Atmospheric forcing

Atmospheric forcing is provided by a simulation at 5.5 km horizontal resolution of the regional atmospheric climate model RACMO2 (Van Reference Van MeijgaardMeijgaard and others, 2008; Reference LenaertsLenaerts and others, 2012b). In previous runs at 27 and 55 km resolution, RACMO2 realistically simulated the Antarctic near-surface climate and SMB (Van de Reference Van de Berg, Van den Broeke, Reijmer and Van MeijgaardBerg and others, 2005; Reference Lenaerts, Van den Broeke, Van de Berg, Van Meijgaard and Kuipers MunnekeLenaerts and others, 2012a). The model includes a module to calculate drifting-snow transport and sublimation, processes that significantly contribute to the SMB on both local and ice-sheet-wide scales (Lenaerts and Van den Reference Lenaerts and Van den BroekeBroeke, 2012). Drifting-snow processes in the model lead to an increased extent of ablation (SMB < 0) and glazed areas (SMB ≅ 0) in interior East Antarctica, features that are shown to be realistic (Reference StearnsStearns, 2011; Lenaerts and Van den Reference Lenaerts and Van den BroekeBroeke, 2012; Reference ScambosScambos and others, 2012). However, to resolve SMB gradients on smaller scales, which are mostly related to subtle variations in topography, subsequent wind field heterogeneity and snow erosion and deposition patterns, the model resolution was enhanced to 5.5 km resolution and run for a single year, 2009 (Reference Lenaerts, Van den Broeke, Scarchilli and AgostaLenaerts and others, 2012c). At this resolution, it is shown that these improvements are necessary to simulate the strong wind acceleration inside the Byrd glacial valley. Due to this acceleration, the cumulative amount of drifting-snow sublimation and erosion is larger than precipitation, leading to ablation in the valley. These features are not resolved at 27 km resolution (Reference Lenaerts, Van den Broeke, Scarchilli and AgostaLenaerts and others, 2012c).

In this study, we use daily output of RACMO2 for the year 2009 as climatic forcing for the FDM. We assume this forcing is representative of the long-term climate, a reasonable assumption since the 2009 SMB of this part of East Antarctica (Ice, Cloud and land Elevation Satellite (ICESat) basin 15 and 16; Reference ShepherdShepherd and others, 2012) is 49 Gt a⁻¹, which is comparable to the 1979–2010 average of 47 Gt a⁻¹.

Firn-densification model

We use a one-dimensional, time-dependent FDM that calculates density, temperature and liquid water content in a vertical firn column (Reference Ligtenberg, Helsen and Van den BroekeLigtenberg and others, 2011). The FDM is forced at the surface with output from RACMO2; SMB components (precipitation, surface sublimation, surface melt and drifting-snow processes), skin temperature and 10 m wind speed. The climate forcing along the ice-flow trajectory is defined as the four-point inverse-distance weighted average of the nearest RACMO2 gridpoints. To keep the FDM computationally feasible, while taking into account the varying climate on locations along the flowline, a constant climate of 10 years is chosen before it is moved to the new trajectory point with its associated different climate. The trajectory extends far enough upstream of the BIA to build up and refresh a complete firn column, thereby spinning-up the FDM.

In previous studies, the FDM was used to simulate firn and surface height changes at a fixed position (Reference Ligtenberg, Horwath, Van den Broeke and LegrésyLigtenberg and others, 2012; Reference Pritchard, Ligtenberg, Fricker, Vaughan, Van den Broeke and PadmanPritchard and others, 2012), whereas this study focuses on simulating the evolution of a firn layer that moves along an ice-flow trajectory. Also, the extreme conditions (ablation, high wind speeds) of the BG region are a rigorous test for the FDM compared with the accumulation zone of an ice sheet. For this purpose, some slight modifications to the FDM physics have been introduced, in comparison with the version of Ligtenberg and others (2011).

