The Case Against Smooth Null Infinity III: Early-Time Asymptotics for Higher -Modes of Linear Waves on a Schwarzschild Background

Abstract

In this paper, we derive the early-time asymptotics for fixed-frequency solutions φ to the wave equation g φ=0 on a fixed Schwarzschild background (M>0) arising from the no incoming radiation condition on I- and polynomially decaying data, rφ t-1 as t-∞, on either a timelike boundary of constant area radius (I) or an ingoing null hypersurface (II). In case (I), we show that the asymptotic expansion of ∂v(rφ) along outgoing null hypersurfaces near spacelike infinity i0 contains logarithmic terms at order r-3- r. In contrast, in case (II), we obtain that the asymptotic expansion of ∂v(rφ) near spacelike infinity i0 contains logarithmic terms already at order r-3 r (unless =1). These results suggest an alternative approach to the study of late-time asymptotics near future timelike infinity i+ that does not assume conformally smooth or compactly supported Cauchy data: In case (I), our results indicate logarithmic modifications to Price's law for each -mode. On the other hand, the data of case (II) lead to much stronger deviations from Price's law. In particular, we conjecture that compactly supported scattering data on H- and I- lead to solutions that exhibit the same late-time asymptotics on I+ for each : rφ| I+ u-2 as u∞.