Add to ORKGWe consider the vortex patch problem for both the 2-D and 3-D incompressible Euler equations. In 2-D, we prove that for vortex patches with $H^{k-0.5}$ Sobolev-class contour regularity, $k \ge 4$, the velocity field on both sides of the vortex patch boundary has $H^k$ regularity for all time. In 3-D, we establish existence of solutions to the vortex patch problem on a finite-time interval $[0,T]$, and we simultaneously establish the $H^{k-0.5}$ regularity of the two-dimensional vortex patch boundary, as well as the $H^k$ regularity of the velocity fields on both sides of vortex patch boundary, for $k \ge 3$
One of the most challenging questions in fluid dynamics is whether the incompressible Euler equation...
The resolvability and differential properties in the solution of the boudary problems for Euler equa...
International audienceThis numerical study aims at getting further insight into singular solutions o...
International audienceWe study in this paper the vortex patch problem for the stratified Euler equat...
In 1993, two proofs of the persistence of regularity of the boundary of a classical vortex patch for...
In this note, we show that if the initial vorticity ! 0 is a C ff(\Omega 0 ) non-constant patch, i...
The regularity of 3D vortex patches, which are weak solutions to the three dimensional incompressibl...
AbstractWe study the evolution of the Hölderian regularity for some convection–diffusion equation wi...
International audienceWe obtain a result about propagation of geometric properties for solutions of ...
En dimension trois d'espace, le système d'Euler incompressible avec une donnée de type poche de tour...
My thesis is devoted to the study of some problems related to the stability of the vortex patches st...
We study the convergence rate of the solutions of the incompressible Euler-α, an inviscid second-gra...
We consider the two-dimensional incompressible Euler equations. We construct vortex patches with smo...
We consider a family of contour dynamics equations depending on a parameter α with 0<α⩽1. The vortex...
AbstractWe consider a family of contour dynamics equations depending on a parameter α with 0<α⩽1. Th...
One of the most challenging questions in fluid dynamics is whether the incompressible Euler equation...
The resolvability and differential properties in the solution of the boudary problems for Euler equa...
International audienceThis numerical study aims at getting further insight into singular solutions o...
International audienceWe study in this paper the vortex patch problem for the stratified Euler equat...
In 1993, two proofs of the persistence of regularity of the boundary of a classical vortex patch for...
In this note, we show that if the initial vorticity ! 0 is a C ff(\Omega 0 ) non-constant patch, i...
The regularity of 3D vortex patches, which are weak solutions to the three dimensional incompressibl...
AbstractWe study the evolution of the Hölderian regularity for some convection–diffusion equation wi...
International audienceWe obtain a result about propagation of geometric properties for solutions of ...
En dimension trois d'espace, le système d'Euler incompressible avec une donnée de type poche de tour...
My thesis is devoted to the study of some problems related to the stability of the vortex patches st...
We study the convergence rate of the solutions of the incompressible Euler-α, an inviscid second-gra...
We consider the two-dimensional incompressible Euler equations. We construct vortex patches with smo...
We consider a family of contour dynamics equations depending on a parameter α with 0<α⩽1. The vortex...
AbstractWe consider a family of contour dynamics equations depending on a parameter α with 0<α⩽1. Th...
One of the most challenging questions in fluid dynamics is whether the incompressible Euler equation...
The resolvability and differential properties in the solution of the boudary problems for Euler equa...
International audienceThis numerical study aims at getting further insight into singular solutions o...