Similarity solutions for solute transport in fractal porous media using a time- and scale-dependent dispersivity
暂无分享,去创建一个
Fawang Liu | D. A. Barry | Vo Anh | David Andrew Barry | Ninghu Su | Graham C. Sander | D. Barry | Fawang Liu | V. Anh | N. Su | G. Sander
[1] N. Udey,et al. The equations of miscible flow with negligible molecular diffusion , 1993 .
[2] P. Addison,et al. Scale-Dependent Subsurface Dispersion: A Fractal-Based Stochastic Model , 2001 .
[3] Steven P.K. Sternberg,et al. Laboratory observation of nonlocal dispersion , 1996 .
[4] Scott W. Tyler,et al. An explanation of scale‐dependent dispersivity in heterogeneous aquifers using concepts of fractal geometry , 1988 .
[5] Karl Heinz Hoffmann,et al. Modelling porous structures by repeated Sierpinski carpets , 2001 .
[6] Doraiswami Ramkrishna,et al. Diffusion in pore fractals: A review of linear response models , 1993 .
[7] Timothy R. Ginn,et al. Nonlocal dispersion in media with continuously evolving scales of heterogeneity , 1993 .
[8] Monica Moroni,et al. Statistical mechanics with three-dimensional particle tracking velocimetry experiments in the study of anomalous dispersion. II. Experiments , 2001 .
[9] J. Pickens,et al. Modeling of scale-dependent dispersion in hydrogeologic systems , 1981 .
[10] D. A. Barry,et al. On the Dagan Model of solute transport in groundwater: Foundational aspects , 1987 .
[11] S. Lovejoy. Area-Perimeter Relation for Rain and Cloud Areas , 1982, Science.
[12] G. Marsily. Quantitative Hydrogeology: Groundwater Hydrology for Engineers , 1986 .
[13] B. Hunt,et al. Solutions and verification of a scale-dependent dispersion model. , 2001, Journal of contaminant hydrology.
[14] Antonis D. Koussis,et al. Analytical solutions to non-Fickian subsurface dispersion in uniform groundwater flow , 1996 .
[15] I. S. Gradshteyn,et al. Table of Integrals, Series, and Products , 1976 .
[16] R. Dasgupta,et al. Scaling exponents for random walks on Sierpinski carpets and number of distinct sites visited: a new algorithm for infinite fractal lattices , 1999 .
[17] M. Shlesinger,et al. Stochastic pathway to anomalous diffusion. , 1987, Physical review. A, General physics.
[18] J. R. Philip. Issues in flow and transport in heterogeneous porous media , 1986 .
[19] D. A. Barry,et al. Analytical solution of a convection‐dispersion model with time‐dependent transport coefficients , 1989 .
[20] C. Welty,et al. A Critical Review of Data on Field-Scale Dispersion in Aquifers , 1992 .
[21] D. A. Barry,et al. Time dependence of solute dispersion in aquifers , 1993 .
[22] S. Yates. An analytical solution for one‐dimensional transport in heterogeneous porous media , 1990 .
[23] I. Procaccia,et al. Analytical solutions for diffusion on fractal objects. , 1985, Physical review letters.
[24] H. G. E. Hentschel,et al. Relative diffusion in turbulent media: The fractal dimension of clouds , 1984 .
[25] J. Stephenson. Some non-linear diffusion equations and fractal diffusion , 1995 .
[26] M. V. Genuchten,et al. Exact solutions for one-dimensional transport with asymptotic scale-dependent dispersion , 1996 .
[27] S. P. Neuman. Universal scaling of hydraulic conductivities and dispersivities in geologic media , 1990 .
[28] N. Su. Development of the Fokker‐Planck Equation and its solutions for modeling transport of conservative and reactive solutes in physically heterogeneous media , 1995 .
[29] Jacob Bear,et al. Flow through porous media , 1969 .
[30] S. Wheatcraft,et al. Reply [to Comment on An explanation of scale-dependent dispersivity in heterogeneous aquifers usin , 1992 .
[31] Mustafa M. Aral,et al. Analytical Solutions for Two-Dimensional Transport Equation with Time-Dependent Dispersion Coefficients , 1996 .