[[1] Attinger, S., Dentz, M., H. Kinzelbach, and W. Kinzelbach (1999), Temporal behavior of a solute cloud in a chemically heterogeneous porous medium, J. Fluid Mech., 386, 77-104.]Search in Google Scholar
[[2] Bellin, A., M. Pannone, A. Fiori, and A. Rinaldo (1996), On transport in porous formations characterized by heterogeneity of evolving scales, Water Resour. Res., 32, 3485-3496.]Search in Google Scholar
[[3] Cintoli, S., S. P. Neuman, and V. Di Federico (2005), Generating and scaling fractional Brownian motion on finite domains, Geophys. Res. Lett. 32, L08404, doi:10.1029/2005GL022608.]Search in Google Scholar
[[4] Dagan, G. (1994), The significance of heterogeneity of evolving scales and of anomalous diffusion to transport in porous formations, Water Resour. Res., 30, 33273336, 1994.]Search in Google Scholar
[[5] Dagan, G. (1987), Theory of solute transport by groundwater, Annu. Rev. Fluid Mech., 19, 183-215.]Search in Google Scholar
[[6] Dagan, G. (1988), Time-dependent macrodispersion for solute transport in anisotropic heterogeneous aquifers, Water Resour. Res., 24, 1491-1500.]Search in Google Scholar
[[7] Dentz, M., H. Kinzelbach, S. Attinger, and W. Kinzelbach (2000), Temporal behavior of a solute cloud in a heterogeneous porous medium 1. Point-like injection, Water Resour. Res., 36, 3591-3604.]Search in Google Scholar
[[8] Dentz, M., H. Kinzelbach, S. Attinger, and W. Kinzelbach (2000), Temporal behavior of a solute cloud in a heterogeneous porous medium 2. Spatially extended injection, Water Resour. Res., 36, 3605-3614.]Search in Google Scholar
[[9] Di Federico, V., and S. P. Neuman (1997), Scaling of random fields by means of truncated power variograms and associated spectra, Water Resour. Res., 33, 1075-1085.]Search in Google Scholar
[[10] Fiori, A. (1996), Finite Peclet extensions of Dagan's solutions to transport in anisotropic heterogeneous formations, Water Resour. Res., 32, 193 198.]Search in Google Scholar
[[11] Fiori, A. (2001), On the inuence of local dispersion in solute transport through formations with evolving scales of heterogeneity, Water Resour. Res., 37, 235242.]Search in Google Scholar
[[12] Fiori, A., and G. Dagan (2000), Concentration fluctuations in aquifer transport: A rigorous first-order solution and applications, J. Contam. Hydrol., 45, 139 163.]Search in Google Scholar
[[13] Gelhar, L. W. (1986), Stochastic subsurface hydrology from theory to applications, Water Resour. Res., 22, 135S-145S.10.1029/WR022i09Sp0135S]Search in Google Scholar
[[14] Gelhar, L. W., and C. L. Axness (1983), Three-dimensional stochastic analysis of macrodispersion in aquifers, textitWater Resour. Res., 19, 161-180.]Search in Google Scholar
[[15] Gradshteyn, I. S., and I. M. Ryzhik (2007), Table of Integrals, Series, and Products, Elsevier, Amsterdam.]Search in Google Scholar
[[16] Jeon, J.-H., and R. Metzler (2010), Fractional Brownian motion and motion governed by the fractional Langevin equation in confined geometries, Phys. Rev. E 81, 021103, doi:10.1103/PhysRevE.81.021103.]Search in Google Scholar
[[17] McLaughlin, D., and F. Ruan (2001), Macrodispersivity and large-scale hydrogeologic variability, Transp. Porous Media, 42, 133154.10.1023/A:1006720632173]Search in Google Scholar
[[18] Papoulis, A., and S. U. Pillai (2009), Probability, Random Variables and Stochastic Processes, McGraw-Hill, New York.]Search in Google Scholar
[[19] Radu, F. A., N. Suciu, J. Hoffmann, A. Vogel, O. Kolditz, C-H. Park, and S. Attinger (2011), Accuracy of numerical simulations of contaminant transport in heterogeneous aquifers: a comparative study, Adv. Water Resour. 34, 47-61.10.1016/j.advwatres.2010.09.012]Search in Google Scholar
[[20] Ross, K., and S. Attinger (2010), Temporal behaviour of a solute cloud in a fractal heterogeneous porous medium at different scales, paper presented at EGU General Assembly 2010, Vienna, Austria, 02-07 May 2010.]Search in Google Scholar
[[21] Schwarze, H., U. Jaekel, and H. Vereecken (2001), Estimation of macrodispersivity by different approximation methods for ow and transport in randomly heterogeneous media, Transp. Porous Media, 43, 265 287.10.1023/A:1010771123844]Search in Google Scholar
[[22] Suciu N. (2010), Spatially inhomogeneous transition probabilities as memory effects for diffusion in statistically homogeneous random velocity fields, Phys. Rev. E, 81, 056301, doi:10.1103/PhysRevE.81.056301.]Search in Google Scholar
[[23] Suciu, N. (2014), Diffusion in random velocity fields with applications to contaminant transport in groundwater, Adv. Water Resour. 69, 114-133.10.1016/j.advwatres.2014.04.002]Search in Google Scholar
[[24] Suciu, N., C. Vamo_s, J. Vanderborght, H. Hardelauf, and H. Vereecken (2006), Numerical investigations on ergodicity of solute transport in heterogeneous aquifers, Water Resour. Res., 42, W04409, doi:10.1029/2005WR004546.]Search in Google Scholar
[[25] Suciu N., C. Vamos, F. A. Radu, H. Vereecken, and P. Knabner (2009), Persistent memory of diffusing particles,Phys. Rev. E, 80, 061134, doi:10.1103/PhysRevE.80.061134.]Search in Google Scholar
[[26] Suciu, N., S. Attinger, F.A. Radu, C. Vamos, J. Vanderborght, H. Vereecken, P. Knabner (2011), Solute transport in aquifers with evolving scale heterogeneity, Preprint No. 346, Mathematics Department, Friedrich-Alexander University Erlangen-Nuremberg (<http://fauams5.am.uni-erlan-gen.de/papers/pr346.pdf>).]Search in Google Scholar
[[27] Suciu, N., F.A. Radu, A. Prechtel, F. Brunner, and P. Knabner (2013), A coupled finite element-global random walk approach to advectiondominated transport in porous media with random hydraulic conductivity, J. Comput. Appl. Math. 246, 27{37.]Search in Google Scholar
[[28] Suciu, N., F.A. Radu, S. Attinger, L. Schüler, Knabner (2014), A Fokker-Planck approach for probability distributions of species concentrations transported in heterogeneous media, J. Comput. Appl. Math., in press, doi:10.1016/j.cam.2015.01.030.]Search in Google Scholar
[[29] Vamoș, C., N. Suciu, H. Vereecken, J. Vanderborght, and O. Nitzsche (2001), Path decomposition of discrete effective diffusion coecient, Internal Report ICG-IV. 00501, Research Center Jülich.]Search in Google Scholar
[[30] Vamoș, C., N. Suciu, and H. Vereecken (2003), Generalized random walk algorithm for the numerical modeling of complex diffusion processes, J. Comput. Phys., 186, 527-544, doi:10.1016/S0021-9991(03)00073-1.]Search in Google Scholar
[[31] Vanderborght, J. (2001), Concentration variance and spatial covariance in second-order stationary heterogeneous conductivity fields, Water Resour. Res., 37, 1893-1912.]Search in Google Scholar
