Focusing nonlinear Hartree equation with inverse-square potential

Abstract

In this paper, we consider the scattering theory of the radial solution to focusing energy-subcritical Hartree equation with inverse-square potential in the energy space H1(Rd) using the method from Dodson2016. The main difficulties are the equation is not space-translation invariant and the nonlinearity is non-local. Using the radial Sobolev embedding and a virial-Morawetz type estimate we can exclude the concentration of mass near the origin. Besides, we can overcome the weak dispersive estimate when a<0, using the dispersive estimate established by zheng.