High-order gravitational late-time tails in Kerr spacetime
Abstract
We calculate high-order late-time tails of the retarded Green function of the Teukolsky equation for linear field perturbations of (subextremal) Kerr spacetime. We calculate these tails at a fixed spheroidal harmonic and azimuthal number m up to the first three orders for the field point: at finite radius (away from the event horizon) for large Boyer-Lindquist time t; along the future event horizon H+ for large ingoing Eddington-Finkelstein coordinate v; and along future null infinity I+ for large outgoing Eddington-Finkelstein coordinate u. We obtain the tail powers for generic integer field spin s and the tail coefficients specifically for gravitational (s=-2) perturbations. Our asymptotics include the known leading power-law (generic) tails, respectively,t-2-3, eimΩH vv-2-3-b (where b=1 for s>0, m=0 and b=0 otherwise, and where ΩH is the angular velocity of the event horizon) and u-+s-2, as well as their higher-order logarithmic corrections: t-2-5 t, eimΩH vv-2-5-b v and u-+s-3 u (as well as u-+s-42 u). Since we obtain the high-order expansions for modes for generic and m, we can readily infer the explicit expansions of the full retarded Green function for s=-2 (and its decay powers for generic integer s). We obtain the late-time asymptotics from small-frequency expansions of the Fourier modes of the retarded Green function in the frequency domain. Accordingly, we also provide small-frequency expansions of various quantities of interest in the scattering theory. We also attach two notebooks which provide expansions for specific values of s: one notebook provides them to the first three leading orders for generic and the other one to arbitrary order for specific values of .
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