We cons i der the motion of a vortex sheet on the surface of a unit sphere in the presence of point vortices xed on north and south poles.Analytic and numerical research revealed that a vortex sheet in two-dimensional space has the following three properties.First,the vortex sheet is linearly unstable due to Kelvin-Helmholtz instability.Second,the curvature of the vortex sheet diverges in nite time.Last,the vortex sheet evolves into a rolling-up doubly branched spiral,when the equation of motion is regularized by the vortex method.The purpose of this article is to investigate how the curvature of the sphere and the presence of the pole vortices
We derive the conditions for the stability of strips or filaments of vorticity on the surface of a s...
The Kelvin-Helmholtz model for the evolution of an infinitesimally thin vortex sheet in an inviscid ...
Copyright © 1998 Cambridge University Press. Published version reproduced with the permission of the...
We consider the motion of a vortex sheet on the surface of a unit sphere in the presence of point vo...
This article revisits the instability of sharp shear interfaces in incompressible fluids, which are ...
The nonlinear evolution of a vortex sheet driven by the Kelvin--Helmholtz instability is characteriz...
It is shown that if a doubly-infinite vortex sheet has cylindrical shape and strength distributions ...
We study the evolution of a 2D vortex layer at high Reynolds number. Vortex layer flows are characte...
A vortex sheet is a surface across which the velocity field of incompressible and inviscid flows has...
We derive the conditions for the stability of strips or filaments of vorticity on the surface of a s...
We develop a mathematical framework for the dynamics of a set of point vortices on a class of differ...
In this thesis, we investigate both theoretically and numerically the singularity formation and long...
The vortex sheet roll-up characteristic of large amplitude Kelvin-Helmholtz instability is simulated...
We study the evolution of vortex sheets according to the Birkhoff-Rott equation, which describe the ...
Point vortex and vortex blob computations are used to investigate the evolution of the planar and th...
We derive the conditions for the stability of strips or filaments of vorticity on the surface of a s...
The Kelvin-Helmholtz model for the evolution of an infinitesimally thin vortex sheet in an inviscid ...
Copyright © 1998 Cambridge University Press. Published version reproduced with the permission of the...
We consider the motion of a vortex sheet on the surface of a unit sphere in the presence of point vo...
This article revisits the instability of sharp shear interfaces in incompressible fluids, which are ...
The nonlinear evolution of a vortex sheet driven by the Kelvin--Helmholtz instability is characteriz...
It is shown that if a doubly-infinite vortex sheet has cylindrical shape and strength distributions ...
We study the evolution of a 2D vortex layer at high Reynolds number. Vortex layer flows are characte...
A vortex sheet is a surface across which the velocity field of incompressible and inviscid flows has...
We derive the conditions for the stability of strips or filaments of vorticity on the surface of a s...
We develop a mathematical framework for the dynamics of a set of point vortices on a class of differ...
In this thesis, we investigate both theoretically and numerically the singularity formation and long...
The vortex sheet roll-up characteristic of large amplitude Kelvin-Helmholtz instability is simulated...
We study the evolution of vortex sheets according to the Birkhoff-Rott equation, which describe the ...
Point vortex and vortex blob computations are used to investigate the evolution of the planar and th...
We derive the conditions for the stability of strips or filaments of vorticity on the surface of a s...
The Kelvin-Helmholtz model for the evolution of an infinitesimally thin vortex sheet in an inviscid ...
Copyright © 1998 Cambridge University Press. Published version reproduced with the permission of the...