras, that arise as the crossed product of a stable simple AF-algebra wi...
AbstractIt is shown that if A is the C∗-algebra inductive limit of a sequence of finite-dimensional ...
We say that a C∗-algebra X has the approximate n-th root property (n> 2) if for every a ∈ X with ...
International audienceWe prove some stability results for certain classes of C *-algebras. We prove ...
AbstractA classification is given of certain separable nuclear C∗-algebras not necessarily of real r...
abstract: C*-algebras of categories of paths were introduced by Spielberg in 2014 and generalize C*-...
Abstract. Any unital separable continuous C(X)-algebra with properly infinite fi-bres is properly in...
Abstract. We give an overview of the development over the last 15 years of the theory of simple C∗-a...
Abstract. We give an overview of the development over the last 15 years of the theory of simple C∗-a...
The infinite product of matrices with integer entries, known as a modified Glimm–Bratteli symbol n, ...
AbstractThe paper gives a complete classification of all separable C∗-algebras with countable spectr...
Abstract. We show that every separable nuclear residually nite dimensional C-algebras satisfying the...
AbstractWe introduce the growth rank of a C∗-algebra—a (N∪{∞})-valued invariant whose minimal instan...
Abstract. We show that semiprojectivity of a C∗-algebra is preserved when passing to C∗-subalgebras ...
AbstractThe class of C*-algebras, that arise as the crossed product of a stable simple AF-algebra wi...
AbstractThe class of C*-algebras, that arise as the crossed product of a stable simple AF-algebra wi...
AbstractIt is shown that if A is the C∗-algebra inductive limit of a sequence of finite-dimensional ...
We say that a C∗-algebra X has the approximate n-th root property (n> 2) if for every a ∈ X with ...
International audienceWe prove some stability results for certain classes of C *-algebras. We prove ...
AbstractA classification is given of certain separable nuclear C∗-algebras not necessarily of real r...
abstract: C*-algebras of categories of paths were introduced by Spielberg in 2014 and generalize C*-...
Abstract. Any unital separable continuous C(X)-algebra with properly infinite fi-bres is properly in...