Add to ORKGLet E = (E0,E1,s,r) be an arbitrary directed graph (i.e., no restriction is placed on the cardinality of E0, or of E1, or of s−1(v) for v ∈ E0). Let LK(E) denote the Leavitt path algebra of E with coefficients in a field K, and let C∗(E) denote the graph C∗-algebra of E. (Note: here C∗(E) need not be separable.) We give necessary and sufficient conditions on E so that LK(E) is primitive (joint work with Jason Bell and K.M. Rangaswamy). We then show that these same conditions are precisely the necessary and sufficient conditions on E so that C∗(E) is primitive (joint work with Mark Tomforde). This gives yet another example in a long and growing list of algebraic/analytic properties of the graph algebras LK(E) and C∗(E) for which the graph co...
When the theory of Leavitt path algebras was already quite advanced, it was discovered that some of ...
Directed graphs have played a prominent role as a tool for encoding information for certain classes ...
There is a tight relation between the geometry of a directed graph and the algebraic structure of a ...
The central concept of this thesis is that of Leavitt path algebras, a notion introduced by both Abr...
Leavitt path algebras can be regarded as the algebraic counterparts of the graph C∗-algebras, the de...
AbstractFor any row-finite graph E and any field K we construct the Leavitt path algebra L(E) having...
AbstractGiven an arbitrary graph E and a field K, the prime ideals as well as the primitive ideals o...
AbstractWe prove Leavitt path algebra versions of the two uniqueness theorems of graph C∗-algebras. ...
A graph can be represented into path algebra over field K by additing two axioms, denoted by KE. If ...
AbstractWe give necessary and sufficient conditions on a row-finite graph E so that the Leavitt path...
Let E be an arbitrary (countable) graph and let R be a unital commutative ring. We analyze the ideal...
Graph can be represented into a path algebra over field K by adding two axioms, denoteds by KE. If t...
Abstract. We extend the notion of the Leavitt path algebra of a graph to include all directed graphs...
We prove an algebraic version of the Gauge-Invariant Uniqueness Theorem, a result which gives inform...
Let E be a directed graph, K any field, and let LK(E) denote the Leavitt path algebra of E with coef...
When the theory of Leavitt path algebras was already quite advanced, it was discovered that some of ...
Directed graphs have played a prominent role as a tool for encoding information for certain classes ...
There is a tight relation between the geometry of a directed graph and the algebraic structure of a ...
The central concept of this thesis is that of Leavitt path algebras, a notion introduced by both Abr...
Leavitt path algebras can be regarded as the algebraic counterparts of the graph C∗-algebras, the de...
AbstractFor any row-finite graph E and any field K we construct the Leavitt path algebra L(E) having...
AbstractGiven an arbitrary graph E and a field K, the prime ideals as well as the primitive ideals o...
AbstractWe prove Leavitt path algebra versions of the two uniqueness theorems of graph C∗-algebras. ...
A graph can be represented into path algebra over field K by additing two axioms, denoted by KE. If ...
AbstractWe give necessary and sufficient conditions on a row-finite graph E so that the Leavitt path...
Let E be an arbitrary (countable) graph and let R be a unital commutative ring. We analyze the ideal...
Graph can be represented into a path algebra over field K by adding two axioms, denoteds by KE. If t...
Abstract. We extend the notion of the Leavitt path algebra of a graph to include all directed graphs...
We prove an algebraic version of the Gauge-Invariant Uniqueness Theorem, a result which gives inform...
Let E be a directed graph, K any field, and let LK(E) denote the Leavitt path algebra of E with coef...
When the theory of Leavitt path algebras was already quite advanced, it was discovered that some of ...
Directed graphs have played a prominent role as a tool for encoding information for certain classes ...
There is a tight relation between the geometry of a directed graph and the algebraic structure of a ...