5.1. Spatial variability in R

The spatial variability shown in our estimates of R is somewhat consistent with other studies, particularly near the grounding zone. Near the grounding zone, we do not expect the ice to be freely floating because it is dynamically linked to the grounded ice and experiences flexure due to variations in sea level (e.g. tides) for several kilometers downstream of the true grounding line rather than simple vertical displacement (Rignot and others, Reference Rignot, Mouginot and Scheuchl2011a; Friedl and others, Reference Friedl, Weiser, Fluhrer and Braun2020). The grounding line used in this study was identified from differential satellite radar interferometry data acquired in 2007–09, and thus most closely represents the landward limit of tidal flexure (Rignot and others, Reference Rignot, Jacobs, Mouginot and Scheuchl2013; Mouginot and others, Reference Mouginot, Scheuchl and Rignot2017); much of the airborne thickness and altimetry data included in analysis are likely within the flexure zone, which often extends a few hundred meters to a few kilometers past the break-in-slope or surface minimum (Rignot and others, Reference Rignot, Mouginot and Scheuchl2011a). The distance between the grounding line and the first seaward point at which the ice is freely floating depends on ice rheology, surface and basal topography, ice velocities and the thermal forcing of the ocean (Griggs and Bamber, Reference Griggs and Bamber2011). Changes in ice properties may lead to decoupling between thickness and surface height gradients (Rignot and Jacobs, Reference Rignot and Jacobs2002), leading to high hydrostatic residuals. Griggs and Bamber (Reference Griggs and Bamber2011) showed that IPR thickness measurements were up to 100 m thinner than those obtained from ERS-1 surface heights within 10 km of the grounding line, which was attributed to poor data coverage due to loss of lock by ERS-1 in regions with steep topography (which led to interpolation errors) and/or the breakdown of hydrostatic equilibrium near the grounding line. In contrast, Chuter and Bamber (Reference Chuter and Bamber2015) found the opposite sign in hydrostatic residual near the grounding line, which was attributed to greater data density from CryoSat-2 compared to ERS-1 and ICESat, which reduced interpolation errors and resulted in thinner hydrostatic thicknesses. Both studies found greater absolute hydrostatic residuals and standard deviations near grounding lines than over entire ice shelves, attributed to the breakdown of the hydrostatic assumption near the grounding zone due to vertical stresses associated with elastic bending and to greater uncertainties in firn thickness on the steep slopes within the grounding zone. Our results are more consistent with those of Griggs and Bamber (Reference Griggs and Bamber2011), as the mean R within 10 km of the grounding line is consistently positive (Fig. 5b), although we do find negative R values associated with the break-in-slope of the surface profile within 10 km of the grounding line (Fig. 6). Our more detailed observations show that the ice is possibly freely floating at 6–8 km from the grounding line (Fig. 6), and we concur that the hydrostatic assumption is unreliable within this distance.

Hydrostatic residuals may reflect uncertainties in the parameters used to calculate hydrostatic thickness and/or physical phenomena preventing the ice from floating freely. The flotation of an ice shelf is dependent on its geometry and velocity; stress transfer may bend the ice to be concave or convex, thus raising or lowering the ice column. Furthermore, estimates of hydrostatic thickness rely on the modeled firn air content, H_a, which is highly uncertain, as firn thickness can vary on sub-km scales not captured in FDMs (Medley and others, Reference Medley, Lenaerts, Dattler, Keenan and Wever2022b). Underestimation of the firn density or thickness would result in an overestimation of hydrostatic ice thickness based on its freeboard, and vice versa. Indeed, the sFDM reported lower H_a values than the tFDM, resulting in more positive hydrostatic residuals (Table 2). Below, we discuss the measurement errors and uncertainties that may contribute to hydrostatic residuals, and we assess their impacts on basal melt rate estimates.

5.2. Confidence in ice penetrating radar thickness measurements

Our crossover analysis shows that radar thickness measurements were highly self-consistent. This indicates that hydrostatic residuals cannot be explained by lack of precision in thickness measurements, but it does not rule out the possibility that the MCoRDS or HiCARS thickness measurements are biased due to radar attenuation. Indeed, HiCARS ice thicknesses are reported to tend to be biased high based on a first return, and biased low based on a nadir return (Blankenship and others, Reference Blankenship2011). Outliers likely represent steep thickness gradients near the intersections due to crevassing or other damage to the ice. Furthermore, shear heating in ice sheet shear margins has been associated with radar signal attenuation leading to dimmed basal echoes and absent or low-confidence radar picks (Summers and Schroeder, Reference Summers and Schroeder2022), however our data show no clear relationship between missing or low-confidence radar picks and high shear strain rates.

