An adaptive time discretization of the classical and the dual porosity model of Richards’ equation
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摘要
This paper presents a numerical solution to the equations describing Darcian flow in a variably saturated porous medium—a classical Richards’ equation model Richards (1931) [1] and an extension of it that approximates the flow in media with preferential paths—a dual porosity model Gerke and van Genuchten (1993) [8]. A numerical solver to this problem, the DRUtES computer program, was developed and released during our investigation. A new technique which maintains an adaptive time step, defined here as the Retention Curve Zone Approach, was constructed and tested. The aim was to limit the error of a linear approximation to the time derivative part. Finally, parameter identification was performed in order to compare the behavior of the dual porosity model with data obtained from a non-homogenized fracture and matrix flow simulation experiment.
论文关键词:Darcy’s law,Variable saturation,Retention curve,Mass balance,Adaptive time discretization,Preferential flow,Homogenization,Parameter identification,Multi-objective evolutionary algorithm
论文评审过程:Received 14 April 2009, Revised 11 September 2009, Available online 1 December 2009.
论文官网地址:https://doi.org/10.1016/j.cam.2009.11.056