Banach Algebras and Compact Operators: Volume 2
BANACH ALGEBRAS AND COMPACT OPERATORSNORTH HOLLAND MATHEMATICAL LIBRARY VOLUME 59 (NHML)
North-Holland (Publisher)
Published on 27. April 2001
Book
Hardback
620 pages
978-0-444-50750-1 (ISBN)
More details
Series
Language
English
Place of publication
United States
Publishing group
Elsevier Science & Technology
Target group
Professional and scholarly
Product notice
Laminated cover
Dimensions
Height: 234 mm
Width: 156 mm
Thickness: 37 mm
Weight
1043 gr
ISBN-13
978-0-444-50750-1 (9780444507501)
Copyright in bibliographic data and cover images is held by Nielsen Book Services Limited or by the publishers or by their respective licensors: all rights reserved.
Schweitzer Classification
Person
Content
Introduction.
2. Banach Algebras.
2.1 Algebras.
2.1.1 General Results.
2.1.2 Invertible Elements.
2.1.3 The Spectrum.
2.1.4 Standard Examples.
2.1.5 Complexification of Algebras.
Exercises.
2.2 Normed Algebras.
2.2.1 General Results.
2.2.2 The Standard Examples.
2.2.3 The Exponential Function and the Neumann Series.
2.2.4 Invertible Elements of Unital Banach Algebras.
2.2.5 The Theorems of Riesz and Gelfand.
2.2.6 Poles of Resolvents.
2.2.7 Modules.
Exercises.
2.3 Involutive Banach Algebras.
2.3.1 Involutive Algebras.
2.3.2 Involutive Banach Algebras.
2.3.3 Sesquilinear Forms.
2.3.4 Positive Linear Forms.
2.3.5 The State Space.
2.3.6 Involutive Modules.
Exercises.
2.4 Gelfand Algebras.
2.4.1 The Gelfand Transform.
2.4.2 Involutive Gelfand Algebras.
2.4.3 Examples.
2.4.4 Locally Compact Additive Groups.
2.4.5 Examples.
2.4.6 The Fourier Transform.
Exercises.
3. Compact Operators.
3.1 The General Theory.
3.1.1 General Results.
3.1.2 Examples.
3.1.3 Fredholm Operators.
3.1.4 Point Spectrum.
3.1.5 Spectrum of a Compact Operator.
3.1.6 Integral Operators.
Exercises.
3.2 Linear Differential Equations.
3.2.1 Boundary Value Problems for Differential Equations.
3.2.2 Supplementary Results.
3.2.3 Linear Partial Differential Equations.
Exercises.
Name Index. Subject Index. Symbol Index.
2. Banach Algebras.
2.1 Algebras.
2.1.1 General Results.
2.1.2 Invertible Elements.
2.1.3 The Spectrum.
2.1.4 Standard Examples.
2.1.5 Complexification of Algebras.
Exercises.
2.2 Normed Algebras.
2.2.1 General Results.
2.2.2 The Standard Examples.
2.2.3 The Exponential Function and the Neumann Series.
2.2.4 Invertible Elements of Unital Banach Algebras.
2.2.5 The Theorems of Riesz and Gelfand.
2.2.6 Poles of Resolvents.
2.2.7 Modules.
Exercises.
2.3 Involutive Banach Algebras.
2.3.1 Involutive Algebras.
2.3.2 Involutive Banach Algebras.
2.3.3 Sesquilinear Forms.
2.3.4 Positive Linear Forms.
2.3.5 The State Space.
2.3.6 Involutive Modules.
Exercises.
2.4 Gelfand Algebras.
2.4.1 The Gelfand Transform.
2.4.2 Involutive Gelfand Algebras.
2.4.3 Examples.
2.4.4 Locally Compact Additive Groups.
2.4.5 Examples.
2.4.6 The Fourier Transform.
Exercises.
3. Compact Operators.
3.1 The General Theory.
3.1.1 General Results.
3.1.2 Examples.
3.1.3 Fredholm Operators.
3.1.4 Point Spectrum.
3.1.5 Spectrum of a Compact Operator.
3.1.6 Integral Operators.
Exercises.
3.2 Linear Differential Equations.
3.2.1 Boundary Value Problems for Differential Equations.
3.2.2 Supplementary Results.
3.2.3 Linear Partial Differential Equations.
Exercises.
Name Index. Subject Index. Symbol Index.