Late-time Kerr tails: generic and non-generic initial data sets, "up" modes, and superposition

Abstract

Three interrelated questions concerning Kerr spacetime late-time scalar-field tails are considered numerically, specifically the evolutions of generic and non-generic initial data sets, the excitation of "up" modes, and the resolution of an apparent paradox related to the superposition principle. We propose to generalize the Barack-Ori formula for the decay rate of any tail multipole given a generic initial data set, to the contribution of any initial multipole mode. Our proposal leads to a much simpler expression for the late-time power law index. Specifically, we propose that the late-time decay rate of the Y m spherical harmonic multipole moment because of an initial Y' m multipole is independent of the azimuthal number m, and is given by t-n, where n='++1 for <' and n='++3 for '. We also show explicitly that the angular symmetry group of a multipole does not determine its late-time decay rate.