2.1. Firn aquifer conceptual model

The conceptual understanding for the formation and function of the Helheim Glacier perennial firn aquifer was initially formulated on the basis of field measurements and observations (2010–2017) and prior firn/crevasse modeling work. A description of this conceptual understanding is presented in Miller and others (Reference Miller2020) and is summarized just below and in Figure 1. The conceptual model developed in this study numerically describes that conceptual understanding, including a hydrogeologic framework, groundwater recharge, flow and discharge to crevasses, hydraulic, physical and thermal properties, and boundary conditions of the aquifer as well as the physical processes of saturated and unsaturated groundwater flow and freeze–thaw defined in SUTRA-ICE. Developing the conceptual model using SUTRA-ICE enables testing of how consistent the conceptual understanding is when constrained by internally consistent representation of physically based hydrologic processes including water mass and total energy balance in multiple spatial dimensions. Inconsistencies between the conceptual model and field observations in any part of the system would indicate field data or process representation deficiencies. The primary question to be answered by testing is: Can the conceptual model predict firn aquifer configuration and dynamics that are consistent with field observations, when providing the model with boundary conditions based on field measurement (primarily firn surface temperature and snow-melt recharge rate)?

Perennial firn aquifers form when sufficient surface meltwater infiltrates to depth, accumulates and saturates open firn pore space (Kuipers Munneke and others, Reference Kuipers Munneke, Ligtenberg, van den Broeke, van Angelen and Forster2014; Miller and others, Reference Miller2020). The heat contained in the infiltrating meltwater warms the shallow firn to the melting point through sensible and latent heat exchange, which keeps some water in its liquid state, permitting aquifer recharge to occur, and sustaining the liquid saturation within the saturated zone perennially. The upper ~10 m of the firn column, having the lowest liquid water content, experiences wide temperature variations as the firn cools through the fall, winter and spring months, and warms to ~0°C during the summer melt season (Koenig and others, Reference Koenig, Miège, Forster and Brucker2014; Miller and others, Reference Miller2020). Within the aquifer, temperatures remain near the melting point throughout the year as the existence of liquid water is sustained. Below the aquifer, temperatures decrease below 0°C and water is fully frozen (Miller and others, Reference Miller2020). The liquid water in the firn aquifer overlies fully frozen sub-aquifer ice.

The Helheim firn aquifer is recharged (9–30 cm a⁻¹) during the summer melt season, as surface melt rapidly infiltrates through the firn unsaturated zone (0.4 m h⁻¹) and into the saturated zone (Miller and others, Reference Miller2020). Mean specific discharge within the aquifer has been measured at 4.3 × 10⁻⁶ m s⁻¹ (std dev. = 2.5 × 10⁻⁶ m s⁻¹), and the aquifer has an average hydraulic conductivity of 2.7 × 10⁻⁴ m s⁻¹ (Miller and others, Reference Miller2017, Reference Miller2018). The average lateral hydraulic gradient of the aquifer is 0.01 m m⁻¹ (slope = 0.8°) (Miller and others, Reference Miller2018). Liquid water flows through the firn aquifer and discharges downslope, likely to crevasses near the edge of the ice sheet (Poinar and others, Reference Poinar2017; Miller and others, Reference Miller2020). The water table depth ranges between 5 and 50 m from the surface, and upslope from Helheim Glacier, the aquifer (i.e. the liquid-saturated zone above the low-permeability icy base of the aquifer) has an average thickness of 11 m (Forster and others, Reference Forster2014; Montgomery and others, Reference Montgomery2017). Porosity of the firn column decreases from ~60% at the snow surface to between 10 and 20% at the base of the aquifer (Koenig and others, Reference Koenig, Miège, Forster and Brucker2014). The model assumes this is disconnected porosity and therefore the aquifer base is a no-flow boundary. These hydraulic and aquifer physical properties were often derived from short-term observations and therefore knowledge of temporal variation is poorly constrained.

