Determination of electromagnetic medium from the Fresnel surface

Abstract

We study Maxwell's equations on a 4-manifold where the electromagnetic medium is described by an antisymmetric 2 2-tensor . In this setting, the Tamm-Rubilar tensor density determines a polynomial surface of fourth order in each cotangent space. This surface is called the Fresnel surface and acts as a generalisation of the light-cone determined by a Lorentz metric; the Fresnel surface parameterises electromagnetic wave-speed as a function of direction. Favaro and Bergamin have recently proven that if has only a principal part and if the Fresnel surface of coincides with the light cone for a Lorentz metric g, then is proportional to the Hodge star operator of g. That is, under additional assumptions, the Fresnel surface of determines the conformal class of . The purpose of this paper is twofold. First, we provide a new proof of this result using Gr\"obner bases. Second, we describe a number of cases where the Fresnel surface does not determine the conformal class of the original 2 2-tensor . For example, if is invertible we show that and -1 have the same Fresnel surfaces.