Blow-up solutions on a sphere for the 3d quintic NLS in the energy space

Abstract

We prove that if u(t) is a log-log blow-up solution, of the type studied by Merle-Rapha\"el (2001-2005), to the L2 critical focusing NLS equation i∂t u + u + |u|4/d u=0 with initial data u0∈ H1(Rd) in the cases d=1, 2, then u(t) remains bounded in H1 away from the blow-up point. This is obtained without assuming that the initial data u0 has any regularity beyond H1(Rd). As an application of the d=1 result, we construct an open subset of initial data in the radial energy space H1rad(R3) with corresponding solutions that blow-up on a sphere at positive radius for the 3d quintic ( H1-critical) focusing NLS equation i∂tu + u + |u|4u=0. This improves Rapha\"el-Szeftel (2009), where an open subset in H3rad(R3) is obtained. The method of proof can be summarized as follows: on the whole space, high frequencies above the blow-up scale are controlled by the bilinear Strichartz estimates. On the other hand, outside the blow-up core, low frequencies are controlled by finite speed of propagation.