Groundwater Flow and Solute Transport
Groundwater migrates from areas of higher hydraulic head toward lower hydraulic head, transporting dissolved solutes through the combined processes of advection and dispersion. Advection refers to the bulk movement of solutes carried by flowing groundwater. Dispersion refers to the spreading of the contaminant plume from highly concentrated areas to less concentrated areas. In many groundwater transport models, solute transport is described by the advection-dispersion-reaction equation in which dispersion coefficients can be calculated as the sum of molecular diffusion, mechanical dispersion, and macrodispersion.
Related Article(s):
CONTRIBUTOR(S): Dr. Charles Newell and Dr. Robert Borden
Key Resource(s):
- Groundwater[1], Freeze and Cherry, 1979.
- Hydrogeologic Properties of Earth Materials and Principals of Groundwater Flow[2], Woessner and Poeter, 2020.
Groundwater Flow
Groundwater flows from areas of higher hydraulic head (a measure of pressure and gravitational energy) toward areas of lower hydraulic head (Figure 1). The rate of change (slope) of the hydraulic head is known as the hydraulic gradient. If groundwater is flowing and contains dissolved contaminants it can transport the contaminants by advection from areas with high hydraulic head toward lower hydraulic head zones, or “downgradient”.
Darcy's Law
Aquifer Material | Total Porosity (dimensionless) |
Effective Porosity (dimensionless) |
Hydraulic Conductivity (meters/second) |
---|---|---|---|
Unconsolidated | |||
Gravel | 0.25 - 0.44 | 0.13 - 0.44 | 3×10-4 - 3×10-2 |
Coarse Sand | 0.31 - 0.46 | 0.18 - 0.43 | 9×10-7 - 6×10-3 |
Medium Sand | — | 0.16 - 0.46 | 9×10-7 - 5×10-4 |
Fine Sand | 0.25 - 0.53 | 0.01 - 0.46 | 2×10-7 - 2×10-4 |
Silt, Loess | 0.35 - 0.50 | 0.01 - 0.39 | 1×10-9 - 2×10-5 |
Clay | 0.40 - 0.70 | 0.01 - 0.18 | 1×10-11 - 4.7×10-9 |
Sedimentary and Crystalline Rocks | |||
Karst and Reef Limestone | 0.05 - 0.50 | — | 1×10-6 - 2×10-2 |
Limestone, Dolomite | 0.00 - 0.20 | 0.01 - 0.24 | 1×10-9 - 6×10-6 |
Sandstone | 0.05 - 0.30 | 0.10 - 0.30 | 3×10-10 - 6×10-6 |
Siltstone | — | 0.21 - 0.41 | 1×10-11 - 1.4×10-8 |
Basalt | 0.05 - 0.50 | — | 2×10-11 - 2×10-2 |
Fractured Crystalline Rock | 0.00 - 0.10 | — | 8×10-9 - 3×10-4 |
Weathered Granite | 0.34 - 0.57 | — | 3.3×10-6 - 5.2×10-5 |
Unfractured Crystalline Rock | 0.00 - 0.05 | — | 3×10-14 - 2×10-10 |
In unconsolidated geologic settings (gravel, sand, silt, and clay) and highly fractured systems, the rate of groundwater movement can be expressed using Darcy’s Law. This law is a fundamental mathematical relationship in the groundwater field and can be expressed this way:
- Where:
- Q = Flow rate (Volume of groundwater flow per time, such as m3/yr)
- A = Cross sectional area perpendicular to groundwater flow (length2, such as m2)
- VD = “Darcy Velocity”; describes groundwater flow as the volume of flow through a unit of cross-sectional area (units of length per time, such as ft/yr)
- K = Hydraulic Conductivity (sometimes called “permeability”) (length per time)
- ΔH = Difference in hydraulic head between two lateral points (length)
- ΔL = Distance between two lateral points (length)
- Where:
Hydraulic conductivity (Table 1 and Figure 2) is a measure of how easily groundwater flows through a porous medium, or alternatively, how much energy it takes to force water through a porous medium. For example, fine sand has smaller pores with more frictional resistance to flow, and therefore lower hydraulic conductivity compared to coarse sand, which has larger pores with less resistance to flow (Figure 2).
Darcy’s Law was first described by Henry Darcy (1856)[6] in a report regarding a water supply system he designed for the city of Dijon, France. Based on his experiments, he concluded that the amount of water flowing through a closed tube of sand (Figure 3) depends on (a) the change in the hydraulic head between the inlet and outlet of the tube, and (b) the hydraulic conductivity of the sand in the tube. Groundwater flows rapidly in the case of higher pressure (ΔH) or more permeable materials such as gravel or coarse sand, but flows slowly when the pressure difference is lower or the material is less permeable, such as fine sand or silt.
