• Produktbild: Fredholm and Local Spectral Theory, with Applications to Multipliers
  • Produktbild: Fredholm and Local Spectral Theory, with Applications to Multipliers

Fredholm and Local Spectral Theory, with Applications to Multipliers

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Beschreibung

Produktdetails

Einband

Taschenbuch

Erscheinungsdatum

01.12.2010

Verlag

Springer Netherland

Seitenzahl

444

Maße (L/B/H)

23,5/15,5/2,5 cm

Gewicht

682 g

Auflage

Softcover reprint of the original 1st ed. 2004

Sprache

Englisch

ISBN

978-90-481-6522-3

Beschreibung

Rezension

From the reviews of the first edition:



"The primary goal of this monograph is a presentation of the Fredholm and Riesz theory of Banach space operators and applications in the stetting of multipliers of a commutative Banach algebra. … This book complements standard references for Fredholm theory … on the one hand, and Laursen and Neumann’s book on the other hand. It should prove to be a valuable resource for graduate students and researchers in Banach space operator theory." (Thomas Len Miller, Mathematical Reviews, 2005e)


"The main concern of the monograph under review is Fredholm theory and its connections with the local spectral theory for bounded linear operators in Banach spaces. … The monograph is intended for the use of researchers and graduate students in functional analysis, having a certain background in operator theory. The style is alert and pleasant and there is a fair and state-of-the-art account of the actual Fredholm theory in connection with local spectral theory." (Florian-Horia Vasilescu, Zentralblatt MATH,Vol. 1077 (3), 2006)

Produktdetails

Einband

Taschenbuch

Erscheinungsdatum

01.12.2010

Verlag

Springer Netherland

Seitenzahl

444

Maße (L/B/H)

23,5/15,5/2,5 cm

Gewicht

682 g

Auflage

Softcover reprint of the original 1st ed. 2004

Sprache

Englisch

ISBN

978-90-481-6522-3

Herstelleradresse

Springer-Verlag KG
Sachsenplatz 4-6
1201 Wien
AT

Email: GPSR Kontakt

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  • Produktbild: Fredholm and Local Spectral Theory, with Applications to Multipliers
  • Produktbild: Fredholm and Local Spectral Theory, with Applications to Multipliers
  • Preface 1. The Kato decomposition property
    1. Hyper-kernel and hyper-range of an operator
    2. Semi-regular operators on Banach spaces
    3. Analytical core of an operator
    4. The semi-regular spectrum of an operator
    5. The generalized Kato decomposition
    6. Semi-Fredholm operators
    7. Quasi-nilpotent part of an operator 2. The single-valued extension property
    1. Local spectrum and SVEP
    2. The SVEP at a point
    3. A local spectral mapping theorem
    4. Algebraic spectral subspaces
    5. Weighted shift operators and SVEP 3. The SVEP and Fredholm theory
    1. Ascent, descent, and the SVEP
    2. The SVEP for operators of Kato type
    3. The SVEP on the components of rho kappa (T)
    4. The Fredholm, Weyl, and Browder spectra
    5. Compressions
    6. Some spectral mapping theorems
    7. Isolated points of the spectrum
    8. Weyl’s theorem
    9. Riesz operators
    10. The spectra of some operators 4. Multipliers of commutative Banach algebras
    1. Definitions and elementary properties
    2. The Helgason–Wang function
    3. The first spectral properties of multipliers
    4. Multipliers of group algebras
    5. Multipliers of Banach algebras with orthogonal basis
    6. Multipliers of commutative H* algebras 5. Abstract Fredholm theory
    1. Inessential ideals
    2. The socle
    3. The socle of semi-prime Banach algebras
    4. Riesz algebras
    5. Fredholm elements of Banach algebras
    6. Compact multipliers
    7. Weyl multipliers
    8. Multipliers of Tauberian regular commutative algebras
    9. Some concrete cases
    10. Browder spectrum of a multiplier 6. Decomposability
    1. Spectral maximal subspaces
    2. Decomposable operators on Banach spaces
    3. Super-decomposable operators
    4. Decomposable right shift operators
    5. Decomposable multipliers
    6. Riesz multipliers
    7. Decomposable convolution operators 7.Perturbation classes of operators
    1. Inessential operators between Banach spaces
    2. Omega+ and Omega- operators
    3. Strictly singular and strictly cosingular operators
    4. Improjective operators
    5. Incomparability between Banach spaces Bibliography
    Index