Firstly, drifting-snow erosion/deposition is added as a mass removal/addition term, as it is one of the driving forces of BIA formation (Reference Takahashi, Naruse, Nakawo and MaeTakahashi and others, 1988). Every model time-step, RACMO2-simulated SMB components (snowfall, rainfall, snowmelt, surface sublimation, drifting-snow sublimation and drifting-snow erosion/deposition) are added to or removed from the top model layer with either the density of fresh snow (mass addition) or the density of the top model layer (mass removal). Secondly, the FDM must be able to accommodate a complete removal of the model firn layer. This is done by adding new layers with the density of ice at the bottom of the model firn layer when a minimum number of model layers is reached (50). Thirdly, the semi-empirical expression for the densification of firn used in the FDM depends on average accumulation (ḃ), and temperature (Reference Herron and LangwayHerron and Langway, 1980; Reference Arthern, Vaughan, Rankin, Mulvaney and ThomasArthern and others, 2010; Reference Ligtenberg, Helsen and Van den BroekeLigtenberg and others, 2011), and is therefore physically unusable in ablation areas. Therefore, we assume that ḃ is always at least equal to 15 kg m^–2 a⁻¹, i.e. firn densification is a continuous process. Even in a negative accumulation area, snowfall events occur that add mass and therefore increase pressure on the firn layers, thereby enhancing firn densification. When mass is removed from the surface, pressure on the firn layers is lowered, but this does not cause ‘negative’ firn densification, i.e. no air is added to the firn layer. The value of ḃ = 15 kg m^–2 a⁻¹ was chosen based on model experiments, and gives comparable densification rates at depth between ablation and accumulation regions. Firn models that use the overburden pressure as a measure for firn densification (e.g. Reference Barnola, Pimienta, Raynaud and KorotkevichBarnola and others, 1991; Reference Spencer, Alley and CreytsSpencer and others, 2001) are not affected by this, as they do not use the average accumulation rate in their equations. Like most firn models, our FDM is calibrated to density data from accumulation zones. In the absence of similar data from ablation areas, we currently have to rely on these models without being able to directly validate the modeled density profiles.

Ice velocity

To obtain a trajectory along an ice flowline, the AIS ice velocity field of Rignot and others (2011) is bilinearly interpolated onto the grid of RACMO2 (5.5 km). Firstly, a location downstream of the ablation area (i.e. negative SMB in RACMO2) is selected and the trajectory is calculated in a stepwise fashion in the upstream direction, using the average flow velocity and direction of the four neighboring points. A time-step of 10 years is used. These steps are repeated until the trajectory reaches the East Antarctic plateau, where the climate is relatively stable and ice velocities are relatively low, conditions that are required to spin-up the model firn layer. Figure 2 shows the resulting ice-flow trajectory and SMB map and profile along the trajectory crossing BG. The trajectory starts at point ′S′ on the East Antarctic plateau, at >2000 m a.s.l., where ice velocity is relatively low (~50 m a^-1), and ends at point ′F′ on the Ross Ice Shelf (RIS). The ice velocity in the first half of the trajectory is low; the more widely spaced trajectory dots indicate the increasing speed when the trajectory enters the narrow valley of BG, where the highest ice-flow velocities are reached (up to 1200 m a⁻¹; Fig. 2a). Ice-flow speed remains high when the trajectory leaves the narrow valley and enters the RIS.

Fig. 2. Ice-flow trajectory starting at ′S′ on the East Antarctic plateau and ending at ‘F’ on the Ross Ice Shelf. Colors indicate ice-flow velocity in (a), and modelled SMB in (b). Dots indicate a trajectory point every 10 years and the solid curves indicate topographic height contours with 500 m spacing. (c) The SMB and (d) its components, snowfall, combined surface and drifting-snow sublimation (SU) and erosion/deposition by drifting snow (ER_ds), along the trajectory.

