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Use of Brooks‐Corey Parameters to Improve Estimates of Saturated Conductivity from Effective Porosity
Author(s) -
Timlin D. J.,
Ahuja L. R.,
Pachepsky Ya.,
Williams R. D.,
Gimenez D.,
Rawls W.
Publication year - 1999
Publication title -
soil science society of america journal
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.836
H-Index - 168
eISSN - 1435-0661
pISSN - 0361-5995
DOI - 10.2136/sssaj1999.6351086x
Subject(s) - porosity , hydraulic conductivity , water content , exponent , moisture , thermodynamics , soil science , mineralogy , mathematics , materials science , geotechnical engineering , soil water , chemistry , geology , composite material , physics , linguistics , philosophy
Effective porosity, defined here as the difference between satiated total porosity and water‐filled porosity at a matric potential of 33 kPa, has been shown to be a good predictor for saturated hydraulic conductivity ( K s ) using a modified Kozeny‐Carman equation. This equation is of the form of a coefficient ( B ) multiplied by effective porosity raised to a power ( n ). The purpose of this study was to improve the predictive capability of the modified Kozeny‐Carman equation by including information from moisture release curves (soil water content vs. matric potential relation). We fitted the Brooks‐Corey (B‐C) equation parameters (pore size distribution index and air entry potential) to moisture release data from a large database (>500 samples). Values of K s were also available from the same source. Inclusion of the pore size distribution index into the Kozeny‐Carman equation improved the K s estimation over using only effective porosity, but only slightly. The improvement came through a better estimation of large values of K s We also fit a relationship for the coefficient (B) of the Kozeny‐Carman equation as a function of the two B‐C parameters with a constant value of n = 2.5 for the exponent. Overall the use of Brooks‐Corey parameters from moisture retention data improved estimates of K s over using effective porosity (ϕ e ) alone. There is still considerable error in predicting individual K s values, however. The best forms of the equation was when λ was included in the term for the coefficient for the modified Kozeny‐Carman equation. The next best form was when λ was included in the exponent for ϕ e The two best models appeared to better preserve the mean, standard deviation and range of the original data.