2.2. SUTRA-ICE numerical simulations

In this study, the pre-existing field data, observations and understanding, and the physics of freeze/thaw and liquid water flow represented by the SUTRA-ICE code comprise the conceptual model (described above and depicted in Fig. 1) that is evaluated in 1-D and 2-D (Fig. 2). The goals of the simulation analyses are to (1) use measured field data to calibrate and constrain the model in order to elucidate major controls on the aquifer and to confirm the viability of the combined descriptive and physical process-based conceptual model, and (2) to use the calibrated model to understand the general effects on the aquifer of increasing recharge that is expected to accompany increasing melt as the Arctic warms. The design of the current study emphasizes parsimonious modeling that is focused on capturing overall behavior in the face of limited field data, rather than attempting to apply complex and highly parameterized approaches, following the method described by Voss (Reference Voss2011). This approach supports understanding of the primary controls on the firn aquifer and effects of varying recharge.

Fig. 2.

Two-dimensional cross-sectional model setup and boundary conditions. Top is located at upper surface of snow (‘ground’ surface), bottom is located at approximate depth where firn temperature is −1°C and liquid water has frozen into solid ice except irreducible liquid saturation with no connected porosity. Downhill boundary is located at a crevasse in which the water table is set at 20 m depth, and uphill boundary is located near upper extent of the observed firn aquifer. Snow surface gradient is 0.01 m m⁻¹. Vertical exaggeration is 50 times.

The SUTRA-ICE code, created by the U.S. Geological Survey, was one of the first of a group of cryohydrogeologic codes, developed over the past two decades (Rühaak and others, Reference Rühaak2015; Grenier and others, Reference Grenier2018), that couple groundwater flow equations to heat transfer equations with dynamic freeze–thaw capabilities. SUTRA-ICE represents the physics of the freeze–thaw process in groundwater where the liquid water can fully or partially saturate the porous medium. Details and governing equations are fully described in previous studies (McKenzie and others, Reference McKenzie, Siegel, Rosenberry, Glaser and Voss2007a; McKenzie and Voss, Reference McKenzie and Voss2013; Wellman and others, Reference Wellman, Voss and Walvoord2013; Kurylyk and others, Reference Kurylyk, Hayashi, Quinton, McKenzie and Voss2016; Evans and Ge, Reference Evans and Ge2017; Evans and others, Reference Evans, Ge, Voss and Molotch2018; Evans and others, Reference Evans, Godsey, Rushlow and Voss2020) and are not repeated here. Readers may refer to these publications for complete information about the code and its functioning.

SUTRA-ICE was originally developed for studies of groundwater flow in permafrost regions and in regions with seasonal subsurface ice. The code has been applied to a variety of cases considering seasonal ground ice and permafrost, how the formation and loss of subsurface ice interacts with the flowing liquid groundwater, and how both are impacted by hydrologic and thermodynamic processes at the ground-surface (McKenzie and others, Reference McKenzie, Voss and Siegel2007b; Ge and others, Reference Ge, McKenzie, Voss and Wu2011; McKenzie and Voss, Reference McKenzie and Voss2013; Wellman and others, Reference Wellman, Voss and Walvoord2013; Briggs and others, Reference Briggs2014; Kurylyk and others, Reference Kurylyk, MacQuarrie and Voss2014, Reference Kurylyk, Hayashi, Quinton, McKenzie and Voss2016; Evans and others, Reference Evans, Ge, Voss and Molotch2018, Reference Evans, Godsey, Rushlow and Voss2020; Lamontagne-Hallé and others, Reference Lamontagne-Hallé, McKenzie, Kurylyk and Zipper2018; Zipper and others, Reference Zipper, Lamontagne-Hallé, McKenzie and Rocha2018; Walvoord and others, Reference Walvoord, Voss, Ebel and Minsley2019; Rey and others, Reference Rey2020; Rushlow and others, Reference Rushlow, Sawyer, Voss and Godsey2020). The current study documents the first application of SUTRA-ICE to firn, in which only water in liquid and ice phases (no mineral grains) is present.