Since Darcy’s time, Darcy’s Law has been extended to develop a useful variation of Darcy's formula that calculates the actual velocity that the groundwater is moving in units such as meters traveled per year. This quantity is called “interstitial velocity” or “seepage velocity” and is calculated by dividing the Darcy Velocity (flow per unit area) by the actual open pore area where groundwater is flowing, the “effective porosity” (Table 1):
- Where:
- VS = “interstitial velocity” or “seepage velocity” (units of length per time, such as m/sec)
- VD = “Darcy Velocity”; describes groundwater flow as the volume of flow per unit area per time (also units of length per time)
- ne = Effective porosity - fraction of cross section available for groundwater flow (unitless)
- VS = “interstitial velocity” or “seepage velocity” (units of length per time, such as m/sec)
Effective porosity is smaller than total porosity. The difference is that total porosity includes some dead-end pores that do not support groundwater. Typical values for total and effective porosity are shown in Table 1.
Darcy Velocity and Seepage Velocity
In groundwater calculations, Darcy Velocity and Seepage Velocity are used for different purposes. For any calculation where the actual flow rate in units of volume per time (such as liters per day or gallons per minute) is involved, the original Darcy Equation should be used (calculate VD, Equation 1) without using effective porosity. When calculating solute travel time however, the seepage velocity calculation (VS, Equation 2) must be used and an estimate of effective porosity is required. Figure 4 illustrates the differences between Darcy Velocity and Seepage Velocity.
Mobile Porosity
Aquifer Material | Mobile Porosity (volume fraction) |
---|---|
Poorly sorted sand and gravel | 0.085 |
Poorly sorted sand and gravel | 0.04 - 0.07 |
Poorly sorted sand and gravel | 0.09 |
Fractured sandstone | 0.001 - 0.007 |
Alluvial formation | 0.102 |
Glacial outwash | 0.145 |
Weathered mudstone regolith | 0.07 - 0.10 |
Alluvial formation | 0.07 |
Alluvial formation | 0.07 |
Silty sand | 0.05 |
Fractured sandstone | 0.0008 - 0.001 |
Alluvium, sand and gravel | 0.017 |
Alluvium, poorly sorted sand and gravel | 0.003 - 0.017 |
Alluvium, sand and gravel | 0.11 - 0.18 |
Siltstone, sandstone, mudstone | 0.01 - 0.05 |
Payne et al. (2008) reported the results from multiple short-term tracer tests conducted to aid the design of amendment injection systems[7]. In these tests, the dissolved solutes were observed to migrate more rapidly through the aquifer than could be explained with typically reported values of ne. They concluded that the heterogeneity of unconsolidated formations results in a relatively small area of an aquifer cross section carrying most of the water, and therefore solutes migrate more rapidly than expected. Based on these results, they recommend that a quantity called “mobile porosity” should be used in place of ne in equation 2 for calculating solute transport velocities. Based on 15 different tracer tests, typical values of mobile porosity range from 0.02 to 0.10 (Table 2).
A data mining analysis of 43 sites in California by Kulkarni et al. (2020) showed that on average 90% of the groundwater flow occurred in about 30% of cross sectional area perpendicular to groundwater flow. These data provided “moderate (but not confirmatory) support for the mobile porosity concept.”[8]
Advection-Dispersion-Reaction Equation
The transport of dissolved solutes in groundwater is often modeled using the Advection-Dispersion-Reaction (ADR) equation. As shown below (Equation 3), the ADR equation describes the change in dissolved solute concentration (C) over time (t) where groundwater flow is oriented along the x direction.
Where: | |
|
are hydrodynamic dispersion coefficients in the x, y and z directions (L2/T), |
|
is the advective transport or seepage velocity in the x direction (L/T), and |
|
is an effective first order decay rate due to combined biotic and abiotic processes (1/T). |
|
is the linear, equilibrium retardation factor (see Sorption of Organic Contaminants), |
The term on the left side of the equation is the rate of mass change per unit volume. On the right side are terms representing the solute flux due to dispersion in the x, y, and z directions, the advective flux in the x direction, and the first order decay due to biotic and abiotic processes. Dispersion coefficients (Dx,y,z) are commonly estimated using the following relationships (Equation 4):
Where: | |
|
is the molecular diffusion coefficient (L2/T), and |
|
are the longitudinal, transverse and vertical dispersivities (L), respectively. |
ADR Applications
The ADR equation can be solved to find the spatial and temporal distribution of solutes using a variety of analytical and numerical approaches. The design tools BIOSCREEN[9], BIOCHLOR[10], and REMChlor[11] (see also REMChlor - MD) employ an analytical solution of the ADR equation. MT3DMS[12] uses a numerical method to solve the ADR equation using the head distribution generated by the groundwater flow model MODFLOW[13].
