3. Results and discussion

With the aim of assessing the consistency among the various ice-thickness models, we compare in this section their ice discharge results and evaluate various aspects of the individual models.

Table 1 shows, for each model, the total ice discharge across the whole set of flux gates. Three sets of discharge values become apparent. The largest values correspond to Carrivick and others and Huss and Farinotti models, which provide discharge values nearly twice those of DeepBedMap and Bedmap2 (whose ice discharge estimates differ from each other by just 6%), and three times as large as that of Bedmachine v2. DeepBedMap and Bedmap2, in turn, produce discharge estimates 32 and 40% higher, respectively, than that of Bedmachine v2. One could think that the largest value for Carrivick and others model could be related to the fact that, according to Eqn. (2), ice thickness, h, will tend to infinity as surface slope tends to zero, meaning that h may be overestimated in regions of flatter ice surface. A similar situation is expected, though to a lesser extent, for Huss and Farinotti model (H&F) through Eqn. (5). Note, however, that the flat regions at higher elevations (in particular near the ice divides, where the slopes tend to zero) are of no concern to us, as the ice-discharge calculation is limited to flux gates near the marine termini of tidewater glaciers or the grounding line of ice shelves. In the latter case, the surface slope up-glacier from the grounding line is nonzero. Only close to the terminus of tidewater glacier fronts the surface slope tends to zero. Even so, both Carrivick and others and H&F models set a minimum slope threshold of 1.5${^\circ }$ to avoid this problem. Moreover, H&F model also sets a maximum ice-thickness value at grounding lines in terms of flotation conditions.

Table 1. Total volumetric and mass ice discharge 2015–17 calculated for the individual models

We used an ice density of 900 kg m⁻³ for the volume to mass conversion. The uncertainty in the mean ice discharge is the standard deviation.

With the exception of the Carrivick and others model, which does not use bed data as input, and DeepBedMap, which uses data from other parts of Antarctica for calibration, the three remaining models use basically the same set of ice-thickness data, and thus provide similar discharge results for the flux gates for which thickness observations are available. Although Bedmachine v2 used some additional airborne radar ice-thickness observations in comparison with Bedmap2 and H&F (see e.g. Figure S3 of Morlighem and others, Reference Morlighem2020), those for the AP north of 70${^\circ }$S were very few, if we exclude radar flights over the ice shelves. Therefore, the differences among flux calculations for the three latter models mostly come from those flux gates where no ice-thickness observations are available (Fig. 3), so the various models use their respective methods to estimate the ice-thickness. The ice-thickness observations on the northernmost AP are very scarce (Fig. 3, sector 1), and are virtually absent on the Trinity Peninsula (northernmost part of Fig. 3, sector 1). The flight lines on the central and southern sectors (Fig. 3, sectors 2 and 3, respectively) are more abundant, but those on the western coast are generally more distant from the flux gates compared with those on the eastern coast.

Given the striking differences among the discharge estimates, it is worth comparing the results in Table 1 with those of the recent estimate by Rignot and others (Reference Rignot2019). The latter authors calculated the mass balance of Antarctica, with detail of regions and subregions, using the input/output method, in which the main output component is ice discharge. For the AP region north of 70°S, they estimated an average ice discharge of 164.33 Gt a⁻¹ over 2015–2017 (their period overlapping with that of our velocity field). To compare with our results in Table 1, we use an ice density of 900 kg m⁻³ to convert from volume to mass ice discharge. These results highlight the proximity between our results using the ice-thickness models of Carrivick and others (Reference Carrivick, Davies, James, McMillan and Glasser2018) and Huss and Farinotti (Reference Huss and Farinotti2014) with those of Rignot and others (Reference Rignot2019). The key point here is considering which ice-thickness dataset was used by Rignot and others (Reference Rignot2019). In their study, if the available ice-thickness data were not of sufficient quality, they assumed a 1979 ice flux in balance with the average SMB for 1979–2008 and scaled the results based on changes in ice velocity, which is fundamentally a mass-conservation approach, and hence its closest agreement with our result for Huss and Farinotti (Reference Huss and Farinotti2014). In the case of the AP, this resulted in constraining fluxes with ice thickness and time-variable velocity for 78$\%$ of the Antarctic Peninsula. For the rest, they used both Bedmap2 and Bedmachine Antarctica v1.