SUTRA-ICE has several advantages in simulating firn aquifers over other codes that have been applied to firn aquifers. SUTRA-ICE solves groundwater mass-balance equations for the unsaturated and saturated zones and allows for liquid water flow in one, two or three space dimensions (1-D, 2-D or 3-D). Representation of both vertical and horizontal flow in firn aquifer simulation is a significant advance beyond 1-D bucket-tipping, or even physics-based firn-water 1-D flow models because multiple dimensions allow for a dynamic, laterally extensive water table, representation of hydrologic and thermodynamic processes in both the unsaturated and saturated zones, and representation of liquid water flow through, and out of, the aquifer. Simulation of lateral liquid water flow is particularly important for representing a firn aquifer's saturated zone and aquifer discharge. This multidimensional capability can also be applied to simulate vertically and laterally heterogeneous firn, preferential flow paths and impermeable ice.

The SUTRA-ICE freeze–thaw capability accounts for the latent heat of fusion and varies thermal properties with changing total-water, liquid and ice saturations. Porosity is the fractional volume of void space in the porous medium (that can host liquid water and ice). ‘Saturation’ refers to the volume of total water (ice and/or liquid water), as a fraction of the volume of void space in the porous medium. ‘Total-water saturation’ is the sum of liquid water saturation and ice saturation. The code allows effective permeability to change as a result of phase change, with effective permeability decreasing as liquid water saturation decreases (due to drainage or freezing). The code does not simulate other possible processes that may occur in firn including cryosuction, air flow, vaporization and sublimation in unsaturated zones, and these represent sources of uncertainty in the model. Cryosuction has not been well studied in firn and is not expected to occur during the recharge period of the 1-D simulations or at all under the 2-D steady-state simulations, where no freezing occurs in the unsaturated zone. While cryosuction may be important during the transition to an isothermal unsaturated zone at 0°C, recharge during this transition is minimal and so cryosuction effects are expected to be minor. However, should cryosuction prove to be a significant process in firn aquifers, it could lead to some redistribution of liquid and ice contents in the unsaturated zone of a firn aquifer. Future experiments in firn might provide more certainty regarding the role of these other processes in firn aquifers. (Note that the version of SUTRA-ICE used was specifically modified for this project to output specific discharge, rather than liquid water velocity.)

In the case of a firn aquifer there is no rock-mineral phase and only liquid water and solid water (ice) exist, so special choices of SUTRA-ICE parameter values must be made. The mineral phase of the model domain is assigned as a permanent ‘ice backbone’ fraction that has the properties of ice. Seasonal snow cover porosity ranges between 0.4 for dense snow and 0.98 for freshly fallen, dry snow (Armstrong and Brun, Reference Armstrong and Brun2008), and in the current study, a range of backbone values from 0.3 to 0.6 (as a fraction of the total porous medium volume) is considered. The permanent ‘backbone’ of ice can never melt or change its value in a simulation. Saturation values refer to only the non-backbone void space – and ice saturation (which can vary during a simulation) does not include the backbone fraction. Lower backbone values can be simulated for cases in which more firn can melt than considered in this study (i.e. a lower backbone value can be specified to allow more firn melt). This approach can simulate very low backbone fractions (e.g. 0.001) but cannot simulate complete melting of the ice (a zero-valued backbone fraction), because if this were to occur there would be no porous medium (which requires the presence of both liquid and ice grains) to simulate. SUTRA-ICE simulations that approach this all-liquid state could be done by setting the backbone fraction to lower values; however, such results are not reported in the current study.

Within the pore space (e.g. for a backbone fraction of 0.4, the total non-backbone initial porosity is 0.6, which is among the lower values observed in firn), the saturations of liquid and ice vary spatially depending on simulated steady-state fluid pressure and temperature, according to freeze/thaw unsaturated-zone physics and prescribed state functions. The initial pore space can fill with liquid water and/or ice as the simulation progresses through time, depending on temperature, fluid pressure and available water.

The assigned properties of liquid water and ice are shown in Table 1. For discussions related to SUTRA-ICE simulations, ‘total water’ refers to both liquid and ice, ‘liquid’ refers to the liquid-water phase and ‘ice’ refers to the solid-water phase. These all refer to water/liquid/ice mass in the non-backbone volume of the firn. The backbone volume of ice remains constant throughout a simulation.

