Linear Analysis
An Introductory Course
2nd Edition
- Author: Béla Bollobás, University of Cambridge
- Date Published: March 1999
- availability: Available
- format: Paperback
- isbn: 9780521655774
Paperback
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Now revised and updated, this brisk introduction to functional analysis is intended for advanced undergraduate students, typically final year, who have had some background in real analysis. The author's aim is not just to cover the standard material in a standard way, but to present results of application in contemporary mathematics and to show the relevance of functional analysis to other areas. Unusual topics covered include the geometry of finite-dimensional spaces, invariant subspaces, fixed-point theorems, and the Bishop-Phelps theorem. An outstanding feature is the large number of exercises, some straightforward, some challenging, none uninteresting.
Read more- Revised and updated
- Many useful and challenging exercises
- Modern perspective on this topic
Reviews & endorsements
' … a well-written concise introduction to functional analysis.' European Mathematical Society
See more reviews'Bollobás writes with clarity and has clearly thought about the needs of his readers. First-time students of functional analysis will thank him for his willingness to remind them about notation and to repeat definitions that he has not used for a while. Bollobás has written a fine book. it is an excellent introduction to functional analysis that will be invaluable to advanced undergraduate students (and their lectures). Steve Abbott, The Mathematical Gazette
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×Product details
- Edition: 2nd Edition
- Date Published: March 1999
- format: Paperback
- isbn: 9780521655774
- length: 256 pages
- dimensions: 228 x 152 x 17 mm
- weight: 0.36kg
- availability: Available
Table of Contents
Preface
1. Basic inequalities
2. Normed spaces and bounded linear operators
3. Linear functional and the Hahn-Banach theorem
4. Finite-dimensional normed spaces
5. The Baire category theorem and the closed-graph theorem
6. Continuous functions on compact spaces and the Stone-Weierstrass theorem
7. The contraction-mapping theorem
8. Weak topologies and duality
9. Euclidean spaces and Hilbert spaces
10. Orthonormal systems
11. Adjoint operators
12. The algebra of bounded linear operators
13. Compact operators on Banach spaces
14. Compact normal operators
15. Fixed-point theorems
16. Invariant subspaces
Index of notation
Index of terms.
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