Spacetime metric from linear electrodynamics II
Abstract
Following Kottler, \'E.Cartan, and van Dantzig, we formulate the Maxwell equations in a metric independent form in terms of the field strength F=(E,B) and the excitation H=( D, H). We assume a linear constitutive law between H and F. First we split off a pseudo-scalar (axion) field from the constitutive tensor; its remaining 20 components can be used to define a duality operator # for 2-forms. If we enforce the constraint ##=-1, then we can derive of that the conformally invariant part of the metric of spacetime.
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