Table 1.

Table showing general model specifications, boundary conditions and physical parameters used in 1-D and 2-D simulations

Three user-defined state functions are required for the physics description contained in the firn-aquifer conceptual model to describe how: (1) liquid water saturation (for fully saturated conditions) varies as a function of only temperature (providing the saturation of liquid and ice under fully saturated conditions); (2) total-water saturation varies as a function of only fluid pressure (defining unsaturated conditions, the saturations of total water and air in the firn pores); and (3) relative permeability varies as a function of liquid saturation (defining the fraction of total permeability of firn that remains as the liquid saturation decreases due to either drainage or freezing). Currently, no direct data exist to accurately define the saturation functions for Helheim firn aquifer, so estimates are based on observations of the system as well as results of 1-D simulations (Table 2). A variety of function types have been applied in coupled water and heat transport models with freeze–thaw, including simplified linear functions when detailed laboratory-derived functions are not available (Kurylyk and Watanabe, Reference Kurylyk and Watanabe2013). The functions, and their shapes, remain a matter of ongoing research and debate.

Table 2.

Table showing model inputs and parameters for 1-D sensitivity analysis and simulations

In addition to the firn aquifer base cases, parameters were uniquely varied for each base case with high, medium, low and very low values. Bold values indicate base case variations.

The low salinity of aquifer liquid water (<50 μS cm⁻¹) indicates that salinity that would allow liquid water to exist at temperatures much below 0°C is not present (Miller and others, Reference Miller2018). Therefore, the liquid water saturation function and values were selected because they enable freezing within a narrow range of temperatures; liquid water freezes according to a steep exponential freezing function (see Evans and Ge, Reference Evans and Ge2017, Eqn (1), where freezing temperature is 0°C).

Liquid water saturation for fully saturated firn conditions (S _Lsat) varies with temperature according to the model adapted from Kozlowski (Reference Kozlowski2007) as:

(1)$$S_{{\rm Lsat}}( T ) = ( {1-\;S_{\rm r}} ) {\rm e}^{-( {T-T_{\rm f}/w} ) } + S_{\rm r}\;{\rm for}\;T < T_{\rm f}$$

where S _r is the residual liquid saturation, T is temperature, T _f is freezing temperature, and w is the exponential model parameter.

Total-water saturation (S _w, the sum of liquid and ice phase saturations) is calculated with a piecewise-linear function that varies with pressure:

(2)$$S_{\rm W}( p ) = \left\{{\matrix{ {1\;{\rm for}\;p > p_{\rm e}} \hfill \cr {( {1-S_{\rm t}} ) \left({\displaystyle{{\,p-p_{\rm w}} \over {\,p_{\rm e}-p_{\rm w}}}} \right) + S_t\;{\rm for}\;p_{\rm w} \le p \le p_{\rm e}} \hfill \cr {S_{\rm t}\;{\rm for}\;p < p_{\rm w}} \hfill \cr } } \right.$$

where S _t is the residual total-water saturation, p is pore pressure, p _w is the pressure at which the linear segment of the function gives S _w equal to S _t, and all pressures are negative. This equation follows Evans and others (Reference Evans, Godsey, Rushlow and Voss2020), Eqn (2), where the air entry pressure (p _e) is 0. When p > 0, the firn is fully saturated (S _w = 1).

To determine the saturation of liquid, S _L, in the firn unsaturated zone, it must be noted that the saturation of liquid water, S _L, cannot exceed the total-water saturation, S _W, even if Eqn (1) indicates a higher value. Thus,

(3)$$S_{\rm L} = \min \{ {S_{{\rm Lsat}}^{} ( T ) , \;\;S_{\rm W}( p ) } \} $$

The ice saturation, S _I, is then given by

(4)$$S_{\rm I} = S_{\rm W}-S_{\rm L} = \max \{ {S_{\rm W}( p ) -S_{{\rm Lsat}}^{} ( T ) , \;\;0} \} $$

Relative permeability (k _r) is calculated as a function of liquid-water saturation as:

