Some free ordered C*-modules
Werner W
Research article in edited proceedings (conference) | Peer reviewedAbstract
A free normed module X ⊗ F over the (complex) algebra F of finite dimensional operators on a separable Hilbert space H 0 is called an operator space if it is isometrical isomorphic to a submodule of L(H 1) ⊗min F, where ⊗min denotes the minimal (or spatial) tensor product. One might consider operator spaces as ‘non-commutative’ normed spaces because, formally, the scalar field has been replaced by F
Details about the publication
Publisher: Cuntz, J.; Echterhoff, S.
Book title: C*-Algebras : Proceedings of the SFB-Workshop on C*-Algebras, Münster, Germany, March 8–12, 1999
Page range: 250-261
Publishing company: Springer
Place of publication: Berlin
Status: Published
Release year: 2000
Language in which the publication is written: English
Conference: SFB-Workshop on C*-Algebras, Münster, Germany
Keywords: C*-algebra; K-theory; Riemann surface; algebra; automorphism; cohomology; field; geometry; harmonic analysis; matrices; quantization; topology
Authors from the University of Münster
| Werner, Wend | Professur für Theoretische Mathematik (Prof. Winter) |