Viscosimetric squeeze flow of suspensions

IF 1.8 4区 物理与天体物理 Q4 CHEMISTRY, PHYSICAL
K. Zidi, B. Darbois Texier, G. Gauthier, A. Seguin
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Abstract

The rheology of particle suspensions has been extensively explored in the case of a simple shear flow, but less in other flow configurations which are also important in practice. Here we investigate the behavior of a suspension in a squeeze flow, which we revisit using local pressure measurements to deduce the effective viscosity. The flow is generated by approaching a moving disk to a fixed wall at constant velocity in the low Reynolds number limit. We measure the evolution of the pressure field at the wall and deduce the effective viscosity from the radial pressure drop. After validation of our device using a Newtonian fluid, we measure the effective viscosity of a suspension for different squeezing speeds and volume fractions of particles. We find results in agreement with the Maron–Pierce law, an empirical expression for the viscosity of suspensions that was established for simple shear flows. We prove that this method to determine viscosity remains valid in the limit of large gap width. This makes it possible to study the rheology of suspensions within this limit and therefore suspensions composed of large particles, in contrast to Couette flow cells which require small gaps.

Abstract Image

悬浮液的粘度测量挤压流动。
颗粒悬浮液的流变学已在简单剪切流的情况下进行了广泛的研究,但在其他流动配置中的研究较少,而其他流动配置在实际应用中也很重要。在这里,我们研究了悬浮液在挤压流中的行为,并利用局部压力测量来推断有效粘度。在低雷诺数极限下,流动是通过移动圆盘以恒定速度靠近固定壁面而产生的。我们测量壁面压力场的演变,并从径向压降推导出有效粘度。在使用牛顿流体对我们的装置进行验证后,我们测量了不同挤压速度和颗粒体积分数下悬浮液的有效粘度。我们发现测量结果与马龙-皮尔斯定律一致,后者是针对简单剪切流建立的悬浮液粘度经验表达式。我们证明,这种确定粘度的方法在间隙宽度较大的情况下仍然有效。这使得研究悬浮液在这一极限范围内的流变学成为可能,因此也可以研究由大颗粒组成的悬浮液,这与需要小间隙的库尔特流室形成了鲜明对比。
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来源期刊
The European Physical Journal E
The European Physical Journal E CHEMISTRY, PHYSICAL-MATERIALS SCIENCE, MULTIDISCIPLINARY
CiteScore
2.60
自引率
5.60%
发文量
92
审稿时长
3 months
期刊介绍: EPJ E publishes papers describing advances in the understanding of physical aspects of Soft, Liquid and Living Systems. Soft matter is a generic term for a large group of condensed, often heterogeneous systems -- often also called complex fluids -- that display a large response to weak external perturbations and that possess properties governed by slow internal dynamics. Flowing matter refers to all systems that can actually flow, from simple to multiphase liquids, from foams to granular matter. Living matter concerns the new physics that emerges from novel insights into the properties and behaviours of living systems. Furthermore, it aims at developing new concepts and quantitative approaches for the study of biological phenomena. Approaches from soft matter physics and statistical physics play a key role in this research. The journal includes reports of experimental, computational and theoretical studies and appeals to the broad interdisciplinary communities including physics, chemistry, biology, mathematics and materials science.
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