English

Scattering for 1D cubic NLS and singular vortex dynamics

Analysis of PDEs 2009-12-17 v2

Abstract

In this paper we study the stability of the self-similar solutions of the binormal flow, which is a model for the dynamics of vortex filaments in fluids and super-fluids. These particular solutions χa(t,x)\chi_a(t,x) form a family of evolving regular curves of R3\mathbb R^3 that develop a singularity in finite time, indexed by a parameter a>0a>0. We consider curves that are small regular perturbations of χa(t0,x)\chi_a(t_0,x) for a fixed time t0t_0. In particular, their curvature is not vanishing at infinity, so we are not in the context of known results of local existence for the binormal flow. Nevertheless, we construct in this article solutions of the binormal flow with these initial data. Moreover, these solutions become also singular in finite time. Our approach uses the Hasimoto transform what leads us to study the long-time behavior of a 1D cubic NLS equation with time-depending coefficients and small regular perturbations of the constant solution as initial data. We prove asymptotic completeness for this equation in appropriate function spaces.

Keywords

Cite

@article{arxiv.0905.0062,
  title  = {Scattering for 1D cubic NLS and singular vortex dynamics},
  author = {Valeria Banica and Luis Vega},
  journal= {arXiv preprint arXiv:0905.0062},
  year   = {2009}
}

Comments

42 pages, revised version, to appear in J. Eur. Math. Soc

R2 v1 2026-06-21T12:57:17.018Z