3.1 Placement

Originally, we deployed four GNSS receivers in a transect out from the doline centre (following the methods of Banwell and others (Reference Banwell, Willis, Macdonald, Goodsell and MacAyeal2019)), an automatic weather station (AWS) and a 10 m subsurface-temperature thermistor string within the doline basin, a timelapse camera system on the doline rim, and several autonomous water-pressure sensors within and outside the doline (Figs 2a, c, d). Instrument deployment was completed during November 2019, and although annual data collection and instrument maintenance was intended, the instruments were left unattended for two years due to Covid-19. When revisited in November 2021, only two of the GNSS receivers (GPS01, near the doline centre, and GPS02, on the south side of the doline rim, Figs 2a, c, d) and the timelapse camera system (Fig. 2c) had survived and collected useful data. All other instrumentation at this site was lost or destroyed due to flooding from meltwater produced during the previous two full melt seasons, the first of which (2019/2020) was a record-high melt year for north George VI Ice Shelf (Banwell and others, Reference Banwell2021). In November 2019, we had also deployed an additional, AWS ~40 km north of South Doline (Fig. 1b; location: 71.14409 S, 67.69971 W), which survived the 2019/2020 melt season, and from which we use 2 m air temperature as well as in-ice temperatures (<10 m depth) in the current study.

The two GNSS systems had Trimble NetR5 receivers with Trimble Geodetic Zephyr antennas, powered by a battery with photovoltaic charging system contained in a Pelican case. Both systems collected data at 15 s intervals throughout the 2019/2020 melt season until the reduction of daylight (~1 April 2020) lowered photovoltaic charging to the point where the receivers only operated intermittently.

The timelapse camera provided an oblique view covering most of South Doline's basin and its opposing ramp and rim (Figs 2a, b), as well as the snow surface on the ramp in the foreground near the base of the camera (Fig. 2c). The camera system, commercially available through HarborTronics Inc., included a Canon model T7 (2000D) with a 18–55 mm f/3.5–5.6 lens (23–63$^\circ$ HAOV) powered by a deep-discharge absorbent glass mat lead/acid battery charged by a photovoltaic panel, and protected by a weather-proof enclosure with a glass aperture. The camera took photographs at 30 min intervals from its deployment in mid-November 2019 through the end of March 2020.

Both GNSS receiver antennas and the camera were mounted on aluminium poles that were drilled at least 2.5 m into the ice-shelf surface in November 2019 (Figs 2c, d). Thus, the camera and antennas were fixed within the material frame of reference of the surface ice. These three poles remained stable, and did not tilt or sink into the surface ice throughout the entire 2019/2020 melt season. This stability was determined from various considerations including (1) the pole for GPS01 was constantly recorded in photographs and remained vertical, (2) the camera field of view did not change appreciably through the 2019/2020 melt season (except for temporary vibrations due to wind), (3) although not in the field of view of the camera, the pole on which GPS02 was mounted was located in the same area as the camera and would have experienced the same minor effects of surface ablation as the pole for the camera, and (4) as we will show, the individual GNSS station data demonstrate that the record of relative horizontal and vertical displacements between GPS01 and GPS02 could not be explained as a result of tilt of the pole on which GPS02 was mounted.

