The Plane Wave Spectrum Representation of Electromagnetic Fields
This is a classic text reissued in the joint IEEE/OUP series, with a new Foreword and introduction. It explains and illustrates a powerful technique for use in electromagnetic wave theory. In this technique electromagnetic waves are represented by the superposition of plane waves travelling in diverse directions. There is no other self-contained account of this technique available.
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PLANE WAVE REPRESENTATION
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angle angular frequency angular spectrum approximation asymptotic expansion Babinet's principle boundary conditions branch-points Cerenkov radiation considered corresponding cosh curl H current distribution dielectric tensor diffraction dipole direction of phase e-ik electric electromagnetic field equations evaluated exponential expressed in terms factor finite formula Fourier Fresnel integral given gives H-polarized half-plane half-space Hankel function homogeneous plane wave incident field integrand line-source magnetostatic field Maxwell's equations obtained P(cos path of integration perfectly conducting permittivity phase propagation plane wave spectrum point charge point of observation polarized field pole power radiated problem pure imaginary radiation field real axis reflection coefficient refractive index replaced respectively result scattered field screen simple solution specified spectrum function steepest descents superposition surface current density surface wave theory time-averaged power flux time-harmonic tion total field transmitted two-dimensional uniaxial medium unity upper/lower sign vacuum field wave spectrum representation wavelength written z-axis zero