An edition of Principles of functional analysis (1971)

Principles of functional analysis

2nd ed.

by Martin Schechter

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An edition of Principles of functional analysis (1971)

Principles of functional analysis

2nd ed.

by Martin Schechter

1 Want to read

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Publish Date

2002

Publisher

American Mathematical Society

Language

English

Pages

425

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Previews available in: English

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Book Details

Machine generated contents note: Chapter 1. BASIC NOTIONS

1.1. A problem from differential equations

1.2. An examination of the results

1.3. Examples of Banach spaces

1.4. Fourier series

1.5. Problems

Chapter 2. DUALITY

2.1. The Riesz representation theorem

2.2. The Hahn-Banach theorem

2.3. Consequences of the Hahn-Banach theorem

2.4. Examples of dual spaces

2.5. Problems

Chapter 3. LINEAR OPERATORS

3.1. Basic properties

3.2. The adjoint operator

3.3. Annihilators

3.4. The inverse operator

3.5. Operators with closed ranges

3.6. The uniform boundedness principle

3.7. The open mapping theorem

3.8. Problems

Chapter 4. THE RIESZ THEORY FOR COMPACT OPERATORS

4.1. A type of integral equation

4.2. Operators of finite rank

4.3. Compact operators

4.4. The adjoint of a compact operator

4.5. Problems

Chapter 5. FREDHOLM OPERATORS

5.1. Orientation

5.2. Further properties

5.3. Perturbation theory

5.4. The adjoint operator

5.5. A special case

5.6. Semi-Fredholm operators

5.7. Products of operators

5.8. Problems

Chapter 6. SPECTRAL THEORY

6.1. The spectrum and resolvent sets

6.2. The spectral mapping theorem

6.3. Operational calculus

6.4. Spectral projections

6.5. Complexification

6.6. The complex Hahn-Banach theorem

6.7. A geometric lemma

6.8. Problems

Chapter 7. UNBOUNDED OPERATORS

7.1. Unbounded Fredholm operators

7.2. Further properties

7.3. Operators with closed ranges

7.4. Total subsets

7.5. The essential spectrum

7.6. Unbounded semi-Fredholm operators

7.7. The adjoint of a product of operators

7.8. Problems

Chapter 8. REFLEXIVE BANACH SPACES

8.1. Properties of reflexive spaces

8.2. Saturated subspaces

8.3. Separable spaces

8.4. Weak convergence

8.5. Examples

8.6. Completing a normed vector space

8.7. Problems

Chapter 9. BANACH ALGEBRAS

9.1. Introduction

9.2. An example

9.3. Commutative algebras

9.4. Properties of maximal ideals

9.5. Partially ordered sets

9.6. Riesz operators

9.7. Fredholm perturbations

9.8. Semi-Fredholm perturbations

9.9. Remarks

9.10. Problems

Chapter 10. SEMIGROUPS

10.1. A differential equation

10.2. Uniqueness

10.3. Unbounded operators

10.4. The infinitesimal generator

10.5. An approximation theorem

10.6. Problems

Chapter 11. HILBERT SPACE

11.1. When is a Banach space a Hilbert space?

11.2. -Normal operators

11.3. Approximation by operators of finite rank

11.4. Integral operators

11.5. Hyponormal operators

11.6. Problems

Chapter 12. BILINEAR FORMS

12.1. The numerical range

12.2. The associated operator

12.3. Symmetric forms

12.4. Closed forms

12.5. Closed extensions

12.6. Closable operators

12.7. Some proofs

12.8. Some representation theorems

12.9. Dissipative operators

12.10. The case of a line or a strip

12.11. Selfadjoint extensions

12.12. Problems

Chapter 13. SELFADJOINT OPERATORS

13.1. Orthogonal projections

13.2. Square roots of operators

13.3. A decomposition of operators

13.4. Spectral resolution

13.5. Some consequences

13.6. Unbounded selfadjoint operators

13.7. Problems

Chapter 14. MEASURES OF OPERATORS

14.1. A seminorm

14.2. Perturbation classes

14.3. Related measures

14.4. Measures of noncompactness

14.5. The quotient space

14.6. Strictly singular operators

14.7. - Norm perturbations

14.8. Perturbation functions

14.9. Factored perturbation functions

14.10. Problems

Chapter 15. EXAMPLES AND APPLICATIONS

15.1. A few remarks

15.2. A differential operator

15.3. Does A have a closed extension?

15.4. The closure of A

15.5. Another approach

15.6. The Fourier transform

15.7. Multiplication by a function

15.8. More general operators

15.9. B-Compactness

15.10. The adjoint of A

15.11. An integral operator

15.12. Problems

Appendix A. Glossary

Appendix B. Major Theorems

Bibliography

Index.

Edition Notes

Includes bibliographical references and index.

Published in: Providence, R.I
Series: Graduate studies in mathematics,, v. 36

Classifications

Dewey Decimal Class: 515/.7
Library of Congress: QA320 .S32 2002

Table of contents

The Physical Object

Pagination: xxi, 425 p. :
Number of pages: 425

ID Numbers

Open Library: OL3946190M
Internet Archive: principlesfuncti00msch
ISBN 10: 0821828959
LCCN: 2001031601
OCLC/WorldCat: 46809570
Goodreads: 4907400

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Principles of functional analysis

by Martin Schechter