Finite-time blowup for a Schr\"odinger equation with nonlinear source term

Abstract

We consider the nonlinear Schr\"odinger equation \[ ut = i u + | u |α u on RN , α>0, \] for H1-subcritical or critical nonlinearities: (N-2) α 4. Under the additional technical assumptions α≥ 2 (and thus N≤ 4), we construct H1 solutions that blow up in finite time with explicit blow-up profiles and blow-up rates. In particular, blowup can occur at any given finite set of points of RN. The construction involves explicit functions U, solutions of the ordinary differential equation Ut=|U|α U. In the simplest case, U(t,x)=(|x|k-α t)- 1α for t<0, x∈ RN. For k sufficiently large, U satisfies | U| Ut close to the blow-up point (t,x)=(0,0), so that it is a suitable approximate solution of the problem. To construct an actual solution u close to U, we use energy estimates and a compactness argument.