Add to ORKGAbstract. We construct a family of essential representations of an arbitrary product system by generalizing some techniques intro-duced by M. Skeide and W. Arveson. We then classify the resulting E0-semigroups up to conjugacy, by identifying their tail flows as periodic W ∗-dynamical systems acting on factors of type I∞. The conjugacy classes of these E0-semigroups correspond to the orbits of the action of the automorphism group of the product system on unital vectors. In the sequel, this classification shows explicitly that any E0-semigroup admits uncountably many non-conjugate cocycle perturbations. 1
AbstractA product systemEover a semigroupPis a family of Hilbert spaces {Es:s∈P} together with multi...
Given a C*-dynamical system (A, G, σ) the crossed product C*-algebra A×σG encodes the action of G on...
A class of examples showing that a measure-theoretical characterization of regular cocycles in terms...
AbstractWe construct a family of essential representations of an arbitrary product system by general...
In these notes the author presents a complete theory of classification of E_0-semigroups by product ...
We introduce four new cocycle conjugacy invariants for $E_0$-semigroups on II$_1$ factors: a couplin...
AbstractGiven a W∗-continuous semigroup φ of unital, normal, completely positive maps of B(H), we in...
AbstractWe show that the conjugacy classes of continuous semigroups of *-endomorphisms of B(H) that ...
Abstract. We show that semigroups of endomorphisms of B(H) can often be asso-ciated with a dynamical...
AbstractWe show that the Markov semigroup obtained by Floricel (2008) in [9] compressing the E0-semi...
Abstract. Let (A,α) and (B, β) be C*-dynamical systems where α and β are arbitrary ∗-endomorphisms. ...
Abstract. Let B be a σ–unital C∗–algebra. We show that every strongly con-tinuous E0–semigroup on th...
AbstractThe set of local cocycles is a natural invariant for an E0-semigroup. It has a multiplicativ...
Abstract. An algebraic semigroup describing the dynamic behavior is associated to compact, locally m...
Given positive integers n and m, we consider dynamical systems in which n copies of a topological sp...
AbstractA product systemEover a semigroupPis a family of Hilbert spaces {Es:s∈P} together with multi...
Given a C*-dynamical system (A, G, σ) the crossed product C*-algebra A×σG encodes the action of G on...
A class of examples showing that a measure-theoretical characterization of regular cocycles in terms...
AbstractWe construct a family of essential representations of an arbitrary product system by general...
In these notes the author presents a complete theory of classification of E_0-semigroups by product ...
We introduce four new cocycle conjugacy invariants for $E_0$-semigroups on II$_1$ factors: a couplin...
AbstractGiven a W∗-continuous semigroup φ of unital, normal, completely positive maps of B(H), we in...
AbstractWe show that the conjugacy classes of continuous semigroups of *-endomorphisms of B(H) that ...
Abstract. We show that semigroups of endomorphisms of B(H) can often be asso-ciated with a dynamical...
AbstractWe show that the Markov semigroup obtained by Floricel (2008) in [9] compressing the E0-semi...
Abstract. Let (A,α) and (B, β) be C*-dynamical systems where α and β are arbitrary ∗-endomorphisms. ...
Abstract. Let B be a σ–unital C∗–algebra. We show that every strongly con-tinuous E0–semigroup on th...
AbstractThe set of local cocycles is a natural invariant for an E0-semigroup. It has a multiplicativ...
Abstract. An algebraic semigroup describing the dynamic behavior is associated to compact, locally m...
Given positive integers n and m, we consider dynamical systems in which n copies of a topological sp...
AbstractA product systemEover a semigroupPis a family of Hilbert spaces {Es:s∈P} together with multi...
Given a C*-dynamical system (A, G, σ) the crossed product C*-algebra A×σG encodes the action of G on...
A class of examples showing that a measure-theoretical characterization of regular cocycles in terms...