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· 분류 : 외국도서 > 과학/수학/생태 > 수학 > 대수학 > 선형대수학
· ISBN : 9781118995419
· 쪽수 : 676쪽
· 출판일 : 2016-02-08
목차
Preface
Part I
Introduction: Three Examples
Chapter 1. SYSTEMS OF LINEAR ALGEBRAIC EQUATIONS
1.1 Linear Algebraic Equations
1.2 Matrix Representation of Linear Systems and the Gauss?]Jordan Algorithm
1.3 The Complete Gauss Elimination Algorithm
1.4 Echelon Form and Rank
1.5 Computational Considerations
Chapter 2. MATRIX ALGEBRA
2.1 Matrix Multiplication
2.2 Some Applications of Matrix Operators
2.3 The Inverse and the Transpose
2.4 Determinants
2.5 Three Important Determinant Rules
Review Problems for Part I
Technical Writing Exercises for Part I
Group Projects for Part I
A. LU Factorization
B. Two?]Point Boundary Value Problems
C. Electrostatic Voltage
D. Kirchhoff's Laws
E. Global Positioning Systems
Part II
Introduction: The Structure of General Solutions to Linear Algebraic Equations
Chapter 3. VECTOR SPACES
3.1 General Spaces, Subspaces, and Spans
3.2 Linear Dependence
3.3 Bases, Dimension, and Rank
Chapter 4. ORTHOGONALITY
4.1 Orthogonal Vectors and the Gram?]Schmidt Algorithm Norm
4.2 Orthogonal Matrices
4.3 Least Squares
4.4 Function Spaces
Review Problems for Part II
Magic square
Controllability
Technical Writing Exercises for Part II
Group Projects for Part II
A. Orthogonal Matrices, Rotations, and Reflections
B. Householder Reflectors and the QR Factorization
C. Infinite Dimensional Matrices
Part III
Introduction: Reflect on This
Chapter 5. Eigenvalues and Eigenvectors
5.1 Eigenvector Basics
5.2 Calculating Eigenvalues and Eigenvectors
5.3 Symmetric and Hermitian Matrices
Chapter 5. Summary
Chapter 6. Similarity
6.1 Similarity Transformations and Diagonalizability
6.2 Principal Axes Normal Modes
6.3 Schur Decomposition and Its Implications
6.4 The Power Method and the QR Algorithm
Chapter 7. Linear Systems of Differential Equations
7.1 First Order Linear Systems of Differential Equations
7.2 The Matrix Exponential Function
7.3 The Jordan Normal Form
Review Problems for Part III
Technical Writing Exercises for Part III
Group Projects for Part III
A. Positive Definite Matrices
B. Hessenberg Form
C. The Discrete Fourier Transform and Circulant Matrices
Answers to Odd?]Numbered Problems
Index














