Sharp Criteria of Scattering for the Fractional NLS

Abstract

In this paper, the sharp threshold of scattering for the fractional nonlinear Schr\"odinger equation in the L2-supercritical case is obtained, i.e., if 1+4sN<p<1+4sN-2s, and M[u0]s-scscE[u0]<M[Q]s-scscE[Q], \ M[u0]s-scsc\| u0\|2 Hs<M[Q]s-scsc\| Q\|2 Hs then the solution u(t) is globally well-posed and scatters. This condition is sharp in the sense that if 1+4sN<p<1+4sN-2s and M[u0]s-scscE[u0]<M[Q]s-scscE[Q], \ M[u0]s-scsc\| u0\|2 Hs>M[Q]s-scsc\| Q\|2 Hs, then the corresponding solution u(t) blows up in finite time, according to Boulenger, Himmelsbach, and Lenzmann's results in [2].