A scattering theory for the wave equation on Kerr black hole exteriors

TL;DR

This paper develops a comprehensive scattering theory for the scalar wave equation on Kerr black hole exteriors, establishing existence, uniqueness, and boundedness of the scattering matrix, and analyzing superradiant reflection effects.

Contribution

It introduces a time-domain scattering framework for Kerr black holes, proving boundedness of the scattering matrix and analyzing superradiance, extending previous decay results.

Findings

The scattering matrix is bounded and maps radiation fields between horizons and null infinity.

Superradiant reflection can amplify energy radiated to null infinity.

Reflection and transmission coefficients are uniformly bounded across frequencies.

Abstract

We develop a definitive physical-space scattering theory for the scalar wave equation on Kerr exterior backgrounds in the general subextremal case |a|<M. In particular, we prove results corresponding to "existence and uniqueness of scattering states" and "asymptotic completeness" and we show moreover that the resulting "scattering matrix" mapping radiation fields on the past horizon and past null infinity to radiation fields on the future horizon and future null infinity is a bounded operator. The latter allows us to give a time-domain theory of superradiant reflection. The boundedness of the scattering matrix shows in particular that the maximal amplification of solutions associated to ingoing finite-energy wave packets on past null infinity is bounded. On the frequency side, this corresponds to the novel statement that the suitably normalised reflection and transmission coefficients are uniformly bounded independently of the frequency parameters. We further complement this with a demonstration that superradiant reflection indeed amplifies the energy radiated to future null infinity of suitable wave-packets as above. The results make essential use of a refinement of our recent proof [M. Dafermos, I. Rodnianski and Y. Shlapentokh-Rothman, Decay for solutions of the wave equation on Kerr exterior spacetimes III: the full subextremal case |a|<M, arXiv:1402.6034] of boundedness and decay for solutions of the Cauchy problem so as to apply in the class of solutions where only a degenerate energy is assumed finite. We show in contrast that the analogous scattering maps cannot be defined for the class of finite non-degenerate energy solutions. This is due to the fact that the celebrated horizon red-shift effect acts as a blue-shift instability when solving the wave equation backwards.