On mass - critical NLS with local and non-local nonlinearities

Abstract: We consider the following nonlinear Schr\"{o}dinger equation with the double $L^2$-critical nonlinearities \begin{align*} iu_t+\Delta u+|u|^\frac{4}{3}u+\mu\left(|x|^{-2}*|u|^2\right)u=0\ \ \ \text{in $\mathbb{R}^3$,} \end{align*} where $\mu>0$ is small enough. Our first goal is to prove the existence and the non-degeneracy of the ground state $Q_{\mu}$. In particular, we develop an appropriate perturbation approach to prove the radial non-degeneracy property and then obtain the general non-degeneracy of the ground state $Q_{\mu}$. We then show the existence of finite time blowup solution with minimal mass $|u_0|{L^2}=|Q{\mu}|{L^2}$. More precisely, we construct the minimal mass blowup solutions that are parametrized by the energy $E{\mu}(u_0)>0$ and the momentum $P_{\mu}(u_0)$. In addition, the non-degeneracy property plays crucial role in this construction.