2012
DOI: 10.1142/s0219887812500466
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A Restatement of the Algebraic Classification of Area Metrics on 4-Manifolds

Abstract: An area metric is a`0 4´-tensor with certain symmetries on a 4-manifold that represents a non-dissipative linear electromagnetic medium. A recent result by Schuller, Witte and Wohlfarth gives a pointwise algebraic classification for such area metrics. This result is similar to the Jordan normal form theorem for`1 1´-tensors, and the result shows that pointwise area metrics divide into 23 metaclasses and each metaclass requires two coordinate representations. For the first 7 metaclasses, we show that only one c… Show more

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Cited by 6 publications
(2 citation statements)
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“…Equation (46) states that components G i jkl 0 define a twisted 4 0 -tensor density G 0 on N of weight 1. The Tamm-Rubilar tensor density [1,2] is the symmetric part of G 0 and we denote this twisted tensor density by G .…”
Section: The Fresnel Surfacementioning
confidence: 99%
See 1 more Smart Citation
“…Equation (46) states that components G i jkl 0 define a twisted 4 0 -tensor density G 0 on N of weight 1. The Tamm-Rubilar tensor density [1,2] is the symmetric part of G 0 and we denote this twisted tensor density by G .…”
Section: The Fresnel Surfacementioning
confidence: 99%
“…A main result of [13] is that such a 6 × 6 transformation matrix (which a priori has 36 degrees of freedom) can for skewon-free constitutive tensors essentially be realized using a coordinate transformation on N (which has only 16 degrees of freedom). See equation ( 14) and for a further discussion see [13,46]. Let us also note that lemma 4.6 and [15, theorem 2.1] are pointwise results, but theorem 4.3 is a global result on a possibly non-orientable manifold.…”
Section: Determining the Constitutive Tensor From The Fresnel Surfacementioning
confidence: 99%