电场中电极-磁流体界面处自振荡的实验研究与数学建模

V. Chekanov, E. Kirillova, A. Kovalenko, E. Diskaeva
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引用次数: 1

摘要

本文以非线性偏微分方程组的边值问题的形式描述了自振荡的数学模型,并给出了数值解。将数值结果与实验数据进行了比较,验证了模型的充分性。该模型采用经典的物质平衡微分方程组、能-普朗克方程和泊松方程,没有进行简化或拟合参数。本文研究了磁场作用下磁流体分散相颗粒层与电极界面处的浓度自振荡参数。为此,我们建立了一个数学模型,并通过相应的物理机制证实了模型的一致性。通过数值实验,我们找到了自激振荡开始的电位跳变临界值。我们还确定了振荡生长周期和过程的其他特征。我们开发了名为AutoWave01的软件,具有直观的用户界面和先进的功能,用于研究磁性胶体薄层中的自振荡。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Experimental study and mathematical modelling of self-oscillation at the electrode-magnetic fluid interface in an electric field
The article describes a mathematical model of self-oscillation in the form of a boundary value problem for a nonlinear system of partial differential equations, with a numerical solution. The numerical results were compared to the experimental data to confirm the adequacy of the model. The model uses the classical system of differential equations of material balance, Nernst-Planck and Poisson equations without simplifications or fitting parameters. The aim of the article was to study the parameters of concentration self-oscillation in a layer of the dispersed phase particles of magnetic fluid at the interface with an electrode in an electric field. For this purpose, we developed a mathematical model, the consistency of which wasconfirmed by the corresponding physical mechanism.As a result of numerical experiments, we found the critical value of the potential jump after which self-oscillation began. We also determined the oscillation growth period and other characteristics of the process. We developed software called AutoWave01 with an intuitive user interface and advanced functionality for the study of self-oscillation in a thin layer of magnetic colloid.
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