English

Long time decay and asymptotics for the complex mKdV equation

Analysis of PDEs 2025-02-07 v4

Abstract

We study the asymptotics of the complex modified Korteweg-de Vries equation tu+x3u=u2xu\partial_t u + \partial_x^3 u = -|u|^2 \partial_x u, which can be used to model vortex filament dynamics. In the real-valued case, it is known that solutions with small, localized initial data exhibit modified scattering for xt1/3|x| \geq t^{1/3} and behave self-similarly for xt1/3|x| \leq t^{1/3}. We prove that the same asymptotics hold for complex mKdV. The major difficulty in the complex case is that the nonlinearity cannot be expressed as a derivative, which makes the low-frequency dynamics harder to control. To overcome this difficulty, we introduce the decomposition u=S+wu = S + w, where SS is a self-similar solution with the same mean as uu and ww is a remainder that has better decay. By using the explicit expression for SS, we are able to get better low-frequency behavior for uu than we could from dispersive estimates alone. An advantage of our method is its robustness: It does not depend on the precise algebraic structure of the equation, and as such can be more readily adapted to other contexts.

Keywords

Cite

@article{arxiv.2111.00630,
  title  = {Long time decay and asymptotics for the complex mKdV equation},
  author = {Gavin Stewart},
  journal= {arXiv preprint arXiv:2111.00630},
  year   = {2025}
}

Comments

59 pages; expanded discussion on self-similar solutions to create Section 4

R2 v1 2026-06-24T07:20:06.333Z