5.3. Impact of ice column component thickness and density on hydrostatic imbalance

We do not assess the impact of accreted marine ice on the hydrostatic residual for the ice shelves in this study. Marine ice can have a density of up to 938 kg m⁻³ (Craven and others, Reference Craven, Allison, Fricker and Warner2009), so we expect that failure to consider accreted marine ice would lead to an underestimation of hydrostatic thickness since a denser ice column sits lower in the water column. Griggs and Bamber (Reference Griggs and Bamber2011) found that ice thickness was underestimated by 5% by not including marine ice (thereby underestimating ice density) in the upper-bound case where half of the total thickness is composed of marine ice. The presence of marine ice may also result in low-confidence picks for the ice shelf base due to its higher conductivity and radar wave energy absorption than meteoric ice (Vaňková and others, Reference Vaňková, Nicholls and Corr2021). The thickness of marine ice has been estimated for several ice shelves, but few of these areas were surveyed in our dataset. On the Ronne-Filchner ice shelf, marine ice exceeding 100 m in thickness is expected north of 80° S (Vaňková and others, Reference Vaňková, Nicholls and Corr2021), but most of our ground tracks fall south of this latitude. Marine ice up to 80 m thick is also expected along several flowlines on Larsen C ice shelf (Holland and others, Reference Holland, Corr, Vaughan, Jenkins and Skvarca2009; Harrison and others, Reference Harrison, Holland, Heywood, Nicholls and Brisbourne2022), but these regions are not associated with anomalous R values (Fig. S14).

Uncertainty in the thickness and density of firn may contribute to hydrostatic residuals. We approximate how these parameters would need to change for the measured H and h to satisfy the hydrostatic assumption for the cases in which the sFDM or tFDM H_a and MDT corrections are applied. When referring to the firn air column thickness and density necessary to satisfy the hydrostatic assumption, we will denote them with the subscript E for consistency with H_E.

Because R is generally positive, the ice must be less dense than assumed for the measured thickness and freeboard to be in hydrostatic equilibrium. This disparity in densities could be a result of uncertainties in the modeled H_a and/or assumed density ρ_a. To independently investigate the thickness of the firn air column needed to account for R (H_aE), we substitute H and H_aE for H_E and H_a in Eqn (1), leaving ρ_a constant, and set the difference between H_E and H equal to R, so that:

(4a)$$\matrix{ {R = ( {H_{aE}-H_a} ) \displaystyle{{\rho _i-\rho _a} \over {\rho _s-\rho _i}}.} \cr } $$

To independently investigate the firn air column density (ρ_aE), needed to account for R, we substitute H and ρ_aE for H_E and ρ_a in Eqn (1), leaving H_a constant, and again take the difference between the equations for H_E and H:

(4b)$$\matrix{ {R = ( {\rho_a-\rho_{aE}} ) \displaystyle{{H_a} \over {\rho _s-\rho _i}}.} \cr } $$

We can then directly solve for H_aE – H_a (assuming ρ_a = 2 kg m⁻³) or ρ_aE – ρ_a (assuming modeled H_a), eliminating the need to explicitly calculate H_aE and ρ_aE.

Equation (4a) shows that when R is positive, the equilibrium H_aE must be proportionally greater than H_a, positive so that air with a density of 2 kg m⁻³ accounts for more of the total thickness of the ice shelf, decreasing the vertically averaged column density to flotation, and vice versa. A thicker firn-air column would account for the higher observed h required for the observed H to satisfy the hydrostatic assumption, because it would lower the density of the observed ice column, forcing it to float higher in the water (i.e. higher freeboard, smaller submerged portion than if the ice column were denser; Fig. 8). In reality, a thicker firn air column, as seen in the tFDM, indicates a deeper firn layer (Ligtenberg and others, Reference Ligtenberg, Helsen and van den Broeke2011). Similarly, if we assume that the modeled firn-air column thickness is correct but that the density is unknown, Eqn (4b) shows that when R is positive, ρ_aE – ρ_a must be negative in order to bring the vertically averaged column density down, and vice versa.

Figure 8. Cartoon graphic showing relevant quantities for a column of ice floating in seawater. The ice below sea level is discontinuous to exaggerate the vertical scale. Quantities represent observed or accepted values as in Fig. 2, with added H_aE, which is the firn air column thickness necessary to bring the observed ice column into hydrostatic equilibrium, and dH_a, which is the difference between H_aE and the modeled firn air column thickness H_a.

