CHAPTER I Hilbert Spaces、CHAPTER Ⅱ Operators on Hilbert Space、CHAPTER Ⅲ Banach Spaces、CHAPTER IV Locally Convex Spaces、CHAPTER V Weak Topologies、CHAPTER Ⅵ Linear Operators on a Banach
Space、CHAPTER Ⅶ Banach Agebras and Spectral Theory for Operators on a Banach Space、CHAPTERⅧ C-Algebras、CHAPTER Ⅸ Normal perators on Hilbert Space、CHAPTER Ⅹ Unbounded Operators、CHAPTER Ⅺ
Fredholm Theory等。
目錄
Preface
Preface to the Second Edition
CHAPTER I Hilbert Spaces
1.Elementary Properties and Examples
2.Orthogonality
3.The Riesz Representation Theorem
4.Orthonormal Sets of Vectors and Bases
5.Isomorphic Hilbert Spaces and the Fourier Transform for the Circle
6.The Direct Sum of Hilbert Spaces
CHAPTER Ⅱ Operators on Hilbert Space
1.Elementary Properties and Examples
2.The Adjoint of an Operator
3.Projections and Idempotents; Invariant and Reducing Subspaces
4.Compact Operators
5.* The Diagonalization of Compact Self-Adjoint Operators
6.* An Application: Sturm-Liouville Systems
7.* The Spectral Theorem and Functional Calculus for Compact Normal Operators
8.* Unitary Equivalence for Compact Normal Operators
CHAPTER Ⅲ Banach Spaces
1.Elementary Properties and Examples
2.Linear Operators on Normed Spaces
3.Finite Dimensional Normed Spaces
4.Quotients and Products of Normed Spaces
5.Linear Functionals
6.The Hahn-Banach Theorem
7.* An Application: Banach Limits
8.* An Application: Runge’’s Theorem
9.* An Application: Ordered Vector Spaces
1.The Dual of a Quotient Space and a Subspace
11.Reflexive Spaces
12.The Open Mapping and Closed Graph Theorems
13.Complemented Subspaces of a Banach Space
14.The Principle of Uniform Boundedness
CHAPTER IV Locally Convex Spaces
1.Elementary Properties and Examples
2.Metrizable and Normable Locally Convex Spaces
3.Some Geometric Consequences of the Hahn-Banach Theorem
4.* Some Examples of the Dual Space of a Locally Convex Space
5.* Inductive Limits and the Space of Distributions
CHAPTER V Weak Topologies
1.Duality
2.The Dual of a Subspace and a Quotient Space
3.Alaoglu’’s Theorem
4.Reflexivity Revisited
5.Separability and Metrizability
6.* An Application: The Stone-t ech Compactification
7.The Krein-Milman Theorem
8.An Application: The Stone-Weierstrass Theorem
9.* The Schauder Fixed Point Theorem
10.* The Ryll-Nardzewski Fixed Point Theorem
11.* An Application: Haar Measure on a Compact Group
12.* The Krein-Smulian Theorem
13.* Weak Compactness
CHAPTER VI Linear Operators on a Banach Space
CHAPTER VII Banach Agebras and Spectral Theory for Operators on a Banach Space
CHAPTER VIII C-Algebras
CHAPTER IX Normal Operators on Hilbert Space
CHAPTER X Unbounded Operators
CHAPTER XI Fredholm Theory
APPENDIX A
APPENDIX B
APPENDIX C
Bibliography
List of Symbols
Index