A space-time integral estimate for a large data semi-linear wave equation on the Schwarzschild manifold

Abstract

We consider the wave equation (-2+2 -V -VL(-S2)) u = fF'(|u| 2) u with (t,,θ,φ) in R x R x S2. The wave equation on a spherically symmetric manifold with a single closed geodesic surface or on the exterior of the Schwarzschild manifold can be reduced to this form. Using a smoothed Morawetz estimate which does not require a spherical harmonic decomposition, we show that there is decay in L2loc for initial data in the energy class, even if the initial data is large. This requires certain conditions on the potentials V, VL, and f. We show that a key condition on the weight in the smoothed Morawetz estimate can be reduced to an ODE condition, which is verified numerically.

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