理想流体运动中的共轭点和切点

IF 0.5 Q3 MATHEMATICS
Theodore D. Drivas, Gerard Misiołek, Bin Shi, Tsuyoshi Yoneda
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引用次数: 9

摘要

如果有一个单参数的测地线族(流体流)将两种流体配置连接到无穷小阶,则沿流的两种流体构型是共轭的。在几何上,它们可以被视为(无限维)保体积微分同胚群的结果,该群具有足够强的正曲率,将附近的流“拉”在一起。从物理上讲,它们表明了粒子位置配置空间中的一种形式的(瞬态)稳定性:从相同配置开始的一系列流最初偏离,随后在稍后的某个时刻相互重新收敛(共振)。在这里,我们首先在任意长宽比的矩形扁环面上建立了无限族Kolmogorov流——欧拉方程的一类平稳解——中共轭点的存在性。在保体积微分同胚群中识别共轭点的一般准则有助于分析。接下来,我们证明了环空、圆盘和通道上沿Arnold稳定稳态不存在共轭点。最后,我们讨论了切点,它们与指数映射的非内射性的关系(在给定时刻不可能从粒子配置确定流),并表明最接近恒等式的切点是共轭点或时间周期拉格朗日流体流的中点。
本文章由计算机程序翻译,如有差异,请以英文原文为准。

Conjugate and cut points in ideal fluid motion

Conjugate and cut points in ideal fluid motion

Two fluid configurations along a flow are conjugate if there is a one parameter family of geodesics (fluid flows) joining them to infinitesimal order. Geometrically, they can be seen as a consequence of the (infinite dimensional) group of volume preserving diffeomorphisms having sufficiently strong positive curvatures which ‘pull’ nearby flows together. Physically, they indicate a form of (transient) stability in the configuration space of particle positions: a family of flows starting with the same configuration deviate initially and subsequently re-converge (resonate) with each other at some later moment in time. Here, we first establish existence of conjugate points in an infinite family of Kolmogorov flows—a class of stationary solutions of the Euler equations—on the rectangular flat torus of any aspect ratio. The analysis is facilitated by a general criterion for identifying conjugate points in the group of volume preserving diffeomorphisms. Next, we show non-existence of conjugate points along Arnold stable steady states on the annulus, disk and channel. Finally, we discuss cut points, their relation to non-injectivity of the exponential map (impossibility of determining a flow from a particle configuration at a given instant) and show that the closest cut point to the identity is either a conjugate point or the midpoint of a time periodic Lagrangian fluid flow.

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来源期刊
CiteScore
1.10
自引率
0.00%
发文量
19
期刊介绍: The goal of the Annales mathématiques du Québec (formerly: Annales des sciences mathématiques du Québec) is to be a high level journal publishing articles in all areas of pure mathematics, and sometimes in related fields such as applied mathematics, mathematical physics and computer science. Papers written in French or English may be submitted to one of the editors, and each published paper will appear with a short abstract in both languages. History: The journal was founded in 1977 as „Annales des sciences mathématiques du Québec”, in 2013 it became a Springer journal under the name of “Annales mathématiques du Québec”. From 1977 to 2018, the editors-in-chief have respectively been S. Dubuc, R. Cléroux, G. Labelle, I. Assem, C. Levesque, D. Jakobson, O. Cornea. Les Annales mathématiques du Québec (anciennement, les Annales des sciences mathématiques du Québec) se veulent un journal de haut calibre publiant des travaux dans toutes les sphères des mathématiques pures, et parfois dans des domaines connexes tels les mathématiques appliquées, la physique mathématique et l''informatique. On peut soumettre ses articles en français ou en anglais à l''éditeur de son choix, et les articles acceptés seront publiés avec un résumé court dans les deux langues. Histoire: La revue québécoise “Annales des sciences mathématiques du Québec” était fondée en 1977 et est devenue en 2013 une revue de Springer sous le nom Annales mathématiques du Québec. De 1977 à 2018, les éditeurs en chef ont respectivement été S. Dubuc, R. Cléroux, G. Labelle, I. Assem, C. Levesque, D. Jakobson, O. Cornea.
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