Viscous flow in a channel with periodic cross-bridging fibres: exact solutions and Brinkman approximation

Tsay, Ruey Yug; Weinbaum, Sheldon

doi:10.1017/s0022112091002318

Cited by 104 publications

(78 citation statements)

References 24 publications

(14 reference statements)

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“…Flow past an array of circular cylindrical fibres confined between two parallel walls has been studied by Tsay and Weinbaum (1991), who extended a result obtained by Lee and Fung (1969). Their analysis is based on an approximate series solution of the Stokes equation.…”

Section: Vtpm the Very Thin Porous Medium Is Characterized By δ(ε)mentioning

confidence: 90%

Darcy’s Law for Flow in a Periodic Thin Porous Medium Confined Between Two Parallel Plates

et al. 2016

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We study stationary incompressible fluid flow in a thin periodic porous medium. The medium under consideration is a bounded perforated 3D-domain confined between two parallel plates. The distance between the plates is δ, and the perforation consists of ε-periodically distributed solid cylinders which connect the plates in perpendicular direction. Both parameters ε, δ are assumed to be small in comparison with the planar dimensions of the plates. By constructing asymptotic expansions, three cases are analysed: (1) ε δ, (2) δ/ε ∼ constant and (3) ε δ. For each case, a permeability tensor is obtained by solving local problems. In the intermediate case, the cell problems are 3D, whereas they are 2D in the other cases, which is a considerable simplification. The dimensional reduction can be used for a wide range of ε and δ with maintained accuracy. This is illustrated by some numerical examples.

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Section: Vtpm the Very Thin Porous Medium Is Characterized By δ(ε)mentioning

confidence: 90%

Darcy’s Law for Flow in a Periodic Thin Porous Medium Confined Between Two Parallel Plates

et al. 2016

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“…28,29 In three dimensions, rigorous solution of creeping flow past a fibrous system is more difficult. For spatially periodic media, Tsay and Weinbaum 30 solved the Stokes equations for flow past a square array of fibers confined between two parallel walls. Higdon and Ford 12 used a spectral boundary element method to calculate the permeability in simple cubic, body-centered cubic, and face-centered cubic structures, and Palassini and Remuzzi 31 employed a finite element method to solve the Stokes equations for a tetrahedral periodic array of cylinders to model the glomerular basement membrane.…”

Section: F Umentioning

confidence: 99%

Permeability calculations in three-dimensional isotropic and oriented fiber networks

et al. 2008

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Hydraulic permeabilities of fiber networks are of interest for many applications and have been studied extensively. There is little work, however, on permeability calculations in three-dimensional random networks. Computational power is now sufficient to calculate permeabilities directly by constructing artificial fiber networks and simulating flow through them. Even with today's high-performance computers, however, such an approach would be infeasible for large simulations. It is therefore necessary to develop a correlation based on fiber volume fraction, radius, and orientation, preferably by incorporating previous studies on isotropic or structured networks. In this work, the direct calculations were performed, using the finite element method, on networks with varying degrees of orientation, and combinations of results for flows parallel and perpendicular to a single fiber or an array thereof, using a volume-averaging theory, were compared to the detailed analysis. The detailed model agreed well with existing analytical solutions for square arrays of fibers up to fiber volume fractions of 46% for parallel flow and 33% for transverse flow. Permeability calculations were then performed for isotropic and oriented fiber networks within the fiber volume fraction range of 0.3%-15%. When drag coefficients for spatially periodic arrays were used, the results of the volume-averaging method agreed well with the direct finite element calculations. On the contrary, the use of drag coefficients for isolated fibers overpredicted the permeability for the volume fraction range that was employed. We concluded that a weighted combination of drag coefficients for spatially periodic arrays of fibers could be used as a good approximation for fiber networks, which further implies that the effect of the fiber volume fraction and orientation on the permeability of fiber networks are more important than the effect of local network structure.

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“…2 to determine the average velocity field and the forces and torques on the cilia has been examined in a hydrodynamically equivalent problem, the Stokes flow past a periodic array of slender vertical fibers in a parallel walled channel (39). Comparison with exact Stokes solutions for the average flow past each fiber and the resulting drag show excellent agreement for fiber solid fractions up to 0.7.…”

Section: Mathematical Models For Shear Stresses Forces and Torques mentioning

confidence: 99%

Effect of flow and stretch on the [Ca²⁺]_iresponse of principal and intercalated cells in cortical collecting duct

Liu¹,

Xu²,

Woda³

et al. 2003

American Journal of Physiology-Renal Physiology

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208

268

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Viscous flow in a channel with periodic cross-bridging fibres: exact solutions and Brinkman approximation

Cited by 104 publications

References 24 publications

Darcy’s Law for Flow in a Periodic Thin Porous Medium Confined Between Two Parallel Plates

Darcy’s Law for Flow in a Periodic Thin Porous Medium Confined Between Two Parallel Plates

Permeability calculations in three-dimensional isotropic and oriented fiber networks

Effect of flow and stretch on the [Ca²⁺]_iresponse of principal and intercalated cells in cortical collecting duct

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Viscous flow in a channel with periodic cross-bridging fibres: exact solutions and Brinkman approximation

Cited by 104 publications

References 24 publications

Darcy’s Law for Flow in a Periodic Thin Porous Medium Confined Between Two Parallel Plates

Darcy’s Law for Flow in a Periodic Thin Porous Medium Confined Between Two Parallel Plates

Permeability calculations in three-dimensional isotropic and oriented fiber networks

Effect of flow and stretch on the [Ca2+]iresponse of principal and intercalated cells in cortical collecting duct

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Product

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Effect of flow and stretch on the [Ca²⁺]_iresponse of principal and intercalated cells in cortical collecting duct