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Further Information on Potentials

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Hertz is known for his outstanding experimental works. However, as a student of Helmholtz, he was a high ranking theoretical physicist. Although, he considered, like Heaviside, electric and magnetic fields as the real physical quantities, still he used the vector potentials, now called Hertzian potentials and , to solve Maxwell's wave equation for the radiation problem. These potentials are closely related to the electric scalar potential ϕ and magnetic vector potential . Stratton further used Hertzian potentials in elaborating the EM‐theory [B.8]. Collin continued the use of Hertzian potentials for the analysis of the guided waves. He also used the and ϕ potentials in the radiation problems [B.9, B.10]. The use of Hertzian potentials gradually declined. However, its usefulness in problem‐solving has been highlighted [J.1, J.11, J.12].

Gradually, the magnetic vector potential became the problem‐solving tool if not the physical reality. Further, by using the retarded scalar and vector potentials and Lorentz gauge condition connecting both the vector and scalar potentials, Lorentz formulated the EM‐theory of Maxwell in terms of the magnetic vector potential. In his formulation, a current is the source of the magnetic vector potential . So, Lorentz considered the propagation of both the magnetic vector and electric scalar potential with a finite velocity that resulted in the retarded time at the field point. However, Maxwell's scalar potential was nonpropagating. Maxwell did not write a wave equation for the scalar potential, as his use of Coulomb gauge was inconsistent with it. Later on, even electric vector potential was introduced in the formulation of EM‐theory. The nonphysical magnetic current, introduced in Maxwell's equations by Heaviside, is the source of potential . The use of vector potentials simplified the computation of the fields due to radiation from wire antenna and aperture antenna. A component of the magnetic/electric vector potential is a scalar quantity. It has further helped the reformulation of EM‐field theory in terms of the electric scalar and magnetic scalar potentials [B.9, B.10]. Such formulations are used in the guided‐waves analysis. In recent years, it has been pointed out that the Lorentz gauge condition and retarded potentials were formulated by Lorenz in 1867, much before the formulation of famous H. A. Lorentz [J.14, J.15]. However, most of the textbooks refer to the name of Lorentz.

Both Heaviside and Hertz considered only the electric and magnetic fields as real physical quantities, and magnetic vector and electric scalar potentials as merely auxiliary nonphysical mathematical concepts to solve the EM‐field problem. Possibly, this was not the attitude of Kelvin and Maxwell. They identified the electrical potential with energy, and magnetic vector potential with momentum. The magnetic vector potential could be considered as the potential momentum per unit charge, just as the electric scalar potential ϕ is the potential energy per unit charge [J.16]. The potential momentum is obtained as follows:

(1.1.2)

In the above equation, is the force acting on the charge q, and is given by equation (1.1.1b).

Lebedev in 1900 experimentally demonstrated the radiation pressure, demonstrating momentum carried by the EM‐wave. The energy and momentum carried by the EM‐wave indicate that the light radiation could be viewed as some kind of particle, not a wave phenomenon. A particle is characterized by energy and momentum. Such a dual nature of light is a quantum mechanical duality phenomenon. Einstein introduced the concept of the light particle, called “photon” to explain the interaction of light with matter, i.e. the photoelectric effect. However, Lorentz retained the classical wave model to explain the interaction between radiation and matter via polarization of dipoles in a material creating its frequency‐dependent permittivity.

It is to be noted that at a location in the space, even for zero and fields, the potentials and ϕ could exist [B.11]. Aharonov–Bohm predicted that the potential fields and ϕ, in the absence of and , could influence a charged particle. Tonomura and collaborators experimentally confirmed the validity of Aharonov–Bohm prediction. The Aharonov–Bohm effect demonstrates that and fields only partly describe the EM‐fields in quantum mechanics. The vector potential also has to be retained for a complete description of the EM‐field quantum mechanically [J.3, J.16, J.17]. However, to solve the classical electromagnetic problems, such as guided wave propagation and radiation from antenna, Heaviside formulation of Maxwell equations and potential functions as additional tools is adequate.

Introduction To Modern Planar Transmission Lines

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