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A note on energy currents and decay for the wave equation on a Schwarzschild background

arXiv:0710.0171

Abstract

In recent work, we have proven uniform decay bounds for solutions of the wave equation $\Box_gϕ=0$ on a Schwarzschild exterior, in particular, the uniform pointwise estimate $|ϕ|\le Cv_+^{-1}$, which holds throughout the domain of outer communications, where $v$ is an advanced Eddington-Finkelstein coordinate, $v_+=\max\{v,1\}$, and $C$ is a constant depending on a Sobolev norm of initial data. A crucial estimate in the proof required a decomposition into spherical harmonics. We here give an alternative proof of this estimate not requiring such a decomposition.

10 pages