Overall, for the case with sFDM H_a and MDT corrections applied, the mean H_aE – H_a is 2 m, and for the case with tFDM Ha and MDT corrections applied, the mean H_aE – H_a is −4 m (Table S3). Thus, the sFDM H_a more closely match the H_aE required for hydrostatic equilibrium than the tFDM H_a. Both mean values are within the nominal uncertainties of both firn models (Table 1), but this uncertainty is poorly spatially constrained. Indeed, a change in H_a of ±10 m would result in an R of ±84 m, and our R values exceed± 84 m in several places (Figs 6, 7), even resulting in negative H_aE over short distances (e.g. Fig. 9). Furthermore, the direct relationship between H_aE – H_a and R means that the firn-air column thickness would vary widely over the same spatial scales as the hydrostatic residual. Although spatial variability in H_a is driven primarily by surface climatic conditions, which have not been modeled on sub-km scales (Ligtenberg and others, Reference Ligtenberg, Helsen and van den Broeke2011; Lenaerts and others, Reference Lenaerts2014; Ligtenberg and others, Reference Ligtenberg, Kuipers Munneke and van den Broeke2014), more recent studies have shown that surface accumulation can vary on km scales (Dattler and others, Reference Dattler, Lenaerts and Medley2019). Our results show that regions like Remnant Larsen B, and near the Bawden ice rise on Larsen C require a > 10 m thicker firn air layer than modeled to satisfy the hydrostatic assumption, despite absent or near zero modeled and observed firn thicknesses in this region (Holland and others, Reference Holland2011; Ligtenberg and others, Reference Ligtenberg, Helsen and van den Broeke2011).

Figure 9. Thwaites transect d-d’ showing modeled H_a (black curve), and H_aE (gray curve).

The mean change in ρ_a would result in unphysical mean hydrostatic firn air column densities (ρ_aE) for all but three ice shelves in the case with sFDM H_a and MDT corrections applied, indicating that uncertainties in accounting for the firn air column alone cannot explain R (Table S3). However, the case with tFDM and MDT corrections applied resulted in positive ρ_aE for all but four ice shelves. This disparity points to the need for more observations of firn properties and firn densification models of higher confidence. Larsen C has the most negative ρ_aE – ρ_a (ρ_aE = −1633 kg m⁻³) required for balance in the sFDM case and the second most negative in the tFDM case (ρ_aE = −71 kg m⁻³), providing further evidence that the measured freeboard is much too high for ice with the observed thickness and H_a from either FDM to be in hydrostatic equilibrium.

5.4. Relationship between R and strain rates

If hydrostatic balance may partly be due to the transfer of vertical stress (i.e. stress bridging) within the ice shelf, we expect that R will also be related to strain rates (Cuffey and Patterson, Reference Cuffey and Paterson2010). We estimate longitudinal (e_lon), transverse (e_trans) and shear (e_shear) surface strain rates from the NASA MEaSUREs InSAR-derived average velocity map (Rignot and others, Reference Rignot, Mouginot and Scheuchl2011b, Reference Rignot, Mouginot and Scheuchl2017; Mouginot and others, Reference Mouginot, Scheuchl and Rignot2012) following the approach of Bindschadler and others (Reference Bindschadler, Vornberger, Blankenship, Scambos and Jacobel1996) at each measurement point. The relationships between R (from the case with sFDM H_a and MDT corrections applied) and the median ∇·u = e_lon + e_trans (normal strain rates, where ∇ is the del operator and u is velocity) and absolute value of e_shear within 1 m increments of R, are plotted in Fig. 10. We find that, as expected, low-magnitude R values coincide with low strain rates, and the magnitude of R increases with increasingly positive shear and normal strain rates. A negative R means the ice is thicker than hydrostatic (the freeboard is below flotation), which is consistent with increased vertical stress due to bridging (Le Brocq and others, Reference Le Brocq2013; Drews, Reference Drews2015). Normal strain rates increase with both positive and negative R, which may depend on the direction of stress transfer.

Figure 10. a: Median normal strain rates (e _lon + e _shear, black dots) and absolute values of shear strain rates (|e _shear|, gray '+' signs) for points within 1 m bins of R for all IPR points. b, c: Median e _lon + e _trans and |e _shear|, respectively, within 1 m bins of R for West Antarctica (blue dots, + signs), East Antarctica (all shelves, red dots, + signs) and East Antarctica excluding the Western Ross/McMurdo ice shelf system (orange dots, + signs). Bins containing fewer than the 40th percentile of N (1100 points for Panel a) are excluded.

