 | ||||||||||||||||
| ||||||||||||||||
by Georgi E. Shilov
|
ISBN: 048663518X Dover Publications Price: $16.95 |
click here to see this book |
Covers determinants, linear spaces, systems of linear equations, linear functions of a vector argument, coordinate transformations, the canonical form of the matrix of a linear operator, bilinear and quadratic forms, Euclidean spaces, unitary spaces, quadratic forms in Euclidean and unitary spaces, finite-dimensional space. Problems with hints and answers.
Table of Contents for Linear Algebra
| chapter 1 | |||||||
| DETERMINANTS | |||||||
| 1.1. Number Fields | |||||||
| 1.2. Problems of the Theory of Systems of Linear Equations | |||||||
| 1.3. Determinants of Order n | |||||||
| 1.4. Properties of Determinants | |||||||
| 1.5. Cofactors and Minors | |||||||
| 1.6. Practical Evaluation of Determinants | |||||||
| 1.7. Cramer's Rule | |||||||
| 1.8. Minors of Arbitrary Order. Laplace's Theorem | |||||||
| 1.9. Linear Dependence between Columns | |||||||
| Problems | |||||||
| chapter 2 | |||||||
| LINEAR SPACES | |||||||
| 2.1. Definitions | |||||||
| 2.2. Linear Dependence | |||||||
| 2.3. "Bases, Components, Dimension" | |||||||
| 2.4. Subspaces | |||||||
| 2.5. Linear Manifolds | |||||||
| 2.6. Hyperplanes | |||||||
| 2.7. Morphisms of Linear Spaces | |||||||
| Problems | |||||||
| chapter 3 | |||||||
| SYSTEMS OF LINEAR EQUATIONS | |||||||
| 3.1. More on the Rank of a Matrix | |||||||
| 3.2. Nontrivial Compatibility of a Homogeneous Linear System | |||||||
| 3.3. The Compatability Condition for a General Linear System | |||||||
| 3.4. The General Solution of a Linear System | |||||||
| 3.5. Geometric Properties of the Solution Space | |||||||
| 3.6. Methods for Calculating the Rank of a Matrix | |||||||
| Problems | |||||||
| chapter 4 | |||||||
| LINEAR FUNCTIONS OF A VECTOR ARGUMENT | |||||||
| 4.1. Linear Forms | |||||||
| 4.2. Linear Operators | |||||||
| 4.3. Sums and Products of Linear Operators | |||||||
| 4.4. Corresponding Operations on Matrices | |||||||
| 4.5. Further Properties of Matrix Multiplication | |||||||
| 4.6. The Range and Null Space of a Linear Operator | |||||||
| 4.7. Linear Operators Mapping a Space Kn into Itself | |||||||
| 4.8. Invariant Subspaces | |||||||
| 4.9. Eigenvectors and Eigenvalues | |||||||
| Problems | |||||||
| chapter 5 | |||||||
| COORDINATE TRANSFORMATIONS | |||||||
| 5.1. Transformation to a New Basis | |||||||
| 5.2. Consecutive Transformations | |||||||
| 5.3. Transformation of the Components of a Vector | |||||||
| 5.4. Transformation of the Coefficients of a Linear Form | |||||||
| 5.5. Transformation of the Matrix of a Linear Operator | |||||||
| *5.6. Tensors | |||||||
| Problems | |||||||
| chapter 6 | |||||||
| THE CANONICAL FORM OF THE MATRIX OF A LINEAR OPERATOR | |||||||
| 6.1. Canonical Form of the Matrix of a Nilpotent Operator | |||||||
| 6.2. Algebras. The Algebra of Polynomials | |||||||
| 6.3. Canonical Form of the Matrix of an Arbitrary Operator | |||||||
| 6.4. Elementary Divisors | |||||||
