The commutant modulo the set of compact operators of a von Neumann algebra

Contents. 0. Introduction. 1. The bundle algebra A. 2. Representation of the bundle algebra A. 3. The dual action and the trace. 4. The local characteristic square extended unitary group and modular automorphism group. 5. Conclusions.

Let H be a separable infinite-dimensional complex Hilbert space and let A B ∈ B H , where B H is the algebra of operators on H into itself. Let δ A B B H → B H denote the generalized derivation δ AB X = AX -XB. This note considers the relationship between the commutant of an operator and the commuta

This paper provides the first examples of non-semiFredholm operators \(S\) on a Banach space such that the left or right multiplication operators \(R \mapsto S R\) or \(R \mapsto R S\) define linear embeddings of the corresponding Calkin algebra into itself. For instance, if \(S\) is a bounded linea

We show that the existence of a certain family of plurisubharmonic functions on a bounded domain in C n implies that the % @ @-Neumann operator associated to the domain is compact. Our condition generalizes previous work of Catlin on compactness of the % @ @-Neumann operator.