English

Energy-critical NLS with quadratic potentials

Analysis of PDEs 2010-10-21 v2

Abstract

We consider the defocusing H˙1\dot H^1-critical nonlinear Schr\"odinger equation in all dimensions (n3n\geq 3) with a quadratic potential V(x)=±12x2V(x)=\pm \tfrac12 |x|^2. We show global well-posedness for radial initial data obeying u0(x),xu0(x)L2\nabla u_0(x), xu_0(x) \in L^2. In view of the potential VV, this is the natural energy space. In the repulsive case, we also prove scattering. We follow the approach pioneered by Bourgain and Tao in the case of no potential; indeed, we include a proof of their results that incorporates a couple of simplifications discovered while treating the problem with quadratic potential.

Keywords

Cite

@article{arxiv.math/0611394,
  title  = {Energy-critical NLS with quadratic potentials},
  author = {Rowan Killip and Monica Visan and Xiaoyi Zhang},
  journal= {arXiv preprint arXiv:math/0611394},
  year   = {2010}
}

Comments

Incorporates corrections to Lemma 6.5