Linear systems and operators in Hilbert
β Fuhrmann P.A.
π Library
π
1981
π MGH
π English
β¦ LIBER β¦
π
Linear Systems and Operators in Hilbert Space
β Scribed by Paul A. Fuhrmann
- Publisher
- Mcgraw-Hill (Tx)
- Year
- 1982
- Tongue
- English
- Leaves
- 333
- Edition
- 1st
- Category
- Library
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β¦ Table of Contents
Cover......Page 1
Title Page......Page 2
Copyright Page......Page 3
Contents......Page 4
Introduction�......Page 8
1. Rings and modules�......Page 9
2. Polynomial modules�......Page 13
3. The Smith canonical form�......Page 19
4. Structure of linear transformations�......Page 22
5. Linear systems�......Page 35
6. Reachability, observability, and realizations�......Page 38
7. Hankel matrices�......Page 39
8. Simulation and isomorphism�......Page 41
9. Transfer functions and their factorizations�......Page 45
10. Realization theory�......Page 46
11. Polynomial system matrices�......Page 50
12. Generalized resultant theorem�......Page 53
13. Feedback�......Page 57
Notes and references�......Page 69
1 . Geometry of Hilbert space�......Page 70
2. Bounded operators in Hilbert space�......Page 77
3. Unbounded operators�......Page 84
4. Representation theorems�......Page 90
5. The spectral theorem�......Page 100
6. Spectral representations�......Page 111
7. The Douglas factorization theorem and related results�......Page 131
8. Shifts, isometries, and the Wold decomposition�......Page 133
9. Contractions, dilations, and models�......Page 136
10. Semigroups of operators�......Page 147
11. The lifting theorem�......Page 168
12. Elements of H^2 theory�......Page 174
13. Models for contractions and their spectra�......Page 197
14. The functional calculus for contractions�......Page 204
15. Jordan models�......Page 215
Notes and references�......Page 243
1. Fundamental concepts�......Page 246
2. Hankel operators and realization theory�......Page 255
3. Restricted shift systems�......Page 258
4. Spectral minimality of restricted shift systems�......Page 266
5. Degree theory for strictly noncyclic functions�......Page 275
6. Continuous time systems�......Page 296
7. Symmetric systems�......Page 314
Notes and references�......Page 324
References�......Page 325
Index�......Page 330
Back Cover......Page 333
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