The relationship between R and ∇·u described above (Fig. 10a) is dominated by West Antarctic ice shelves, which have greater data density (Fig. 10b). However, individual ice shelves show significant variability (Text S3.1, Figs S46–S47).

For East Antarctic ice shelves, excluding the western Ross Ice Shelf/McMurdo Ice Shelf system, the median ∇·u is near zero for all values of R, with higher magnitudes of R generally correlating with decreasing ∇·u (Fig. 10b). Overall, we find that smaller hydrostatic imbalances tend to be associated with compression, while larger imbalances, particularly positive R values, are more likely to be associated with extension, when the Western Ross/McMurdo Ice Shelf is excluded. However, this general pattern is not consistent at the scale of individual ice shelves (Figs S46–S47).

Higher shear strain rates are associated with increasing magnitudes of R, and this effect is larger for negative R values for both West and East Antarctica (Fig. 10a, c). We would expect more negative R values in areas of higher shear as shear stresses may be transferred horizontally from the interior of the ice sheet to the margin.

5.5. Impact of R on estimates of basal melt/accretion rates

The over/underestimation of the rate of basal mass change is dependent on the signs of R and the strain rates. Because R and median strain rates for the vast majority of points are near zero (Figs 4,10), we expect that the rate of basal mass change estimated from hydrostatic thickness, M_bE, won't be greatly misestimated. Assuming incompressibility of ice, and following the continuity approach, the basal mass balance is estimated as (e.g. Dutrieux and others, Reference Dutrieux2013; Berger and others, Reference Berger, Drews, Helm, Sun and Pattyn2017; Shean and others, Reference Shean, Joughin, Dutrieux, Smith and Berthier2019; Chartrand and Howat, Reference Chartrand and Howat2020):

(5)$$\matrix{ {M_b = \left({\displaystyle{{DH} \over {Dt}} + H( {\nabla \cdot u} ) } \right)\displaystyle{{\rho _i} \over {\rho _w}}\;-\;M_s, \;\;} \cr } $$

where M_b is the rate of basal mass loss/gain in m w.e. a⁻¹ (meters of fresh water equivalent per year) and is positive for refreezing and negative for basal melt, M_s is the surface ablation/accumulation rate, which is positive for mass gain, ∇ is the del operator, u is the column-average horizontal velocity of the ice (m a⁻¹), and ρ_w is the density of fresh water, 1000 kg m⁻². The density of ice is assumed to be 918 kg m⁻³. Estimates of basal mass balance from spaceborne freeboard height measurements, such as those from Adusumilli and others (Reference Adusumilli, Fricker, Medley, Padman and Siegfried2020) rely on the calculation of H_E, and we will thus refer to these estimates as M_bE.

To explicitly calculate the difference in the rate of basal mass loss/gain estimated from H and H_E, termed R_Mb, we substitute M_bE for M_b and H_E for H in Eqn (5) and subtract M_b from M_bE, assuming that DH/Dt = DH_E/Dt, so that these values and M_s cancel out:

(6)$$\matrix{ {R_{Mb} = M_{bE}-M_b = [ {( {H_E-H} ) ( {\nabla \cdot u} ) } ] \displaystyle{{\rho _i} \over {\rho _w}} = R( {\nabla \cdot u} ) \displaystyle{{\rho _i} \over {\rho _w}}.} \cr } $$

Thus, R_Mb balances the extension or compression of the ice and the hydrostatic residual. We estimate ∇·u as described in Section 5.3. We then compare our results from Eqn (6) with basal mass balance rates obtained from the ICESat and ICESat-2 satellite record (Adusumilli and others, Reference Adusumilli, Fricker, Medley, Padman and Siegfried2020), termed M_bE. Where R is positive (thickness is overestimated) and strain rates are tensile, R_Mb is greater than 0, indicating that M_bE is too positive, and where strain rates are compressive, R_Mb < 0 and M_bE is too negative. Where R is negative (thickness is underestimated), R_Mb < 0 and M_bE is too negative where strain rates are tensile, and R_Mb > 0 and M_bE is too positive where strain rates are compressive. These interpretations are also summarized in Box 1. These relationships hold at each ground track coordinate, but not necessarily for the aggregated ice shelf results (Table S4). We divide the absolute value of R_Mb by the absolute value of M_bE – R_Mb (where M_bE is from the satellite record, bilinearly interpolated to ground track coordinates) and multiply by 100 to obtain a percent error of mass balance estimates (Table S4).

