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Partial Differential Equations and Solitary Waves Theory 偏微分方程与孤波理论


作者:
Abdul-Majid Wazwaz
定价:
96.00元
ISBN:
978-7-04-025480-8
版面字数:
820.000千字
开本:
16开
全书页数:
741页
装帧形式:
精装
重点项目:
暂无
出版时间:
2009-05-27
读者对象:
学术著作
一级分类:
自然科学
二级分类:
数学与统计
三级分类:
偏微分方程

Partial Differential Equations and Solitary Waves Theory is a self-containedbook divided into two parts: Part I is a coherent survey bringing together newlydeveloped methods for solving PDEs. While some traditional techniques are pre-sented, this part does not require thorough understanding of abstract theories orcompact concepts. Well-selected worked examples and exercises shall guide thereader through the text. Part II provides an extensive exposition of the solitarywaves theory. This part handles nonlinear evolution equations by methods suchas Hirotas bilinear method or the tanh-coth method. A self-contained treatmentis presented to discuss complete integrability of a wide class of nonlinear equa-tions. This part presents in an accessible manner a systematic presentation ofsolitons, multi-soliton solutions, kinks, peakons, cuspons, and compactons.

While the whole book can be used as a text for advanced undergraduate andgraduate students in applied mathematics, physics and engineering, Part II will be most useful for graduate students and researchers in mathematics, engineer-ing, and other related fields.

