English

Sobolev estimates for two dimensional gravity water waves

Analysis of PDEs 2013-07-16 v1

Abstract

Our goal in this paper is to apply a normal forms method to estimate the Sobolev norms of the solutions of the water waves equation. We construct a paradifferential change of unknown, without derivatives losses, which eliminates the part of the quadratic terms that bring non zero contributions in a Sobolev energy inequality. Our approach is purely Eulerian: we work on the Craig-Sulem-Zakharov formulation of the water waves equation. In addition to these Sobolev estimates, we also prove L2L^2-estimates for the xαZβ\partial_x^\alpha Z^\beta-derivatives of the solutions of the water waves equation, where ZZ is the Klainerman vector field tt+2xxt\partial_t +2x\partial_x. These estimates are used in another paper where we prove a global existence result for the water waves equation with smooth, small, and decaying at infinity Cauchy data, and we obtain an asymptotic description in physical coordinates of the solution, which shows that modified scattering holds. The proof of this global in time existence result relies on the simultaneous bootstrap of some H\"older and Sobolev a priori estimates for the action of iterated Klainerman vector fields on the solutions of the water waves equation. The present paper contains the proof of the Sobolev part of that bootstrap.

Keywords

Cite

@article{arxiv.1307.3836,
  title  = {Sobolev estimates for two dimensional gravity water waves},
  author = {Thomas Alazard and Jean-Marc Delort},
  journal= {arXiv preprint arXiv:1307.3836},
  year   = {2013}
}

Comments

255 pages. Our previous preprint arXiv:1305.4090 is now divided into two parts. This paper contains the second one

R2 v1 2026-06-22T00:51:20.556Z