Singular Vortex Pairs Follow Magnetic Geodesics

Pub Date : 2024-05-23 DOI:10.1093/imrn/rnae106

Theodore D Drivas, Daniil Glukhovskiy, Boris Khesin

引用次数: 0

Abstract

We consider pairs of point vortices having circulations $\Gamma _{1}$ and $\Gamma _{2}$ and confined to a two-dimensional surface $S$. In the limit of zero initial separation $\varepsilon $, we prove that they follow a magnetic geodesic in unison, if properly renormalized. Specifically, the “singular vortex pair” moves as a single-charged particle on the surface with a charge of order $1/\varepsilon ^{2}$ in an magnetic field $B$ that is everywhere normal to the surface and of strength $|B|=\Gamma _{1} +\Gamma _{2}$. In the case $\Gamma _{1}=-\Gamma _{2}$, this gives another proof of Kimura’s conjecture [11] that singular dipoles follow geodesics.

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奇异涡旋对遵循磁性大地线

我们考虑了一对具有$\Gamma _{1}$和$\Gamma _{2}$循环并被限制在二维表面$S$上的点涡旋。在初始分离度 $\varepsilon $ 为零的极限下，我们证明，如果适当地重新规范化，它们会一致地沿着磁性大地线运动。具体地说，"奇异涡旋对 "作为表面上的单电荷粒子运动，其电荷量级为 $1/\varepsilon ^{2}$，在磁场$B$中运动，该磁场的强度为$|B|=\Gamma _{1}+\Gamma _{2}$。在 $\Gamma _{1}=-\Gamma _{2}$ 的情况下，这给出了木村猜想[11]的另一个证明，即奇异偶极子遵循大地线。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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