Nonlinear Wave Equations for Pressure Wave Propagation in Liquids Containing Gas Bubbles

Tetsuya KANAGAWA; Masao WATANABE; Takeru YANO; Shigeo FUJIKAWA

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Nonlinear Wave Equations for Pressure Wave Propagation in Liquids Containing Gas Bubbles

机译：气泡在含气泡液体中传播的非线性波动方程

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Based on the unified theory by the present authors (Kanagawa et al. , J. Fluid Sci. Tech. , 5, 2010), the Korteweg-de Vries-Burgers (KdVB) equation and the nonlinear Schr?dinger (NLS) equation with an attenuation term for weakly nonlinear waves in bubbly liquids are re-derived from a system of bubble-liquid mixture model equations composed of the conservation equations of mass and momentum, the Keller equation for bubble dynamics, and supplementary equations. We show that the re-derived KdVB equation and NLS equation are essentially the same as those derived from a system of two-fluid model equations except for the coefficients of nonlinear, dissipation, and dispersion terms. The differences in these coefficients are studied in detail, and we find that for the case of KdVB equation, the mixture model is valid only for sufficiently small initial void fractions. On the other hand, for the case of NLS equation, the range of validity of the mixture model depends on not only the initial void fraction but also the wavenumber concerned. 展开▼

机译：基于当前作者的统一理论（神奈川等人，流体科学与技术杂志，2010年5月5日），Korteweg-de Vries-Burgers（KdVB）方程和从气泡-液体混合物模型方程组中重新推导了带有气泡项的弱气泡非线性项的非线性薛定ding（NLS）方程，该方程组由质量和动量守恒方程，气泡动力学的凯勒方程，和补充方程式。我们表明，重新推导的KdVB方程和NLS方程与从两个流体模型方程组导出的基本相同，除了非线性，耗散和色散项的系数。详细研究了这些系数的差异，我们发现对于KdVB方程，混合模型仅对足够小的初始空隙分数有效。另一方面，对于NLS方程，混合模型的有效范围不仅取决于初始空隙率，还取决于相关的波数。展开▼

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《Journal of Fluid Science and Technology》 |2011年第6期|共13页

作者
Tetsuya KANAGAWA; Masao WATANABE; Takeru YANO; Shigeo FUJIKAWA;
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中图分类流体力学;

关键词
BubbleBubbly LiquidGas-Liquid Two-Phase FlowPressure WaveWeakly Nonlinear WaveTwo-Fluid ModelBubble-Liquid Mixture Model;

机译：气泡气泡液体气液两相流动压力波弱非线性波两流体模型气泡液体混合物模型;

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Nonlinear Wave Equations for Pressure Wave Propagation in Liquids Containing Gas Bubbles

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