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常微分方程及其应用:理论与模型
作者:周宇虹 等编著
出版社:科学出版社
出版时间:2011-01-01
ISBN:9787030301253
定价:¥29.00
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内容简介
《常微分方程及其应用:理论与模型》是常微分方程课程的英文教材,是作者结合多年的双语教学经验编写而成。全书共5章,包括一阶线性微分方程,高阶线性微分方程,线性微分方程组。Laplace变换及其在微分方程求解中的应用,以及微分方程的稳定性理论。书中配有大量的应用实例和用Matlab软件绘制的微分方程解的相图,并介绍了绘制相图的程序。本书可作为高等院校理工科偏理或非数学专业的本科双语教材,也可供相关专业的研究生、教师和广大科技人员参考。
作者简介
暂缺《常微分方程及其应用:理论与模型》作者简介
目录
Chapter 1 First.order Differential Equations
1.1 Introduction
Exercise 1.1
1.2 First—order Linear Differential Equations
1.2.1 First—order Homogeneous Linear Differential Equations
1.2.2 First—order Nonhomogeneous Linear Differential Equations
1.2.3 Bernoulli Equations
Exercise 1.2
1.3 Separable Equations
1.3.1 Separable Equations
1.3.2 Homogeneous Equations
Exercise 1.3
1.4 Applications
Module 1 The Spread of Technological Innovations
Module 2 The Van Meegeren Art Forgeries
1.5 Exact Equations
1.5.1 Criterion for Exactness
1.5.2 Integrating Factor
Exercise 1 5
1.6 Existence and Uniqueness of Solutions
Exercise 1.6
Chapter 2 Second.order Differential Equations
2.1 General Solutions of Homogeneous Second—order Linear Equations
Exercise 2.1
2.2 Homogeneous Second—order Linear Equations with Constant Coeffcients
2.2.1 The Characteristic Equation Has Distinct Real Roots
2.2.2 The Characteristic Equation Has Repeated Roots
2.2.3 The Characteristic Equation Has ComNeX Conjugate Roo~s
Exercise 2.2
2.3 Nonhomogeneous Second—order Linear Equations
2.3.1 Structure of General Solutions
2.3.2 Method of Variation of Parameters
2.3.3 Methods for Some Special Form of the Nonhomogeneous Term g(t)
Exercise 2.3
2.4 Applications
Module 1 An Atomic Waste Disposal Problem.
Module 2 Mechanical Vibrations
Chapter 3 Linear Systems of Differential Equations
3.1 Basic Concepts and Theorems
Exercise 3.1
3.2 The Eigenvalue-Eigenvector Method of Finding Solutions
3.2.1 The Characteristic Polynomial of A Has n Distinct Real
Eigenvalues
3.2.2 The Characteristic Polynomial of A Has Complex Eigenvalues
3.2.3 The Characteristic Polynomial of A Has Equal Eigenvalues
Exercise 3.2
3.3 YhndamentM Matrix Solution;Matrix—valued Exponential Function eAt
Exercise 3.3
3.4 Nonhomogeneous Equations;Variation of Parameters
Exercise 3.4
3.5 Applications
Module 1 The Principle of Competitive Exclusion in Population Biology.
Module 2 A Model for the Blood Glucose Regular System
Chapter 4 Laplace Transforms and Their Applications in Solving Differential Equations
4.1 Laplace Transforms
Exercise 4.1
4.2 Properties of Laplace Transforms
Exercise 4.2
4.3 Inverse Laplace Transforms
Exercise 4.3
4.4 Solving Differential Equations by Laplace Transforms
……
Chapter 5 Introduction to the Stability Theory
Answers to Selected Exercises
References
附录 软件包Iode简介
1.1 Introduction
Exercise 1.1
1.2 First—order Linear Differential Equations
1.2.1 First—order Homogeneous Linear Differential Equations
1.2.2 First—order Nonhomogeneous Linear Differential Equations
1.2.3 Bernoulli Equations
Exercise 1.2
1.3 Separable Equations
1.3.1 Separable Equations
1.3.2 Homogeneous Equations
Exercise 1.3
1.4 Applications
Module 1 The Spread of Technological Innovations
Module 2 The Van Meegeren Art Forgeries
1.5 Exact Equations
1.5.1 Criterion for Exactness
1.5.2 Integrating Factor
Exercise 1 5
1.6 Existence and Uniqueness of Solutions
Exercise 1.6
Chapter 2 Second.order Differential Equations
2.1 General Solutions of Homogeneous Second—order Linear Equations
Exercise 2.1
2.2 Homogeneous Second—order Linear Equations with Constant Coeffcients
2.2.1 The Characteristic Equation Has Distinct Real Roots
2.2.2 The Characteristic Equation Has Repeated Roots
2.2.3 The Characteristic Equation Has ComNeX Conjugate Roo~s
Exercise 2.2
2.3 Nonhomogeneous Second—order Linear Equations
2.3.1 Structure of General Solutions
2.3.2 Method of Variation of Parameters
2.3.3 Methods for Some Special Form of the Nonhomogeneous Term g(t)
Exercise 2.3
2.4 Applications
Module 1 An Atomic Waste Disposal Problem.
Module 2 Mechanical Vibrations
Chapter 3 Linear Systems of Differential Equations
3.1 Basic Concepts and Theorems
Exercise 3.1
3.2 The Eigenvalue-Eigenvector Method of Finding Solutions
3.2.1 The Characteristic Polynomial of A Has n Distinct Real
Eigenvalues
3.2.2 The Characteristic Polynomial of A Has Complex Eigenvalues
3.2.3 The Characteristic Polynomial of A Has Equal Eigenvalues
Exercise 3.2
3.3 YhndamentM Matrix Solution;Matrix—valued Exponential Function eAt
Exercise 3.3
3.4 Nonhomogeneous Equations;Variation of Parameters
Exercise 3.4
3.5 Applications
Module 1 The Principle of Competitive Exclusion in Population Biology.
Module 2 A Model for the Blood Glucose Regular System
Chapter 4 Laplace Transforms and Their Applications in Solving Differential Equations
4.1 Laplace Transforms
Exercise 4.1
4.2 Properties of Laplace Transforms
Exercise 4.2
4.3 Inverse Laplace Transforms
Exercise 4.3
4.4 Solving Differential Equations by Laplace Transforms
……
Chapter 5 Introduction to the Stability Theory
Answers to Selected Exercises
References
附录 软件包Iode简介
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