Add to ORKGThe authors study crossed products of arbitrary operator algebras by locally compact groups of completely isometric automorphisms. They develop an abstract theory that allows for generalizations of many of the fundamental results from the selfadjoint theory to our context. They complement their generic results with the detailed study of many important special cases. In particular they study crossed products of tensor algebras, triangular AF algebras and various associated C^*-algebras. They make contributions to the study of C^*-envelopes, semisimplicity, the semi-Dirichlet property, Takai duality and the Hao-Ng isomorphism problem. They also answer questions from the pertinent literature
AbstractLet U be a C∗-algebra, and G be a locally compact abelian group. Suppose α is a continuous a...
AbstractWhen A is a unital simple AF C∗-algebra and has a unique tracial state, it is shown that the...
AbstractWe introduce a method to study C*-algebras possessing an action of the circle group, from th...
In 2015, E. Katsoulis and C. Ramsey introduced the construction of a non-self-adjoint crossed produc...
In 2015, E. Katsoulis and C. Ramsey introduced the construction of a non-self-adjoint crossed produc...
In 2015, E. Katsoulis and C. Ramsey introduced the construction of a non-self-adjoint crossed produc...
In 2015, E. Katsoulis and C. Ramsey introduced the construction of a non-self-adjoint crossed produc...
The authors examine the semicrossed products of a semigroup action by *-endomorphisms on a C*-algebr...
AbstractGiven a C∗-algebra U and endomorphim α, there is an associated nonselfadjoint operator algeb...
The paper presents a construction of the crossed product of a C*-algebra by a commutative semigroup ...
In 2015, E. Katsoulis and C. Ramsey introduced the construction of a non-self-adjoint crossed produc...
AbstractIt will be proved that a uniformly hyperfinite C∗-algebra A admits a compact Abelian automor...
AbstractLet U be a C∗-algebra, and G be a locally compact abelian group. Suppose α is a continuous a...
AbstractWe study the C*-algebra crossed product C0(X)⋊G of a locally compact group G acting properly...
We give an exposition of two fundamental results of the theory of crossed products. One of these sta...
AbstractLet U be a C∗-algebra, and G be a locally compact abelian group. Suppose α is a continuous a...
AbstractWhen A is a unital simple AF C∗-algebra and has a unique tracial state, it is shown that the...
AbstractWe introduce a method to study C*-algebras possessing an action of the circle group, from th...
In 2015, E. Katsoulis and C. Ramsey introduced the construction of a non-self-adjoint crossed produc...
In 2015, E. Katsoulis and C. Ramsey introduced the construction of a non-self-adjoint crossed produc...
In 2015, E. Katsoulis and C. Ramsey introduced the construction of a non-self-adjoint crossed produc...
In 2015, E. Katsoulis and C. Ramsey introduced the construction of a non-self-adjoint crossed produc...
The authors examine the semicrossed products of a semigroup action by *-endomorphisms on a C*-algebr...
AbstractGiven a C∗-algebra U and endomorphim α, there is an associated nonselfadjoint operator algeb...
The paper presents a construction of the crossed product of a C*-algebra by a commutative semigroup ...
In 2015, E. Katsoulis and C. Ramsey introduced the construction of a non-self-adjoint crossed produc...
AbstractIt will be proved that a uniformly hyperfinite C∗-algebra A admits a compact Abelian automor...
AbstractLet U be a C∗-algebra, and G be a locally compact abelian group. Suppose α is a continuous a...
AbstractWe study the C*-algebra crossed product C0(X)⋊G of a locally compact group G acting properly...
We give an exposition of two fundamental results of the theory of crossed products. One of these sta...
AbstractLet U be a C∗-algebra, and G be a locally compact abelian group. Suppose α is a continuous a...
AbstractWhen A is a unital simple AF C∗-algebra and has a unique tracial state, it is shown that the...
AbstractWe introduce a method to study C*-algebras possessing an action of the circle group, from th...