Asymptotic tails of massive scalar fields in a stationary axisymmetric EMDA black hole geometry
arXiv:gr-qc/0405129 · doi:10.1088/0256-307X/21/10/002
Abstract
The late-time tail behavior of massive scalar fields is studied analytically in a stationary axisymmetric EMDA black hole geometry. It is shown that the asymptotic behavior of massive perturbations is dominated by the oscillatory inverse power-law decaying tail $ t^{-(l+3/2)}\sin(μt)$ at the intermediate late times, and by the asymptotic tail $ t^{-5/6}\sin(μt)$ at asymptotically late times. Our result seems to suggest that the intermediate tails $ t^{-(l+3/2)}\sin(μt)$ and the asymptotically tails $t^{-5/6} \sin(μt)$ may be quite general features for evolution of massive scalar fields in any four dimensional asymptotically flat rotating black hole backgrounds.
6 pages