Long time smooth solutions of 3D cubic quasilinear wave systems with small weakly decaying initial data

Abstract

For the 3D cubic quasilinear wave system ci ui=Gi(u,∂ u,∂2u)=Σ0|α|,|β|,|γ|1 \\ 1 j,k,l mgαβγijkl∂αuj∂βuk∂γul, it is well known that global solution u exists when the small smooth initial data (u,∂tu)|t=0 =(u0(x), u1(x)) are compactly supported or decay rapidly at spatial infinity. However, when (u0, u1)∈ (Hs+1, Hs) with s>52 are small, it remains unknown whether u exists globally or not. In this paper, we show that if \|u0\|HN+1+\|u1\|HN (N 6) is small, then the almost global solution u exists in [0, T] with T eC-1 for the general G(u,∂ u,∂2u) depending on u and T eC-2 for the nonlinearity G(∂ u,∂2u) independent of u, respectively. In addition, if Σ|a| 5\| xμ∂ax(u 0,u1)\|L2 holds for any fixed constant μ∈ (0,1), then the solution u exists globally and meanwhile the scattering property of u is derived. Our main ingredients consist in establishing a series of new weighted L∞-L2 estimates and Strichartz estimates based on the strong Huygens' principle for 3D linear wave equations.