3.2 GNSS processing

Following methods used by Banwell and others (Reference Banwell, Willis, Macdonald, Goodsell and MacAyeal2019), GNSS data were collected at a 15 s resolution and processed to yield positions every 5 min using TRACK (Chen, Reference Chen1998), the kinematic mode of the GAMIT (v.10.71) software (Herring and others, Reference Herring, King, Floyd and McClusky2018). For a base station located on bedrock, we used FOS1, the GNSS station operated near to the BAS Fossil Bluff Research Station (Koulali and others, Reference Koulali2022), ~30 km from South Doline. However, the FOS1 base station was not operational until 15 December 2019, thus two to three weeks of data recorded by GPS01 and GPS02 prior to that time were not used in the analysis here. We used default values for TRACK processing parameters, which included specification of minimum satellite elevation (15$^\circ$); horizontal and vertical noise tolerance (1  cm); the satellite constellation(s) and number of included satellites (33, which was the functioning GPS constellation operated by the US during the period the GNSS receivers were operating); and the signals to process (carrier signals L1 and L2). For specification of GPS constellation orbits and clock errors, we used the Massachusetts Institute of Technology compilation of final satellite precise ephemerides (.sp3 files) provided by the US National Geodetic Service. TRACK outputs reported standard deviation of horizontal and vertical positions on the 5 min time-series of ~2 cm and ~5 cm, respectively. Vertical-elevation time series were provided by TRACK relative to the geoid, which in the region of the George VI Ice Shelf was taken to be 7.86 m.

To restrict attention to only long-period monotonic vertical displacements associated with meltwater-load ice-shelf flexure, the average tidal signal from the two GNSS stations was subtracted from the 5 min raw elevation data from TRACK. The tidal displacement, which is common to both GNSS stations, was estimated by fitting 34 tidal constituents ranging in period from 3.1 h to 27.5 d (including compound tides, tidal harmonics, semidiurnal, diurnal and long-period tides) to the vertical-elevation time series using least squares following the method of Pawlowicz and others (Reference Pawlowicz, Beardsley and Lentz2002) (see also, Banwell and others, Reference Banwell, Willis, Macdonald, Goodsell and MacAyeal2019). Following de-tiding, these GNSS data were further corrected by subtracting the inverse barometer effect (IBE) deduced from the barometric pressure observed at the BAS Fossil Bluff AWS (Fig. 1b, location: 71.329 S, 68.267 W, 66 m a.s.l.) using a sensitivity of 97.27 hPa m⁻¹.

The 5 min timeseries of horizontal and vertical position were cleaned by visual inspection of outliers and obvious short-term errors associated with multipath signal interference. Segments of both the vertical and horizontal time-series of <30 min were discarded where the vertical elevation was >10 cm different from the trend associated with daily tidal variation. The data used to determine long-term (multiple day) vertical elevation and horizontal separation changes between the doline centre and rim were subsequently smoothed using a 5 d running mean (i.e. data shown in Figs 6d, 7c).

3.3 Timelapse imagery processing

Initial processing of camera photographs was undertaken to remove mild effects of random wind-induced mounting-pole vibration and swaying. These movements were corrected by re-registering each photo by hand to a fixed reference frame based on surrounding mountain features using the MatLab routines cpselect and fitgeotrans. Two registration points (Fig. 2c) easily recognised in the distant mountain landscape were used to perform the re-registration in a manner that corrected for camera wobble due to wind vibration.

Secondary processing of camera photographs was done to obtain a quantitative timeseries of the total meltwater lake area through the 2019/2020 melt season. Using photographs taken at local noon on each day from mid-December 2019 to late April 2020, the images were orthorectified to yield a view of the doline basin as if photographed from directly overhead. This was accomplished by using an affine transformation in the MatLab fitgeotrans set up to match the WorldView-2 satellite image (1.84 m pixel resolution) taken on 18 January 2020 (Fig. 2a). To orthorectify the images, between 10 and 15 registration points were identified in each photograph (depending on visibility conditions) using the features in the doline basin, such as the prominent edges of the water-covered areas and surrounding streams. A sample of this orthorectified photography is shown in Figures 3a,b.

Figure 3. Image orthorectification of meltwater areas in the doline basin. (a) Oblique timelapse photo from local noon on 17 January 2020. (b) Orthorectified image of the doline basin created from the oblique photo in panel A. (c) Digitised meltwater lake areas (red outline).

