Add to ORKGWe study the evolution of solutions to the 2D Euler equations whose vorticity is sharply concentrated in the Wasserstein sense around a finite number of points. Under the assumption that the vorticity is merely $L^p$ integrable for some $p>2$, we show that the evolving vortex regions remain concentrated around points, and these points are close to solutions to the Helmholtz--Kirchhoff point vortex system.Comment: Minor revisio
Point-vortex dynamics describe idealized, non-smooth solutions to the incompressible Euler equations...
We discuss the Lagrangian property and the conservation of the kinetic energy for solutions of the 2...
A new family of exact solutions to the two-dimensional steady incompressible Euler equation is prese...
In this article we describe the system of point vortices, derived by Helmholtz from the Euler equati...
Within the incompressible three-dimensional Euler equations, we study the pancake-like high vorticit...
The two-dimensional Navier-Stokes equations are rewritten as a system of coupled nonlinear ordinary ...
In this dissertation, we study some problems related to vortex dynamics in two equations for two-dim...
AbstractThe motion of a finite number of point vortices on a two-dimensional periodic domain is cons...
European Physical Journal B 86 (3), 1-14 (2013)International audienceThe complex interactions of lo...
We give a vorticity-dynamical proof of $C^1\cap H^2$-illposedness of the 2D Euler equations. Our con...
We prove a mean field limit, a law of large numbers and a central limit theorem for a system of poin...
We consider weak solutions of the 2-D incompressible Euler equations with compactly supported initia...
37pIn this article we examine the interaction of incompressible 2D flows with compact material bound...
We point out an interesting connection between fluid dynamics and minimal surface theory: When gluin...
The global asymptotic dynamics of point vortices for the lake equations is rigorously derived. Vorti...
Point-vortex dynamics describe idealized, non-smooth solutions to the incompressible Euler equations...
We discuss the Lagrangian property and the conservation of the kinetic energy for solutions of the 2...
A new family of exact solutions to the two-dimensional steady incompressible Euler equation is prese...
In this article we describe the system of point vortices, derived by Helmholtz from the Euler equati...
Within the incompressible three-dimensional Euler equations, we study the pancake-like high vorticit...
The two-dimensional Navier-Stokes equations are rewritten as a system of coupled nonlinear ordinary ...
In this dissertation, we study some problems related to vortex dynamics in two equations for two-dim...
AbstractThe motion of a finite number of point vortices on a two-dimensional periodic domain is cons...
European Physical Journal B 86 (3), 1-14 (2013)International audienceThe complex interactions of lo...
We give a vorticity-dynamical proof of $C^1\cap H^2$-illposedness of the 2D Euler equations. Our con...
We prove a mean field limit, a law of large numbers and a central limit theorem for a system of poin...
We consider weak solutions of the 2-D incompressible Euler equations with compactly supported initia...
37pIn this article we examine the interaction of incompressible 2D flows with compact material bound...
We point out an interesting connection between fluid dynamics and minimal surface theory: When gluin...
The global asymptotic dynamics of point vortices for the lake equations is rigorously derived. Vorti...
Point-vortex dynamics describe idealized, non-smooth solutions to the incompressible Euler equations...
We discuss the Lagrangian property and the conservation of the kinetic energy for solutions of the 2...
A new family of exact solutions to the two-dimensional steady incompressible Euler equation is prese...