Displacement flows under elastic membranes. Part 1. Experiments and direct numerical simulations

Pihler-Puzović, Draga; Juel, Anne; Peng, Gunnar G.; Lister, Joseph; Heil, Matthias

doi:10.1017/jfm.2015.590

Cited by 35 publications

(38 citation statements)

References 44 publications

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“…For small systems, an analog to such a predicted transition is observed for a thin perturbed elastic plate resting on a nanoscopic fluid layer, where the restoring elastic bending force is opposed by van der Waals forces leading to an elastohydrodynamic touchdown [24] similar to capillary film dewetting [25]. To describe the dynamics theoretically, one can solve the full Navier-Stokes equation in the fluid phase using dynamic boundary conditions at the elastic interface given by the solution of the Föppl-von-Kármán equation [26], using e.g. the immersed-boundary method [27].…”

Section: Introductionmentioning

confidence: 99%

“…the immersed-boundary method [27]. Viscous flow in thin films can be described by the lubrication theory [28] that has been widely used to study different elastohydrodynamic flow phenomena [8,[22][23][24]26]. However, not much is known about how elastohydrodynamic flows are affected by the ratio between the geometric parameters that characterize the system as it undergoes large changes while the driving force remain the same.…”

Section: Introductionmentioning

confidence: 99%

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Asymptotic regimes in elastohydrodynamic and stochastic leveling on a viscous film

et al. 2019

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An elastic sheet that deforms near a solid substrate in a viscous fluid is a situation relevant to various dynamical processes in biology, geophysics and engineering. Here, we study the relaxation dynamics of an elastic plate resting on a thin viscous film that is supported by a solid substrate. By combining scaling analysis, numerical simulations and experiments, we identify asymptotic regimes for the elastohydrodynamic leveling of a surface perturbation of the form of a bump, when the flow is driven by either the elastic bending of the plate or thermal fluctuations. In both cases, two distinct regimes are identified when the bump height is either much larger or much smaller than the thickness of the pre-wetted viscous film. Our analysis reveals a distinct crossover between the similarity exponents with the ratio of the perturbation height to the film height. * acarlson@math.uio.no

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Section: Introductionmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

Asymptotic regimes in elastohydrodynamic and stochastic leveling on a viscous film

et al. 2019

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“…In Part 1 of this work (Pihler-Puzović et al 2015), we presented a model for the physical system that couples the Föppl-von-Kármán equations for the elastic sheet to the Navier-Stokes equations for the viscous liquid and includes a free surface that corresponds to the gas-liquid interface. The governing equations were solved numerically using the finite-element library oomph-lib (Heil & Hazel 2006).…”

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confidence: 99%

Displacement flows under elastic membranes. Part 2. Analysis of interfacial effects

Peng

Pihler-Puzović²,

Juel³

et al. 2015

J. Fluid Mech.

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We investigate the injection of inviscid gas into the narrow liquid-filled gap between a rigid base plate and an overlying elastic sheet. After an early-time transient in which the gas deflects the sheet into a large blister, the viscous liquid displaced by the expanding bubble starts to accumulate in a wedge which advances as the elastic sheet peels away from the base. We analyse theoretically the subsequent interaction between viscous forces, elastic (bending or tension) forces and capillary forces. Asymptotic expressions are derived for the speed of spreading of the bubble, which reveal that the effect of the capillary pressure drop at the bubble tip is to suck down the sheet over the liquid wedge and thereby reduce the speed. We show that the system passes through three different asymptotic regimes in sequence. At early times, capillary effects are weak and hence the spreading of the bubble is controlled dominantly by the viscous-peeling process at the wedge tip. The capillary forces grow in importance with time, and at late times they dominate viscous effects and balance with elastic forces, leading to quasi-static spreading. Finally, at very late times, the capillary suction generates a narrow bottleneck at the wedge tip, which pushes a large ridge of liquid ahead of it. These results hold in the framework of standard lubrication theory as well as with an improved lubrication model, which takes into account films of wetting liquid deposited behind the advancing bubble tip. The predictions of the model are shown to be in excellent agreement with the Navier-Stokes simulations and experimental results from Part 1 of this work.

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“…Interaction of fluid viscosity with solid elasticity in Hele-Shaw cells, or similar configurations, is relevant to various research subjects. Among these are viscous peeling problems (Hosoi & Mahadevan 2004;Lister et al 2013;Peng et al 2015;Pihler-Puzović et al 2015;Carlson & Mahadevan 2016), fluid driven crack propagation (Roper & Lister 2005;Spence et al 1987;Lai et al 2016), gravity currents on elastic substrates (Hewitt et al 2015;Howell et al 2016), and wrinkling of lubricated sheets (Huang & Suo 2002;Kodio et al 2016). At the inviscid flow limit, elastic-inertial fluid-structure-interaction have been shown to vary the solid structure resonance frequency.…”

Section: Introductionmentioning

confidence: 99%

Frequency response and resonance of a thin fluid film bounded by elastic sheets with application to mechanical filters

Tulchinsky

Gat

2019

Journal of Sound and Vibration

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Displacement flows under elastic membranes. Part 1. Experiments and direct numerical simulations

Cited by 35 publications

References 44 publications

Asymptotic regimes in elastohydrodynamic and stochastic leveling on a viscous film

Asymptotic regimes in elastohydrodynamic and stochastic leveling on a viscous film

Displacement flows under elastic membranes. Part 2. Analysis of interfacial effects

Frequency response and resonance of a thin fluid film bounded by elastic sheets with application to mechanical filters

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