Microscopic flow near the surface of two-dimensional porous media. Part 2. Transverse flow

R. E. Larson; J. J. L. Higdon

doi:10.1017/S0022112087001149

Abstract

A model problem is analysed to study the microscopic flow near the surface of porous media. In the idealized system, we consider two-dimensional media consisting of infinite and semi-infinite periodic lattices of cylindrical inclusions. In Part 1, results for axial flow were presented. In this work results for transverse flow are presented and discussed in the context of macroscopic approaches such as slip coefficients and Brinkman's equation.

References

Beavers, G. S. & Joseph, D. D. 1967 Boundary conditions at a naturally permeable wall. J. Fluid Mech. 30, 197–207.Google Scholar

Brinkman, H. C. 1947 A calculation of the viscous force exerted by a flowing fluid on a dense swarm of particles. Appl. Sci. Res. A 1, 27.Google Scholar

Happel, J. & Brenner, H. 1973 Low Reynolds Number Hydrodynamics, 2nd edn. Noordhoff

Higdon, J. J. L. 1985 Stokes flow in arbitrary two-dimensional domains: shear flow over ridges and cavities. J. Fluid Mech. 159, 195–226.Google Scholar

Larson, R. E. & Higdon, J. J. L. 1986 Microscopic flow near the surface of two-dimensional porous media. Part 1. Axial flow. J. Fluid Mech. 166, 449–472.Google Scholar

Saffman, P. G. 1971 On the boundary condition at the structure of a porous medium. Stud. Appl. Maths 50, 93–101.Google Scholar

Sangani, A. S. & Acrivos, A. 1982 Slow flow past periodic arrays of cylinders with application to heat transfer. Intl J. Multiphase Flow 8, 193–206.Google Scholar

Crossref Citations

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Kolodziej, J. A. 1988. Influence of the porosity of a porous medium on the effective viscosity in Brinkman's filtration equation. Acta Mechanica, Vol. 75, Issue. 1-4, p. 241.

Larson, R. E. and Higdon, J. J. L. 1989. A periodic grain consolidation model of porous media. Physics of Fluids A: Fluid Dynamics, Vol. 1, Issue. 1, p. 38.

Sangani, A. S. and Behl, S. 1989. The planar singular solutions of Stokes and Laplace equations and their application to transport processes near porous surfaces. Physics of Fluids A: Fluid Dynamics, Vol. 1, Issue. 1, p. 21.

Fatehi, M. and Kaviany, M. 1990. Analysis of levitation of saturated liquid droplets on permeable surfaces. International Journal of Heat and Mass Transfer, Vol. 33, Issue. 5, p. 983.

Chmielewski, C. Petty, C.A. and Jayaraman, K. 1990. Crossflow of elastic liquids through arrays of cylinders. Journal of Non-Newtonian Fluid Mechanics, Vol. 35, Issue. 2-3, p. 309.

Svensson, Urban and Rahm, Lars 1991. Toward a mathematical model of oxygen transfer to and within bottom sediments. Journal of Geophysical Research: Oceans, Vol. 96, Issue. C2, p. 2777.

Kaviany, M. 1991. Principles of Heat Transfer in Porous Media. p. 15.

Åström, B. Tomas Pipes, R. Byron and Advani, Suresh G. 1992. On Flow through Aligned Fiber Beds and Its Application to Composites Processing. Journal of Composite Materials, Vol. 26, Issue. 9, p. 1351.

Skartsis, L. Khomami, B. and Kardos, J. L. 1992. Resin flow through fiber beds during composite manufacturing processes. Part II: Numerical and experimental studies of newtonian flow through ideal and actual fiber beds. Polymer Engineering & Science, Vol. 32, Issue. 4, p. 231.

Skartsis, L. Kardos, J. L. and Khomami, B. 1992. Resin flow through fiber beds during composite manufacturing processes. Part I: Review of newtonian flow through fiber beds. Polymer Engineering & Science, Vol. 32, Issue. 4, p. 221.

Sahraoui, M. and Kaviany, M. 1992. Slip and no-slip velocity boundary conditions at interface of porous, plain media. International Journal of Heat and Mass Transfer, Vol. 35, Issue. 4, p. 927.

Stolzenbach, Keith D. Newman, Kathleen A. and Wong, Charles S. 1992. Aggregation of fine particles at the sediment‐water interface. Journal of Geophysical Research: Oceans, Vol. 97, Issue. C11, p. 17889.

Sahimi, Muhammad 1993. Flow phenomena in rocks: from continuum models to fractals, percolation, cellular automata, and simulated annealing. Reviews of Modern Physics, Vol. 65, Issue. 4, p. 1393.

Berdichevsky, Alexander L. and Cai, Zhong 1993. Preform permeability predictions by self‐consistent method and finite element simulation. Polymer Composites, Vol. 14, Issue. 2, p. 132.

Saleh, S. Thovert, J. F. and Adler, P. M. 1993. Flow along porous media by partical image velocimetry. AIChE Journal, Vol. 39, Issue. 11, p. 1765.

Higdon, J. J. L. and Schnepper, C. A. 1994. Free Boundaries in Viscous Flows. Vol. 61, Issue. , p. 49.

Martys, N. Bentz, D. P. and Garboczi, E. J. 1994. Computer simulation study of the effective viscosity in Brinkman’s equation. Physics of Fluids, Vol. 6, Issue. 4, p. 1434.

Phelan, F.R. Leung, Y. and Parnas, R.S. 1994. Modeling of Microscale Flow in Unidirectional Fibrous Porous Media. Journal of Thermoplastic Composite Materials, Vol. 7, Issue. 3, p. 208.

Jana, Sadhan C. Tjahjadi, Mahari and Ottino, J. M. 1994. Chaotic mixing of viscous fluids by periodic changes in geometry: Baffled cavity flow. AIChE Journal, Vol. 40, Issue. 11, p. 1769.

Ghosh, U.K. Upadhyay, S.N. and Chhabra, R.P. 1994. Vol. 25, Issue. , p. 251.

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Microscopic flow near the surface of two-dimensional porous media. Part 2. Transverse flow

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This article has been cited by the following publications. This list is generated based on data provided by Crossref.

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Microscopic flow near the surface of two-dimensional porous media. Part 2. Transverse flow

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