Figures 5a and 5b were generated using a numerical solution of the ADR equation for a non-reactive tracer (R = 1; λ = 0) with v = 5 m/yr and Dx = 10 m2/yr. Figure 5a shows the predicted change in concentration of the tracer, chloride, versus distance downgradient from the continuous contaminant source at different times (0, 1, 2, and 4 years). Figure 5b shows the change in concentration versus time (commonly referred to as the breakthrough curve or BTC) at different downgradient distances (10, 20, 30 and 40 m). At 2 years, the mid-point of the concentration versus distance curve (Figure 5a) is located 10 m downgradient (x = 5 m/yr * 2 yr). At 20 m downgradient, the mid-point of the concentration versus time curves (Figure 5b) occurs at 4 years (t = 20 m / 5 m/yr).
Modeling Dispersion
Mechanical dispersion (hydrodynamic dispersion) results from groundwater moving at rates both greater and less than the average linear velocity. This is due to: 1) fluids moving faster through the center of the pores than along the edges, 2) fluids traveling shorter pathways and/or splitting or branching to the sides, and 3) fluids traveling faster through larger pores than through smaller pores[14]. Because the invading solute-containing water does not travel at the same velocity everywhere, mixing occurs along flow paths. This mixing is called mechanical dispersion and results in distribution of the solute at the advancing edge of flow. The mixing that occurs in the direction of flow is called longitudinal dispersion. Spreading normal to the direction of flow from splitting and branching out to the sides is called transverse dispersion (Figure 6). Typical values of the mechanical dispersivity measured in laboratory column tests are on the order of 0.01 to 1 cm[15].
The dispersion coefficient in the ADR equation accounts for the combined effects of mechanical dispersion and molecular diffusion, both of which cause spreading of the contaminant plume from highly concentrated areas toward less concentrated areas. Molecular diffusion is the result of the thermal motion of individual molecules which causes a flux of dissolved solutes from areas of higher concentration to areas of lower concentration.
Modeling Diffusion
Molecular diffusion is the result of the thermal motion of individual molecules which causes a flux of dissolved solutes from areas of higher concentration to areas of lower concentration (Figure 7). The diffusion coefficient is a proportionality constant between the molar flux due to molecular diffusion and the concentration gradient and is a function of the temperature and molecular weight. In locations where advective flux is low (clayey aquitards and sedimentary rock), diffusion is often the dominant transport mechanism.
The diffusive flux J (M/L2/T) in groundwater is calculated using Fick’s Law:
J = -De dC/dx (Equation 5) | |
Where: | |
|
is the effective diffusion coefficient and |
|
is the concentration gradient. |
The effective diffusion coefficient for transport through the porous media, De, is estimated as:
De = Dm ne δ/Τ (Equation 6) | |
Where: | |
|
is the diffusion coefficient of the solute in water, |
|
is the effective porosity (dimensionless), |
|
is the constrictivity (dimensionless) which reflects the restricted motion of particles in narrow pores[17], and |
|
is the tortuosity (dimensionless) which reflects the longer diffusion path in porous media around sediment particles[18]. |
Dm is a function of the temperature, fluid viscosity and molecular weight. Values of Dm for common groundwater solutes are shown in Table 3.
