Approximate travelling wave solutions to the 2D Euler equation on the torus - Inria - Institut national de recherche en sciences et technologies du numérique Access content directly
Journal Articles Asymptotic Analysis Year : 2013

Approximate travelling wave solutions to the 2D Euler equation on the torus

Abstract

We consider the two-dimensional Euler equation with periodic boundary conditions. We construct approximate solutions of this equation made of localized travelling profiles with compact support propagating over a stationary state depending on only one variable. The direction or propagation is orthogonal to this variable, and the support is concentrated around flat points of the stationary state. Under regularity assumptions, we prove that the approximation error can be made exponentially small with respect to the width of the support of the travelling wave. We illustrate this result by numerical simulations.

Domains

Analysis of PDEs [math.AP]
Fichier principal
Vignette du fichier
submarines.pdf (198.62 Ko) Télécharger le fichier
Origin : Files produced by the author(s)

Nicolas Crouseilles  : Connect in order to contact the contributor

https://hal.science/hal-00567426

Submitted on : Monday, February 21, 2011-11:15:59 AM

Last modification on : Tuesday, April 16, 2024-11:17:00 AM

Long-term archiving on: Tuesday, November 6, 2012-2:31:00 PM

Download

Dates and versions

hal-00567426 , version 1 (21-02-2011)

Identifiers

Cite

Nicolas Crouseilles, Erwan Faou. Approximate travelling wave solutions to the 2D Euler equation on the torus. Asymptotic Analysis, 2013, 81, pp.31-34. ⟨10.3233/ASY-2012-1117⟩. ⟨hal-00567426⟩

Export

BibTeX XML-TEI Dublin Core DC Terms EndNote DataCite

Collections

UNIV-RENNES1 IRMAR UR2-HB CNRS INRIA INSA-RENNES IECN IRMA UNAM IRMAR-AN UNIV-LORRAINE INRIA2 TDS-MACS UR1-MATH-STIC UNIV-RENNES2 SITE-ALSACE UNIV-RENNES INSA-GROUPE UR1-MATH-NUM IRMAR-ANUM
362 View
272 Download

Altmetric

Share

Gmail Facebook X LinkedIn More