Overview
- Authors:
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Vladimir Rabinovich
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Instituto Politécnico Nacional, ESIME Zacatenco, Mexico, D.F., USA
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Bernd Silbermann
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Department of Mathematics, Technical University of Chemnitz, Chemnitz, Germany
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Steffen Roch
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Department of Mathematics, Technical University of Darmstadt, Darmstadt, Germany
- First monograph devoted to the limit operators method, including the study of general band-dominated operators and their Fredholm theory
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Table of contents (7 chapters)
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- Vladimir Rabinovich, Bernd Silbermann, Steffen Roch
Pages 1-29
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- Vladimir Rabinovich, Bernd Silbermann, Steffen Roch
Pages 31-152
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- Vladimir Rabinovich, Bernd Silbermann, Steffen Roch
Pages 153-199
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- Vladimir Rabinovich, Bernd Silbermann, Steffen Roch
Pages 201-266
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- Vladimir Rabinovich, Bernd Silbermann, Steffen Roch
Pages 267-302
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- Vladimir Rabinovich, Bernd Silbermann, Steffen Roch
Pages 303-344
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- Vladimir Rabinovich, Bernd Silbermann, Steffen Roch
Pages 345-373
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Back Matter
Pages 375-392
About this book
This text has two goals. It describes a topic: band and band-dominated operators and their Fredholm theory, and it introduces a method to study this topic: limit operators. Band-dominated operators. Let H = [2(Z) be the Hilbert space of all squared summable functions x : Z -+ Xi provided with the norm 2 2 X IIxl1 :=L I iI . iEZ It is often convenient to think of the elements x of [2(Z) as two-sided infinite sequences (Xi)iEZ. The standard basis of [2(Z) is the family of sequences (ei)iEZ where ei = (. . . ,0,0, 1,0,0, . . . ) with the 1 standing at the ith place. Every bounded linear operator A on H can be described by a two-sided infinite matrix (aij)i,jEZ with respect to this basis, where aij = (Aej, ei)' The band operators on H are just the operators with a matrix representation of finite band-width, i. e. , the operators for which aij = 0 whenever Ii - jl > k for some k. Operators which are in the norm closure ofthe algebra of all band operators are called band-dominated. Needless to say that band and band dominated operators appear in numerous branches of mathematics. Archetypal examples come from discretizations of partial differential operators. It is easy to check that every band operator can be uniquely written as a finite sum L dkVk where the d are multiplication operators (i. e.
Authors and Affiliations
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Instituto Politécnico Nacional, ESIME Zacatenco, Mexico, D.F., USA
Vladimir Rabinovich
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Department of Mathematics, Technical University of Chemnitz, Chemnitz, Germany
Bernd Silbermann
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Department of Mathematics, Technical University of Darmstadt, Darmstadt, Germany
Steffen Roch