At the start of the trajectory, the SMB is close to zero (Fig. 2b and c), with small SMB components (Fig. 2d). Alternating patterns of ablation and accumulation are caused by subtle differences in the RACMO2 topography that initiate acceleration and deceleration of the wind speed (Reference Lenaerts, Van den Broeke, Scarchilli and AgostaLenaerts and others, 2012c). In turn, this determines patterns of erosion or deposition of drifting snow (Fig. 2d). This area of (near-)ablation agrees well with the ‘wind-glaze’ area found by Das and others (2013), shaded green in Figure 3. The Transantarctic Mountain range represents a large gradient in elevation and precipitation, leading to higher SMB values on the RIS to the east (~150 kg m⁻² a⁻¹) compared with the ice-sheet plateau to the west (-20 to 20 kg m⁻² a⁻¹). In the valleys of BG and Darwin Glacier (79° S, 159° E) the SMB is dominated by large drifting-snow sublimation and erosion rates due to strong katabatic winds, leading to a locally negative SMB. Downstream at the RIS, the SMB turns positive due to more precipitation and lower wind speeds.

Fig. 3. (a) Ice-flow trajectory starting at ′S′ on the East Antarctic plateau and ending at ‘F’ on the Ross Ice Shelf. Shaded background colors are observed ‘wind-glaze’ surface (green; from Reference DasDas and others, 2013) and blue-ice areas (blue; after Reference ScambosScambos and others, 2012). (b) Enlargement of the Byrd Glacier region in (a).

Blue-ice area

Scambos and others (2007) present a satellite image algorithm for mapping snow grain size, and use it to estimate BIA extent. Using two bands from the Moderate Resolution Imaging Spectroradiometer (MODIS) satellite sensor, specifically its two 250 m resolution bands (band 1: red visible light at 620–670 nm; band 2: near-infrared at 841–876 nm), grain size is determined by the increased absorption of infrared light as grain size increases. The MODIS band 1 and 2 data are corrected for sensor drift, satellite and solar geometry, and atmospheric absorption, and are converted to top-of-the-atmosphere reflectivity before using a look-up table of snow grain size and reflectivity in each band derived from a model (Reference Ricchiazzi, Yang, Gautier and SowleRicchiazzi and others, 1998; Reference Painter, Dozier, Roberts, Davis and GreenPainter and others, 2003). A map of snow grain size produced from a MODIS mosaic of the Antarctic continent was produced and described by Scambos and others (2007), and data for this 2003–04 mosaic and a second mosaic produced from 2008–09 data (Reference ScambosScambos and others, 2012) are available from NSIDC (nsidc.org).

An earlier Landsat-based study by Brown and Scambos (2004) used a supervised classification approach to map wind-induced BIAs near BG for seasonal and interannual variations in extent. Comparing the grain-size mapping results of the MODIS bands 1 and 2 approach with this earlier study indicates that an effective threshold for mapping BIA boundaries from optically determined snow grain-size data is 400 μm. Figure 3 shows the resulting BIA extent (in blue) when this threshold and the method described above are used. The two Mosaic of Antarctica grain-size datasets give results consistent with the BIAs considered by Brown and Scambos (2004), and other mapped Antarctic BIAs (e.g. Van den Reference Van de Berg, Van den Broeke, Reijmer and Van MeijgaardBroeke and others, 2006). They indicate that the BIA in the central BG trunk extends from just east of 155° E to just west of 162° E. However, these boundaries can vary due to seasonal and interannual variations in snow cover. For example, the eastern extent boundary varies between 161.6° E and 161.9° E in the 2004 and 2009 mappings. The western boundary, and most other wind-induced BIAs in the region, are near identical in both mappings. The BG BIA is approximately 125–130 km along-flow and 20–30 km wide through the glacier trunk, extending quite close to the valley walls of the glacier. Along the ice-flow trajectory calculated in the previous subsection (Fig. 2c), the BG BIA extends from 156.4° E to 161.8° E (Fig. 3b). The trajectory also passes through a smaller BIA, upstream of BG, which extends from 150.8° E to 152.1° E.

