Thermal vortex ring: vortex-dynamics analysis of a high-resolution simulation

IF 3.6 2区 工程技术 Q1 MECHANICS
Jun-Ichi Yano, Hugh Morrison
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引用次数: 0

Abstract

A high-resolution simulation of a thermal vortex ring is analysed from the point of view of the vortex dynamics. A power-spectrum analysis of vortex-ring sections suggests that the simulated flows are overall ‘two dimensional’ in the large-scale limit, being dominated by axisymmetric components, but with a substantial contribution from the non-axisymmetric component at small scales. Contribution of the non-axisymmetric components is negligible in budgets of volume integrals of the vorticity and potential vorticity as well as the impulse (moments of the vorticity weighted by $s^n$ with $n=-1$ , 0, 1, where $s$ is the distance from the vertical axis of the vortex ring). A concise description of the dynamics is obtained as a function of geometrical factors together with these three integral variables. Analysis shows that the geometrical factors are fairly close to constant with time, and thus, a redundant closed description of the system is obtained in the similarity regime after spin up of the vortex ring. This redundancy leads to a constraint on the geometrical factors, which is reasonably satisfied by the simulation. A closed description is also obtained over the initial spin-up period of the vortex ring by adding a phenomenologically derived prognostic equation for the source for the volume integral of the potential vorticity (with $n=-1$ ). Analysis of the budget supports this description.
热涡流环:高分辨率模拟的涡流动力学分析
从涡旋动力学的角度分析了热涡旋环的高分辨率模拟。对涡环截面的功率谱分析表明,模拟流动在大尺度极限下总体上是 "二维 "的,主要由轴对称分量构成,但在小尺度下非轴对称分量也有很大贡献。非轴对称成分的贡献在涡度和潜在涡度的体积积分以及脉冲(涡度的矩加权 $s^n$ ,$n=-1$ ,0,1,其中 $s$ 是涡环垂直轴的距离)预算中可以忽略不计。作为几何因素与这三个积分变量的函数,可以得到动力学的简明描述。分析表明,几何因子相当接近于随时间变化的常数,因此,在涡旋环旋转起来之后的相似状态下,可以得到系统的冗余封闭描述。这种冗余导致了对几何因子的约束,而模拟结果合理地满足了这一约束。通过为潜在涡度的体积积分源($n=-1$)添加一个现象学推导的预报方程,还可以获得涡环初始旋升期的封闭描述。预算分析支持这一描述。
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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来源期刊
CiteScore
6.50
自引率
27.00%
发文量
945
审稿时长
5.1 months
期刊介绍: Journal of Fluid Mechanics is the leading international journal in the field and is essential reading for all those concerned with developments in fluid mechanics. It publishes authoritative articles covering theoretical, computational and experimental investigations of all aspects of the mechanics of fluids. Each issue contains papers on both the fundamental aspects of fluid mechanics, and their applications to other fields such as aeronautics, astrophysics, biology, chemical and mechanical engineering, hydraulics, meteorology, oceanography, geology, acoustics and combustion.
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