Threshold solutions for the focusing L2 -supercritical NLS Equations

Abstract

We investigate the L2-supercritical and H1-subcritical nonlinear Schr\"odinger equation in H1. In G1 and yuan, the mass-energy quantity M(Q)1-scscE(Q) has been shown to be a threshold for the dynamical behavior of solutions of the equation. In the present paper, we study the dynamics at the critical level M(u)1-scscE(u)=M(Q)1-scscE(Q) and classify the corresponding solutions using modulation theory, non-trivially generalize the results obtained in holmer3 for the 3D cubic Schr\"odinger equation.