Box 1. Impact of R on basal mass balance estimates

Overall, accounting for R using sFDM H_a and MDT corrections results in a mean of 71% and a median of 3% error in the rate of basal mass change calculated in Adusumilli and others (Reference Adusumilli, Fricker, Medley, Padman and Siegfried2020). Since strain rates of ice shelves tend to be on the order of 10⁻³ per year, the median percent error aligns with our expectation that the impact of R on M_b is generally small. We expect that the large mean percent error results from division by very small magnitudes of |M_bE – R_Mb|. However, hydrostatic imbalance may introduce a bias that, when integrated over large areas, may be significant to the total mass balance. Also, the impact may be significant in areas of high strain rates, such as at shear margins, or in areas of high R, such as basal channels.

Overall, the mean and median |R_Mb| for all data points is 0.4 and 0.0 ± 2.1 m w.e. a⁻¹, meaning that on average, the hydrostatic assumption does not dramatically over- or underestimate basal melt rates, but the standard deviation of 2.1 m w.e. a⁻¹ indicates that there is spatial variability, depending on the flow regime. However, the impact of R on basal mass change rate estimates varies between ice shelves, and on local scales (Table S4). The most extreme impacts of R_Mb occur on Thwaites Ice Shelf (mean and median R_Mb = 0.3 and 0.1 ± 6.6 m w.e. a⁻¹), the Ninnis ice shelf (−0.9 and −0.3 ± 2.8 m w.e. a⁻¹), and the Vincennes Bay/Underwood Ice Shelf region (−0.8 and 0.0 ± 12.7 m w.e. a⁻¹), and the Shackleton Ice Shelf (−0.3 and −0.0 ± 2.5 m w.e. a⁻¹). When compared to the melt rates from Adusumilli and others (Reference Adusumilli, Fricker, Medley, Padman and Siegfried2020), however, the most extreme relative impacts on basal mass balance were on Thwaites Ice Shelf, where M_bE is misestimated by a median of 11%, Cook Ice Shelf, (9%), Shackleton Ice Shelf (10%) and West Ice Shelf (16%). The R_Mb values of the latter three ice shelves are likely dominated by extreme R values due to the relatively low number of ground tracks in those regions.

Our results showing high magnitudes of R near basal channels and other potentially destabilizing features are consistent with other observations (e.g. Drews, Reference Drews2015; Chartrand and Howat, Reference Chartrand and Howat2020; Dow and others, Reference Dow2021) and point to the need for more detailed measurements near these features to accurately account for them in mass balance estimates. Hydrostatic imbalance has been shown to change over time as ice advects over an actively incising basal channel (Chartrand and Howat, Reference Chartrand and Howat2020), indicating that repeat freeboard height measurements may yield erroneous basal melt rates. Although temporal analysis of R is not a goal of this study, several ground tracks with repeat coverage show that R changes over time at a variety of ice shelf features (Figs S9, S10, S16, S17, S27–29, S41). Furthermore, analyses on the Roi Baudoin and Nansen Ice shelves have shown that satellite-derived surface velocities and related strain rates may be better suited than the hydrostatic assumption to characterize basal feature morphology (Drews, Reference Drews2015; Dow and others, Reference Dow2021). However, these studies used near-contemporaneous surface velocities to test the agreement between strain-rate and IPR-derived morphology, which are not widely available for supplementing hydrostatic calculations of ice thickness prior to the epoch of widespread availability of high-resolution speed and surface elevation data, such as from the GO_LIVE/ITS_LIVE (Fahnestock and others, Reference Fahnestock2016; Gardner and others, Reference Gardner2018) and REMA projects (Noh and Howat, Reference Noh and Howat2019).

Similarly, short-term and short-spatial-scale freeboard changes are largely unrelated to basal mass balance and, if not accounted for, can lead to magnification of errors in estimating changes in ice thickness (Vaňková and Nicholls, Reference Vaňková and Nicholls2022). Our results corroborate the assertion that errors in basal melt rates derived from satellite data (e.g. Adusumilli and others, Reference Adusumilli, Fricker, Medley, Padman and Siegfried2020) are not spatially uniform (Vaňková and Nicholls, Reference Vaňková and Nicholls2022), because R is not uniform in time or space, imparting unknown and potentially large errors in basal melt rates estimated from freeboard.