The theory of noncommutative Haagerup ¿¿ and Orlicz spaces is an important tool in both Quantum Harmonic Analysis and Mathematical Physics. Goldstein and Labuschagne provide a detailed account of the current theories in a way that is useful and accessible to a wide range of readers.
The theory of noncommutative Haagerup ¿¿ and Orlicz spaces is an important tool in both Quantum Harmonic Analysis and Mathematical Physics. Goldstein and Labuschagne provide a detailed account of the current theories in a way that is useful and accessible to a wide range of readers.
Stanis¿aw Goldstein began working at the University of Lodz in 1977 and continues there till this day, holding a chair at the Faculty of Mathematics and Computer Science. He earned his PhD in 1978 and became a full professor in 2001. In 1989-1990 he spent a year in Bielefeld-Bochum-Stochastik, King's College London and Nottingham University as a Humboldt Fellow. His research interests are primarily operator algebras and noncommutative measure theory. Louis Labuschagne obtained his PhD in 1988 in the field of Single Linear Operator theory. He started his professional academic career in the same year at Stellenbosch University, moving to the University of Pretoria in 1992. This move also coincided with a shift in his research focus to Operator Algebras and their application to Quantum Theory. After spending 19 years in Pretoria, first at the University of Pretoria and then UNISA from 2001, he took up an appointment at North-West University in January 2011, where he currently serves as director of the Focus Area for Pure and Applied Analytics.
Inhaltsangabe
* Preface * Introduction * Preliminaries * Part 1: Foundational Examples * 1: Abelian von Neumann algebras * 2: The Schatten-von Neumann classes * Part 2: Tracial case * 3: Noncommutative measure theory U+02014 tracial case * 4: Weights and densities * 5: Basic theory of decreasing rearrangements * 6: and Orlicz spaces in the tracial case * 7: Real interpolation and monotone spaces * Part 3: General case * 8: Basic elements of modular theory * 9: Crossed products * 10: L^p: and Orlicz spaces for general von Neumann algebras * Part 4: Advanced Theory and Applications * 11: Complex interpolation of noncommutative spaces * 12: Extensions of maps to (M) spaces and applications * 13: Haagerup's reduction theorem * 14: Applications to quantum physics * Bibliography * Notation Index * Subject Index
* Preface * Introduction * Preliminaries * Part 1: Foundational Examples * 1: Abelian von Neumann algebras * 2: The Schatten-von Neumann classes * Part 2: Tracial case * 3: Noncommutative measure theory U+02014 tracial case * 4: Weights and densities * 5: Basic theory of decreasing rearrangements * 6: and Orlicz spaces in the tracial case * 7: Real interpolation and monotone spaces * Part 3: General case * 8: Basic elements of modular theory * 9: Crossed products * 10: L^p: and Orlicz spaces for general von Neumann algebras * Part 4: Advanced Theory and Applications * 11: Complex interpolation of noncommutative spaces * 12: Extensions of maps to (M) spaces and applications * 13: Haagerup's reduction theorem * 14: Applications to quantum physics * Bibliography * Notation Index * Subject Index
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