$L^2$-stability of explicit schemes for incompressible Euler equations

Erwan Deriaz

$L^2$-stability of explicit schemes for incompressible Euler equations

Numerical Analysis 2007-12-17 v1

Authors: Erwan Deriaz

Abstract

We present an original study on the numerical stabiliy of explicit schemes solving the incompressible Euler equations on an open domain with slipping boundary conditions. Relying on the skewness property of the non-linear term, we demonstrate that some explicit schemes are numerically stable for small perturbations under the condition $\delta t\leq C \delta x^{2r/(2r-1)}$ where $r$ is an integer, $\delta t$ the time step and $\delta x$ the space step.

Keywords

stability analysis stability theory euler equations for incompressible fluids

Cite

@article{arxiv.0712.2328,
  title  = {$L^2$-stability of explicit schemes for incompressible Euler equations},
  author = {Erwan Deriaz},
  journal= {arXiv preprint arXiv:0712.2328},
  year   = {2007}
}

Comments

6 pages

Related papers

View all related →

Atmospheric and Oceanic Physics · Physics

Stability of leap-frog constant-coefficients semi-implicit schemes for the fully elastic system of Euler equations. Flat-terrain case