| 6.5. Further Implications | |||||||
| 6.6. The Real Jordan Canonical Form | |||||||
| *6.7. "Spectra, Jets and Polynomials" | |||||||
| *6.8. Operator Functions and Their Matrices | |||||||
| Problems | |||||||
| chapter 7 | |||||||
| BILINEAR AND QUADRATIC FORMS | |||||||
| 7.1. Bilinear Forms | |||||||
| 7.2. Quadratic Forms | |||||||
| 7.3. Reduction of a Quadratic Form to Canonical | |||||||
| 7.4. The Canonical Basis of a Bilinear Form | |||||||
| 7.5. Construction of a Canonical Basis by Jacobi's Method | |||||||
| 7.6. Adjoint Linear Operators | |||||||
| 7.7. Isomorphism of Spaces Equipped with a Bilinear Form | |||||||
| *7.8. Multilinear Forms | |||||||
| 7.9. Bilinear and Quadratic Forms in a Real Space | |||||||
| Problems | |||||||
| chapter 8 | |||||||
| EUCLIDEAN SPACES | |||||||
| 8.1. Introduction | |||||||
| 8.2. Definition of a Euclidean Space | |||||||
| 8.3. Basic Metric Concepts | |||||||
| 8.4. Orthogonal Bases | |||||||
| 8.5. Perpendiculars | |||||||
| 8.6. The Orthogonalization Theorem | |||||||
| 8.7. The Gram Determinant | |||||||
| 8.8. Incompatible Systems and the Method of Least Squares | |||||||
| 8.9. Adjoint Operators and Isometry | |||||||
| Problems | |||||||
| chapter 9 | |||||||
| UNITARY SPACES | |||||||
| 9.1. Hermitian Forms | |||||||
| 9.2. The Scalar Product in a Complex Space | |||||||
| 9.3. Normal Operators | |||||||
| 9.4. Applications to Operator Theory in Euclidean Space | |||||||
| Problems | |||||||
| chapter 10 | |||||||
| QUADRATIC FORMS IN EUCLIDEAN AND UNITARY SPACES | |||||||
| 10.1. Basic Theorem on Quadratic Forms in a Euclidean Space | |||||||
| 10.2. Extremal Properties of a Quadratic Form | |||||||
| 10.3 Simultaneous Reduction of Two Quadratic Forms | |||||||
| 10.4. Reduction of the General Equation of a Quadratic Surface | |||||||
| 10.5. Geometric Properties of a Quadratic Surface | |||||||
| *10.6. Analysis of a Quadric Surface from Its Genearl Equation | |||||||
| 10.7. Hermitian Quadratic Forms | |||||||
| Problems | |||||||
| chapter 11 | |||||||
| FINITE-DIMENSIONAL ALGEBRAS AND THEIR REPRESENTATIONS | |||||||
| 11.1. More on Algebras | |||||||
| 11.2. Representations of Abstract Algebras | |||||||
| 11.3. Irreducible Representations and Schur's Lemma | |||||||
| 11.4. Basic Types of Finite-Dimensional Algebras | |||||||
| 11.5. The Left Regular Representation of a Simple Algebra | |||||||
| 11.6. Structure of Simple Algebras | |||||||
| 11.7. Structure of Semisimple Algebras | |||||||
| 11.8. Representations of Simple and Semisimple Algebras | |||||||
| 11.9. Some Further Results | |||||||
| Problems | |||||||
| *Appendix | |||||||
| CATEGORIES OF FINITE-DIMENSIONAL SPACES | |||||||
| A.1. Introduction | |||||||
| A.2. The Case of Complete Algebras | |||||||
| A.3. The Case of One-Dimensional Algebras | |||||||
| A.4. The Case of Simple Algebras | |||||||
| A.5. The Case of Complete Algebras of Diagonal Matrices | |||||||
| A.6. Categories and Direct Sums | |||||||
| HINTS AND ANSWERS | |||||||
| BIBLIOGRAPHY | |||||||
| INDEX |