Electromagnetic Theory

Julius Adams Stratton

  • 出版商: Wiley
  • 出版日期: 2007-01-22
  • 售價: $5,680
  • 貴賓價: 9.5$5,396
  • 語言: 英文
  • 頁數: 640
  • 裝訂: Hardcover
  • ISBN: 0470131535
  • ISBN-13: 9780470131534
  • 下單後立即進貨 (約1~3週)

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This book is an electromagnetics classic. Originally published in 1941, it has been used by many generations of students, teachers, and researchers ever since. Since it is classic electromagnetics, every chapter continues to be referenced to this day.

This classic reissue contains the entire, original edition first published in 1941. Additionally, two new forewords by Dr. Paul E. Gray (former MIT President and colleague of Dr. Stratton) and another by Dr. Donald G. Dudley, Editor of the IEEE Press Series on E/M Waves on the significance of the book's contribution to the field of Electromagnetics.

 

Table of Contents

Preface

CHAPTER I: THE FIELD EQUATIONS.

MAXWELL'S EQUATIONS.

1.1 The Field Vectors.

1.2 Charge and Current.

1.3 Divergence of the Field Vectors.

1.4 Integral Form of the Field Equations.

MACROSCOPIC PROPERTIES OF MATTER.

1.5 The Inductive Capacities c and p.

1.6 Electric and Magnetic Polarization.

1.7 Conducting Media.

UNITS AND DIMENSIONS.

1.8 M.K.S. or Giorgi System.

THE ELECTROMAGNETIC POTENTIALS.

1.9 Vector and Scalar Potentials.

1.10 Conducting Media.

1.11 Hertz Vectors, or Polarization Potentials.

1.12 Complex Field Vectors and Potentials.

BOUNDARY CONDITIONS.

1.13 Discontinuities in the Field Vectors.

COORDINATE SYSTEMS.

1.14 Unitary and Reciprocal Vectors.

1.15 Differential Operators.

1.16 Orthogonal Systems.

1.17 Field Equations in General Orthogonal Coordinates.

1.18 Properties of Some Elementary Systems.

THE FIELD SENSORS.

1.19 Orthogonal Transformations and Their Invariants.

1.20 Elements of Tensor Analysis.

1.21 Space-time Symmetry of the Field Equations.

1.22 The Lorentz Transformation.

1.23 Transformation of the Field Vectors to Moving Systems.

CHAPTER II: STRESS AND ENERGY.

STRESS AND STRAIN IN ELASTIC MEDIA.

2.1 Elastic Stress Tensor.

2.2 Analysis of Strain.

2.3 Elastic Energy and the Relations of Stress to Strain.

ELECTROMAGNETIC FORCES ON CHARGES AND CURRENTS.

2.4 Definition of the Vectors E and B.

2.5 Electromagnetic Stress Tensor in Free Space.

2.6 Electromagnetic Momentum.

2.7 Electrostatic Energy as a Function of Charge Density.

2.8 Electrostatic Energy as a Function of Field Intensity.

2 3 A Theorem on Vector Fields.

2.10 Energy of a Dielectric Body in an Electrostatic Field.

2.11 Thornson's Theorem.

2.12 Earnshaw's Theorem.

2.13 Theorem on the Energy of Uncharged Conductors.

MAGNETOSTATIC ENERGY.

2.14 Magnetic Energy of Stationary Currents.

2.15 Magnetic Energy as a Function of Field Intensity.

2.16 Ferromagnetic Materials.

2.17 Energy of a Magnetic Body in a Magnetostatic Field.

2.18 Potential Energy of a Permanent Magnet.

ENERGY FLOW.

2.19 Poynting's Theorem.

2.20 Complex Poynting Vector.

FORCES ON A DIELECTRIC IN AN ELECTROSTATIC FIELD.

2.21 Body Forces in Fluids.

2.22 Body Forces in Solids.

2.23 The Stress Tensor.

2.24 Surfaces of Discontinuity.

2.25 Electrostriction.

2.26 Force on a Body Immersed in a Fluid.

FORCES IN THE MAGNETOSTATIC FIELD.