BIA feedback mechanisms

Positive feedback processes active at the BIA surface are related to (1) the darker surface of a BIA compared to snow and (2) the smoother and harder surface of a BIA. The albedo of freshly fallen snow can be as high as 0.85, while the albedo of blue ice is in the range 0.5–0.6 (Bintanja and Van den Reference Van den Broeke and BintanjaBroeke, 1995), so blue ice absorbs three to four times more solar radiation than fresh snow. A part of this extra energy is transformed into heat, making the surface of BIAs warmer than the surrounding snow-covered areas. Bintanja and Van den Broeke (1995) found that, averaged over one summer, the surface temperature of a BIA was 6.4 K higher than over the surrounding snow-covered area. In the FDM, this effect was mimicked by adding a sine-like surface temperature correction, maximized at the summer solstice (+6 K) and zero when the sun is below the horizon at 80° S (Fig. 5a). The associated increase in sublimation rate follows the correction for temperature, since the effects are coupled. At the summer solstice the sublimation correction is maximized at +0.3 mm d⁻¹ (Fig. 5b). This value is based on the difference in average summer latent heat flux above a BIA and snow (10 W m⁻²; Bintanja and Van den Reference Van den Broeke and BintanjaBroeke, 1995). The magnitude of both corrections (temperature and sublimation) is made a function of the density of the upper model layer: no correction is applied for a snow surface (ρ < 400 kg m⁻³) and the full correction is applied for blue ice (ρ > 830 kg m⁻³), with a linear dependency in between. The latter threshold is chosen as it represents the approximate pore close-off density, at which air bubbles get trapped in the ice, and firn characteristics no longer change appreciably.

Fig. 5. Imposed idealized positive feedback mechanisms on a BIA, for (a) surface temperature, T _skin, (b) surface sublimation, SU_s, and (c) accumulation ratio (snowfall and deposition of drifting snow).

The smoother and harder surface of a BIA makes it more difficult for precipitating snow particles to form a continuous snow layer at the surface (Van den Reference Van den Broeke and BintanjaBroeke and Bintanja, 1995a), especially during strong wind events. Therefore, less snow will accumulate at the surface of a BIA. To compensate for this effect, a fraction of the simulated snowfall and drifting-snow deposition is assumed to be removed from the surface, depending on the density of the surface. The threshold values for the surface density (400 and 830 kg m⁻³) are similar to that for the temperature and sublimation feedback. For a snow surface, all accumulation remains at the surface (fraction = 1.0), whereas on a BIA the fraction decreases to 0.2, meaning that only 20% of the accumulation is allowed to accumulate on the surface (Fig. 5c).

To investigate the sensitivity of BIA formation to the above schematic adjustments, an ensemble of FDM simulations was performed with varying strengths. The feedback mechanisms as described in the previous paragraphs, were used as the maximized values (1.0, or 100%): a 6 K temperature increase, a latent heat flux increase of 10 W m⁻² (e.g. a sublimation increase of 0.3 mm d⁻¹) and an accumulation fraction of 20%. In each consecutive run, numbered X10 to X1, the feedback strength was decreased by fractional increments of 0.1. For example, the ‘T6-S4-A3’ acronym refers to a simulation with a temperature increase of 3.6 K (0.6 × 6 K), a latent heat flux (or sublimation) correction of 0.12 mm d⁻¹ (0.4 × 0.3 mm d⁻¹) and an accumulation fraction of 0.76 (1.0 – (0.3 × 0.8)). The firn layer simulation without the feedback mechanisms (‘control’), as shown in Figure 4a, is thus ‘T0-S0-A0’.

