On the Eigenvalues of the Fermionic Angular Eigenfunctions in the Kerr Metric

Davide Batic; Suzan Hamad Abdul Karim; Marek Nowakowski

doi:10.3390/e24081083

Entropy (Aug 2022)

On the Eigenvalues of the Fermionic Angular Eigenfunctions in the Kerr Metric

Davide Batic,
Suzan Hamad Abdul Karim,
Marek Nowakowski

Affiliations

Davide Batic: Department of Mathematics, Khalifa University of Science and Technology, Main Campus, Abu Dhabi P.O. Box 127788, United Arab Emirates
Suzan Hamad Abdul Karim: Department of Mathematics, Khalifa University of Science and Technology, Main Campus, Abu Dhabi P.O. Box 127788, United Arab Emirates
Marek Nowakowski: Departamento de Fisica, Universidad de los Andes, Cra.1E No.18A-10, Bogota 111711, Colombia

DOI: https://doi.org/10.3390/e24081083
Journal volume & issue: Vol. 24, no. 8
p. 1083

Abstract

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In view of a result recently published in the context of the deformation theory of linear Hamiltonian systems, we reconsider the eigenvalue problem associated with the angular equation arising after the separation of the Dirac equation in the Kerr metric, and we show how a quasilinear first order PDE for the angular eigenvalues can be derived efficiently. We also prove that it is not possible to obtain an ordinary differential equation for the eigenvalues when the role of the independent variable is played by the particle energy or the black hole mass. Finally, we construct new perturbative expansions for the eigenvalues in the Kerr case and obtain an asymptotic formula for the eigenvalues in the case of a Kerr naked singularity.

Published in Entropy

ISSN: 1099-4300 (Online)
Publisher: MDPI AG
Country of publisher: Switzerland
LCC subjects: Science: Astronomy: Astrophysics; Science: Physics
Website: http://www.mdpi.com/journal/entropy

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