2.27 Nonferromagnetic Materials.

2.28 Ferromagnetic Materials.

FORCES IN THE ELECTROMAGNETIC FIELD.

2.29 Force on a Body Immersed in a Fluid.

CHAPTER III: THE ELECTROSTATIC FIELD.

3.1 Equations of Field and Potential.

3.2 Boundary Conditions.

CALCULATION OF THE FIELD FROM THE CHARGE DISTRIBUTION.

3.3 Green's Theorem.

3.4 Integration of Poisson's Equation.

3.5 Behavior at Infinity.

3.6 Coulomb Field.

3.7 Convergence of Integrals.

EXPANSION OF THE POTENTIAL IN SPHERICAL HARMONICS.

3.8 Axial Distributions of Charge.

3.9 The Dipole.

3.10 Axial Multipoles.

3.11 Arbitrary Distributions of Charge.

3.12 General Theory of Multipoles.

DIELECTRIC POLARIZATION.

3.13 Interpretation of the Vectors P and IT.

3.14 Volume Distributions of Charge and Dipole Moment.

3.15 Single-layer Charge Distributions.

3.16 Double-layer Distributions.

3.17 Interpretation of Green's Theorem.

3.18 Images.

BOUNDARY-VALUE PROBLEMS.

3.19 Formulation of Electrostatic Problems.

3.20 Uniqueness of Solution.

3.21 Solution of Laplace's Equation.

PROBLEM OF THE SPHERE.

3.22 Conducting Sphere in Field of a Point Charge

3.23 Dielectric Sphere in Field of a Point Charge

3.24 Sphere in a Parallel Field

3.25 Free Charge on a Conducting Ellipsoid.

3.26 Conducting Ellipsoid in a Parallel Field.

3.27 Dielectric Ellipsoid in a Parallel Field.

3.28 Cavity Definitions of E and D.

3.29 Torque Exerted on an Ellipsoid.

CHAPTER IV: THE MAGNETOSTATIC FIELD.

GENERAL PROPERTIES OF A MAGNETOSTATFIC FIELD.

4.1 Field Equations and the Vector Potential.

4.2 Scalar Potential.

4.3 Poisson's Analysis.

CALCULATION OF THE FIELD OF A CURRENT DISTRIBUTION.

4.4 Biot-Savart Law.

4.5 Expansion of the Vector Potential.

4.6 The Magnetic Dipole.

4.7 Magnetic Shells.

A DIGRESSION ON UNITS AND DIMENSIONS.

4.8 Fundamental Systems.

4.9 Coulomb's Law for Magnetic Matter.

MAGNETIC POLARIZATION. 

4.10 Equivalent Current Distributions

4.11 Field of hfagnetized Rods and Spheres

DISCONTINUITIES OF THE VECTORS A AND B.

4.12 Surface Distributions of Current.

4.13 Surface Distributions of Magnetic Moment.

INTEGRATION OF THE EQUATION.

4.14 Vector Analogue of Green's Theorem.

4.15 Application to the Vector Potential.

BOUNDARY-VALUE PROBLEMS.

4.16 Formulation of the Magnetostatic Problem.

4.17 Uniqueness of Solution.

PROBLEM OF THE ELLIPSOID.

4.18 Field of a Uniformly Magnetized Ellipsoid.

4.19 Magnetic Ellipsoid in a Parallel Field.

CYLINDER IN A PARALLEL FIELD.

4.20 Calculation of the Field.

4.21 Force Exerted on the Cylinder.

PROBLEMS.

CHAPTER V: PLANE WAVES IN UNBOUNDED ISOTROPIC MEDIA.

PROPAGATION OF PLANE WAVES.

5.1 Equations of a One-dimensional Field.

5.2 Plane Waves Harmonic in Time.

5.3 Plane Waves Harmonic in Space.

5.4 Polarization.

5.5 Energy Flow.

5.6 Impedance.

GENERAL SOLUTIONS OF THE ONE-DIMENSION WAVE EQUATION.