Sensitivity experiments

Figure 6 shows the evolution of firn mass along the ice-flow trajectory with the three feedback mechanisms activated separately with varying strengths: (a) temperature, (b) sublimation and (c) accumulation. The temperature feedback appears to have a minor effect on the simulated firn mass; only in the low-velocity region of the trajectory (151–152° E) does the increase in surface temperature result in a significant change from the control run. The higher temperatures lead to higher firn densification rates, causing a faster firn/ice transition than in the control run and therefore earlier BIA formation. On BG no change in firn mass evolution is simulated for increased temperatures; BIA feedback processes are only activated when the upper layer density becomes >400 kg m⁻³, and this threshold is not reached on BG. Apparently, snowfall and drifting-snow deposition are large and constant enough for the upper snow layer density to remain low.

Fig. 6. Evolution of firn mass along the trajectory for (a) temperature, (b) sublimation and (c) accumulation experiments, along the trajectory shown in Figure 2b. The control simulation (thick black curve, same as Fig. 4a), and light (red, 1) to strong (blue, 10) feedback experiments are shown. Both the longitude and elapsed time are shown. Blue bars in (a) indicate the locations of the ‘Upper BIA’ and the ‘Byrd Glacier BIA’.

In the sublimation (Fig. 6b) and accumulation (Fig. 6c) experiments, the impact on firn mass is much larger. Both have similar effects on the firn layer: an increase in sublimation or a decrease in snow accumulation both decrease the SMB at the surface. For moderate feedback strengths (1–4), firn mass is reduced fairly linearly over the fast-ice-flow region (153–162° E). This is mainly caused by a lag effect that originates in the Upper BIA, where glacier ice is at the surface and the influence of the feedback processes therefore large. In both simulations, it takes more time for the new firn layer to re-establish itself and thereby deactivate the feedback mechanisms. When this happens (~153° E), the SMB forcing is again equal to the control run and the evolution of firn mass is similar until 159° E. Here BIA feedback processes again start to play a role as the upper layer density increases, causing the firn mass to reduce more rapidly. For relatively high feedback strengths (S5 and A4 and higher), a BIA at BG is simulated (firn mass = 0 at 160° E). These results suggest that the feedback mechanisms described here are essential to sustain the BG BIA. If no BIA were present, the feedback mechanisms would not be active and the climate would be comparable to the RACMO2 output, which does not lead to a BIA on BG (Fig. 4).

Between simulations S6 and S7 (and also between A5 and A6), a rapid change in firn mass prior to BG (154–158° E) occurs, which is also initiated by the previously discussed lag effect. The SMB around 153° E (Fig. 2c) is, in combination with the imposed increase in sublimation (or decrease in accumulation), too small to initiate fast firn layer growth. As the density of the upper layers remains high, the feedback processes remain active and no new firn layer is established. Only at ~154° E is the peak in SMB due to drifting-snow deposition large enough to start the formation of a significant firn layer. Hereafter, the feedback mechanisms are switched off and firn mass increases regularly until 157° E. Only for the strongest feedback simulation (A10, accumulation reduced by 80%) is no firn layer simulated over the entire 152–164° E section of the trajectory.

Although the sublimation and accumulation sensitivity simulations give quite similar results, there are also some notable differences. In the sublimation simulations, the onset of the Upper BIA occurs earlier with every experiment, whereas for the accumulation simulations an optimum is already reached in simulation A3. In this near-zero SMB environment, the individual SMB components are small (Fig. 2d) and because the accumulation feedback mechanism is prescribed as a fraction of the absolute amount, the imposed accumulation effect is also rather small. The sublimation effect, however, is prescribed as an absolute value and therefore has a continuously increasing effect. In the faster-flowing sections of the trajectory (154–157° E), the reverse effect is visible; here the sublimation simulations converge, with the strongest feedback simulations (S7–S10) showing the same firn mass. When individual SMB components are large, the absolute effect of the sublimation feedback is small and here the relative accumulation feedback has a much bigger impact. This is reflected in the reduction of firn mass in each subsequent simulation (A1–A10). When the trajectory enters the RIS (>162° E), all sublimation experiments form a firn layer, whereas the firn mass in the high-impact accumulation experiments (>A8) remains zero.