(5)$$k_{\rm r} = ( {1-k_{\rm s}} ) S_{\rm s}^{} + k_{\rm s}$$

where k _s is the relative permeability at residual liquid-water saturation and S _s is a scaled liquid-water saturation defined as:

(6)$$S_{\rm s}^{} \equiv \displaystyle{{S_{\rm L}-S_{\rm r}} \over {1-S_{\rm r}}}$$

Relative permeability decreases linearly from a value of 1 when liquid saturation has a value of 1, to a minimum relative permeability value when the liquid saturation drops to the selected liquid saturation value at which this minimum occurs. For lower liquid saturations, the relative permeability remains at its minimum value (values are given in Table 1). Decreases in permeability due to freezing are calculated using a linear function to simulate observed permeability, which is relatively homogeneous (Miller and others, Reference Miller2017).

There is a current absence of field and laboratory data to constrain the functions for firn aquifers (Eqns (1–5)). However, this modeling study is not intended to represent the details of unsaturated zone water saturations and resulting relative permeabilities, as would a study that is focused on the details of an unsaturated zone in a typical hydrogeologic system. Rather, the current selections of simple linear relations for total-water saturation and relative permeability allow the current model to represent the primary saturation and drainage processes in a firn unsaturated zone. According to the functions, liquid water saturation decreases when temperature decreases, total-water saturation decreases when pressure drops and relative permeability decreases when liquid saturation drops. These simplifications represent the primary drainage and permeability changes and provide a basis for addressing the study goal of evaluating the major water and energy-balance processes that control the overall regional hydrologic behavior of a firn aquifer. However, such simplifications also represent a source of uncertainty in the modeling approach that future work may address.

The ice saturation, Eqn (4), in unsaturated conditions is determined by both the liquid water saturation, Eqn (3), and total saturation, Eqn (2), state functions (and is thus a function of both temperature and fluid pressure). The ice saturation state function appears as follows. For lower total water contents in the state function due to lower fluid pressure at constant temperature (for which the porous medium becomes more unsaturated), the liquid water content remains constant and ice content becomes lower. Kurylyk and Watanabe (Reference Kurylyk and Watanabe2013) explain that in laboratory measurements (Jame, Reference Jame1977; Watanabe and Wake, Reference Watanabe and Wake2009; Zhou and others, Reference Zhou, Zhou, Kinzelbach and Stauffer2014) the total unsaturated water content (which is a function of pressure) does not affect the liquid water content over a range of freezing temperatures. For example, this physical behavior can be observed in Figure 2 of Watanabe and Wake (Reference Watanabe and Wake2009), where, for a wide range of frozen soil types, the measured liquid water content depends only on temperature, and does not depend on the total-water saturation. Then, for lower total-water saturations at which there is no longer ice in the pores, the liquid saturation becomes equal to the total saturation and decreases with decreasing fluid pressure, as occurs in normal unfrozen mineral aquifer fabrics. This implies that the liquid-water saturation in partially frozen soils is independent of the total-water saturation, provided that the total-water saturation is greater than the maximum possible liquid saturation (the value that occurs for fully saturated conditions as a function of temperature). The current study assumes that similar state functions control unsaturated freeze–thaw behavior in firn, which contains no mineral grains, and this may represent a source of uncertainty in firn-aquifer modeling. Future studies could test this assumption in laboratory experiments on firn.

2.3. 1-D simulations

Calibration of model parameters employed in the 2-D cross-sectional steady-state model, described below, was achieved through analysis of 1-D time-variant simulations of firn temperature profiles. For the 1-D calibration, a variety of firn-aquifer situations were considered (Table 2). Three base cases were defined (drier firn, icier firn and wetter firn) and then input values were applied for high, medium, low and very low parameter-value variation cases (Table 2), resulting in a series of simulated vertical profiles of spring firn temperatures. The parameters and input values for total-water saturation, relative permeability and liquid water saturation equations from the combination that resulted in the closest match to measured firn temperature profiles were then employed in the 2-D steady-state simulations, described in the next section.