In our study, the flux gate with the largest ice discharge is that of Seller Glacier catchment (which includes Fleming, Seller, Airy and Rotz glaciers), located on the south-western coast of our study region, with a mean of 12.76 ± 4.62 Gt a⁻¹. The Seller Glacier catchment terminates in Wordie Bay, where a series of ice-shelf disintegration events resulted in an acceleration of the mentioned glaciers (Friedl and others, Reference Friedl, Seehaus, Wendt, Braun and Höppner2018). Rignot and others (Reference Rignot2019) calculated a similar value of 14.44 Gt a⁻¹ (for 2015–2017 in their case). The calculated ice discharge by the models considered here shows considerable spread, differing from Rignot's estimate by amounts between 3% (for H&F model) and 35% (for Carrivick's model).

To analyze how the whole set of models performed, on average, for each individual glacier, we calculated a multi-model normalized root-mean-square deviation (NRMSD, as shortened acronym) between the model results for each individual glacier:

(10)$$NRMSD_i = {1\over \overline{\varphi_{i}}} \sqrt{{\sum_{\,j = 1}^J( \overline{\varphi_{i}}-\varphi_{i, j}) ^2\over J}}$$

Here, φ_i,j is the flux calculated using model j for the flux gate i. $\overline {\varphi _{i}}$ is the average flux calculated using the various models (where j = 1,  2,  3,  4,  5, with J = 5) for an individual flux gate i. The results for each of the individual glaciers are shown in Figure 4, which illustrates that, although the differences between the models are large, they are not equally spatially distributed. We can observe that the various models perform similarly for the glaciers discharging along the eastern coast of the AP, particularly for the glaciers terminating in ice shelves, while on the western coast, there are much larger discrepancies between the results from the different models. We attribute this to the fact that the flux gates in the western coast are more distant from the radar flight lines compared to those in the eastern coast (Fig. 3).

Figure 4. Spatial distribution of the normalized multi-model root-mean square deviations for the ice discharge of the individual flux gates in the Antarctic Peninsula (see Eqn. (10)). Letters from a to f identify glaciers with profile plots in 6.

We also calculated the averaged value $NRMSD = \overline {NRMSD_i}$. The result for the whole set of flux gates and the five models was NRMSD = 0.91. This means that the average NRMSD is 91% of the mean ice discharge of all flux gates in the AP, representing a high average variability in the ice discharge of individual glaciers. Referring back to the differences between the western and eastern coasts, if we only consider the glaciers that terminate in ice shelves, the averaged NRMSD of the whole set is 0.50, while if we only consider the ocean- and land-terminating glaciers, it is 1.03. This difference in the NRMSD values indicates larger discrepancies between models in the estimation of the ice discharge of the ocean- and land-terminating glaciers compared with the ice-shelf-terminating ones (as visually shown in Fig. 4).

To analyze the difference in performance between pairs of models, we introduced

(11)$${\Delta\varphi_{\,jk}} = \overline{\left({\vert \varphi_{i, j}-\varphi_{i, k}\vert \over \overline{\left\lbrace\varphi_{i, 1},\; \varphi_{i, 2},\; \varphi_{i, 3},\; \varphi_{i, 4},\; \varphi_{i, 5}\right\rbrace}}\right)}$$

where the fraction in the right-hand side is the difference in the absolute value of ice discharge between the models j and k for flux gate i normalized by the mean of all models (the term in the denominator, where φ_i,1, φ_i,2, φ_i,3, φ_i,4 and φ_i,5 are the ice discharge calculations for flux gate i using the five different ice-thickness models (1, 2, 3, 4 and 5) and the averaging is understood to be applied over the five quantities enclosed by the braces). The global averaging bar is understood to be applied over the whole set of flux gates (represented by subscript i), so Δφ_jk is the normalized mean difference between models j and k for the whole set of flux gates.