The meltwater lake features visible in the orthorectified images were identified subjectively by eye, and their boundaries were digitised by hand. An example of this ad hoc digitization is shown in Figure 3c. The areas of the polygons enclosing the area covered by meltwater were then determined using the MatLab function polyarea and summed (if more than one lake boundary was needed) to produce an estimate of the total lake area. Not all orthorectified images were analysed in this manner, because digitisation by eye and hand was often found to be too difficult as a result of poor visibility or sun glint in the image. Another difficulty was that interpretation of meltwater features was at times inconsistent, particularly when there was superimposed ice during the period from early February 2020. It is thus difficult to estimate the uncertainty of lake area derived from the imagery. Repeated, but independent classifications of the same image led to differences in lake area of about 5%, and day-to-day variations in lake area during periods when superimposed ice was present was about 10%. This informal error analysis suggests that lake area derived from the imagery is accurate to ~15%.

6.1 Model domain

For the purpose of exploring ice-shelf flexure in response to meltwater loading, we adopt a simple geometrical representation of the doline (Fig. 8). The idealized doline is taken to be an axisymmetric circular feature (Fig. 8a) where ice deformation is a function of the radial and vertical coordinates, r and z, respectively. For initial conditions, all ice columns in the domain are assumed to be in local hydrostatic equilibrium, with surface and base elevations of (1 − ρ _i/ρ _sw)H(r) and ( − ρ _i/ρ _sw)H(r), respectively, where ρ _i is the density of ice, ρ _sw is the density of salt water (Table 1), and H(r) is the ice thickness varying as a function of r (Figs 8b, c). Further detail is provided in the Supplementary Material (’Additional Model Details’).

Figure 8. Idealised, axisymmetric model domain used to simulate the doline. (a) Plan view; (b) and (c) cross-section views (full domain and close-up of basin and rim, respectively).

Our assumption of hydrostatic equilibrium as an initial condition means we ignore any processes that could have created disequilibrium conditions. Such processes might have included the initial doline formation and/or subsequent episodes of meltwater loading and unloading in its central basin. However, the flexural readjustment to such processes would likely have been completed within a few months of such perturbations. Another process leading to hydrostatic disequilibrium might be the doline's evolving topography in response to its advection with ice flow. However, as we show below, the stresses involved are small, and perturbations to hydrostatic equilibrium will be minimal as the ice shelf can readjust within days to weeks. Thus, our assumption of hydrostatic equilibrium at the beginning of the melt season (when our observations begin) is reasonable, and, in any case, we do not have the necessary observations to constrain any other ice-shelf thickness distribution.

Given our assumption of hydrostatic equilibrium, and as the mean observed surface elevations of GPS01 and GPS02 averaged over the 2019/2020 melt season (Figs 6b, a) were ~6 m and ~31 m, respectively, which agree with the surface elevations according to the Reference Elevation Model of Antarctica (REMA) tile dated 15 December 2020 (Howat and others, Reference Howat, Porter, Smith, Noh and Morin2019), the corresponding ice thicknesses H of the doline basin and rim are calculated as ~40 and ~240 m, respectively. In our model domain, an annulus surrounding the doline basin (130 < r < 330 m) is taken to represent the doline ramp, and ice thickness linearly increases from 40 m at r = 130 m to 240 m at r = 330 m, which is defined to be the position of the doline rim (Figs 2b, 8b). Beyond the doline rim, ice thickness in the model domain is taken to be uniform at 240 m. We ignore any changes in ice-shelf thickness due to snow accumulation or basal melting through the melt season. We also do not include the surface topographic or ice thickness effects of the meltwater-filled moat surrounding the doline (at about 1 km distance from the doline centre, Fig. 1d) in our model simulations, as sensitivity tests (not shown) showed that this had no substantial effect on model results.

