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Approximation theory in tensor product spaces

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Published by Springer-Verlag in Berlin, New York .
Written in English

Subjects:

  • Approximation theory.,
  • Banach spaces.,
  • Tensor products.

Book details:

Edition Notes

StatementW.A. Light, E.W. Cheney.
SeriesLecture notes in mathematics ;, 1169, Lecture notes in mathematics (Springer-Verlag) ;, 1169.
ContributionsCheney, E. W. 1929-
Classifications
LC ClassificationsQA3 .L28 no. 1169, QA221 .L28 no. 1169
The Physical Object
Paginationvi, 157 p. ;
Number of Pages157
ID Numbers
Open LibraryOL2548377M
ISBN 100387160574
LC Control Number85030376

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Approximation Theory in Tensor Product Spaces (Lecture Notes in Mathematics) th Edition by William A. Light (Author), Elliot W. Cheney (Contributor) ISBN ISBN Why is ISBN important? ISBN. This bar-code number lets you verify that you're getting exactly the right version or edition of a book. Cited by: ISBN: OCLC Number: Description: VI, Seiten. Contents: An introduction to tensor product spaces : Approximation Theory in Tensor Product Spaces (Lecture Notes in Mathematics) () by Light, William A. and a great selection of similar New, Used and Collectible Books available now at great Range: $ - $ William Allan Light, Elliott Ward Cheney. Pages Proximinality.

From the reviews: "The book under review is intended to serve as an introduction to the theory of tensor products of Banach spaces. it is a most welcome addition to the existing literature and appears to be well-suited as a guide and as a textbook in lectures, seminars, etc., for students .Cited by:   alternating algorithm assume Banach space best approximation best L1-approximation biorthonormal system Bochner integrable C(S X T C(SXT CHAPTER characteristic function defined denote Diliberto-Straus Algorithm dist f element equation equicontinuous exists finite measure space finite-dimensional subspace function f G & C(T G and H g e G. In mathematics, specifically functional analysis, a Banach space is said to have the approximation property (AP), if every compact operator is a limit of finite-rank converse is always true. Every Hilbert space has this property. There are, however, Banach spaces which do not; Per Enflo published the first counterexample in a article.. However, a lot of work in this area. Tensor products of direct sums Grecu, Bogdan C. and Ryan, Raymond A., Arkiv för Matematik, ; The bidual of a tensor product of Banach spaces Cabello Sánchez, Félix and García, Ricardo, Revista Matemática Iberoamericana, ; A nearly-optimal algorithm for the Fredholm problem of the second kind over a non-tensor product Sobolev space Werschulz, A.G. and Woźniakowski, H., Journal of Cited by:

  Light W.A., Cheney E.W. () An introduction to tensor product spaces. In: Approximation Theory in Tensor Product Spaces. Lecture Notes in Mathematics, vol Author: William Allan Light, Elliott Ward Cheney. This book is intended as an introduction to the theory of tensor products of Banach spaces. The prerequisites for reading the book are a first course in Functional Analysis and in Measure Theory. C*-approximation theory has provided the foundation for many of the most important conceptual breakthroughs and applications of operator algebras. This book systematically studies (most of) the numerous types of approximation properties that have been important in recent years: nuclearity, exactness, quasidiagonality, local reflexivity, and others. Optimized Tensor-Product Approximation Spaces. the theory of information-based complexity still lacks a notion which allows to quantify the exact (sub-/super-) exponential dependence of n(ε.