5.7 Elements of Fourier Analysis.

5.8 General Solution of the One-dimensional Wave Equation in a Nondissipative Medium.

5.9 Dissipative Medium; Prescribed Distribution in Time.

5.10 Dissipative Medium; Prescribed Distribution in Space.

5.11 Discussion of a Numerical Example.

5.12 Elementary Theory of the Laplace Transformation.

5.13 Application of the Laplace Transformation to Maxwell's Equations.18

DISPERSION.

5.14 Dispersion in Dielectrics.

5.15 Dispersion in Metals.

5.16 Propagation in an Ionized Atmosphere.

VELOCITIES OF PROPAGATION.

5.17 Group Velocity.

5.18 Wave-front and Signal Velocities.

PROBLEMS.

CHAPTER VI: CYLINDRICAL WAVES.

EQUATIONS OF A CYLINDRICAL FIE LD.

6.1 Representation by Hertz Vectors.

6.2 Scalar and Vector Potentials.

6.3 Impedances of Harmonic Cylindrical Fields.

WAVE FUNCTIONS OF THE CIRCULAR CYLINDER. 

6.4 Elementary Waves.

6.5 Properties of the Functions Zp(p).

6.6 The Field of Circularly Cylindrical Wave Functions.

6.7 Construction from Plane Wave Solutions.

6.8 Integral Representations of the Functions Zp(p).

6.9 Fourier-Bessel Integrals.

6.10 Representation of a Plane Wave.

6.11 The Addition Theorem for Circularly Cylindrical Waves.

WAVE FUNCTIONS OF THE ELLIPTIC CYLINDER.

6.12 Elementary Waves.

6.13 Integral Representations.

6.14 Expansion of Plane and Circular Waves.

PROBLEMS.

CHAPTER VII: SPHERICAL WAVES.

THE VECTOR WAVE EQUATION.

7.1 A Fundamental Set of Solutions.

7.2 Application to Cylindrical Coordinates.

THE SCALAR WAVE EQUATION IN SPHERICAL COORDINATES.

7.3 Elementary Spherical Waves.

7.4 Properties of the Radial Functions.

7.5 Addition Theorem for the Legendre Polynomials.

7.6 Expansion of Plane Waves.

7.7 Integral Representations.

7.8 A Fourier-Bessel Integral.

7.9 Expansion of a Cylindrical Wave Function.

7.10 Addition Theorem for zp(kR).

THE VECTOR WAVE EQUATION IN SPHERICACL COORDINATES.

7.11 Spherical Vector Wave Functions.

7.12 Integral Representations.

7.13 Orthogonality.

7.14 Expansion of a Vector Plane Wave.

PROBLEMS.

CHAPTER VIII: RADIATION.

THE INHOMOGENEOUS SOLAR WAVE EQUATION.

8.1 Kirchhoff Method of Integration.

8.2 Retarded Potentials.

8.3 Retarded Hertz Vector.

A MULTIPOLE EXPANSION.

8.4 Definition of the Moments.

8.5 Electric Dipole.

8.6 Magnetic Dipole.

RADIATION THEORY OF LINEAR ANTENNA SYSTEMS.

8.7 Radiation Field of a Single Linear Oscillator.

8.8 Radiation Due to Traveling Waves.

8.9 Suppression of Alternate Phases.

8.10 Directional Arrays.

8.11 Exact Calculation of the Field of a Linear Oscillator.

8.12 Radiation Resistance by the E.M.F. Method.

THE KIRCHHOFF-HUYGENS PRINCIPLE.

8.13 Scalar Wave Functions.

8.14 Direct Integration of the Field Equations.

8.15 Discontinuous Surface Distributions.

FOUR-DIMENSIONAL FORMULATION OF THE RADIATION PROBLEM.

8.16 Integration of the Wave Equation.

8.17 Field of a Moving Point Charge.

PROBLEMS.

CHAPTER IX: BOUNDARY-VALUE PROBLEMS.

GENERAL THEOREMS.