We identify the centre of the doline at r = 0 to represent where GPS01 is located, and take the doline rim at r = 330  m to represent where GPS02 is located. The horizontal dimension of the doline is chosen to be consistent with the horizontal separation of GPS01 and GPS02 and the approximate size of the central basin determined from satellite imagery. Beyond the doline rim, the numerical domain includes an annular area that extends out to r = 2  km. This 2 km scale is chosen from the appearance of meltwater lake features in satellite imagery, which, beyond this 2 km distance, no longer appear to be influenced (in terms of their surface topography and shape) by the presence of the doline (e.g. Fig. 1d). This scale is also consistent with the characteristic length scale for viscoelastic flexure of an ice shelf of a thickness similar to that surrounding South Doline (e.g. MacAyeal and others, Reference MacAyeal2021).

6.2 Model dynamics and rheology

The model is constructed using COMSOL, a commercial finite-element package, that solves for the ice deformation in the idealised axisymmetric model domain using the Stokes Equations for incompressible laminar flow (e.g. Durand and others, Reference Durand, Gagliardini, Zwinger, Meur and Hindmarsh2009; Christmann and others, Reference Christmann, Müller and Humbert2019; Mosbeux and others, Reference Mosbeux, Wagner, Becker and Fricker2020) and an effective viscosity, ν _eff, based on Glen's flow law (e.g. MacAyeal, Reference MacAyeal1989):

(1)$$\nu_{\rm{eff}} = {B( z) \over 2} \dot{e}_{II}^{( {1}/{n}) -1}$$

where $\dot {e}_{II}$, n and B(z) are, respectively, the second invariant of the strain-rate tensor, the flow-law exponent (which we take to be 3) and a flow-law rate constant appropriate for the ice temperature-depth profile,

(2)$$B\;( z) = B_o \exp{\left(\displaystyle {Q\over 3RT( z) } \right)}$$

where B _o, Q, R and T(z) are, respectively, a flow-law rate constant, the activation energy for ice deformation, the universal gas constant and the temperature (in degrees Kelvin) as a function of z (Table 1). For the temperature-depth profile, we take a linear function that varies from −8 °C at the surface (corresponding to the annual average surface ice temperature observed with a 10 m thermistor string deployed between November 2019 and November 2021 in the ice at our AWS; Fig. 1b) to −2 °C at the base (the freezing point of ocean water at pressure).

Our model only accounts for viscous deformation; it does not account for the elastic component of ice shelf deformation, e.g. as is accounted for in the purely elastic ice-shelf model of Warner and others (Reference Warner2021). The Maxwell timescale (the effective viscosity scale divided by Young's modulus), which estimates the timescale over which elastic effects are significant, is short (~1 d) compared to the time period of the melt season (~100 d). This means that, in our application, viscous deformation will dominate over elastic deformation. We note that a treatment of viscoelastic deformation of similar idealised geometries is possible using a thin-plate approximation (MacAyeal and others, Reference MacAyeal2021), however the comparability of the scales of the doline basin radius and the ice thickness suggests that a thin-plate approximation is not appropriate; so a full-Stokes stress balance equation is applied in this study.

6.3 Model boundary conditions

Boundary conditions applied to the stress balance equation consist of specification of pressures on the upper and lower surfaces of the idealised model geometry and velocities on the outer extent of the model domain. At the centre of the model domain, the conditions enforcing axisymetry are specified (radial velocity is zero and vertical velocity has no r gradient at r = 0). The upper surface pressure is assumed to be zero for both the doline ramp and the surrounding ice shelf. For the doline basin, the pressure was specified to be ρ _w g d where d is water depth. At the base of the model geometry, the hydrostatic pressure of sea water is specified. The depth of the base of the ice geometry is allowed to vary with time so as to accommodate flexure. At the outer vertical boundary of the model domain (r = 2 km) the radial ice velocity u _r is specified either to be zero or a value of 12.5 m a⁻¹ (see description of model experiments below). The non-zero radial ice velocity value is chosen empirically to reduce convergence of ice flow into the doline centre, and is consistent with a large-scale radial strain rate of 2.0 × 10⁻¹⁰ s⁻¹. The vertical ice velocity at r = 2 km is allowed to vary according to a free slip condition (zero r-derivative). At the centre of the doline, the radial velocity is zero and the vertical velocity is allowed to vary according to free slip (zero r-derivative). These boundary conditions, and other details of the numerical implementation, are described in greater length in the Supplementary Material (Additional Model Details).

