Capillary rise between parallel plates under dynamic conditions

Wolf, Fabiano G.; Santos, Luís Orlando Emerich dos; Philippi, Paulo C.

doi:10.1016/j.jcis.2009.12.023

Cited by 38 publications

(20 citation statements)

References 48 publications

(81 reference statements)

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“…The major assumption used in (1.2) is the constancy of the contact angle θ. The studies of dynamical wetting (Hoffman 1974;Tanner 1979;de Gennes 1985) later showed that this is generally not the case, so that the Lucas-Washburn law must be corrected in the first steps of the rise (Siebold 2000;Wolf 2010). Another assumption in this law is that inertia is negligible.…”

Section: Introductionmentioning

confidence: 99%

A universal law for capillary rise in corners

2011

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International audienceWe study the capillary rise of wetting liquids in the corners of different geometries and show that the meniscus rises without limit following the universal law: h(t)/a ≈ (ɣt/na)⅓, where ɣ and n stand for the surface tension and viscosity of the liquid while a =√γ /ρɣ g is the capillary length, based on the liquid density p and gravity g. This law is universal in the sense that it does not depend on the geometry of the corner. © 2011 Cambridge University Press

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Section: Introductionmentioning

confidence: 99%

A universal law for capillary rise in corners

2011

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“…In spite of the diversity of actual porous media, the √ t scaling law, which results macroscopically from the balance between a constant driving capillary force and an increasing viscous drag, is ubiquitously observed. In fact, it appears that the LW relationship holds down to the nanoscopic scale, as shown by recent experimental 10,11 and theoretical studies [13][14][15][16][17][18] . This of course is an important indication for the development of nanofluidic devices.…”

Section: Introductionmentioning

confidence: 90%

Spontaneous Imbibition in Disordered Porous Solids: A Theoretical Study of Helium in Silica Aerogels

et al. 2011

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We present a theoretical study of spontaneous imbibition of liquid (4)He in silica aerogels focusing on the effect of porosity on the fluid dynamical behavior. We adopt a coarse-grained three-dimensional lattice-gas description like in previous studies of gas adsorption and capillary condensation and use a dynamical mean-field theory, assuming that capillary disorder predominates over permeability disorder as in recent phase-field models of spontaneous imbibition. Our results reveal a remarkable connection between imbibition and adsorption as also suggested by recent experiments. The imbibition front is always preceded by a precursor film, and the classical Lucas-Washburn √t scaling law is generally recovered, although some deviations may exist at large porosity. Moreover, the interface roughening is modified by wetting and confinement effects. Our results suggest that the interpretation of the recent experiments should be revised.

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“…In the literature, capillary rise simulations using the lattice Boltzmann method have been performed ( Latva-Kokko and Rothman, 2005b;Raiskinmäki et al, 2002;Wolf et al, 2010 ). These simulations considered Bond numbers = 10 −1 − 10 0 based on the definition of Eq.…”

Section: Capillary Rise Simulationmentioning

confidence: 99%

Wetting boundary condition for the color-gradient lattice Boltzmann method: Validation with analytical and experimental data

Akai

Bijeljic

Blunt

2018

Advances in Water Resources

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a b s t r a c tIn the color gradient lattice Boltzmann model (CG-LBM), a fictitious-density wetting boundary condition has been widely used because of its ease of implementation. However, as we show, this may lead to inaccurate results in some cases. In this paper, a new scheme for the wetting boundary condition is proposed which can handle complicated 3D geometries. The validity of our method for static problems is demonstrated by comparing the simulated results to analytical solutions in 2D and 3D geometries with curved boundaries. Then, capillary rise simulations are performed to study dynamic problems where the three-phase contact line moves. The results are compared to experimental results in the literature (Heshmati and Piri, 2014). If a constant contact angle is assumed, the simulations agree with the analytical solution based on the Lucas-Washburn equation. However, to match the experiments, we need to implement a dynamic contact angle that varies with the flow rate.

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Capillary rise between parallel plates under dynamic conditions

Cited by 38 publications

References 48 publications

A universal law for capillary rise in corners

A universal law for capillary rise in corners

Spontaneous Imbibition in Disordered Porous Solids: A Theoretical Study of Helium in Silica Aerogels

Wetting boundary condition for the color-gradient lattice Boltzmann method: Validation with analytical and experimental data

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