On blow-up solutions to the 3D cubic nonlinear Schroedinger equation

Abstract

For the 3d cubic nonlinear Schr\"odinger (NLS) equation, which has critical (scaling) norms L3 and H1/2, we first prove a result establishing sufficient conditions for global existence and sufficient conditions for finite-time blow-up. For the rest of the paper, we focus on the study of finite-time radial blow-up solutions, and prove a result on the concentration of the L3 norm at the origin. Two disparate possibilities emerge, one which coincides with solutions typically observed in numerical experiments that consist of a specific bump profile with maximum at the origin and focus toward the origin at rate (T-t)1/2, where T>0 is the blow-up time. For the other possibility, we propose the existence of ``contracting sphere blow-up solutions'', i.e. those that concentrate on a sphere of radius (T-t)1/3, but focus towards this sphere at a faster rate (T-t)2/3. These conjectured solutions are analyzed through heuristic arguments and shown (at this level of precision) to be consistent with all conservation laws of the equation.

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