The differences between pairs of ice-discharge calculations (using Eqn. (11)) are summarized in Table 2. It shows that there are large differences between the models. Huss and Farinotti (Reference Huss and Farinotti2014) exhibits the three largest differences, with values of 1.85, 1.73 and 1.62 with respect to Bedmachine v2, DeepBedMap and Bedmap2, respectively. The result of ice discharge using Huss and Farinotti (Reference Huss and Farinotti2014) is in better agreement with the one of Carrivick, with a mean-normalized difference of 0.94. We attribute the greatest differences between models shown by Huss and Farinotti (Reference Huss and Farinotti2014) model to the fact that it uses a mass-conservation approach, which is more physically based and clearly differs from those used by Bedmachine v2, DeepBedMap and Bedmap2. More precisely, as noted by Carrivick and others (Reference Carrivick, Davies, James, McMillan and Glasser2018), Huss and Farinotti (Reference Huss and Farinotti2014) used an ice flow model driven by mass-balance parameters; it is technically not a mass conservation approach due to the correction parameter f _RACMO in Eqn. ((4)). Carrivick and others model is also physically based, but it uses the perfect-plasticity approach instead of SIA (in H&F) and is not a mass-conservation approach. The results using Carrivick and others model present intermediate mean-normalized differences from the other models, with values of 1.30, 1.27 and 1.13 with respect to Bedmachine v2, DeepBedMap and Bedmap2, respectively.

Table 2. Mean of the normalized difference between pairs of models for each flux gate (see Eqn. (11))

The closest agreement is between Bedmap2 and Bedmachine v2, with a value of 0.37. We remind that this value represents the difference relative to the mean. Therefore, the mean difference between Bedmap2 and Bedmachine v2 is 0.37 times the mean of all models.

Although the total ice discharge from the APIS north of 70°S calculated using DeepBedMap agrees well with that obtained using Bedmap2 (see Table 1), comparing the values at the flux-gate level manifests a larger difference (Δφ₂₃ = 0.76). More importantly, focusing now on DeepBedMap, 44% of its ice-thickness data at the AP flux gates are meaningless negative values (see Figs 5e, f). Also, while Leong and Horgan (Reference Leong and Horgan2020) highlight the sensitivity of DeepBedMap to the training data set, they do not have a training data set for the Antarctic Peninsula, which compromises their results in this region. Furthermore, it is possible to identify artifacts through their ice-thickness map.

Figure 5. Histogram of the distribution of ice-thickness points extracted along the flux gates for each model.

Finally, Fretwell and others (Reference Fretwell2013) and Morlighem and others (Reference Morlighem2020) had similar general results, as was expected due to the use of similar approaches (interpolation, although of a different type).

Another important parameter to assess the quality of the results is the number of flux gates producing zero ice-discharge results, as this is an indication of unrealistic thickness at the flux gates. Using Carrivick and others (Reference Carrivick, Davies, James, McMillan and Glasser2018) and Huss and Farinotti (Reference Huss and Farinotti2014) ice-thickness maps, we obtained non-zero ice discharge values for every single flux gate, whereas Fretwell and others (Reference Fretwell2013), Leong and Horgan (Reference Leong and Horgan2020) and Morlighem and others (Reference Morlighem2020) produced, respectively, 88, 86 and 1 zero ice-discharge results at individual flux gates, out of 325 flux gates.

Once again, Figure 5 highlights the similarity between the Bedmap2 and Bedmachine v2 ice-thickness distributions (along the flux gates). As noted earlier, this is expected since they use similar approaches for the Antarctic Peninsula. However, while Bedmachine v2 includes a total of 220 zero ice-thickness points along the flux gates, Bedmap2 includes 1851 out of 7630 (see Table 3). This difference, however, is not as striking when we note that 1810 measurement points along the flux gates in Bedmachine v2 show ice-thickness values of less than 1 m, thus having little impact on the total ice-discharge calculation.