Following from our two motivating questions presented above, we conducted three model experiments in which forcing conditions were varied systematically to see the effects of ice-shelf strain rates and stresses (Table 2). The first two experiments are used to determine how the velocity boundary condition at the outer vertical edge of the model domain (r = 2 km) should be specified. In experiment 1, the radial velocity u _r at r = 2 km was specified to be zero. In experiment 2, a radial velocity (at r = 2 km) was specified as 12.5 m a⁻¹, which acted as an imposed strain rate that eliminated the strong ice-flow-convergence into the doline basin that was observed in experiment 1. Experiment 2 was therefore taken as a ‘control experiment’, with which to compare experiment 3. Experiment 3 used the same radial velocity boundary condition at r = 2 km as that used in experiment 2, but was also forced with ablation, meltwater movement, and hence lake filling.

Table 2. Numerical experiments

For experiment 3, the effects of melting, meltwater movement and lake filling were treated as follows. The lake filling the basin of the model domain was assumed to be filled with meltwater coming from just the annular ramp region of the model domain. Melting elsewhere in the model domain was assumed to be zero. The relationship between the ablation rate on the ramp $\dot A( t)$ and the meltwater-lake depth d(t) was taken to be:

(3)$$\displaystyle {\rm d}( t) = \displaystyle {\rho_{\rm i}\over \rho_{\rm w}}\left({( r_{\rm {rim}}^2 - r_{{\rm basin}}^2) \over r_{{\rm basin}}^2} \right)\int_0^t \dot{A}( t') {\rm d}t'$$

where t is time. For simplicity, we took $\dot A( t) = \dot A$ to be constant in time. We note that in reality, the lake's water depth will also increase due to enhanced lake-bottom ablation, which occurs because water has a lower albedo than bare ice or snow (Tedesco and others, Reference Tedesco2012). However, as lake-bottom ablation results in no mass change within the lake, we do not account for this process in our model. Another simplification is that we do not account for any change in basin floor geometry, i.e. its downwarping due to being loaded with meltwater. To treat the loss of ice mass caused by ablation and runoff on the surface of the ramp, a negative (upward) load was applied to the upper surface of the ramp equal to $\rho _{\rm i} g \dot A \cdot t$. The lateral flow of meltwater from the ramp to the lake was assumed to be instantaneous.

6.4 Model results

Results of the three 100 d experiments (experiments 1–3 in Table 2) are shown in Figure 9a, where the modelled vertical displacements (red lines) are compared with the observed vertical elevation displacement (black lines). For experiment 1, where both regional strain rate ($\dot {e}_{{\rm rr}}$) and ablation rate and lake depth ($\dot {A}$ and d(t)) are zero, the change in vertical elevation difference and horizontal distance are both of opposite sign compared to the observed values. This indicates that, in the absence of either an externally imposed radial velocity (i.e. producing an externally imposed strain rate) or a meltwater-loading process, the doline geometry tends to decay with time by convergent ice-shelf flow into the doline basin, thereby increasing the ice thickness of the doline basin and raising its surface to be more in accord with the elevation of the ice shelf surrounding the doline. The ice shelf, in other words, deforms to shrink the doline basin radius and reduce the elevation difference between the doline basin and rim.

Figure 9. (a) Comparison of the observed vertical elevation difference (basin minus rim elevations, initiating at 0 cm) over a 100 d period against model experiments 1–3 (red lines labelled with numbers). Black line shows the 5 d running mean of vertical elevation difference (also plotted in Fig. 6d). (b) Maximum deviatoric tensile stress in the radial direction for the top 10 m of ice in the doline basin as a function of time for experiment 3 (red line; right y-axis), and observed horizontal separation change (black line; left y-axis, horizontal distance of separation as a function of time minus the initial horizontal distance of separation) as plotted in Figure 7c. The correspondence of the inferred fracture event on 25 January with the tensile stress curve suggests that a value of about 75 kPa is sufficient to have induced fracture.

