Blowup and Scattering problems for the Nonlinear Schr\"odinger equations

Abstract

We consider L2-supercritical and H1-subcritical focusing nonlinear Schr\"odinger equations. We introduce a subset PW of H1(Rd) for d 1, and investigate behavior of the solutions with initial data in this set. For this end, we divide PW into two disjoint components PW+ and PW-. Then, it turns out that any solution starting from a datum in PW+ behaves asymptotically free, and solution starting from a datum in PW- blows up or grows up, from which we find that the ground state has two unstable directions. We also investigate some properties of generic global and blowup solutions.