Add to ORKGLet $\alpha$ be an approximately inner flow on a $C^*$-algebra $A$ with generator $\delta$ and let $\delta_n$ denote the bounded generators of the approximating flows $\alpha^{(n)}$. We analyze the structure of the set 26739 \mathcal D=\bigl\{x\in D(\delta): \lim_{n\rightarrow\infty}\delta_n(x)=\delta(x)\bigr\} 26739 of pointwise convergence of the generators. In particular we examine the relationship of $\mathcal D$ and various cores related to spectral subspaces
Let ${\cal F}\sb{\rm II}$ be the space of Fredholm elements in a type II$\sb\infty$ von Neumann alge...
This report is a preliminary version of work on an intrinsic approximation process arising in the co...
AbstractIn this note we discuss various extensions of a normal ∗ derivation of a uniformly hyperfini...
We show that a multiplier cocycle of a flow on a non-unital C∗-algebra can be approximated by a norm...
AbstractWe show that a multiplier cocycle of a flow on a non-unital C∗-algebra can be approximated b...
AbstractWe have started to study quasi-diagonal flows (or strongly continuous one-parameter automorp...
By a flow α on a C∗-algebra A we mean a homomorphism α: R→Aut(A) such that t 7 → αt(x) is continuous...
summary:In this paper we obtain some results concerning the set ${\mathcal M} = \cup \bigl \lbrace \...
Before this symposium I had been pondering over approximately inner flows to see whether I could cra...
AbstractWe present a systematic characterization of the domain of a generator of a one parameter gro...
We obtain three results: 1) Every compact simplex bundle with exactly one point in the fiber over 0 ...
We present a definition of spectral flow for any norm closed ideal J in any von Neumann algebra N. G...
AbstractIn this paper, it is shown that every norm continuous linear local derivation from an arbitr...
summary:Let $K$ be a field. The generalized Leibniz rule for higher derivations suggests the definit...
AbstractLet A be a separable exact quasidiagonal C*-algebra. Suppose that π:A→L(H) is a faithful rep...
Let ${\cal F}\sb{\rm II}$ be the space of Fredholm elements in a type II$\sb\infty$ von Neumann alge...
This report is a preliminary version of work on an intrinsic approximation process arising in the co...
AbstractIn this note we discuss various extensions of a normal ∗ derivation of a uniformly hyperfini...
We show that a multiplier cocycle of a flow on a non-unital C∗-algebra can be approximated by a norm...
AbstractWe show that a multiplier cocycle of a flow on a non-unital C∗-algebra can be approximated b...
AbstractWe have started to study quasi-diagonal flows (or strongly continuous one-parameter automorp...
By a flow α on a C∗-algebra A we mean a homomorphism α: R→Aut(A) such that t 7 → αt(x) is continuous...
summary:In this paper we obtain some results concerning the set ${\mathcal M} = \cup \bigl \lbrace \...
Before this symposium I had been pondering over approximately inner flows to see whether I could cra...
AbstractWe present a systematic characterization of the domain of a generator of a one parameter gro...
We obtain three results: 1) Every compact simplex bundle with exactly one point in the fiber over 0 ...
We present a definition of spectral flow for any norm closed ideal J in any von Neumann algebra N. G...
AbstractIn this paper, it is shown that every norm continuous linear local derivation from an arbitr...
summary:Let $K$ be a field. The generalized Leibniz rule for higher derivations suggests the definit...
AbstractLet A be a separable exact quasidiagonal C*-algebra. Suppose that π:A→L(H) is a faithful rep...
Let ${\cal F}\sb{\rm II}$ be the space of Fredholm elements in a type II$\sb\infty$ von Neumann alge...
This report is a preliminary version of work on an intrinsic approximation process arising in the co...
AbstractIn this note we discuss various extensions of a normal ∗ derivation of a uniformly hyperfini...