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浪漫地理学:追寻崇高景观
计算方法 版权信息
- ISBN:9787564930547
- 条形码:9787564930547 ; 978-7-5649-3054-7
- 装帧:一般胶版纸
- 册数:暂无
- 重量:暂无
- 所属分类:>
计算方法 内容简介
本教材为普通高校类数学专业教材, 全书用英文编写, 符合《数值分析》大纲要求, 适用于理科数学类专业本科生及其他理工科硕士研究生“数值分析”课程, 旨在提高学生的专业英语能力, 更适应当前对国际化的要求。
计算方法 目录
Chapter 1 Introduction
1.1 Numerical Computational Methods and Main Contents
1.2 Error
1.3 Stability Analysis of Numerical Methods
1.4 How to Avoid Error
Excises 1
Chapter 2 Interpolation and Polynomial Approximation
2.1 Introduction
2.2 Lagrange Interpolation Polynomial
2.3 Neville' s Interpolating Formula
2.4 Newton Interpolation
2.5 Hermite Interpolation
2.6 Piecewise Polynomial Approximation
2.7 Cubic Spline Interpolation
Excises 2
Chapter 3 Approximation Theory
3.1 Optimal Approximation
3.2 Optimal Approximation of Normed Linear Space
3.3 Optimal Uniform Approximation Polynomial
3.4 Minimum Error to Zero-Chebyshev Polynomial
3.5 Optimal Approximation of the Inner Product Space
3.6 Optimal Square Approximation and Orthogonal Polynomials
3.7 Discrete Optimal Square Approximation and Least Square Method (L-S)
Excises 3
Chapter 4 Numerical Integration and Differentiation
4.1 Introduction
4.2 Newton-Cotes Quadrature Formula
4.3 Composite Numerical Integration
4.4 Richardson Extrapolation and Romberg Integration
4.5 Gaussian Quadrature
4.6 Numerical Differentiation
Excises 4
Chapter 5 Solving Linear System of Equations
5.1 Elementary Notions and Results of Linear Algebra
5.2 Direct Methods for Solving Linear System of Equations
5.3 Error of Gaussian Elimination
5.4 Iterative Methods for Solving Linear Systems
5.5 Conjugate Gradient Method
Excises 5
Chapter 6 Approximating Eigenvalues
6.1 Linear Algebra and Eigenvalues
6.2 The Power Method and the Inverse Power Method
6.3 Householder' s Method
6.4 QR Algorithm
6.5 Improved Power Method
Excises 6
Chapter 7 Numerical Solutions of Nonlinear Systems
7.1 The Bisection Method
7.2 Fixed Point Iterative Method
7.3 Newton' s Iteration Method
7.4 Numerical Solutive for Nonlinear Systems of Equations
Excises 7
Chapter 8 Numerical Solutions of Ordinary Differential Equations
8.1 Introduction
8.2 Euler's Method
8.3 Multistep Methods (Ⅰ)
8.4 Muhistep Methods (Ⅱ)
8.5 Runge-Kutta Method
8.6 Stiff Problem
8.7 Numerical Solution for Boundary-value Problem
Excises 8
References
1.1 Numerical Computational Methods and Main Contents
1.2 Error
1.3 Stability Analysis of Numerical Methods
1.4 How to Avoid Error
Excises 1
Chapter 2 Interpolation and Polynomial Approximation
2.1 Introduction
2.2 Lagrange Interpolation Polynomial
2.3 Neville' s Interpolating Formula
2.4 Newton Interpolation
2.5 Hermite Interpolation
2.6 Piecewise Polynomial Approximation
2.7 Cubic Spline Interpolation
Excises 2
Chapter 3 Approximation Theory
3.1 Optimal Approximation
3.2 Optimal Approximation of Normed Linear Space
3.3 Optimal Uniform Approximation Polynomial
3.4 Minimum Error to Zero-Chebyshev Polynomial
3.5 Optimal Approximation of the Inner Product Space
3.6 Optimal Square Approximation and Orthogonal Polynomials
3.7 Discrete Optimal Square Approximation and Least Square Method (L-S)
Excises 3
Chapter 4 Numerical Integration and Differentiation
4.1 Introduction
4.2 Newton-Cotes Quadrature Formula
4.3 Composite Numerical Integration
4.4 Richardson Extrapolation and Romberg Integration
4.5 Gaussian Quadrature
4.6 Numerical Differentiation
Excises 4
Chapter 5 Solving Linear System of Equations
5.1 Elementary Notions and Results of Linear Algebra
5.2 Direct Methods for Solving Linear System of Equations
5.3 Error of Gaussian Elimination
5.4 Iterative Methods for Solving Linear Systems
5.5 Conjugate Gradient Method
Excises 5
Chapter 6 Approximating Eigenvalues
6.1 Linear Algebra and Eigenvalues
6.2 The Power Method and the Inverse Power Method
6.3 Householder' s Method
6.4 QR Algorithm
6.5 Improved Power Method
Excises 6
Chapter 7 Numerical Solutions of Nonlinear Systems
7.1 The Bisection Method
7.2 Fixed Point Iterative Method
7.3 Newton' s Iteration Method
7.4 Numerical Solutive for Nonlinear Systems of Equations
Excises 7
Chapter 8 Numerical Solutions of Ordinary Differential Equations
8.1 Introduction
8.2 Euler's Method
8.3 Multistep Methods (Ⅰ)
8.4 Muhistep Methods (Ⅱ)
8.5 Runge-Kutta Method
8.6 Stiff Problem
8.7 Numerical Solution for Boundary-value Problem
Excises 8
References
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