On the Existence of Self-Similar solutions for some Nonlinear Schrödinger equations

Abstract

We construct solutions of Schrödinger equations which are asymptotically self-similar solutions as time goes to infinity. Also included are situations with two bubbles. These solutions are global, with non-zero L2 norms, and are stable. As such they are not of the standard asymptotic decomposition of linear waves and localized waves. Such weakly localized solutions were expected in view of previous works Liu-Sof1,Liu-Sof2 on the large time behavior of general dispersive equations. It is shown that one can associate a scattering channel to such solutions, with the dilation operator as the asymptotic ``Hamiltonian''.