Aqueous Diffusion Coefficient | Temperature (°C) |
Dm (cm2/s) |
Reference |
---|---|---|---|
Acetone | 25 | 1.16x10-5 | Cussler 1997 [19] |
Benzene | 20 | 1.02x10-5 | Bonoli and Witherspoon 1968 [20] |
Carbon dioxide | 25 | 1.92x10-5 | Cussler 1997 [19] |
Carbon tetrachloride | 25 | 9.55x10-6 | Yaws 1995 [21] |
Chloroform | 25 | 1.08x10-5 | Yaws 1995 [21] |
Dichloroethene | 25 | 1.12x10-5 | Yaws 1995 [21] |
1,4-Dioxane | 25 | 1.02x10-5 | Yaws 1995 [21] |
Ethane | 25 | 1.52x10-5 | Witherspoon and Saraf 1965 [22] |
Ethylbenzene | 20 | 8.10x10-6 | Bonoli and Witherspoon 1968 [20] |
Ethene | 25 | 1.87x10-5 | Cussler 1997 [19] |
Helium | 25 | 6.28x10-5 | Cussler 1997 [19] |
Hydrogen | 25 | 4.50x10-5 | Cussler 1997 [19] |
Methane | 25 | 1.88x10-5 | Witherspoon and Saraf 1965 [22] |
Nitrogen | 25 | 1.88x10-5 | Cussler 1997 [19] |
Oxygen | 25 | 2.10x10-5 | Cussler 1997 [19] |
Perfluorooctanoic acid (PFOA) | 20 | 4.80x10-6 | Schaefer et al. 2019 [23] |
Perfluorooctane sulfonic acid (PFOS) | 20 | 5.40x10-6 | Schaefer et al. 2019 [23] |
Tetrachloroethene | 25 | 8.99x10-6 | Yaws 1995 [21] |
Toluene | 20 | 8.50x10-6 | Bonoli and Witherspoon 1968 [20] |
Trichloroethene | 25 | 8.16x10-6 | Rossi et al. 2015 [24] |
Vinyl chloride | 25 | 1.34x10-5 | Yaws 1995 [21] |
Macrodispersion
Spatial variations in hydraulic conductivity can increase the apparent spreading of solute plumes observed in groundwater monitoring wells. For example, in an aquifer composed of alternating layers of lower hydraulic conductivity (K) silty sand and higher K sandy gravel layers, the dissolved solute rapidly migrates downgradient through the sandy gravel layers resulting in relatively high concentration fingers surrounded by relatively uncontaminated material. Over time, contaminants in lower K layers eventually breakthrough at the monitoring well, causing a more gradual further increase in measured concentrations. This rapid breakthrough followed by gradual increases in solute concentrations gives the appearance of a plume with a very large dispersion coefficient. This spreading of the solute caused by large-scale heterogeneities in the aquifer and the associated spatial variations in advective transport velocity is referred to as macrodispersion.
In some groundwater modeling projects, large values of the dispersion coefficient are used as an adjustment factor to better represent the observed large-scale spreading of plumes[16]. Theoretical studies suggest that macrodispersivity will increase with distance near the source, and then increase more slowly farther downgradient, eventually approaching an asymptotic value[25][26][27]. Figure 8 shows values of macrodispersivity calculated using the theory of Dagan[27] with an autocorrelation length of 3 m and several different values of the variance of Y (σ2Y) where Y = Log K. The calculated macrodispersivity increases more rapidly and approaches higher asymptotic values for more heterogeneous aquifers with greater variations in K (larger σ2Y). The maximum predicted dispersivity values were in the range of 0.5 to 5 m. Zech, et al. (2015)[28] presented moderate and high reliability measurements of longitudinal macrodispersivity versus distance. Typical values of the longitudinal macrodispersivity varied from 0.1 to 10 m, with much lower values for transverse and vertical dispersivities.
Matrix Diffusion
Recently, an alternate conceptual model for describing large-scale plume spreading in heterogeneous soils has been proposed[16][7][29]. In this approach, solute transport in the transmissive zones is reasonably well described by the advection-dispersion equation using relatively small dispersion coefficients representing mechanical dispersion. However, over time, molecular diffusion slowly transports solutes into lower permeability zones. As the transmissive zones are remediated, these solutes slowly diffuse back out, causing a long extended tail to the flushout curve. This process, referred to as matrix diffusion, is controlled by molecular diffusion and the presence of geologic heterogeneity with sharp contrasts between transmissive and low permeability media[30] as discussed in the video shown in Figure 9. In some cases, matrix diffusion can maintain contaminant concentrations in more permeable zones at greater than target cleanup goals for decades or even centuries after the primary sources have been addressed[31].
References
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- ^ Woessner, W.W., and Poeter, E.P., 2020. Properties of Earth Materials and Principals of Groundwater Flow, The Groundwater Project, Guelph, Ontario, 207 pages. Free download from The Groundwater Project.
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- ^ 23.0 23.1 Schaefer, C.E., Drennan, D.M., Tran, D.N., Garcia, R., Christie, E., Higgins, C.P. and Field, J.A., 2019. Measurement of Aqueous Diffusivities for Perfluoroalkyl Acids. Journal of Environmental Engineering, 145(11). DOI: 10.1061/(ASCE)EE.1943-7870.0001585
- ^ Rossi, F., Cucciniello, R., Intiso, A., Proto, A., Motta, O. and Marchettini, N., 2015. Determination of the Trichloroethylene Diffusion Coefficient in Water. American Institute of Chemical Engineers Journal, 61(10), pp.3511-3515. DOI: 10.1002/aic.14861
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