The 1-D vertical profile model analysis focuses on unsaturated zone freeze/thaw processes. Simulated temperature profiles were compared to measured temperature profiles for April 2016, based on a temperature string at FA15_1 (latitude: 66.3622, longitude: −39.3119, elevation: 1664 m) installed in April 2015 (Miller and others, Reference Miller2020). By August 2016, the surface temperature sensor had become buried ~1.5 m below the surface by new snow accumulation. A burial rate of 0.1 m month⁻¹ was applied to the temperature sensor depths from 2015 to determine the sensor depth in April 2016. In reality, each sensor was deepened by ~1.2 m over this period. However, SUTRA-ICE observation nodes were set to occur at 1 m intervals, and so the measured depths are increased by only 1 m to coincide with SUTRA-ICE temperature observation nodes.

Transient April temperature profiles were simulated for a 1-D firn column consisting of a simple vertical stack of 2-D rectangular finite elements that provide the same 1-D vertical numerical results along the left and right edges of the stack of elements. The firn column simulation begins during the prior summer, when the firn column is isothermal at 0°C, and the water table is located at 20 m depth. Recharge of 0°C liquid water at the top of the column initially occurs in the simulation for 1.5 months, then stops. The liquid water is allowed to drain through the unsaturated zone for the first month, after which the snow surface temperature is lowered to a constant specified temperature value for 7 months, based on weather station data. The average air temperature for 2015 was −13°C and the average winter temperature for 2015 (January 1–April 30, and October 1–December 31) was −19°C (Reijmer and others, Reference Reijmer, Kuipers Munneke and Smeets2019). At the column base for all three periods, the temperature is held at 0°C (a specified-temperature boundary condition) and the fluid pressure is specified at a constant value of 294 300 Pa (equivalent to 30 m of hydraulic head, placing the simulated water table at 20 m depth, as observed in the field).

To characterize the effect of liquid water flow on the unsaturated zone temperatures under different parameterizations, dry, wet and icy firn base cases were established (Table 2). These base cases represent variations in parameters that control total and liquid water saturations. In the dry base case, the residual total-water saturation (ice + liquid) is low (0.01). In the icy base case, the residual total-water saturation is higher (0.20). In the wet base case, the minimum liquid saturation is high (0.20; this keeps more liquid water in the firn as the temperature decreases). For each of these base cases, the surface temperature during the winter, amount of summer recharge, fraction of backbone ice, unsaturated function, relative permeability function, and freezing function were varied over a range of values (see Table 2), providing a range of scenarios for each base case. Final simulated temperature profiles for each scenario were then compared to the measured firn temperatures.

2.4. 2-D simulations

2-D simulations were also developed and the aquifer response to changes in recharge was evaluated. The 2-D simulations represent the firn aquifer along a flowline of Helheim Glacier, where a series of sites provided surface-based measurements (Fig. 1) (Montgomery and others, Reference Montgomery2017; Legchenko and others, Reference Legchenko2018a). Each simulation was run in transient mode from arbitrary initial fluid pressure and temperature conditions until it reached a steady-state solution for liquid water pressure and temperature (same temperature value for liquid, ice and backbone), the two primary variables that are being solved for. The initial conditions and initial ice density vertical profile has no impact on the steady-state solution. The system of governing equations is inherently non-linear and running a transient simulation from arbitrary initial conditions to steady state resolves the non-linearities and provides the self-consistent numerical solution. The simulated 2-D cross-sectional domain consists of a 16 km long, 50 m thick vertical 2-D cross-section of the firn aquifer system (Fig. 2). The model configuration, the temperature and fluid pressure boundary conditions, as well as the freezing, unsaturated and relative permeability functions are explained in the following.

Regarding the spatial configuration and position of the model domain, there are two ways to accommodate glacial motion in the 2-D cross-sectional firn aquifer model. (1) It may be considered that the model domain moves downslope at the velocity of glacial movement with no new ice entering or leaving the cross-section; thus, the energy and water mass contribution of the moving glacier in which the firn aquifer exists would be zero. (2) If the model domain is set in a fixed location in space, the glacial ice moves through this fixed location, but in fact, the contribution of ice entering the upstream boundary and exiting the downstream boundary to the water mass and energy balances is negligible relative to that of the meltwater flux and vertical energy transport resulting from top-surface and bottom-surface temperature values. Therefore, the ice flow could be ignored in model simulations, and a fixed location of the model domain (2) was used for simplicity.

