Superradiance initiated inside the ergoregion

Abstract

We consider the stationary metrics that have both the black hole and the ergoregion. The class of such metric contains, in particular, the Kerr metric. We study the Cauchy problem with highly oscillatory initial data supported in a neighborhood inside the ergoregion with some initial energy E0. We prove that when the time variable x0 increases this solution splits into two parts: one with the negative energy -E1 ending at the event horizon in a finite time, and the second part, with the energy E2=E0+E1>E0, escaping, under some conditions, to the infinity when x0→ +∞. Thus we get the superradiance phenomenon. In the case of the Kerr metric the superradiance phenomenon is "short-lived", since both the solutions with positive and negative energies cross the outer event horizon in a finite time (modulo O(1k)) where k is a large parameter. We show that these solutions end on the singularity ring in a finite time. We study also the case of naked singularity.