For experiment 2, the addition of an externally imposed radial velocity reduces the convergent flow of the ice into the doline basin. This is because this velocity boundary condition creates a radial, azimuthal and vertical strain-rate field in the ice shelf that cancels out the convergence of ice flow into the doline centre that is seen in experiment 1. However, ablation is not specified in experiment 2, and therefore there is only minimal change in both the ice thickness in the doline basin and in the surface elevation of the doline basin relative to the rim. As shown in Figure 9a, the vertical elevation change for experiment 2 is roughly zero over 100 d. However, for the first 15 d, the elevation change of experiment 2 agrees with the slightly negative slope of the observed elevation change. This suggests that the divergent strain rate externally imposed on the doline by the surrounding ice flow is controlling the doline geometry prior to the onset of substantial melting and meltwater-loading-induced flexure.

For experiment 3, the combination of the externally imposed radial velocity (and hence strain rate) of experiment 2, alongside the addition of ablation and lake filling (this experiment) produces the best agreement between modelled and observed vertical elevation change (Fig. 9a).

The results of experiment 3 were examined further to assess whether stresses induced by the combination of the externally-imposed radial velocity and meltwater-loading are sufficient to induce fracture of the ice (either to partial or full thickness) such as implied by our observation of increased horizontal displacement between our two GNSS for the 4 d after 25 January 2020 (Fig. 7c). Figure 9b compares the horizontal separation change between the rim and basin GNSS antennae and the maximum deviatoric tensile stress in the radial direction for the top 10 m of ice in the basin, as simulated by experiment 3. The initial stresses at day 0 of experiment 3 are slightly below 60 kPa. They rise to over 100 kPa at the end of the 100 d simulation. At the time at which the fracture occurs (about day 40 after the initial date of the observations and the model initial condition), the maximum tensile stress is about 75 kPa. We note, however, that our simplistic viscous modelling approach is not explicitly able to simulate brittle fracture initiation.

We can use our model results (described above) to answer the two questions that motivated the modelling effort. The first question, whether ablation and lake filling are sufficient to explain the elevation change of the doline basin relative to the rim, is answered affirmatively by comparison of experiments 2 and 3. Experiment 3, which produces a downward movement of the basin relative to the rim roughly consistent with observations, simulates the deformation associated with of meltwater loading in the central lake. Experiment 2, taken as a control experiment where the effects of ablation, meltwater movement and lake filling were taken to be absent, did not produce downward movement of the basin relative to the rim in a manner consistent with observations.

The second question, whether tensile stresses caused by the combination of the imposed radial velocity at r = 2 km and meltwater-induced flexure are sufficiently high to initiate fracture, is answered affirmatively by the comparison shown in Figure 9b. Maximum tensile stress in the top 10 m of the basin (i.e. where we assume fractures initiate) reaches a threshold value of ~75 kPa after ~40 d. Taking the initial condition of the model run to be equivalent to the state of the doline at the beginning of the observation period (15 December) implies that the apparent fracture event on 25 January corresponds to the tensile stress reaching a threshold value of ~75 kPa (Fig. 9b), which is a reasonable stress value to initiate ice-shelf fracture (e.g. Albrecht and Levermann, Reference Albrecht and Levermann2012; Banwell and others, Reference Banwell, MacAyeal and Sergienko2013). We note that the background tensile stress in the ice shelf near its upper surface is slightly negative (indicating compressive stress) prior to the time when the lake starts to fill. This is because the tendency for ice-flow convergence into the centre of the model domain is not entirely eliminated by the specification of a radial velocity at the outer boundary (r = 2 km) in experiments 2 and 3.