Water dynamics in a gradually nonhomogeneous soil described by the linearized Richards equation

In order to investigate the influence of the soil vertical nonhomogeneity on the dynamics of the water in the upper soil layer, an analytical solution of the linearized Richards equation was derived. Here the hydraulic conductivity Ks at saturation is assumed to decrease exponentially with depth, in...

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Bibliographic Details
Published in:Water resources research 2007-08, Vol.43 (8), p.n/a
Main Authors: Barontini, S, Ranzi, R, Bacchi, B
Format: Article
Language:English
Subjects:
hydraulic conductivity
hydrodynamics
mountains
nonhomogeneous soil
Richards' equation
saturated conditions
saturated conductivity
soil depth
soil water
soil water content
soil water retention
spatial variation
watersheds
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Summary:In order to investigate the influence of the soil vertical nonhomogeneity on the dynamics of the water in the upper soil layer, an analytical solution of the linearized Richards equation was derived. Here the hydraulic conductivity Ks at saturation is assumed to decrease exponentially with depth, in accordance with field data reported in the literature and collected during our surveys in mountain catchments. Gardner's constitutive laws were assumed for the hydraulic conductivity and water retention characteristics K(s) and Ψ(s). The resulting one‐dimensional Richards equation is linear, and its coefficients decrease exponentially with depth. An analytical solution was found by using the method of Laplace transform and compared with some test cases both analytically and numerically. The soil water content profile exhibits a maximum at one point in the domain. Moreover, it accounts for a different behavior in the water dynamics, depending on the prevailing role of diffusive effects, related to the soil water retention, or of the transport effects, related to the hydraulic conductivity profile.
ISSN:0043-1397
1944-7973
DOI:10.1029/2006WR005126