Introduction to linear algebra
著者
書誌事項
Introduction to linear algebra
Addison-Wesley, c1998
4th ed
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注記
Includes index
内容説明・目次
内容説明
This book stresses both practical computation and theoretical principles and centers on the early introduction of matrix theory and systems of linear equations, elementary vector-space concepts, and the eigenvalue problem. Featuring a gradual increase in the level of difficulty, an accessible writing style, and the integration of MATLAB, this text is an excellent introduction for engineering students.
目次
- 1. Matrices and Systems of Linear Equations. Introduction to Matrices and Systems of Linear Equations. Echelon Form and Gauss-Jordan Elimination. Consistent Systems of Linear Equations. Applications. Matrix Operations. Algebraic Properties of Matrix Operations. Linear Independence and Nonsingular Matrices. Data Fitting, Numerical Integration, and Numerical Differentiation. Matrix Inverses and Their Properties. 2. The Vector Space R^n. Introduction. Vector Space Properties of R^n. Examples of Subspaces. Bases for Subspaces. Dimension. Orthogonal Bases for Subspaces. Linear Transformations from R^n to R^m. Least-Squares Solutions to Inconsistent Systems, with Applications to Data Fitting. Theory and Practice of Least Squares. 3. The Eigenvalue Problem. Introduction. Determinants and the Eigenvalue Problem. Elementary Operations and Determinants. Eigenvalues and the Characteristic Polynomial. Eigenvectors and Eigenspaces. Complex Eigenvalues and Eigenvectors. Similarity Transformations and Diagonalization. Difference Equations
- Markov Chains
- Systems of Differential Equations. 4. Vector Spaces and Linear Transformations. Introduction. Vector Spaces. Subspaces. Linear Independence, Bases, and Coordinates. Dimension. Inner Product Spaces, Orthogonal Bases, and Projections. Linear Transformations. Operations with Linear Transformations. Matrix Representations for Linear Transformations. Change of Basis and Diagonalization. 5. Determinants. Introduction. Cofactor Expansions of Determinants. Cramer's Rule. Applications of Determinants: Inverses and Wronksians. 6. Eigenvalues and Applications. Quadratic Forms. Systems of Differential Equations. Transformation to Hessenberg Matrices. Eigenvalues of Hessenberg Matrices. Householder Transformations. The QR Factorization and Least-Squares Solutions. Matrix Polynomials and the Cayley-Hamilton Theorem. Generalized Eigenvectors and Solutions of Systems of Differential Equations. Appendix A: Introduction to MATLAB. Appendix B: Review of Geometric Vectors.
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