Scattering for the cubic Schr\"odinger equation in 3D with randomized radial initial data

Abstract

We obtain almost-sure scattering for the cubic defocusing Schr\"odinger equation in the Euclidean space R3, with randomized radially-symmetric initial data at some supercritical regularity scales. Since we make no smallness assumption, our result generalizes the work of B\'enyi, Oh and Pocovnicu. It also extends the results of Dodson, L\"uhrmann and Mendelson on the energy-critical equation in R4, to the energy-subcritical equation in R3. In this latter setting, even if the nonlinear Duhamel term enjoys a stochastic smoothing effect that makes it subcritical, it still has infinite energy. In the present work, we first develop a stability theory from the deterministic scattering results below the energy space, due to Colliander, Keel, Staffilani, Takaoka and Tao. Then, we propose a globalization argument in which we set up the I-method with a Morawetz bootstrap in a stochastic setting. To our knowledge, this is the first almost-sure scattering result for an energy-subcritical Schr\"odinger equation outside the small data regime.

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