非同心球形假想胞内球体的滑移流

Pub Date : 2020-09-01 DOI:10.17512/jamcm.2020.3.05
K. Madasu
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引用次数: 4

摘要

研究了不可压缩粘性流体在非同心球胞内由滑移球引起的缓慢轴对称流动。匀速(Cunningham模型)和切向速度沿径向达到最小值是在细胞表面施加的条件(Kvashnin模型)。该问题的通解以滑移球和球胞表面为中心,在两个球坐标系中采用基本解的叠加法组合。得到了内球上校正系数的数值计算结果,对球中心与球胞之间的相对距离、滑移系数和体积分数的不同取值具有较好的收敛性。所得结果与已发表的结果吻合较好。与Kvashnin的模型相比,Cunningham的模型中浓度的影响更大。无滑移球的壁面修正系数大于有滑移球的壁面修正系数。滑移球的校正系数大于球形气泡的校正系数。MSC 2010: 76a05, 76d07, 76s05
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Slip flow of a sphere in non-concentric spherical hypothetical cell
Slow axisymmetric flow of an incompressible viscous fluid caused by a slip sphere within a non-concentric spherical cell surface is investigated. The uniform velocity (Cunningham’s model) and tangential velocity reaches minimum along a radial direction are imposed conditions at the cell surface (Kvashnin’s model). The general solution of the problem is combined using superposition of the fundamental solution in the two spherical coordinate systems based on the centers of the slip sphere and spherical cell surface. Numerical results for the correction factor on the inner sphere are obtained with good convergence for various values of the relative distance between the centers of the sphere and spherical cell, the slip coefficient, and the volume fraction. The obtained results are in good agreement with the published results. The effect of concentration is more in the Cunningham’s model compared to the Kvashnin’s model. The wall correction factor on the no-slip sphere is more compared to that of a slip sphere. The correction factor on the slip sphere is more than that of a spherical gas bubble. MSC 2010: 76A05, 76D07, 76S05
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