Revisiting the integral form of Gauss' law for a generic case of electrodynamics with arbitrarily moving Gaussian surface
Abstract
We have re-examined the integral form of Gauss' law for arbitrarily moving charges inside and outside an arbitrarily expanding (or contracting) and deforming Gaussian surface. We have explicitly calculated the time-dependent Gauss' flux integral for such a generic non-static case with the Maxwell equations under consideration. We have obtained an evolution equation ddts(t)E·ds(t)=I(s)in(t)ε0 for the time-dependence of the flux-integral. We have pedagogically demonstrated that while the flux integral is dependent on the expansion/contraction of the surface, it is independent of its deformation.
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