AbstractWe identify sets of conjugacy classes of ergodic endomorphisms of B(H) where H is a fixed separable Hilbert space. They correspond to certain equivalence classes of pure states on the Cuntz algebras Onwherenis the Powers index. These states, called finitely correlated states, and strongly asymptotically shift invariant states, are defined and characterized. The subsets of these states defining shifts will in general be identified in a later work, but here an interesting cross section for the conjugacy classes of shifts called diagonalizable shifts is introduced and studied
AbstractWe study a w*-dense subset of the translation invariant states on an infinite tensor product...
Abstract. We investigate representations of the Cuntz algebra O2 on antisymmetric Fock space Fa(K1) ...
This thesis consists of two independent chapters. Each chapter has its own detailed introduction ...
AbstractWe identify sets of conjugacy classes of ergodic endomorphisms of B(H) where H is a fixed se...
We consider endomorphisms of von Neumann algebras: Let M be a von Neumann algebra, represented on a ...
The subject of this book stands at the crossroads of ergodic theory and measurable dynamics. With an...
AbstractR. T. Powers has constructed a family of unital endomorphisms of the hyperfiniteII1factorR. ...
AbstractWe study a class of endomorphisms of subfactor index 2, called binary shifts, on the hyperfi...
AbstractAll continuous endomorphisms f∞ of the shift dynamical system S on the 2-adic integers Z2 ar...
AbstractIf ω1, ω2 are two pure gauge-invariant states of the Cuntz algebra Od, we show that there is...
AbstractLagarias showed that the shift dynamical system S on the set Z2 of 2-adic integers is conjug...
Aiming at a better understanding of finite groups as finite dynamical systems, we show that by a ver...
In an attempt to propose more general conditions for decoherence to occur, we study spectral and e...
The implementation of non-surjective Bogoliubov transformations in Fock states over CAR algebras is ...
Abstract. We study some properties of invariant states on a C*-algebra ~ with a group G of automorph...
AbstractWe study a w*-dense subset of the translation invariant states on an infinite tensor product...
Abstract. We investigate representations of the Cuntz algebra O2 on antisymmetric Fock space Fa(K1) ...
This thesis consists of two independent chapters. Each chapter has its own detailed introduction ...
AbstractWe identify sets of conjugacy classes of ergodic endomorphisms of B(H) where H is a fixed se...
We consider endomorphisms of von Neumann algebras: Let M be a von Neumann algebra, represented on a ...
The subject of this book stands at the crossroads of ergodic theory and measurable dynamics. With an...
AbstractR. T. Powers has constructed a family of unital endomorphisms of the hyperfiniteII1factorR. ...
AbstractWe study a class of endomorphisms of subfactor index 2, called binary shifts, on the hyperfi...
AbstractAll continuous endomorphisms f∞ of the shift dynamical system S on the 2-adic integers Z2 ar...
AbstractIf ω1, ω2 are two pure gauge-invariant states of the Cuntz algebra Od, we show that there is...
AbstractLagarias showed that the shift dynamical system S on the set Z2 of 2-adic integers is conjug...
Aiming at a better understanding of finite groups as finite dynamical systems, we show that by a ver...
In an attempt to propose more general conditions for decoherence to occur, we study spectral and e...
The implementation of non-surjective Bogoliubov transformations in Fock states over CAR algebras is ...
Abstract. We study some properties of invariant states on a C*-algebra ~ with a group G of automorph...
AbstractWe study a w*-dense subset of the translation invariant states on an infinite tensor product...
Abstract. We investigate representations of the Cuntz algebra O2 on antisymmetric Fock space Fa(K1) ...
This thesis consists of two independent chapters. Each chapter has its own detailed introduction ...