| Chapter/Section # |
Title |
Page #
|
| Chapter 1: DETERMINANTS
|
| 1.1 |
Number Fields |
1
|
| 1.2 |
Problems of the Theory of Systems of Linear Equations |
3
|
| 1.3 |
Determinants of Order \(n\) |
5
|
| 1.4 |
Properties of Determinants |
8
|
| 1.5 |
Cofactors and Minors |
12
|
| 1.6 |
Practical Evaluation of Determinants |
16
|
| 1.7 |
Cramer's Rule |
18
|
| 1.8 |
Minors of Arbitrary Order. Laplace's Theorem |
20
|
| 1.9 |
Multiplicative inverses |
23
|
|
Problems |
28
|
| Chapter 2: LINEAR SPACES
|
| 2.1 |
Definitions |
31
|
| 2.2 |
Linear Dependence |
36
|
| 2.3 |
Bases, Components, Dimension |
38
|
| 2.4 |
Subspaces |
42
|
| 2.5 |
Linear Manifolds |
49
|
| 2.6 |
Hyperplanes |
51
|
| 2.7 |
Morphisms of Linear Spaces |
53
|
|
Problems |
56
|
| Chapter 3: SYSTEMS OF LINEAR EQUATIONS
|
| 3.1 |
More on the Rank of a Matrix |
58
|
| 3.2 |
Nontrivial Compatibility of a Homogeneous Linear System |
60
|
| 3.3 |
The Compatibility Condition for a General Linear System |
61
|
| 3.4 |
The General Solution of a Linear System |
63
|
| 3.4 |
Geometric Properties of the Solution Space |
65
|
| 3.4 |
Methods for Calculating the Rank of a Matrix |
67
|
|
Problems |
71
|
| Chapter 4: LINEAR FUNCTIONS OF A VECTOR ARGUMENT
|
| 4.1 |
Linear Forms |
75
|
| 4.2 |
Linear Operators |
77
|
| 4.3 |
Sums and Products of Linear Operators |
82
|
| 4.4 |
Corresponding Operations on Matrices |
84
|
| 4.5 |
Further Properties of Matrix Multiplication |
88
|
| 4.6 |
The Range and Null Space of a Linear Operator |
93
|
| 4.7 |
Linear Operators Mapping a Space \(K_n\) into Itself |
98
|
| 4.8 |
Invariant Subspaces |
106
|
| 4.9 |
Eigenvectors and Eigenvalues |
108
|
|
Problems |
113
|
| Chapter 5: COORDINATE TRANSFORMATIONS
|
| 5.1 |
Transformation to a New Basis |
118
|
| 5.2 |
Consecutive Transformations |
120
|
| 5.3 |
Transformation of the Components of a Vector |
121
|
| 5.4 |
Transformation of the Coefficients of a Linear Form |
123
|
| 5.5 |
Transformation of the Matrix of a Linear Operator |
124
|
| *5.6 |
Tensors |
126
|
|
Problems |
131
|
| Chapter 6: THE CANONICAL FORM OF THE MATRIX OF A LINEAR OPERATOR
|
| 6.1 |
Canonical Form of the Matrix of a Nilpotent Operator |
133
|
| 6.2 |
Algebras. The Algebra of Polynomials |
136
|
| 6.3 |
Canonical Form of the Matrix of an Arbitrary Operator |
142
|
| 6.4 |
Elementary Divisors |
147
|
| 6.5 |
Further Implications |
153
|
| 6.6 |
The Real Jordan Canonical Form |
155
|
| 6.7 |
Spectra, Jets and Polynomials |
160
|
| 6.8 |
Operator Functions and Their Matrices |
169
|
|
Problems |
176
|
| Chapter 7: BILINEAR AND QUADRATIC FORMS
|
| 7.1 |
Bilinear Forms |
179
|
| 7.2 |
Quadratic Forms |
183
|
| 7.3 |
Reduction of a Quadratic Form to Canonical Form |
183
|
| 7.4 |
The Canonical Basis of a Bilinear Form |
183
|
| 7.5 |
Construction of a Canonical Basis by Jacobi's Method |
183
|
| 7.6 |
Adjoint Linear Operators |
183
|
| 7.7 |
Isomorphism of Spaces Equipped with a Bilinear Form |
183
|
| *7.8 |
Multilinear Forms |
183
|
| 7.9 |
Bilinear and Quadratic Forms in a Real Space |
183
|
|
Problems |
210
|
| Chapter 8: EUCLIDEAN SPACES
|
| 8.1 |
Introduction |
214
|
| 8.2 |
Definition of a Euclidean Space |
215
|
| 8.3 |
Basic Metric Concepts |
216
|
| 8.4 |
Orthogonal Bases |
222
|
| 8.5 |
Perpendiculars |
223
|
| 8.6 |
The Orthogonalization Theorem |
226
|
| 8.7 |
The Gram Determinant |
230
|
| 8.8 |
Incompatible Systems and the Method of Least Squares |
234
|
| 8.9 |
Adjoint Operators and Isometry |
237
|
|
Problems |
241
|
| Chapter 9: UNITARY SPACES
|
| 9.1 |
Hermitian Forms |
247
|
| 9.2 |
The Scalar Product in a Complex Space |
254
|
| 9.3 |
Normal Operators |
259
|
| 9.4 |
Applications to Operator Theory in Euclidean Space |
263
|
|
Problems |
271
|
| Chapter 10: QUADRATIC FORMS IN EUCLIDEAN AND UNITARY SPACES
|
| 10.1 |
Basic Theorem on Quadratic Forms in a Euclidean Space |
273
|
| 10.2 |
Extremal Properties of a Quadratic Form |
276
|
| 10.3 |
Simultaneous Reduction of Two Quadratic Forms |
283
|
| 10.4 |
Reduction of the General Equation of a Quadric Surface |
287
|
| 10.5 |
Geometric Properties of a Quadric Surface |
289
|
| *10.6 |
Analysis of a Quadric Surface from Its General Equation |
300
|
| 10.7 |
Hermitian Quadratic Forms |
308
|
|
Problems |
310
|
| Chapter 11: FINITE-DIMENSIONAL ALGEBRAS AND THEIR REPRESENTATIONS
|
| 11.1 |
More on Algebras |
312
|
| 11.2 |
Representations of Abstract Algebras |
313
|
| 11.3 |
Irreducible Representations and Schur's Lemma |
314
|
| 11.4 |
Basic Types of Finite-Dimensional Algebras |
315
|
| 11.5 |
The Left Regular Representation of a Simple Algebra |
318
|
| 11.6 |
Structure of Simple Algebras |
320
|
| 11.7 |
Structure of Semisimple Algebras |
323
|
| 11.8 |
Representations of Simple and Semisimple Algebras |
327
|
| 11.9 |
Some Further Results |
331
|
|
Problems |
332
|
| *Appendix |
|
|
| CATEGORIES OF FINITE-DIMENSIONAL SPACES
|
| A.1 |
Introduction |
335
|
| A.2 |
The Case of Complete Algebras |
338
|
| A.3 |
The Case of One-Dimensional Algebras |
340
|
| A.4 |
The Case of Simple Algebras |
345
|
| A.5 |
The Case of Complete Algebras of Diagonal Matrices |
353
|
| A.6 |
Categories and Direct Sums |
357
|
| HINTS AND ANSWERS |
361
|
| BIBLIOGRAPHY |
379
|
| INDEX |
381
|
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