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Separability of the massive Diracs equation in 5-dimensional Myers-Perry black hole geometry and its relation to a rank-three Killing-Yano tensor

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 نشر من قبل S. Q. Wu
 تاريخ النشر 2008
  مجال البحث فيزياء
والبحث باللغة English
 تأليف Shuang-Qing Wu




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The Dirac equation for the electron around a five-dimensional rotating black hole with two different angular momenta is separated into purely radial and purely angular equations. The general solution is expressed as a superposition of solutions derived from these two decoupled ordinary differential equations. By separating variables for the massive Klein-Gordon equation in the same space-time background, I derive a simple and elegant form for the Stackel-Killing tensor, which can be easily written as the square of a rank-three Killing-Yano tensor. I have also explicitly constructed a symmetry operator that commutes with the scalar Laplacian by using the Stackel-Killing tensor, and the one with the Dirac operator by the Killing-Yano tensor admitted by the five-dimensional Myers-Perry metric, respectively.



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