Numerical investigation of turbulent flow of Herschel–Bulkley fluids in a concentric annulus with inner cylinder rotation

IF 2.7 2区工程技术 Q2 MECHANICS

Journal of Non-Newtonian Fluid Mechanics Pub Date : 2024-03-19 DOI:10.1016/j.jnnfm.2024.105219

Felipe O. Basso, Admilson T. Franco

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引用次数: 0

Abstract

In the present work, under-resolved direct numerical simulation (UDNS) is used to study the turbulent flow of Herschel–Bulkley fluids in a concentric annular region with the rotation effect of the inner cylinder. The current numerical method is verified against the first- and second-order statistics of the velocity field with the large-eddy simulation (LES) data available in the literature for the Reynolds number of 8,900. The influence of the flow behavior index ( $n =$ 0.65, 0.70, and 0.75), the Bingham number ( $B n =$ 0.10, 0.25, and 0.40), and the Rotation number ( $N =$ 0, 0.15 and 0.30) on the flow characteristics are explored. The instantaneous flow quantities, including contours of the axial velocity and viscosity and vortical structures, and mean flow features, such as the first- and second-order turbulence statistics, mean viscosity profiles, pressure gradient, and skin friction coefficients, are investigated. The results show that weaker Reynolds stress tensor components are generated as the $n$ value is reduced and the Bingham number increases. Moreover, raising the rotation rate increases the magnitudes of turbulent statistics and makes the velocity fluctuations more asymmetrical.

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赫歇尔-布克雷流体在内圆筒旋转的同心环形空间中的湍流数值研究

在本研究中，采用欠分辨直接数值模拟（UDNS）研究了具有内筒旋转效应的同心环形区域中赫歇尔-布克利流体的湍流。在雷诺数为 8,900 时，根据速度场的一阶和二阶统计数据以及文献中的大涡流模拟 (LES) 数据，对当前的数值方法进行了验证。探讨了流动特性指数（n= 0.65、0.70 和 0.75）、宾汉数（Bn= 0.10、0.25 和 0.40）和旋转数（N= 0、0.15 和 0.30）对流动特性的影响。研究了瞬时流动量，包括轴向速度和粘度轮廓以及涡旋结构，以及平均流动特征，如一阶和二阶湍流统计量、平均粘度轮廓、压力梯度和表皮摩擦系数。结果表明，随着 n 值的减小和宾厄姆数的增加，雷诺应力张量分量会减弱。此外，提高旋转速率会增加湍流统计量的大小，并使速度波动更加不对称。

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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来源期刊

Journal of Non-Newtonian Fluid Mechanics 物理-力学

CiteScore

5.00

自引率

19.40%

发文量

109

审稿时长

61 days

期刊介绍： The Journal of Non-Newtonian Fluid Mechanics publishes research on flowing soft matter systems. Submissions in all areas of flowing complex fluids are welcomed, including polymer melts and solutions, suspensions, colloids, surfactant solutions, biological fluids, gels, liquid crystals and granular materials. Flow problems relevant to microfluidics, lab-on-a-chip, nanofluidics, biological flows, geophysical flows, industrial processes and other applications are of interest. Subjects considered suitable for the journal include the following (not necessarily in order of importance): Theoretical, computational and experimental studies of naturally or technologically relevant flow problems where the non-Newtonian nature of the fluid is important in determining the character of the flow. We seek in particular studies that lend mechanistic insight into flow behavior in complex fluids or highlight flow phenomena unique to complex fluids. Examples include Instabilities, unsteady and turbulent or chaotic flow characteristics in non-Newtonian fluids, Multiphase flows involving complex fluids, Problems involving transport phenomena such as heat and mass transfer and mixing, to the extent that the non-Newtonian flow behavior is central to the transport phenomena, Novel flow situations that suggest the need for further theoretical study, Practical situations of flow that are in need of systematic theoretical and experimental research. Such issues and developments commonly arise, for example, in the polymer processing, petroleum, pharmaceutical, biomedical and consumer product industries.