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The Richards equation represents the movement of water in unsaturated soils, and is attributed to Lorenzo A. Richards who published the equation in 1931.^[1] It is a quasilinear partial differential equation; its analytical solution is often limited to specific initial and boundary conditions.^[2] Proof of the existence and uniqueness of solution was given only in 1983 by Alt and Luckhaus.^[3] The equation is based on Darcy-Buckingham law^[1] representing flow in porous media under variably saturated conditions, which is stated as

{\vec {q}}=-\mathbf {K} (\theta )(\nabla h+\nabla z),

where

{\vec {q}}

is the volumetric flux;

\theta

is the volumetric water content;

h

is the liquid pressure head, which is negative for unsaturated porous media;

\mathbf {K} (h)

is the unsaturated hydraulic conductivity;

\nabla z

is the geodetic head gradient, which is assumed as

\nabla z=\left({\begin{smallmatrix}0\\0\\1\end{smallmatrix}}\right)

for three-dimensional problems.

Considering the law of mass conservation for an incompressible porous medium and constant liquid density, expressed as

{\frac {\partial \theta }{\partial t}}+\nabla \cdot {\vec {q}}+S=0

,

where

S

is the sink term [T

^{-1}

], typically root water uptake.^[4]

Then substituting the fluxes by the Darcy-Buckingham law the following mixed-form Richards equation is obtained:

{\frac {\partial \theta }{\partial t}}=\nabla \cdot \mathbf {K} (h)(\nabla h+\nabla z)-S

.

For modeling of one-dimensional infiltration this divergence form reduces to

{\frac {\partial \theta }{\partial t}}={\frac {\partial }{\partial z}}\left(\mathbf {K} (\theta )\left({\frac {\partial h}{\partial z}}+1\right)\right)-S

.

Although attributed to L. A. Richards, the equation was originally introduced 9 years earlier by Lewis Fry Richardson in 1922.^[5]^[6]

^ ^a ^b Richards, L.A. (1931). "Capillary conduction of liquids through porous mediums". Physics. 1 (5): 318–333. Bibcode:1931Physi...1..318R. doi:10.1063/1.1745010.
^ Tracy, F. T. (August 2006). "Clean two- and three-dimensional analytical solutions of Richards' equation for testing numerical solvers: TECHNICAL NOTE". Water Resources Research. 42 (8). doi:10.1029/2005WR004638. S2CID 119938184.
^ Wilhelm Alt, Hans; Luckhaus, Stephan (1 September 1983). "Quasilinear elliptic-parabolic differential equations". Mathematische Zeitschrift. 183 (3): 311–341. doi:10.1007/BF01176474. ISSN 1432-1823. S2CID 120607569.
^ Feddes, R. A.; Zaradny, H. (1 May 1978). "Model for simulating soil-water content considering evapotranspiration — Comments". Journal of Hydrology. 37 (3): 393–397. Bibcode:1978JHyd...37..393F. doi:10.1016/0022-1694(78)90030-6. ISSN 0022-1694.
^ Knight, John; Raats, Peter. "The contributions of Lewis Fry Richardson to drainage theory, soil physics, and the soil-plant-atmosphere continuum" (PDF). EGU General Assembly 2016.
^ Richardson, Lewis Fry (1922). Weather prediction by numerical process. Cambridge, The University press. pp. 262.