9.1 Boundary Conditions.

9.2 Uniqueness of Solution.

9.3 Electrodynamic Similitude.

REFLECTION AND REFRACTION AT A PLANE SURFACE.

9.4 Snell's Laws.

9.5 Fresnel's Equations.

9.6 Dielectric Media.

9.7 Total Reflection.

9.8 Refraction in a Conducting Medium.

9.9 Reflection at a Conducting Surface.

PLANE SHEETS.

9.10 Reflection and Transmission Coefficients.

9.11 Application to Dielectric Media.

9.12 Ahsorbing Layers.

SURFACE WAVES.

9.13 Complex Angles of Incidence

9.14 Skin Effect.

PROPAGATION ALONG A CIRCULAR CYLINDER.

9 15 Natural Modes.

9 16 Conductor Ernbeded in a Dielectric.

9 17 Further Discussion of the Principal Wave.

9 18 Waves in Hollow Pipes.

COAXIA LINES.

9.19 Propagation Constant.

9.20 Infinite Conductivity.

9.21 Finite Conductivity.

OSCILLATIONS OF A SPHERE.

9.22 Natural Modes.

9.23 Oscillations of a Conducting Sphere.

9.24 Oscillations in a Spherical Cavity.

DIFFRACTION OF A PLANE WAVE BY A SPHERE.

9.25 Expansion of the Diffracted Field.

9.26 Total Radiation.

9.27 Limiting Cases.

EFFECT OF THE EARTH ON THE PROPAGATION OF RADIO WAVES.

9.28 Sommerfeld Solution.

9.29 Weyl Solution.

9.30 van der Pol Solution.

9.31 Approximation of the Integrals.

PROBLEMS.

APPENDIX I.

A. NUMERICAL VALUES OF FUNDAMENTAL CONSTANTS.

B. DIMENSIONS OF ELECTROMAGNETIC QUANTITIES.

C. CONVERSION TABLES.

APPENDIX II.

FORMULAS FROM VECTOR ANALYSIS.

APPENDIX III.

CONDUCTIVITY OF VARIOUS MATERIALS.

SPECIFIC INDUCTIVE CAPACITY OF DIELECTRICS.

APPENDIX IV.

ASSOCIATED LEGENDRE FUNCTIONS.

Index.

商品描述(中文翻譯)

描述



這本書是一本電磁學的經典之作。最初於1941年出版,至今已被許多代學生、教師和研究人員使用。由於它是經典的電磁學教材,每一章至今仍被引用。

這本經典再版包含了1941年首次出版的完整原版。此外,還有兩篇新的前言,一篇是由Paul E. Gray博士(前麻省理工學院校長,Stratton博士的同事)撰寫,另一篇是由Donald G. Dudley博士撰寫,他是IEEE Press系列關於電磁波的編輯,介紹了這本書對電磁學領域的貢獻。


 



目錄



前言

第一章:場方程。


麥克斯韋方程。


1.1 場向量。


1.2 電荷和電流。


1.3 場向量的散度。


1.4 場方程的積分形式。


物質的宏觀性質。


1.5 電感和電容。


1.6 電場和磁場的極化。


1.7 導體介質。


單位和尺寸。


1.8 M.K.S.或Giorgi系統。


電磁勢。


1.9 向量和純量勢。


1.10 導體介質。


1.11 赫茲向量或極化勢。


1.12 複數場向量和勢。


邊界條件。


1.13 場向量的不連續性。


座標系統。


1.14 正交和互易向量。


1.15 微分算子。


1.16 正交系統。


1.17 一般正交座標系統的場方程。


1.18 一些基本系統的性質。


場感測器。


1.19 正交變換及其不變量。


1.20 張量分析的基本概念。


1.21 場方程的時空對稱性。


1.22 洛倫茲變換。


1.23 場向量對於運動系統的變換。


第二章:應力和能量。


彈性介質中的應力和應變。


2.1 彈性應力張量。


2.2 應變分析。


2.3 彈性能量和應力與應變的關係。


電磁力量