Flow in porous media I: A theoretical derivation of Darcy's law
- 1 January 1986
- journal article
- research article
- Published by Springer Nature in Transport in Porous Media
- Vol. 1 (1), 3-25
- https://doi.org/10.1007/bf01036523
Abstract
No abstract availableKeywords
This publication has 24 references indexed in Scilit:
- A general closure scheme for the method of volume averagingChemical Engineering Science, 1986
- On unifying the concepts of scale, instrumentation, and stochastics in the development of multiphase transport theoryWater Resources Research, 1984
- The Operational Significance of the Continuum Hypothesis in the Theory of Water Movement Through Soils and AquifersWater Resources Research, 1984
- Heat and Mass Transfer in Porous MediaPublished by Springer Nature ,1984
- Multiphase transport equations: I - general equation for macroscopic statistical, local space-time homogeneity1Transport Theory and Statistical Physics, 1983
- Dispersion resulting from flow through spatially periodic porous mediaPhilosophical Transactions of the Royal Society of London. Series A, Mathematical and Physical Sciences, 1980
- A derivation of the equations for multi-phase transportChemical Engineering Science, 1975
- On the Flow of Two Immscible Fluids in Fractured Porous MediaPublished by Elsevier ,1972
- Fluid Mechanical Description of Fluidized Beds. Equations of MotionIndustrial & Engineering Chemistry Fundamentals, 1967
- Mechanics of Deformation and Acoustic Propagation in Porous MediaJournal of Applied Physics, 1962