Add to ORKGWe consider the system of the N vortex points with the identical strength on a sphere. As a local effect of the rotation of the sphere, we fix vortex points at the both poles, which are called the pole vortices. When the N vortex points are equally spaced along the line of latitude of the sphere, the configuration is called the “N-ring ” or “N-gon”. It is a relative fixed configuration[3,4] and its linear and nonlinear stability in the presence of the pole vortices are investigated well[1,2,5]; The stability of the N-ring is determined by the strengths of the pole vortices and the latitude where the N-ring lies. This talk gives a systematic reduction method of the N vortex problem to invariant dynamical systems based on the linear stability...
The paper is devoted to stability of the stationary rotation of a system of equal point vortices loc...
We study the dynamics of point vortices with discrete symmetry of rotation. In the case of two rings...
We study the dynamics of N point vortices on a rotating sphere. The Hamiltonian system becomes infin...
We are concerned with the system of the $N$ vortex points on a sphere with two fixed vortex points ...
We study the motion of N point vortices with N∈ℕ on a sphere in the presence of fixed pole vortices,...
We study the motion of $N$ point vortices with $N\in\Nset$ on a sphere in the presence of fixed pol...
This paper deal with the motion of a polygonal ring of identical vortex points that are equally spac...
We study the evolution of N-point vortices in ring formation embedded in a background flowfield that...
We consider the motion of the $N$-vortex points that are equally spaced along a line of latitude on ...
We study the motion of a polygonal ring consists of identical vortex points that are equally spaced ...
Colloque avec actes et comité de lecture. Internationale.International audienceThe paper is devoted ...
Abstract. We study the nonlinear stability of relative equilibria of configurations of identical poi...
We describe the linear and nonlinear stability and instability of certain configurations of point vo...
We consider the motion of the $N$-vortex points that are equally spaced along a line of latitude on...
We describe the linear and nonlinear stability and instability of certain symmetric configurations o...
The paper is devoted to stability of the stationary rotation of a system of equal point vortices loc...
We study the dynamics of point vortices with discrete symmetry of rotation. In the case of two rings...
We study the dynamics of N point vortices on a rotating sphere. The Hamiltonian system becomes infin...
We are concerned with the system of the $N$ vortex points on a sphere with two fixed vortex points ...
We study the motion of N point vortices with N∈ℕ on a sphere in the presence of fixed pole vortices,...
We study the motion of $N$ point vortices with $N\in\Nset$ on a sphere in the presence of fixed pol...
This paper deal with the motion of a polygonal ring of identical vortex points that are equally spac...
We study the evolution of N-point vortices in ring formation embedded in a background flowfield that...
We consider the motion of the $N$-vortex points that are equally spaced along a line of latitude on ...
We study the motion of a polygonal ring consists of identical vortex points that are equally spaced ...
Colloque avec actes et comité de lecture. Internationale.International audienceThe paper is devoted ...
Abstract. We study the nonlinear stability of relative equilibria of configurations of identical poi...
We describe the linear and nonlinear stability and instability of certain configurations of point vo...
We consider the motion of the $N$-vortex points that are equally spaced along a line of latitude on...
We describe the linear and nonlinear stability and instability of certain symmetric configurations o...
The paper is devoted to stability of the stationary rotation of a system of equal point vortices loc...
We study the dynamics of point vortices with discrete symmetry of rotation. In the case of two rings...
We study the dynamics of N point vortices on a rotating sphere. The Hamiltonian system becomes infin...