Add to ORKGThe two-dimensional Navier-Stokes equations are rewritten as a system of coupled nonlinear ordinary differential equations. These equations describe the evolution of the moments of an expansion of the vorticity with respect to Hermite functions and of the centers of vorticity concentrations. We prove the convergence of this expansion and show that in the zero viscosity and zero core size limit we formally recover the Helmholtz-Kirchhoff model for the evolution of point vortices. The present expansion systematically incorporates the effects of both viscosity and finite vortex core size. We also show that a low-order truncation of our expansion leads to the representation of the flow as a system of interacting Gaussian (i.e., Oseen) vortices,...
Both experimental and numerical studies of fluid motion indicate that initially localized regions of...
European Physical Journal B 86 (3), 1-14 (2013)International audienceThe complex interactions of lo...
Previous high-resolution contour dynamics calculations [Dritschel and Waugh, Phys. Fluids A 4, 1737 ...
The two-dimensional Navier-Stokes equations are rewritten as a system of coupled nonlinear ordinary ...
We consider the inviscid limit for the two-dimensional incompressible Navier-Stokes equa-tion in the...
We study the evolution of solutions to the 2D Euler equations whose vorticity is sharply concentrate...
In this article we describe the system of point vortices, derived by Helmholtz from the Euler equati...
An approximate solution to the two-dimensional incompressible fluid equations is constructed by expa...
Copyright © 2009 Cambridge University PressThe spreading and diffusion of two-dimensional vortices s...
Summary. The Helmholtz-Kirchhoff ODEs governing the planar motion of N point vortices in an ideal, i...
The point vortex model predicts that a certain configuration of three point vortices leads to a coll...
Nonequilibrium statistical models of point vortex systems are constructed using an optimal closure m...
We develop a nonequilibrium statistical mechanical description of the evolution of point vortex syst...
In this paper we introduce simplified, combinatorially exact formulas that arise in the vortex inter...
In this paper we perform Direct Statistical Simulations of a model of two-dimensional flow that exhi...
Both experimental and numerical studies of fluid motion indicate that initially localized regions of...
European Physical Journal B 86 (3), 1-14 (2013)International audienceThe complex interactions of lo...
Previous high-resolution contour dynamics calculations [Dritschel and Waugh, Phys. Fluids A 4, 1737 ...
The two-dimensional Navier-Stokes equations are rewritten as a system of coupled nonlinear ordinary ...
We consider the inviscid limit for the two-dimensional incompressible Navier-Stokes equa-tion in the...
We study the evolution of solutions to the 2D Euler equations whose vorticity is sharply concentrate...
In this article we describe the system of point vortices, derived by Helmholtz from the Euler equati...
An approximate solution to the two-dimensional incompressible fluid equations is constructed by expa...
Copyright © 2009 Cambridge University PressThe spreading and diffusion of two-dimensional vortices s...
Summary. The Helmholtz-Kirchhoff ODEs governing the planar motion of N point vortices in an ideal, i...
The point vortex model predicts that a certain configuration of three point vortices leads to a coll...
Nonequilibrium statistical models of point vortex systems are constructed using an optimal closure m...
We develop a nonequilibrium statistical mechanical description of the evolution of point vortex syst...
In this paper we introduce simplified, combinatorially exact formulas that arise in the vortex inter...
In this paper we perform Direct Statistical Simulations of a model of two-dimensional flow that exhi...
Both experimental and numerical studies of fluid motion indicate that initially localized regions of...
European Physical Journal B 86 (3), 1-14 (2013)International audienceThe complex interactions of lo...
Previous high-resolution contour dynamics calculations [Dritschel and Waugh, Phys. Fluids A 4, 1737 ...