Add to ORKGWe show how to reconstruct a finite directed graph E from its Toeplitz algebra, its gauge action, and the canonical finite-dimensional abelian subalgebra generated by the vertex projections. We also show that if E has no sinks, then we can recover E from its Toeplitz algebra and the generalized gauge action that has, for each vertex, an independent copy of the circle acting on the generators corresponding to edges emanating from that vertex. We show by example that it is not possible to recover E from its Toeplitz algebra and gauge action alone
A graph of groups consists of an undirected graph with each edge and vertex assigned a group. There ...
We consider self-similar actions of groupoids on the path spaces of finite directed graphs, and co...
Abstract. We compute the K-theory of a special class of C∗-algebras which are endowed with gauge act...
The goal of this thesis is to study the KMS states of graph algebras with a generalised gauge dynami...
In this note we generalize a result from a recent paper of Hajac, Reznikoff and Tobolski (2020). In ...
Let a group G act on a directed graph E. This determines a representation ρ of G on the C∗-correspon...
AbstractWe compute the K-theory of the Toeplitz algebra of a finitely aligned higher rank graph and ...
We consider a finite directed graph E, and the gauge action on its Toeplitz-Cuntz-Krieger algebra, v...
Let a group G act on a directed graph E. This determines a representation ρ of G on the C∗-correspon...
Given a directed graph E, we construct for each real number l a quiver whose vertex space is the top...
In this note we shall show that the Graph Reconstruction Conjecture (also called the Kelly-Ulam conj...
To a higher rank directed graph (Λ, d), in the sense of Kumjian and Pask, 2000, one can associate na...
Let a group G act on a directed graph E. This determines a representation ρ of G on the C∗-correspon...
We study the generalised Bunce-Deddens algebras and their Toeplitz extensions constructed by Kribs a...
Let E be a countable directed graph that is amplified in the sense that whenever there is an edge fr...
A graph of groups consists of an undirected graph with each edge and vertex assigned a group. There ...
We consider self-similar actions of groupoids on the path spaces of finite directed graphs, and co...
Abstract. We compute the K-theory of a special class of C∗-algebras which are endowed with gauge act...
The goal of this thesis is to study the KMS states of graph algebras with a generalised gauge dynami...
In this note we generalize a result from a recent paper of Hajac, Reznikoff and Tobolski (2020). In ...
Let a group G act on a directed graph E. This determines a representation ρ of G on the C∗-correspon...
AbstractWe compute the K-theory of the Toeplitz algebra of a finitely aligned higher rank graph and ...
We consider a finite directed graph E, and the gauge action on its Toeplitz-Cuntz-Krieger algebra, v...
Let a group G act on a directed graph E. This determines a representation ρ of G on the C∗-correspon...
Given a directed graph E, we construct for each real number l a quiver whose vertex space is the top...
In this note we shall show that the Graph Reconstruction Conjecture (also called the Kelly-Ulam conj...
To a higher rank directed graph (Λ, d), in the sense of Kumjian and Pask, 2000, one can associate na...
Let a group G act on a directed graph E. This determines a representation ρ of G on the C∗-correspon...
We study the generalised Bunce-Deddens algebras and their Toeplitz extensions constructed by Kribs a...
Let E be a countable directed graph that is amplified in the sense that whenever there is an edge fr...
A graph of groups consists of an undirected graph with each edge and vertex assigned a group. There ...
We consider self-similar actions of groupoids on the path spaces of finite directed graphs, and co...
Abstract. We compute the K-theory of a special class of C∗-algebras which are endowed with gauge act...