An introduction to functional analysis / James C. Robinson
Material type:
TextPublisher: Cambridge : Cambridge University Press, 2020Description: xv, 403 pages : illustrationsContent type: - text
- unmediated
- volume
- 9780521728393
- 515.7
| Item type | Current library | Collection | Call number | Status | Barcode | |
|---|---|---|---|---|---|---|
Book
|
Cubao Branch Reference Section | Reference | R 515.7 R662i 2020 (Browse shelf(Opens below)) | Room use only | 52805QC |
Includes bibliographical references (pages 394-395) and index.
Part I. Preliminaries
Vector space and bases
Metric spaces
Part II. Normed linear spaces
Norms and normed spaces
Complete normed spaces
Finite-dimensional normed spaces
Spaces of continuous functions
Completions and the Lebesgue space
Part III. Hilbert spaces
Hilbert spaces
Orthonormal sets and orthonormal bases for Hilbert spaces
Closest points and approximation
Linear maps between normed spaces
Dual spaces and the Riesz representation theorem
The Hilbert adjoint of a linear operator
The spectrum of a bounded linear operator
The spectrum of a bounded linear operator
Compact linear operators
The Hilbert-Schmidt theorem
Application : Sturm-Liouville problems
Part IV. Banach spaces
Dual spaces of Banach spaces
The Hahn-Banach theorem
Some applications of the Hahn-Banach theorem
Convex subsets of Banach Spaces
The principle of uniform boundedness
The open mapping, inverse mapping, and closed graph theorems
Spectral theory for compact operators
Unbounded operators on Hilbert spaces
Reflexives spaces
Weak and weak--convergence
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