The curl operator on odd-dimensional manifolds
Differential Geometry
2019-03-08 v3 Spectral Theory
Abstract
We study the spectral properties of curl, a linear differential operator of first order acting on differential forms of appropriate degree on an odd-dimensional closed oriented Riemannian manifold. In three dimensions its eigenvalues are the electromagnetic oscillation frequencies in vacuum without external sources. In general, the spectrum consists of the eigenvalue 0 with infinite multiplicity and further real discrete eigenvalues of finite multiplicity. We compute the Weyl asymptotics and study the zeta-function. We give a sharp lower eigenvalue bound for positively curved manifolds and analyze the equality case. Finally, we compute the spectrum for flat tori, round spheres and 3-dimensional spherical space forms.
Cite
@article{arxiv.1702.02044,
title = {The curl operator on odd-dimensional manifolds},
author = {Christian Baer},
journal= {arXiv preprint arXiv:1702.02044},
year = {2019}
}
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published version