Darcy number

In fluid dynamics through porous media, the Darcy number (Da) represents the relative effect of the permeability of the medium versus its cross-sectional area—commonly the diameter squared. The number is named after Henry Darcy and is found from nondimensionalizing the differential form of Darcy's law. This number should not be confused with the Darcy friction factor which applies to pressure drop in a pipe. It is defined as

\mathrm {Da} ={\frac {K}{d^{2}}}

where

K is the permeability of the medium (SI units: $m 2$ );
d is the characteristic length, e.g. the diameter of the particle (SI units: $m$ ).^[1]

Alternative forms of this number do exist depending on the approach by which Darcy's Law is made dimensionless and the geometry of the system.^[2] The Darcy number is commonly used in heat transfer through porous media.^[3]

References

^ Kim, Sung Jin; Jang, Seok Pil (2002). "Effects of the Darcy number, the Prandtl number, and the Reynolds number on local thermal non-equilibrium". International Journal of Heat and Mass Transfer. 45 (19): 3885–3896. Bibcode:2002IJHMT..45.3885K. doi:10.1016/S0017-9310(02)00109-6.
^ Shires, G. L. (2006). "Darcy Number". A-to-Z Guide to Thermodynamics, Heat and Mass Transfer, and Fluids Engineering. Begel House. doi:10.1615/AtoZ.d.darcy_number. ISBN 9781567004564.
^ Nouri-Borujerdi, Ali; Noghrehabadi, Amin R.; Rees, D. Andrew S. (31 August 2007). "Influence of Darcy number on the onset of convection in a porous layer with a uniform heat source" (PDF). International Journal of Thermal Sciences. 47 (8): 1020–1025. doi:10.1016/j.ijthermalsci.2007.07.014. Archived from the original (PDF) on 8 May 2024.

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[1] Kim, Sung Jin; Jang, Seok Pil (2002). "Effects of the Darcy number, the Prandtl number, and the Reynolds number on local thermal non-equilibrium". International Journal of Heat and Mass Transfer. 45 (19): 3885–3896. Bibcode:2002IJHMT..45.3885K. doi:10.1016/S0017-9310(02)00109-6.

[2] Shires, G. L. (2006). "Darcy Number". A-to-Z Guide to Thermodynamics, Heat and Mass Transfer, and Fluids Engineering. Begel House. doi:10.1615/AtoZ.d.darcy_number. ISBN 9781567004564.

[3] Nouri-Borujerdi, Ali; Noghrehabadi, Amin R.; Rees, D. Andrew S. (31 August 2007). "Influence of Darcy number on the onset of convection in a porous layer with a uniform heat source" (PDF). International Journal of Thermal Sciences. 47 (8): 1020–1025. doi:10.1016/j.ijthermalsci.2007.07.014. Archived from the original (PDF) on 8 May 2024.

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Darcy number

See also

References

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