Classical ElectrodynamicsIntroduction to electrostatics. Boudary-value problems in electrostatics: I. Boundary-value problems in electrostatics: II. Multipoles, electrostatics of macroscopic media, dielectrics. Magnetostatics. Time-varying fields, maxwell equations, conservation laws. Plane electromagnetic waves and wave propagation. Wave guides and resonant cavities. Simple radiating systems, scattering, and diffraction. Magnetohydrodynamics and plasma physics. Special theory of relativity. Dynamics of relativistic particles and electromagnetic fields. Collisions between charged particles, energy loss, and scattering. Radiation by moving charges. Bremsstrahlung, method of virtual quanta, radiative beta processes. Multipole fields. Radiation damping, self-fields of a particle, scattering and absorption of radiation by a bound system. Units and dimensions, basic units and derived units. Electromagnetic units and equations. Various systems of electromagnetic units. Conversion of equations and amounts between Gaussian units and MKSA units. |
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Page 132
... infinite . Are there difficulties ? Can you obtain an explicit estimate of the corrections ? ( c ) Consider the limit of L → ∞ with ( L − z ) , a and p fixed and show that the results of Problem 3.11 are recovered . What about ...
... infinite . Are there difficulties ? Can you obtain an explicit estimate of the corrections ? ( c ) Consider the limit of L → ∞ with ( L − z ) , a and p fixed and show that the results of Problem 3.11 are recovered . What about ...
Page 341
... infinite medium . The final consequence is that the TEM mode cannot exist inside a single , hollow , cylindrical conductor of infinite conductivity . The surface is an equipotential ; the electric field therefore vanishes inside . It is ...
... infinite medium . The final consequence is that the TEM mode cannot exist inside a single , hollow , cylindrical conductor of infinite conductivity . The surface is an equipotential ; the electric field therefore vanishes inside . It is ...
Page 840
... infinite interval , 110 of complex exponentials on infinite interval , 68 of Legendre polynomials , 87 of sines and cosines , 67 of spherical harmonics , 99 of vector spherical harmonics , 746 Orthogonal transformations , 245 ...
... infinite interval , 110 of complex exponentials on infinite interval , 68 of Legendre polynomials , 87 of sines and cosines , 67 of spherical harmonics , 99 of vector spherical harmonics , 746 Orthogonal transformations , 245 ...
Contents
L2 The Inverse Square Law or the Mass of the Photon | 1 |
BoundaryValue Problems | 54 |
Multipoles Electrostatics | 136 |
Copyright | |
17 other sections not shown
Common terms and phrases
4-vector Ampère's law amplitude angle angular distribution angular momentum approximation atomic axis behavior boundary conditions calculate Chapter charge density charge q charged particle classical coefficients collision components conducting conductor consider coordinates cross section current density cylinder d³x defined dielectric constant diffraction dimensions dipole direction discussed electric and magnetic electric field electromagnetic fields electrons electrostatic expansion expression factor force frame frequency given Green function incident integral limit linear Lorentz transformation macroscopic magnetic field magnetic induction magnetic monopole magnitude Maxwell equations medium modes molecules motion multipole multipole expansion multipole moments nonrelativistic normal obtained oscillations parallel parameter photon Phys plane wave plasma polarization problem propagation quantum quantum-mechanical radiation radius region relativistic result scattering shown in Fig sin² solution spectrum sphere spherical surface tensor theorem transverse unit vanishes vector potential velocity volume wave guide wave number wavelength written zero ΦΩ