Rajendra Bhatia9780898716313, 0898716314
Perturbation Bounds for Matrix Eigenvalues contains a unified exposition of spectral variation inequalities for matrices. The text provides a complete and self-contained collection of bounds for the distance between the eigenvalues of two matrices, which could be arbitrary or restricted to special classes. The book s emphasis on sharp estimates, general principles, elegant methods, and powerful techniques, makes it a good reference for researchers and students. For the SIAM Classics edition, the author has added over 60 pages of new material, which includes recent results and discusses the important advances made in the theory, results, and proof techniques of spectral variation problems in the two decades since the book s original publication. Audience This updated edition is appropriate for use as a research reference for physicists, engineers, computer scientists, and mathematicians interested in operator theory, linear algebra, and numerical analysis. The text is also suitable for a graduate course in linear algebra or functional analysis. Contents Preface to the Classics Edition; Preface; Introduction; Chapter 1: Preliminaries; Chapter 2: Singular values and norms; Chapter 3: Spectral variation of Hermitian matrices; Chapter 4: Spectral variation of normal matrices; Chapter 5: The general spectral variation problem; Chapter 6: Arbitrary perturbations of constrained matrices; Postscripts; References; Supplements 1986 2006; Chapter 7: Singular values and norms; Chapter 8: Spectral variation of Hermitian matrices; Chapter 9: Spectral variation of normal matrices; Chapter 10: Spectral variation of diagonalizable matrices; Chapter 11: The general spectral variation problem; Chapter 12: Arbitrary perturbations of constrained matrices; Chapter 13: Related Topics; Bibliography; Errata. |
Table of contents :
Perturbation Bounds for Matrix Eigenvalues……Page 1
Contents……Page 8
Preface to the Classics Edition……Page 12
Preface……Page 16
Introduction……Page 18
1 Preliminaries……Page 24
2 Singular values and norms……Page 35
3 Spectral variation of Hermitian matrices……Page 51
4 Spectral variation of normal matrice……Page 69
5 The general spectral variation problem……Page 106
6 Arbitrary perturbations of constrained matrices……Page 125
References……Page 139
Supplements 1986-2006……Page 148
7 Singular values and norms……Page 150
8 Spectral variation of Hermitian matrices……Page 159
9 Spectral variation of normal matrices……Page 171
10 Spectral variation of diagonalizable matrices……Page 180
11 The general spectral variation problem……Page 186
12 Arbitrary perturbations of constrained matrices……Page 191
13 Related Topics……Page 195
Bibliography……Page 204
Errata……Page 210 |
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