A novel subclass of exact solutions to the Euler equations in two dimensions has been put forward recently [D. Crowdy, "A class of exact multipolar vortices," Phys. Fluids 11, 2556 (1999)]. The solutions show vortical equilibria which can be described by only two parameters. The first one designates the multipolar aspect of these equilibria, i.e., the number of point vortices involved, while the other parameter signatures the shape of the finite area of uniform vorticity in which the point vortices are embedded. The main aspect of these equilibria is that the vortical configuration is static, meaning that the velocity induced at the patch edge, outside the vortical area, and also at the locations of the point vortices is zero. We show with ...
Herein we study the general interaction of two vortex patches in a single-layer quasi-geostrophic sh...
In this thesis we study the coherent vortices of a two-dimensional incompressible ideal fluid (the E...
In this dissertation, we are concerned with the vortex dynamics for some equations arising in fluid ...
A novel subclass of exact solutions to the Euler equations in two dimensions has been put forward re...
The classical problem of point vortex equilibria has inspired many studies and the discovery of vari...
We examine the form, properties, stability and evolution of simply-connected vortex-patch relative q...
A new family of exact solutions to the two-dimensional steady incompressible Euler equation is prese...
This dissertation focuses on the development of theoretical and numerical methodologies to study equ...
The shapes and properties of two equal corotating uniform vortices, rotating steadily about each oth...
We study how a general steady configuration of finitely many point vortices, with Newtonian interact...
We investigate the stability of circular point vortex arrays and their evolution when their dynamics...
We examine the equilibrium forms, linear stability and nonlinear evolution of two patches having opp...
Equilibrium shapes of two-dimensional rotating configurations of uniform vortices are numerically ca...
We give a rigorous construction of solutions to the Euler point vortices system in which three vorti...
AbstractWe consider the problem of finding steady states of the two-dimensional Euler equation from ...
Herein we study the general interaction of two vortex patches in a single-layer quasi-geostrophic sh...
In this thesis we study the coherent vortices of a two-dimensional incompressible ideal fluid (the E...
In this dissertation, we are concerned with the vortex dynamics for some equations arising in fluid ...
A novel subclass of exact solutions to the Euler equations in two dimensions has been put forward re...
The classical problem of point vortex equilibria has inspired many studies and the discovery of vari...
We examine the form, properties, stability and evolution of simply-connected vortex-patch relative q...
A new family of exact solutions to the two-dimensional steady incompressible Euler equation is prese...
This dissertation focuses on the development of theoretical and numerical methodologies to study equ...
The shapes and properties of two equal corotating uniform vortices, rotating steadily about each oth...
We study how a general steady configuration of finitely many point vortices, with Newtonian interact...
We investigate the stability of circular point vortex arrays and their evolution when their dynamics...
We examine the equilibrium forms, linear stability and nonlinear evolution of two patches having opp...
Equilibrium shapes of two-dimensional rotating configurations of uniform vortices are numerically ca...
We give a rigorous construction of solutions to the Euler point vortices system in which three vorti...
AbstractWe consider the problem of finding steady states of the two-dimensional Euler equation from ...
Herein we study the general interaction of two vortex patches in a single-layer quasi-geostrophic sh...
In this thesis we study the coherent vortices of a two-dimensional incompressible ideal fluid (the E...
In this dissertation, we are concerned with the vortex dynamics for some equations arising in fluid ...