Boundary conditions and other details of firn-aquifer model setup are as follows. Meltwater generated at the surface of the snow was applied along the top boundary of the model as a specified fluid source boundary condition. Although non-uniform recharge occurs in the field, for simplicity in this initial firn-aquifer modeling study, recharge was applied uniformly across the top of the model, and the recharge rate is held constant during each simulation. Following confirmation of the conceptual model of a firn aquifer in the first 2-D simulations, the recharge rates, based on melt and recharge rates estimated from weather station data (Miller and others, Reference Miller2020), were varied in another set of runs (5 and 30 cm a⁻¹) to determine their impact on the configuration of the firn aquifer.

The downslope model domain boundary was placed at the upslope edge of an open crevasse in the Helheim Glacier, where liquid water can flow out of (or in to) the aquifer. The hydrologic condition assumed at the crevasse was based on the measured water-table location at 20 m depth near the crevasse (Miège and others, Reference Miège2016). The water table along the upslope side of the crevasse was simulated by setting a specified fluid pressure of 0 Pa at the water table location (20 m depth) and by specifying hydrostatic fluid pressure values everywhere along the crevasse boundary (with hydrostatic pressures becoming more negative along the crevasse boundary above the water table and becoming greater positive values with greater distance below the water table). The linear hydrostatic pressure distribution along the crevasse wall was calculated assuming a constant density of liquid water at 0°C, of 1000 kg m⁻³. (Note that liquid water density was held constant for all simulations, in order to preserve simplicity by avoiding natural convection of liquid water due to density differences.) Liquid water could theoretically flow in the upslope direction into the aquifer at the simulated crevasse boundary during any period in which the water level in the crevasse was higher than the water level in the aquifer, although this scenario was not evaluated and the simulations reported here have only aquifer outflow at this boundary.

The temperature specified at the base of the cross-section (top of assumed impermeable ice) was held constant at −1°C, based on vertical temperature profile measurements (Miller and others, Reference Miller2020). The temperature specified at the snow surface was held at 0°C to match the temperature (also 0°C) of the liquid-water recharge added at the snow surface. Although measured surface temperatures decrease below 0°C when there is no meltwater recharge, the surface temperature remains at about 0°C during recharge periods. This choice was deemed appropriate for steady-state simulations.

Initial permeability values were set at 2.7 × 10⁻¹¹ m² based on field measurements of hydraulic conductivity (Miller and others, Reference Miller2017). The longitudinal dispersivities were set to the lowest value (usually about one-fourth of the element size measured in the direction of flow) that avoids instability in the numerical energy-transport solution.

The user-defined function values for total-water saturation, relative permeability and liquid water saturation in the 2-D simulations were determined based on the 1-D simulation results (Table 3). The dry base case function values were selected for 2-D simulations because they produce firn temperature profiles similar to observed temperature profiles and they are more similar to field observations than the wet base case. In the assumed functionality, irrespective of how low the fluid pressure becomes, a 1% total-water saturation (liquid plus ice) was retained in the firn pore space (backbone fraction was set at 0.4) as the total residual water saturation. Liquid water freezes according to a steep exponential freezing function ranging from 100% liquid at 0°C to the residual liquid saturation at −0.2°C. For possible future simulation analyses, note that a steep linear function would likely give similar simulation results as were obtained using this function. As liquid freezes, the effective permeability, given by the product of total permeability for fully saturated firn and the relative permeability, decreases linearly from the total permeability value when fully saturated to a value 100 times lower when liquid saturation is at its minimum-possible value. The decrease by a factor of 100 is based on experience in mineral soils, and although this value is arbitrarily selected for this analysis, it provides a simple but significant decrease in the ability of liquid water to flow through firn when the liquid saturation deceases to very low values.

Table 3.

Table showing backbone and user-defined function values used in 2-D simulations