Scalar Spheroidal Harmonics in Five Dimensional Kerr-(A)dS(General and Mathematical Physics)
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概要
- 論文の詳細を見る
We rewrite expressions for a general five dimensional metric on a Kerr-(A)dS black hole background, based on the derivation given be Chen, Lu and Pope [W. Chen, H. Lu and C. N. Pope, Class. Quantum Gray. 23 (2006), 5323, hep-th/0604125]. The Klein-Gordon equation is explicitly separated using this form and we show that the angular part of the wave equation leads to just one spheroidal wave equation. We then present results for the perturbative expansion of the angular eigenvalue in powers of the rotation parameters up to 6th order and compare numerically with the continued fraction method.
- 2012-08-25
著者
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Naylor Wade
International Coll.:dept. Of Physics Osaka University
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Cho H.
Department Of Mechanical Engineering Hanyang University
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Cornell Alan
National Institute For Theoretical Physics; School Of Physics University Of The Witwatersrand
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CORNELL Alan
National Institute for Theoretical Physics; School of Physics, University of the Witwatersrand
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NAYLOR Wade
International College & Department of Physics, Osaka University
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DOUKAS Jason
Yukawa Institute for Theoretical Physics, Kyoto University
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CORNELL Alan
National Institute for Theoretical Physics ; School of Physics, University of the Witwatersrand
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- Scalar Spheroidal Harmonics in Five Dimensional Kerr-(A)dS