轴向余弦振荡圆柱体上非定常Maxwell斜驻点流动的Chebyshev谱法

Q4 Mathematics

应用数学和力学 Pub Date : 2023-01-01 DOI:10.21656/1000-0887.430361

BAI Yu, TANG Qiaoli, ZHANG Yan

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引用次数: 0

摘要

研究了麦克斯韦流体冲击轴向余弦振荡圆柱体时的斜驻点流动。首先，根据斜驻点流动特性，利用圆柱坐标系下得到的二阶压力微分方程对压力进行修正;在此基础上，建立了振荡圆柱上非定常麦克斯韦流体的边界层模型。通过合理的相似变换对模型进行转换，利用切比雪夫谱法得到数值解。结果表明，靠近圆柱体表面的流体随圆柱体周期性运动。圆柱体曲率越大，流体颗粒在同一时间处于同一位置的速度越高。相反，非定常参数和流体的记忆特性阻碍了流体更靠近汽缸壁。

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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A Chebyshev Spectral Method for the Unsteady Maxwell Oblique Stationary Point Flow on an Axially Cosine Oscillating Cylinder

The oblique stationary point flow of the Maxwell fluid impacting an axially cosine oscillating cylinder was studied. Firstly, based on the oblique stationary point flow characteristics, the pressure was corrected with the 2ndorder ordinary differential equation of pressure obtained in the cylindrical coordinate system. Later, the boundary layer model for the unsteady Maxwell fluid on an oscillating cylinder was established. The model was converted through the reasonable similarity transform, and the numerical solutions were obtained with the Chebyshev spectral method. The results show that, the fluid near the surface of the cylinder moves periodically with the cylinder. The larger the curvature of the cylinder is, the higher the velocity of the fluid particle will be in the same position at the same time. In contrast, the unsteady state parameter and the memory properties of the fluid hinder the flow closer to the cylinder wall.

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来源期刊

应用数学和力学 Mathematics-Applied Mathematics

CiteScore

1.20

自引率

0.00%

发文量

6042

期刊介绍： Applied Mathematics and Mechanics was founded in 1980 by CHIEN Wei-zang, a celebrated Chinese scientist in mechanics and mathematics. The current editor in chief is Professor LU Tianjian from Nanjing University of Aeronautics and Astronautics. The Journal was a quarterly in the beginning, a bimonthly the next year, and then a monthly ever since 1985. It carries original research papers on mechanics, mathematical methods in mechanics and interdisciplinary mechanics based on artificial intelligence mathematics. It also strengthens attention to mechanical issues in interdisciplinary fields such as mechanics and information networks, system control, life sciences, ecological sciences, new energy, and new materials, making due contributions to promoting the development of new productive forces.