Some properties of spin-weighted spheroidal harmonics
- 2 December 1977
- journal article
- Published by The Royal Society in Proceedings of the Royal Society of London. Series A. Mathematical and Physical Sciences
- Vol. 358 (1692) , 71-86
- https://doi.org/10.1098/rspa.1977.0187
Abstract
We analyse the angular eigenfunctions - spin-weighted spheroidal harmonics-and eigenvalues of Teukolsky’s equation. This equation describes infinitesimal scalar, electromagnetic and gravitational perturbations of rotating (Kerr) black holes. We derive analytic expressions for the eigenvalues up to sixth order in the expansion parameter for low frequencies and an analogous expansion in the high-frequency limit. Spinweighted spheroidal harmonics form a complete and orthonormal set of functions on a prolate spheroid. They are, however, not the eigenfunctions of the natural Laplace operator on a spheroid and thus do not allow an obvious geometrical interpretation as the corresponding spin-weighted spherical harmonics.Keywords
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