Uniqueness of ground states of some coupled nonlinear Schrödinger systems and their application

We establish the uniqueness of ground states of some coupled nonlinear Schrödinger systems in the whole space. We firstly use Schwartz symmetrization to obtain the existence of ground states for a more general case. To prove the uniqueness of ground states, we use the radial symmetry of the ground states to transform the systems into an ordinary differential system, and then we use the integral forms of the system. More interestingly, as an application of our uniqueness results, we derive a sharp vector-valued Gagliardo–Nirenberg inequality.