Relativistic origin of Hertz-form and extended Hertz-form equations for Maxwell theory of electromagnetism

Abstract

We show explicitly that the Hertz-form Maxwell's equations and their extensions can be obtained from the non-relativistic expansion of Lorentz transformation of Maxwell's equations. The explicit expression for the parameter α in the extended Hertz-form equations can be derived from such a non-relativistic expansion. The extended Hertz-form equations, which do not preserve Galilean invariance, origin from Lorentz transformation of Maxwell's equations and differ from the Galilean-transformed Maxwell equations (the original Hertz equations) by the relative sign differences between the two α terms etc. Especially, the α parameter is of relativistic origin. The superluminal behavior illustrated by the D'Alembert equation from the extended Hertz-form equations should be removed by including all subleading contributions in the v/c expansion, although such a superluminal behavior will not occur in the vacuum because α=0. We should note that in the Hertz form and extended Hertz form equations, the electromagnetic fields should take the forms E(x)=E(-1x) and B(x)=B(-1x). Such a choice of description for the fields is different from the ordinary one with E(x) and B(x), which are well known to satisfy the ordinary Maxwell's equations. The descriptions of electromagnetic phenomena using the function set \E(x),B(x)\ and the function set (E(x),B(x)) are equivalent, with the \E(x),B(x)\ description satisfying the extended Hertz-form Maxwell's equations in the low speed approximation. The solution of (extended) Hertz-form Maxwell's equations describe the traveling wave form electromagnetic field.