Fractional dynamics of tracer transport in fractured media from local to regional scales

Zhang, Yong; Reeves, Donald M.; Pohlmann, K.; Chapman, Jenny; Russell, Cynthia

doi:10.2478/s11534-013-0200-x

Cited by 5 publications

(3 citation statements)

References 51 publications

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“…Anomalous transport with retention or early arrivals have been well documented in many disciplines, motivating the development of nonlocal physical models such as the fractional advection‐dispersion equation (fADE) [ Metzler and Klafter , ; Kilbas et al ., ; Herrmann , ]. In hydrology, anomalous diffusion due to retention has been observed for tracers transport in soils [ Pachepsky et al ., ; Levy and Berkowitz , ; Bromly and Hinz , ; Cortis and Berkowitz , ; Delay et al ., ; Hunt et al ., ], rocks [ LaBolle and Fogg , ; Kosakowski , ; Pedretti et al ., ; Ronayne , ], and streams [ Czernuszenko et al ., ; González‐Pinzón et al ., ], while anomalous diffusion with early arrivals has been found for conservative tracer transport in soils [ Zhang et al ., ], streams [ Deng et al ., , ; Kim and Kavvas , ], bed load or suspended sediment transport in rivers [ Stark et al ., ; Houssais and Lajeunesse , , among many others], and solutes moving along fractured media at various scales [ Benson et al ., ; Reeves et al ., , b; Zhang et al ., ]. The fADE is found to be superior to the second‐order advection‐dispersion equation (ADE) in quantifying the observed non‐Fickian transport behavior [ Benson et al ., , 2004; Schumer et al ., ; Zhang et al ., ].…”

Section: Introductionmentioning

confidence: 99%

Modeling mixed retention and early arrivals in multidimensional heterogeneous media using an explicit Lagrangian scheme

Zhang

Meerschaert

Baeumer

et al. 2015

Water Resources Research

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This study develops an explicit two-step Lagrangian scheme based on the renewal-reward process to capture transient anomalous diffusion with mixed retention and early arrivals in multidimensional media. The resulting 3-D anomalous transport simulator provides a flexible platform for modeling transport. The first step explicitly models retention due to mass exchange between one mobile zone and any number of parallel immobile zones. The mobile component of the renewal process can be calculated as either an exponential random variable or a preassigned time step, and the subsequent random immobile time follows a Hyper-exponential distribution for finite immobile zones or a tempered stable distribution for infinite immobile zones with an exponentially tempered power-law memory function. The second step describes well-documented early arrivals which can follow streamlines due to mechanical dispersion using the method of subordination to regional flow. Applicability and implementation of the Lagrangian solver are further checked against transport observed in various media. Results show that, although the time-nonlocal model parameters are predictable for transport with retention in alluvial settings, the standard timenonlocal model cannot capture early arrivals. Retention and early arrivals observed in porous and fractured media can be efficiently modeled by our Lagrangian solver, allowing anomalous transport to be incorporated into 2-D/3-D models with irregular flow fields. Extensions of the particle-tracking approach are also discussed for transport with parameters conditioned on local aquifer properties, as required by transient flow and nonstationary media.

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Section: Introductionmentioning

confidence: 99%

Modeling mixed retention and early arrivals in multidimensional heterogeneous media using an explicit Lagrangian scheme

Zhang

Meerschaert

Baeumer

et al. 2015

Water Resources Research

Self Cite

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“…The fractional‐derivative model (14) should be valid at any spatial and temporal scale as long as the control volume provides well‐defined statistics for flow dynamics, since mathematically, the tempered stable density is infinitely divisible (i.e., formally valid at all scales) [ Baeumer and Meerschaert , ]. Previous applications using real‐world data also demonstrated that the spatiotemporal fractional‐derivative models can capture anomalous dynamics of conservative tracers transport in complex fractured media varying from centimeter scales to multikilometer scales [ Zhang et al ., ] and quantify fluvial bed sediment transport across all scales [ Zhang et al ., ]. The FSF model (14), similar to other stochastic hydrologic models, is applicable for stationary media such as soil which is sometimes assumed to be fractal with scale‐invariant properties.…”

Section: Discussionmentioning

confidence: 99%

A fully subordinated linear flow model for hillslope subsurface stormflow

Zhang

Baeumer

Chen

et al. 2017

Water Resources Research

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Hillslope subsurface stormflow exhibits complex patterns when natural soils with multiscale heterogeneity impart a spatiotemporally nonlocal memory on flow dynamics. To efficiently quantify such nonlocal flow responses, this technical note proposes a fully subordinated flow (FSF) equation where the time‐ and flow‐subordination capture the temporal and spatial memory, respectively. Results show that the time‐subordination component of the FSF model captures a wide range of delayed flow response due to various degrees of soil heterogeneity (especially for low‐conductivity zones), while the model's flow‐subordination term accounts for the rapid flow responses along preferential flow paths. In the FSF model, parameters defining spatiotemporal memory functions may be related to soil properties, while other parameters such as scalar factors controlling the overall advection and diffusion are difficult to predict and can be estimated from subsurface stormflow hydrographs. These parameters can be constants at the hillslope scale because the spatiotemporal subordination, an upscaling technique, can capture the impact of system heterogeneity on flow dynamics, leading to a linear FSF model that might be applicable for various slopes. Valid scale, limitation and extension of the FSF model, and modification of the model for other complex hydrological dynamics are also discussed.

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“…Fractional calculus has recently proven to be useful in mimicking aberrant behaviours that can occur in a range of scientific and engineering fields. Many mathematical models are developed using the fractional derivatives like the nonlinear behaviour of earthquake [6], continuum fluid-dynamics [7], porous media [8], hydrology [18], fractured media at regional scales [40], complex dynamics in biological tissues [17], non-Fickian transport [37,38], optimization of radiotherapy cancer treatments [5], SIQ mathematical model of Corona virus disease [23].…”

Section: Introductionmentioning

confidence: 99%

A New Compact Numerical Scheme for Solving Time Fractional Mobile-Immobile Advection-Dispersion Model

Thomas,

Nadupuri

2023

MJMS

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This work is focused on the derivation and analysis of a novel numerical technique for solving time fractional mobile-immobile advection-dispersion equation which models many complex systems in engineering and science. The scheme is derived using the effective combination of Euler and Caputo numerical techniques for approximating the integer and fractional time derivatives respectively, and a fourth order exponential compact scheme for spatial derivatives. The Fourier analysis technique is used to prove that the proposed numerical scheme is unconditionally stable and perform convergence analysis. To assess the viability and accuracy of the proposed scheme, some numerical examples are demonstrated with constant as well as variable order time fractional derivatives for this model.

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Fractional dynamics of tracer transport in fractured media from local to regional scales

Cited by 5 publications

References 51 publications

Modeling mixed retention and early arrivals in multidimensional heterogeneous media using an explicit Lagrangian scheme

Modeling mixed retention and early arrivals in multidimensional heterogeneous media using an explicit Lagrangian scheme

A fully subordinated linear flow model for hillslope subsurface stormflow

A New Compact Numerical Scheme for Solving Time Fractional Mobile-Immobile Advection-Dispersion Model

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