Operator Space Tensor Norms - Chávez-Domínguez, Javier Alejandro;Dimant, Verónica;Galicer, Daniel
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This book provides a comprehensive introduction to the systematic theory of tensor products and tensor norms within the framework of operator spaces. The use of tensor products has significantly advanced functional analysis and other areas of mathematics and physics, and the field of operator spaces is no exception. Building on the theory of tensor products in Banach spaces, this work adapts the definitions and results to the operator space context. This approach goes beyond a mere translation of existing results. It introduces new insights, techniques, and hypotheses to address the many…mehr

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Produktbeschreibung
This book provides a comprehensive introduction to the systematic theory of tensor products and tensor norms within the framework of operator spaces. The use of tensor products has significantly advanced functional analysis and other areas of mathematics and physics, and the field of operator spaces is no exception. Building on the theory of tensor products in Banach spaces, this work adapts the definitions and results to the operator space context. This approach goes beyond a mere translation of existing results. It introduces new insights, techniques, and hypotheses to address the many challenges of the non-commutative setting, revealing several notable differences to the classical theory. This text is expected to be a valuable resource for researchers and advanced students in functional analysis, operator theory, and related fields, offering new perspectives for both the mathematics and physics communities. By presenting several open problems, it also serves as a potentialsource for further research, particularly for those working in operator spaces or operator algebras.
Autorenporträt
Javier Alejandro Chávez-Domínguez is an Associate Professor in the Department of Mathematics of the University of Oklahoma (USA). His main research interest is Functional Analysis with an emphasis on its non-linear and non-commutative aspects, particularly Operator Spaces, Tensor Products and Operator Ideals, and Quantum Graphs/Metric Spaces. Verónica Dimant is a Full Professor at the University of San Andrés (Argentina) and Independent Researcher at CONICET. Her research interest lies in Non-linear Functional Analysis with a focus on Holomorphy, Polynomials and Tensor Products in Banach spaces and operator spaces. Daniel Galicer is an Associate Professor at Universidad Torcuato Di Tella (Argentina) and an Independent Researcher at IMAS-CONICET. His research focuses on Functional Analysis, with an emphasis on the Local Theory of Banach Spaces, Infinite-Dimensional Analysis, Asymptotic Geometric Analysis, Tensor Products, and the interactions between Analysis and Probability.