A fractal Richards' equation to capture the non-Boltzmann scaling of water transport in unsaturated media.

The traditional Richards' equation implies that the wetting front in unsaturated soil follows Boltzmann scaling, with travel distance growing as the square root of time. This study proposes a fractal Richards' equation (FRE), replacing the integer-order time derivative of water content by a fractal derivative, using a power law ruler in time. FRE solutions exhibit anomalous non-Boltzmann scaling, attributed to the fractal nature of heterogeneous media. Several applications are presented, fitting the FRE to water content curves from previous literature.

[1]  J. Milczarek,et al.  Neutron radiography study of water absorption in porous building materials: anomalous diffusion analysis , 2004 .

[2]  Shlomo P. Neuman,et al.  Gaussian Closure of One-Dimensional Unsaturated Flow in Randomly Heterogeneous Soils , 2001 .

[3]  J. H. Cushman,et al.  Anomalous diffusion as modeled by a nonstationary extension of Brownian motion. , 2009, Physical review. E, Statistical, nonlinear, and soft matter physics.

[4]  T. Harter,et al.  Flow in unsaturated random porous media, nonlinear numerical analysis and comparison to analytical stochastic models , 1998 .

[5]  Scott W. Tyler,et al.  An explanation of scale‐dependent dispersivity in heterogeneous aquifers using concepts of fractal geometry , 1988 .

[6]  Mathias J. M. Römkens,et al.  Extension of the Heaslet‐Alksne Technique to arbitrary soil water diffusivities , 1992 .

[7]  Mark M. Meerschaert,et al.  Limit theorems for continuous-time random walks with infinite mean waiting times , 2004, Journal of Applied Probability.

[8]  M. Küntz,et al.  Experimental evidence and theoretical analysis of anomalous diffusion during water infiltration in porous building materials , 2001 .

[9]  I. Moore,et al.  Fractals, fractal dimensions and landscapes — a review , 1993 .

[10]  L. A. Richards Capillary conduction of liquids through porous mediums , 1931 .

[11]  Y. Pachepsky,et al.  Generalized Richards' equation to simulate water transport in unsaturated soils , 2003 .

[12]  I. Vardoulakis,et al.  Modelling infiltration by means of a nonlinear fractional diffusion model , 2006 .

[13]  M. Meerschaert,et al.  Stochastic Models for Fractional Calculus , 2011 .

[14]  W. Chen Time-space fabric underlying anomalous diffusion , 2005, math-ph/0505023.

[15]  Scott W. Tyler,et al.  Fractal processes in soil water retention , 1990 .