Operator Algebras [electronic resource] : The Abel Symposium 2004 / edited by Ola Bratteli, Sergey Neshveyev, Christian Skau.

Interpolation by Projections in C*-Algebras -- KMS States and Complex Multiplication (Part II) -- An Algebraic Description of Boundary Maps Used in Index Theory -- On Rȹrdam's Classification of Certain C*-Algebras with One Non-Trivial Ideal -- Perturbation of Hausdorff Moment Sequences, and an Application to the Theory of C*-Algebras of Real Rank Zero -- Twisted K-Theory and Modular Invariants: I Quantum Doubles of Finite Groups -- The Orbit Structure of Cantor Minimal Z2-Systems -- Outer Actions of a Group on a Factor -- Non-Separable AF-Algebras -- Central Sequences in C*-Algebras and Strongly Purely Infinite Algebras -- Lifting of an Asymptotically Inner Flow for a Separable C*-Algebra -- Remarks on Free Entropy Dimension -- Notes on Treeability and Costs for Discrete Groupoids in Operator Algebra Framework.

The theme of this symposium was operator algebras in a wide sense. In the last 40 years operator algebras has developed from a rather special dis- pline within functional analysis to become a central ?eld in mathematics often described as ǣnon-commutative geometryǥ (see for example the book ǣNon-Commutative Geometryǥ by the Fields medalist Alain Connes). It has branched out in several sub-disciplines and made contact with other subjects like for example mathematical physics, algebraic topology, geometry, dyn- ical systems, knot theory, ergodic theory, wavelets, representations of groups and quantum groups. Norway has a relatively strong group of researchers in the subject, which contributed to the award of the ?rst symposium in the series of Abel Symposia to this group. The contributions to this volume give a state-of-the-art account of some of these sub-disciplines and the variety of topics re?ect to some extent how the subject has branched out. We are happy that some of the top researchers in the ?eld were willing to contribute. The basic ?eld of operator algebras is classi?ed within mathematics as part of functional analysis. Functional analysis treats analysis on in?nite - mensional spaces by using topological concepts. A linear map between two such spaces is called an operator. Examples are di?erential and integral - erators. An important feature is that the composition of two operators is a non-commutative operation.

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