English

Well-posedness for the NLS hierarchy

Analysis of PDEs 2024-11-06 v2

Abstract

We prove well-posedness for higher-order equations in the so-called NLS hierarchy (also known as part of the AKNS hierarchy) in almost critical Fourier-Lebesgue spaces and in modulation spaces. We show the jjth equation in the hierarchy is locally well-posed for initial data in H^rs(R)\hat H^s_r(\mathbb{R}) for sj1rs \ge \frac{j-1}{r'} and 1<r21 < r \le 2 and also in M2,ps(R)M^s_{2, p}(\mathbb{R}) for s=j12s = \frac{j-1}{2} and 2p<2 \le p < \infty. Supplementing our results with corresponding ill-posedness results in Fourier-Lebesgue spaces shows optimality. Using the conserved quantities derived in Koch-Tataru (2018) we argue that the hierarchy equations are globally well-posed for data in Hs(R)H^s(\mathbb{R}) for sj12s \ge \frac{j-1}{2}. Our arguments are based on the Fourier restriction norm method in Bourgain spaces adapted to our data spaces and bi- & trilinear refinements of Strichartz estimates.

Keywords

Cite

@article{arxiv.2402.07652,
  title  = {Well-posedness for the NLS hierarchy},
  author = {Joseph Adams},
  journal= {arXiv preprint arXiv:2402.07652},
  year   = {2024}
}

Comments

To appear in J. Evol. Equ

R2 v1 2026-06-28T14:45:59.680Z