Desingularization of vortex rings and shallow water vortices by a semilinear elliptic problem

On strong convergence to 3D steady vortex sheets

Jiu, Quansen
Xin, Zhouping

August 2007

AbstractIn this paper, we first establish a strong convergence criterion of approximate solutions fo...

Weak solutions of the three-dimensional vorticity equation with vortex singularities

Winckelmans, G.
Leonard, A.

July 1988

The use of a modified scheme for the dynamics of vortex singularities is shown to lead to a weak sol...

The three-dimensional Euler equations : singular or non-singular?

Gibbon, J. D.
Bustamante, Miguel D.
Kerr, Robert M. (Robert McDougall)

August 2008

One of the outstanding open questions in modern applied mathematics is whether solutions of the inco...

Desingularization of Vortices for the Euler Equation

Smets, Didier
Van Schaftingen, Jean

January 2010

We study the existence of stationary classical solutions of the incompressible Euler equation in the...

A numerical and analytical study of vortex rings with swirl

Alexander Lifschitz
W. Henry Suters
J. Thomas Beale

August 2002

We study the growth of disturbances to vortex rings with swirl, which are exact solutions of the Eul...

Desingularization of a Steady Vortex Pair in the Lake Equation

Dekeyser, Justin

January 2020

We construct a family of steady solutions of the lake model perturbed by some small Coriolis force, ...

Non-Universal and Non-Singular Asymptotics of Interacting Vortex Filaments

Hormoz, Sahand
Brenner, Michael P.

December 2013

AbstractWe present a method for calculating the asymptotic shape of interacting vortex filaments in ...

Leapfrogging vortex rings for the 3-dimensional incompressible Euler equations

Davila, Juan
del Pino, Manuel
Musso, Monica
Wei, Juncheng

July 2022

A classical problem in fluid dynamics concerns the interaction of multiple vortex rings sharing a co...

Gluing methods for Vortex dynamics in Euler flows.

del Pino, Manuel

May 2019

We consider the two-dimensional Euler flow for an incompressible fluid confined to a smooth domain. ...

Evolution of single elliptic vortex rings

Zhao, Y
Shi, XG

January 1997

The evolution of single elliptic vortex rings for initial aspect ratio (AR) = 2,4,6 has been studied...

REGULARIZATION OF POINT VORTICES FOR THE EULER EQUATION IN DIMENSION TWO

Daomin Cao
Zhongyuan Liu
Juncheng Wei

December 2014

Abstract. In this paper, we construct stationary classical solutions of the incompress-ible Euler eq...

Mean Field Limit of Interacting Filaments for 3D Euler Equations

Bessaih H.
Coghi M.
Flandoli F.

January 2019

The 3D Euler equations, precisely local smooth solutions of class H s with s> 5 / 2 are obtained ...

Equimeasurable functions and their application to vortex dynamics in lakes

Dekeyser, Justin

January 2019

We study a variation of the two-dimensional Euler's equations known as the lake model, where the top...

Bidimensional shallow water model with polynomial dependence on depth through vorticity

Rodríguez, J.M.
Taboada-Vázquez, R.

November 2009

AbstractIn this paper, we obtain a bidimensional shallow water model with polynomial dependence on d...

Dynamic depletion of vortex stretching and non-blowup of the 3-D incompressible euler equations

Hou, Thomas Y.
Li, Ruo

January 2006

We study the interplay between the local geometric properties and the non-blowup of the 3D incompres...

On strong convergence to 3D steady vortex sheets

Jiu, Quansen
Xin, Zhouping

August 2007

AbstractIn this paper, we first establish a strong convergence criterion of approximate solutions fo...

Weak solutions of the three-dimensional vorticity equation with vortex singularities

Winckelmans, G.
Leonard, A.

July 1988

The use of a modified scheme for the dynamics of vortex singularities is shown to lead to a weak sol...

The three-dimensional Euler equations : singular or non-singular?

Gibbon, J. D.
Bustamante, Miguel D.
Kerr, Robert M. (Robert McDougall)

August 2008

One of the outstanding open questions in modern applied mathematics is whether solutions of the inco...

Desingularization of Vortices for the Euler Equation

Smets, Didier
Van Schaftingen, Jean

January 2010

We study the existence of stationary classical solutions of the incompressible Euler equation in the...

A numerical and analytical study of vortex rings with swirl

Alexander Lifschitz
W. Henry Suters
J. Thomas Beale

August 2002

We study the growth of disturbances to vortex rings with swirl, which are exact solutions of the Eul...

Desingularization of a Steady Vortex Pair in the Lake Equation

Dekeyser, Justin

January 2020

We construct a family of steady solutions of the lake model perturbed by some small Coriolis force, ...

Non-Universal and Non-Singular Asymptotics of Interacting Vortex Filaments

Hormoz, Sahand
Brenner, Michael P.

December 2013

AbstractWe present a method for calculating the asymptotic shape of interacting vortex filaments in ...

Leapfrogging vortex rings for the 3-dimensional incompressible Euler equations

Davila, Juan
del Pino, Manuel
Musso, Monica
Wei, Juncheng

July 2022

A classical problem in fluid dynamics concerns the interaction of multiple vortex rings sharing a co...

Gluing methods for Vortex dynamics in Euler flows.

del Pino, Manuel

May 2019

We consider the two-dimensional Euler flow for an incompressible fluid confined to a smooth domain. ...

Evolution of single elliptic vortex rings

Zhao, Y
Shi, XG

January 1997

The evolution of single elliptic vortex rings for initial aspect ratio (AR) = 2,4,6 has been studied...

REGULARIZATION OF POINT VORTICES FOR THE EULER EQUATION IN DIMENSION TWO

Daomin Cao
Zhongyuan Liu
Juncheng Wei

December 2014

Abstract. In this paper, we construct stationary classical solutions of the incompress-ible Euler eq...

Mean Field Limit of Interacting Filaments for 3D Euler Equations

Bessaih H.
Coghi M.
Flandoli F.

January 2019

The 3D Euler equations, precisely local smooth solutions of class H s with s> 5 / 2 are obtained ...

Equimeasurable functions and their application to vortex dynamics in lakes

Dekeyser, Justin

January 2019

We study a variation of the two-dimensional Euler's equations known as the lake model, where the top...

Bidimensional shallow water model with polynomial dependence on depth through vorticity

Rodríguez, J.M.
Taboada-Vázquez, R.

November 2009

AbstractIn this paper, we obtain a bidimensional shallow water model with polynomial dependence on d...

Dynamic depletion of vortex stretching and non-blowup of the 3-D incompressible euler equations

Hou, Thomas Y.
Li, Ruo

January 2006

We study the interplay between the local geometric properties and the non-blowup of the 3D incompres...

On strong convergence to 3D steady vortex sheets

Jiu, Quansen
Xin, Zhouping

August 2007

AbstractIn this paper, we first establish a strong convergence criterion of approximate solutions fo...

Weak solutions of the three-dimensional vorticity equation with vortex singularities

Winckelmans, G.
Leonard, A.

July 1988

The use of a modified scheme for the dynamics of vortex singularities is shown to lead to a weak sol...

The three-dimensional Euler equations : singular or non-singular?

Gibbon, J. D.
Bustamante, Miguel D.
Kerr, Robert M. (Robert McDougall)

August 2008

One of the outstanding open questions in modern applied mathematics is whether solutions of the inco...

Desingularization of vortex rings and shallow water vortices by a semilinear elliptic problem

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Desingularization of vortex rings and shallow water vortices by a semilinear elliptic problem

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