English

Note on the Euler equations in C^k spaces

Analysis of PDEs 2014-06-02 v1

Abstract

In this note, using the ideas from our recent article \cite{EM}, we prove strong ill-posedness for the 2D Euler equations in CkC^k spaces. This note provides a significantly shorter proof of many of the main results in \cite{BLi2}. In the case k>1k>1 we show the existence of initial data for which the kthkth derivative of the velocity field develops a logarithmic singularity immediately. The strong ill-posedness covers Ck1,1C^{k-1,1} spaces as well. The ill-posedness comes from the pressure term in the Euler equation. We formulate the equation for DkuD^k u as: tDku=Dk+1p+l.o.t.\partial_t D^k u=D^{k+1} p + l.o.t. and then use the non-locality of the map upu\rightarrow p to get the ill-posedness. The real difficulty comes in how to deal with the "l.o.t." terms which can be handled by special commutator estimates.

Keywords

Cite

@article{arxiv.1405.7891,
  title  = {Note on the Euler equations in C^k spaces},
  author = {Tarek M. Elgindi and Nader Masmoudi},
  journal= {arXiv preprint arXiv:1405.7891},
  year   = {2014}
}
R2 v1 2026-06-22T04:27:05.003Z