被气流包围的液体环形射流中瞬态增长的非模式分析

IF 4.1 2区 工程技术 Q1 MECHANICS
Dong-qi Huang, Zi-xuan Fang, Tao Hu, Qingfei Fu, Lijun Yang
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引用次数: 0

摘要

瞬态能量增长是许多流体流动系统中常见的数学概念,近年来人们利用非模态分析对其进行了广泛研究。非模态分析可以表征扰动的短期能量放大,它受到雷诺数、韦伯数和初始条件(如波长)的影响。在气液同轴喷嘴中,经常会产生环形射流,其破裂过程受到瞬态能量增长的影响。然而,迄今为止这方面的研究还很有限。本文首次研究了环形液体射流在静态气体中的瞬态能量增长,并使用改进的环形射流模型进行了验证。在推导过程中,考虑了环形液膜内外的气液界面。研究发现,在一定的雷诺数和韦伯数下存在一个最佳初始条件。雷诺数和环形射流内外半径比的增大可使特定初始波数下的瞬态增长最大化,而气/液密度比和韦伯数的增大将使瞬态增长最小化。研究还发现,瞬态能量增长是由自由边界的位移引起的。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Non-modal analysis of transient growth in a liquid annular jet surrounded by gas flow
Transient energy growth is a common mathematical concept in many fluid flow systems, and it has been widely investigated in recent years using non-modal analysis. Non-modal analysis can characterize the short-term energy amplification of perturbations, which is influenced by the Reynolds number, the Weber number, and the initial conditions such as the wavenumber. In gas–liquid coaxial nozzles, annular jets are often produced, and their breakup process is influenced by transient energy growth. However, research in this area has been limited so far. This paper for the first time investigates the transient energy growth of an annular liquid jet in static gas and validates it using a modified annular jet model. In the derivation process, the gas–liquid interfaces inside and outside the annular liquid film are taken into account. It has been found that there exists an optimal initial condition for a certain Reynolds number and a Weber number. The increase in the Reynolds number and ratio of inner and outer radius of the annular jet can maximize the transient growth under a specific initial wavenumber, while the increase in gas/liquid density ratio and the Weber number will minimize the transient growth. It is also found that transient energy growth is caused by the displacement of the free boundary.
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来源期刊
Physics of Fluids
Physics of Fluids 物理-力学
CiteScore
6.50
自引率
41.30%
发文量
2063
审稿时长
2.6 months
期刊介绍: Physics of Fluids (PoF) is a preeminent journal devoted to publishing original theoretical, computational, and experimental contributions to the understanding of the dynamics of gases, liquids, and complex or multiphase fluids. Topics published in PoF are diverse and reflect the most important subjects in fluid dynamics, including, but not limited to: -Acoustics -Aerospace and aeronautical flow -Astrophysical flow -Biofluid mechanics -Cavitation and cavitating flows -Combustion flows -Complex fluids -Compressible flow -Computational fluid dynamics -Contact lines -Continuum mechanics -Convection -Cryogenic flow -Droplets -Electrical and magnetic effects in fluid flow -Foam, bubble, and film mechanics -Flow control -Flow instability and transition -Flow orientation and anisotropy -Flows with other transport phenomena -Flows with complex boundary conditions -Flow visualization -Fluid mechanics -Fluid physical properties -Fluid–structure interactions -Free surface flows -Geophysical flow -Interfacial flow -Knudsen flow -Laminar flow -Liquid crystals -Mathematics of fluids -Micro- and nanofluid mechanics -Mixing -Molecular theory -Nanofluidics -Particulate, multiphase, and granular flow -Processing flows -Relativistic fluid mechanics -Rotating flows -Shock wave phenomena -Soft matter -Stratified flows -Supercritical fluids -Superfluidity -Thermodynamics of flow systems -Transonic flow -Turbulent flow -Viscous and non-Newtonian flow -Viscoelasticity -Vortex dynamics -Waves
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