Scattering of solutions to NLW by Inward Energy Decay (1909.01881v1)
Abstract: The topic of this paper is a semi-linear, energy sub-critical, defocusing wave equation $\partial_t2 u - \Delta u = - |u|{p -1} u$ in the 3-dimensional space ($3\leq p<5$) whose initial data are radial and come with a finite energy. In this work we prove scattering in the positive time direction by only assuming the inward part of the energy decays at a certain rate, as long as the total energy is finite, regardless of the decay rate or size of the outward energy. More precisely, we assume the initial data comes with a finite energy and [ \int_{{\mathbb R}3} \max{1,|x|\kappa}\ (\ |\nabla u_0(x)\cdot \frac{x}{|x|} + \frac{u_0(x)}{|x|} + u_1(x)\ |2 + \frac{2}{p+1}|u_0(x)|{p+1}\ ) dx < \infty. ] Here $\kappa\geq \kappa_0(p) = \frac{5-p}{p+1}$ is a constant. If $\kappa>\kappa_0(p)$, we can also prove $|u|_{Lp L{2p}}({\mathbb R}+ \times {\mathbb R}3)< +\infty$ and give an explicit rate of $u$'s convergence to a free wave.