Nonscattering solutions to the L2-supercritical NLS Equations

Abstract

We investigate the nonlinear Schr\"odinger equation iut+ u+|u|p-1u=0 with 1+4N<p<1+4N-2 (when N=1, 2, 1+4N<p<∞) in energy space H1 and study the divergent property of infinite-variance and nonradial solutions. If M(u)1-scscE(u)<M(Q)1-scscE(Q) and \|u0\|21-scsc\|∇ u0\|2>\|Q\|21-scsc\|∇ Q\|2, then either u(t)~blows up in finite forward time, or u(t) exists globally for positive time and there exists a time sequence tn→+∞ such that \|∇ u(tn)\|2→+∞. Here Q is the ground state solution of -Q+ Q+|Q|p-1Q=0. A similar result holds for negative time. This extend the result of the 3D cubic Schr\"odinger equation in holmer10 to the general mass-supercritical and energy-subcritical case .