Regularization for point vortices on $\mathbb S^2$
Abstract
We construct a series of patch type solutions for incompressible Euler equation on , which constitutes the regularization for steady or traveling point vortex systems. We first prove the existence of -fold symmetric patch solutions, whose limit is the well-known von K\'arm\'an point vortex street on ; then we consider the general steady case, where besides a non-localized part induced by the sphere rotation, positive and negative patches are located near a nondegenerate critical point of the Kirchhoff--Routh function on . Our construction is accomplished by Lyapunov--Schmidt reduction argument, where the traveling speed or vortex patch location are used to eliminate the degenerate direction of a linearized operator. We also show that the boundary of each vortex patch is a close curve, which is a perturbation of a small ellipse in the spherical coordinates. As far as we know, this is the first attempt for a regularization of the point-vortex equilibria on .
Cite
@article{arxiv.2411.11388,
title = {Regularization for point vortices on $\mathbb S^2$},
author = {Takashi Sakajo and Changjun Zou},
journal= {arXiv preprint arXiv:2411.11388},
year = {2024}
}
Comments
31 pages