
Ebook Info
- Published: 2003
- Number of pages: 488 pages
- Format: PDF
- File Size: 38.25 MB
- Authors: Gilles Pisier
Description
The theory of operator spaces is very recent and can be described as a non-commutative Banach space theory. An ‘operator space’ is simply a Banach space with an embedding into the space B(H) of all bounded operators on a Hilbert space H. The first part of this book is an introduction with emphasis on examples that illustrate various aspects of the theory. The second part is devoted to applications to C*-algebras, with a systematic exposition of tensor products of C*-algebras. The third (and shorter) part of the book describes applications to non self-adjoint operator algebras, and similarity problems. In particular the author’s counterexample to the ‘Halmos problem’ is presented, as well as work on the new concept of ‘length’ of an operator algebra. Graduate students and professional mathematicians interested in functional analysis, operator algebras and theoretical physics will find that this book has much to offer.
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Free Download Introduction to Operator Space Theory (London Mathematical Society Lecture Note Series Book 294) 1st Edition in PDF format
Introduction to Operator Space Theory (London Mathematical Society Lecture Note Series Book 294) 1st Edition PDF Free Download
Download Introduction to Operator Space Theory (London Mathematical Society Lecture Note Series Book 294) 1st Edition 2003 PDF Free
Introduction to Operator Space Theory (London Mathematical Society Lecture Note Series Book 294) 1st Edition 2003 PDF Free Download
Download Introduction to Operator Space Theory (London Mathematical Society Lecture Note Series Book 294) 1st Edition PDF
Free Download Ebook Introduction to Operator Space Theory (London Mathematical Society Lecture Note Series Book 294) 1st Edition