A space-time integral estimate for a large data semi-linear wave equation on the Schwarzschild manifold
arXiv:math/0703399 · doi:10.1007/s11005-007-0177-8
Abstract
We consider the wave equation (-\dt^2+\dr^2 -V -V_L(-Î_{S^2})) u = fF'(|u| ^2) u with (t,Ï,θ,Ï) in R x R x S^2. 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 L^2_{loc} for initial data in the energy class, even if the initial data is large. This requires certain conditions on the potentials V, V_L, 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.
10 pages, 4 figures