Orbital Stability of Standing Waves for Fractional Hartree Equation with Unbounded Potentials

Abstract

We prove the existence of the set of ground states in a suitable energy space s=\u: ∫RN u(-+m2)s u+V |u|2<∞\, s∈ (0,N2) for the mass-subcritical nonlinear fractional Hartree equation with unbounded potentials. As a consequence we obtain, as a priori result, the orbital stability of the set of standing waves. The main ingredient is the observation that s is compactly embedded in L2. This enables us to apply the concentration compactness argument in the works of Cazenave-Lions and Zhang, namely, relative compactness for any minimizing sequence in the energy space.