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Now available in English for the first time, Physics and Partial Differential Equations, Volumel bridges physics and applied mathematics in a manner that is easily accessible to readers with an undergraduate-level background in these disciplines.
Readers who are more familiar with mathematics than physics will discover the connection between various physical and mechanical disciplines and their related mathematical models, which are described by partial differential equations (PDEs). The authors establish the funda-mental equations for fields such as
electrodynamics;
fluid dynamics, magnetohydrodynamics, and reacting fluid dynamics;
elastic, thermoelastic, and viscoelastic mechanics;
the kinetic theory of gases;
special relativity; and quantum mechanics.
Readers who are more familiar with physics than mathematics will benefit from in-depth explanations of how PDEs work as effective mathematical tools to more clearly express and present the basic concepts of physics. The book describes the mathematical structures and features of these PDEs, including
the types and basic characteristics of the equations,
the behavior of solutions, and
some commonly used approaches to solving PDEs.
内容简介
The first volume of the Chinese edition of this book was published in July 1997, and the second volume was published in June 2000. In July 2000, upon the readers' request, we corrected several typographical errors and republished the first volume.
In this edition, minor typographical errors are corrected, and a small paragraph has been added to section 5.5.4 in Chapter 5, while the remaining text is unchanged.
We would like to take this opportunity to express our sincere thanks to our teachers,friends, and readers for their encouragement and support.
作者简介
Tatsien Li is a Professor in the School of Mathematical Sciences at Fudan University in Shanghai. He is a member of the Chinese Academy of Saences and a foreign member of the French Academy of Sciences.
Tiehu Qin is a Professor in the School of Mathematical Sciences at Fudan University in Shanghai.
内页插图
目录
Preface to the English Edition
Preface to the Clunese Edition
1 Electrodynanucs
1.1 Introduction
1.2 Preliminaries
1.3 Maxwell's Equations in a Vacuum; Lorentz Force
1.4 Electromagnetic Energy and Momentum; Conservation and Transformation Laws of Energy and Momentum
1.5 Mathematical Structure of Maxwell's Equations; Wave Effect of Electromagnetic Fields
1.6 Scalar Potential and Vector Potential of an Electromagnetic Field
1.7 Maxwell's Equations in a Medium
1.8 Electrostatic Fields and Magnetostatic Fields
1.9 Darwin Model
Exercises
Bibliography
2 Fluid Dynamics
2.1 System of ldealFluid Dynamics
2.2 System of Viscous Fluid Dynamics
2.3 Navier-Stokes Equations
2.4 Shock Waves
2.5 System of One-Dimensional F1uid Dynamics in LagrangianRepresentation
Exercises
Bibliography
3 Magnetohydrodynamics
3.1 Plasma
3.2 System of Magnetohydrodynamics
3.3 System of Magnetohydrodynamics When the Conductivity lnfinite
3.4 Mathematical Structure of Magnetohydrodynamics System
3.5 System of One-Dimensional Magnetohydrodynamics
Exercises
Bibliography
4 Reacting Fluid Dynamics
4.1 Introduction
4.2 System of Reacting Fluid Dynamics
4.3 System of One-Dimensional Reacting Fluid Dynamics
Exercises
Bibliography
5 Elastic Mechanics
5.1 Introduction
5.2 Description of Deformation; Strain Tensor
5.3 Conservation Laws; Stress Tensor
5.4 Constitutive Equation: Relationship Between Stress and Deformation
5.5 System of Elastodynanucs and Its Mathematical Structure
5.6 Well-Posed Problems of the System of Elastostatics
Exercises
Bibliography
Appendix A Cartesian Tensor
A.1 Definition of Tensor
A.2 Operations of Tensor
A.3 Invariants of the Second-Order Symmetric Tensor
A.4 Isotropic Tensor
A.5 Differentiation of Tensor
Appendix B Overview of Thermodynamics
B.1 Objective of the Study of Thermodynamics
B.2 The First Law of Thermodynamics; Intemal Energy
B.3 The Second Law of Thermodynamics; Entropy
B.4 Legendre Transform
B.5 Thermodynamic Functions
B.6 Expressions of Internal Energy and Entropy
Index
数学精品系列:物理学与偏微分方程(上册 英文版) [Physics and Partial Differential Equations] epub pdf mobi txt 电子书 下载 2024
数学精品系列:物理学与偏微分方程(上册 英文版) [Physics and Partial Differential Equations] 下载 epub mobi pdf txt 电子书 2024
数学精品系列:物理学与偏微分方程(上册 英文版) [Physics and Partial Differential Equations] mobi pdf epub txt 电子书 下载 2024
评分
☆☆☆☆☆
Readers who are more familiar with mathematics than physics will discover the connection between various physical and mechanical disciplines and their related mathematical models, which are described by partial differential equations (PDEs). The authors establish the funda-mental equations for fields such as
评分
☆☆☆☆☆
the kinetic theory of gases;
评分
☆☆☆☆☆
special relativity; and quantum mechanics.
评分
☆☆☆☆☆
elastic, thermoelastic, and viscoelastic mechanics;
评分
☆☆☆☆☆
fluid dynamics, magnetohydrodynamics, and reacting fluid dynamics;
评分
☆☆☆☆☆
Readers who are more familiar with physics than mathematics will benefit from in-depth explanations of how PDEs work as effective mathematical tools to more clearly express and present the basic concepts of physics. The book describes the mathematical structures and features of these PDEs, including
评分
☆☆☆☆☆
elastic, thermoelastic, and viscoelastic mechanics;
评分
☆☆☆☆☆
the behavior of solutions, andNow available in English for the first time, Physics and Partial Differential Equations, Volumel bridges physics and applied mathematics in a manner that is easily accessible to readers with an undergraduate-level background in these disciplines.
评分
☆☆☆☆☆
the kinetic theory of gases;
数学精品系列:物理学与偏微分方程(上册 英文版) [Physics and Partial Differential Equations] epub pdf mobi txt 电子书 下载 2024