  • Part I Partial Differential Equations
    • 1 Basic Concepts
      • 1.1 Introduction
      • 1.2 Definitions
        • 1.2.1 Definition of a PDE
        • 1.2.2 Order of a PDE
        • 1.2.3 Linear and Nonlinear PDEs
        • 1.2.4 Some Linear Partial Differential Equations
        • 1.2.5 Some Nonlinear Partial Differential Equations..
        • 1.2.6 Homogeneous and Inhomogeneot, s PDEs
        • 1.2.7 Solution of a PDE
        • 1.2.8 Boundary Conditions
        • 1.2.9 Initial Conditions
        • 1.2.10 Well-posed PDEs
      • 1.3 Classifications of a Second-order PDE
      • References
    • 2 First-order Partial Differential Equations
      • 2.1 Introduction
      • 2.2 Adomian Decomposition Method
      • 2.3 The Noise Terms Phenomenon
      • 2.4 The Modified Decomposition Method
      • 2.5 The Variational Iteration Method
      • 2.6 Method of Characteristics
      • 2.7 Systems of Linear PDEs by Adomian Method
      • 2.8 Systems of Linear PDEs by Variational Iteration Method
      • References
    • 3 One Dimensional Heat Flow
      • 3.1 Introduction
      • 3.2 The Adomian Decomposition Method
        • 3.2.1 Homogeneous Heat Equations
        • 3.2.2 Inhomogeneous Heat Equations
      • 3.3 The Variational Iteration Method
        • 3.3.1 Homogeneous Heat Equations
        • 3.3.2 Inhomogeneous Heat Equations
      • 3.4 Method of Separation of Variables
        • 3.4.1 Analysis of the Method
        • 3.4.2 Inhomogeneous Boundary Conditions
        • 3.4.3 Equations with Lateral Heat Loss
      • References
    • 4 Higher Dimensional Heat Flow
      • 4.1 Introduction
      • 4.2 Adomian Decomposition Method
        • 4.2.1 Two Dimensional Heat Flow
        • 4.2.2 Three Dimensional Heat Flow
      • 4.3 Method of Separation of Variables
        • 4.3.1 Two Dimensional Heat Flow
        • 4.3.2 Three Dimensional Heat Flow
      • References
    • 5 One Dimensional Wave Equation
      • 5.1 Introduction
      • 5.2 Adomian Decomposition Method
        • 5.2.1 Homogeneous Wave Equations
        • 5.2.2 Inhomogeneous Wave Equations
        • 5.2.3 Wave Equation in an Infinite Domain
      • 5.3 The Variational Iteration Method
        • 5.3.1 Homogeneous Wave Equations
        • 5.3.2 Inhomogeneous Wave Equations
        • 5.3.3 Wave Equation in an Infinite Domain
      • 5.4 Method of Separation of Variables
        • 5.4.1 Analysis of the Method
        • 5.4.2 Inhomogeneous Boundary Conditions
      • 5.5 Wave Equation in an Infinite Domain: DAlembert Solution
      • References
    • 6 Higher Dimensional Wave Equation
      • 6.1 Introduction
      • 6.2 Adomian Decomposition Method
        • 6.2.1 Two Dimensional Wave Equation
        • 6.2.2 Three Dimensional Wave Equation
      • 6.3 Method of Separation of Variables
        • 6.3.1 Two Dimensional Wave Equation
        • 6.3.2 Three Dimensional Wave Equation
      • References
    • 7 Laplaces Equation
      • 7.1 Introduction
      • 7.2 Adomian Decomposition Method
        • 7.2.1 Two Dimensional Laplaces Equation ...
      • 7.3 The Variational Iteration Method
      • 7.4 Method of Separation of Variables
        • 7.4.1 Laplaces Equation in Two Dimensions..
        • 7.4.2 Laplaces Equation in Three Dimensions
      • 7.5 Laplaces Equation in Polar Coordinates
        • 7.5.1 Laplaces Equation for a Disc
        • 7.5.2 Laplaces Equation for an Annulus
      • References
    • 8 Nonlinear Partial Differential Equations
      • 8.1 Introduction
      • 8.2 Adomian Decomposition Method
        • 8.2.1 Calculation of Adomian Polynomials ...
        • 8.2.2 Alternative Algorithm for Calculating Adomian Polynomials
      • 8.3 Nonlinear ODEs by Adomian Method
      • 8.4 Nonlinear ODEs by VIM
      • 8.5 Nonlinear PDEs by Adomian Method
      • 8.6 Nonlinear PDEs by VIM
      • 8.7 Nonlinear PDEs Systems by Adomian Method..
      • 8.8 Systems of Nonlinear PDEs by VIM
      • References
    • 9 Linear and Nonlinear Physical Models
      • 9.1 Introduction
      • 9.2 The Nonlinear Advection Problem
      • 9.3 The Goursat Problem
      • 9.4 The Klein-Gordon Equation
        • 9.4.1 Linear Klein-Gordon Equation
        • 9.4.2 Nonlinear Klein-Gordon Equation
        • 9.4.3 The Sine-Gordon Equation
      • 9.5 The Burgers Equation
      • 9.6 The Telegraph Equation
      • 9.7 Schrodinger Equation
        • 9.7.1 The Linear Schrodinger Equation
        • 9.7.2 The Nonlinear Schrodinger Equation
      • 9.8 Korteweg-deVries Equation
      • 9.9 Fourth-order Parabolic Equation
        • 9.9.1 Equations with Constant Coefficients
        • 9.9.2 Equations with Variable Coefficients
      • References
    • 10 Numerical Applications and Pade Approximants
      • 10.1 Introduction
      • 10.2 Ordinary Differential Equations
        • 10.2.1 Perturbation Problems
        • 10.2.2 Nonperturbed Problems
      • 10.3 Partial Differential Equations
      • 10.4 The Pade Approximants
      • 10.5 Pad6 Approximants and Boundary Value Problems
      • References
    • 11 Solitons and Compaetons
      • 11.1 Introduction
      • 11.2 Solitons
        • 11.2.1 The KdV Equation
        • 11.2.2 The Modified KdV Equation
        • 11.2.3 The Generalized KdV Equation
        • 11.2.4 The Sine-Gordon Equation
        • 11.2.5 The Boussinesq Equation
        • 11.2.6 The Kadomtsev-Petviashvili Equation
      • 11.3 Compactons
      • 11.4 The Defocusing Branch of K(n,n)
      • References
  • Part II Solitray Waves Theory
    • 12 Solitary Waves Theory
      • 12.1 Introduction
      • 12.2 Definitions
        • 12.2.1 Dispersion and Dissipation
        • 12.2.2 Types of Travelling Wave Solutions
        • 12.2.3 Nonanalytic Solitary Wave Solutions
      • 12.3 Analysis of the Methods
        • 12.3.1 The Tanh-coth Method
        • 12.3.2 The Sine-cosine Method
        • 12.3.3 Hirotas Bilinear Method
      • 12.4 Conservation Laws
      • References

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