Global Regularity for Supercritical Nonlinear Dissipative Wave Equations in 3D

Abstract

The nonlinear wave equation utt- u +|ut|p-1ut=0 is shown to be globally well-posed in the Sobolev spaces of radially symmetric functions Hk rad( R3)× Hk-1 rad( R3) for all p≥ 3 and k≥ 3. Moreover, global C∞ solutions are obtained when the initial data are C0∞ and exponent p is an odd integer. The radial symmetry allows a reduction to the one-dimensional case where an important observation of A. Haraux (2009) can be applied, i.e., dissipative nonlinear wave equations contract initial data in Wk,q( R)× Wk-1,q( R) for all k∈[1,2] and q∈ [1,∞].