Table 3. Total number of ice thickness points along flux gates with negative, zero and positive values, categorized into values with point velocity greater than 0.5 m d⁻¹, between 0.5 and 0.1 m d⁻¹ and lower than 0.1  m d⁻¹

We also analyzed the individual points of the flux gate discretizations, counting the number of negative, zero and positive ice thicknesses and comparing them with the ice surface velocity (Table 3). As mentioned above, 43.6% of the DeepBedMap points show negative ice thickness values. These meaningless negative values were masked and considered as zero values in our calculation of ice discharge (Fig. 5f shows the ice-thickness distribution for DeepBedMap before masking negative numbers). Also, 24.3% of the Bedmap2 thickness points along the flux gates are zero. In these two cases (DeepBedMap and Bedmap2), we expect a high underestimation of the ice discharge, since the calculations of ice discharge for fast-flowing ice (>0.5 m d⁻¹) produce zero discharge due to the zero ice thickness. In the case of Carrivick and others (Reference Carrivick, Davies, James, McMillan and Glasser2018), Huss and Farinotti (Reference Huss and Farinotti2014) and Morlighem and others (Reference Morlighem2020), 99.25, 99.5 and 97.1% are points along the flux gates with meaningful positive ice-thickness values.

A fundamental problem of Carrivick and others (Reference Carrivick, Davies, James, McMillan and Glasser2018) model, pointed out by their own authors and also common to Huss and Farinotti (Reference Huss and Farinotti2014) model, is that neither the perfect-plasticity approach (Carrivick) nor the SIA (H&F) is expected to be appropriate for either calving tidewater glaciers or ice shelf tributary glaciers, because they have significant longitudinal stresses resulting in rapidly expanding flow near their terminus (tidewater glaciers) or as they approach the ice shelves. While the mass-conservation approach of Bedmachine does its best when modeling ice-thickness in regions of fast flow (>50 m  a⁻¹), in the case of Bedmachine Antarctica v2 it has rarely been applied to glaciers north of 70${^\circ }$S; instead, the streamline-diffusion interpolation scheme has been applied in most of the region, no matter whether the zones have fast flow or slow flow. This is likely due to the fact, pointed out by Morlighem and others (Reference Morlighem2020), that the precision of the mass-conservation product is affected by the spacing between ice-thickness measurements, which are used to constrain the calculation. A fundamental problem of DeepBedMap is that it does not use ice-thickness data from the AP to train its neural network algorithm. This could be the reason behind the large number of meaningless negative ice-thickness values produced in this region. Finally, a major limitation of Bedmap2 in the AP region is its coarse nominal spatial resolution of 1 km, which is actually much coarser due to the limited data used for interpolation (Carrivick and others, Reference Carrivick, Davies, James, McMillan and Glasser2018). This makes it inappropriate for most of our study region, characterized by a complex and rapidly spatially-varying bed geometry. This could be the reason for the large number of zero ice-thickness points generated by this model at the flux gates, even in fast-flowing areas.

Taking into account that most of the ice-thickness reconstruction models used in this study have proved to be more consistent and in more agreement with measurements when applied at other locations (such as the Greenland and central Antarctic ice sheets, and mountainous regions), their deficiencies and inconsistencies in ice-thickness results shown when applied to the AP north of 70 °S, and their associated ice discharge estimates, manifest a fundamental problem of our region under study: the scarcity of appropriate ice-thickness data. The mountainous relief, with many outlet glaciers confined within steep ridges, makes airborne radar data collection extremely difficult. Across-flow profiles close to the calving fronts of tidewater glaciers or next to the grounding line of ice-shelves fed by many of the outlets, are critical for accurate ice-thickness estimates. However, the surrounding steep slopes make the data collection prone to failure. When along-flow profiles are involved, unwanted reflections from the glacier valley walls obscure the radar records and make their interpretation difficult or impossible. The highly crevassed glacier fronts, with their inherent scattering of radar energy, further complicate things. For these reasons, even if the Icebridge radar profiles are in many parts of the AP relatively abundant, when one looks at the actual data recorded a huge amount of data gaps or inconsistent data arises. In regions such as the northernmost AP, where a certain amount of temperate ice is expected, Icebridge data have been collected using radars designed for cold ice and the bed reflection is often simply not visible because of the strong scattering of the radar energy by the temperate ice, preventing data interpretation.