Combination of feedbacks

A combination of the feedback mechanisms is more realistic; to that end 121 experiments with different combinations of the sublimation and accumulation effects were performed. The temperature effect, although of minor importance, is also included and is prescribed to have the same relative strength as the sublimation effect. Figure 7 shows the results of 25 moderate combination simulations (A1–A5, combined with S1–S5). Similar patterns to those in Figure 6b and c emerge; (1) a faster formation of the Upper BIA, (2) the firn layer growth at the 153 or 154° E accumulation event and (3) the varying presence and extent of the BG BIA.

Fig. 7. Evolution of firn mass along the trajectory shown in Figure 2b for simulations with a combination of accumulation (line color) and sublimation (line style) feedback processes. The control simulation is included (thick black curve, same as Fig. 4a) and numbers indicate the strength of the feedback process, varying from light (1) to moderate (5). Blue bars indicate the locations of the ‘Upper BIA’ and the ‘Byrd Glacier BIA’.

The formation of the Upper BIA is similar to Figure 6b, as sublimation is the main driver of the formation of this BIA. With each increase in sublimation feedback strength, the Upper BIA is formed earlier, while an increase in accumulation effect induces significantly less change. The difference in maximum firn mass prior to BG (at 156° E) also shows the same pattern as for the separate sublimation and accumulation simulations (Fig. 6b and c). For the control run it peaks at 24 tons, and for moderate feedback simulations (S2-A2) this reduces to 18–22 tons, due to the slight time lag in firn layer growth around 153° E. From simulation S3-A3 onwards, the positive SMB event of 153° E is not sufficient and the build-up of a firn layer is delayed until the positive SMB event at 154° E, thereby generating significantly less firn mass (~7 tons). For stronger feedbacks, no firn layer is simulated and the BIA extends from 150 to 162° E. The presence and/or length of the BG BIA depends mostly on this maximum firn layer mass prior to BG. If this firn mass is larger, more mass needs to be removed and the BIA forms later or not at all. The firn layer growth at the end of BG BIA is more robust, and is predicted to be ~162° E in all experiments.

Figure 8 summarizes (a) the length, (b) the start position and (c) the end position of the BG BIA for the different model experiments, expressed in degrees longitude. The white area in the lower-left corner represents simulations in which no BIA develops. The white area in the upper-right corner represents simulations in which the BIA extends from at least 152° E to the end of the trajectory. The latter means that the feedback processes are so strong that no new firn layer forms between the Upper and BG BIAs. For increasing strength of the feedback processes, the length of the BIA increases, with the start and end of the BIA propagating westwards and eastwards, respectively. However, the transition is not gradual; the start of the BIA shows a distinct transition between simulations that do not simulate a firn layer prior to BG and simulations that do (start of BIA >158° E and <158° E, respectively). Less distinct is the difference in start position above 158° E, which indicates simulated firn layer growth from either the 153° E or the 154° E accumulation event. The end position of the BIA is more evenly distributed, with the majority of the solutions predicting the BIA terminating around 162° E. The length of the BIA is simply the difference between the start and end position, and varies between 2 and 10° E.

Fig. 8. (a) Length, (b) start position and (c) end position of the simulated BG BIA, for simulations with a combination of accumulation and sublimation feedback processes. Axis labels indicate the strength of the feedback process, varying from light (1) to strong (10). The observed BIA characteristics are indicated by the triangles.

An optimal combination of accumulation and sublimation feedback strengths is hard to provide, because no combination exists that best captures the start, end and length of the BG BIA. Figures 7 and 8 show that the end location of the BG BIA is positioned rather uniformly around 162° E, in agreement with observations. Based solely on the start position, the solutions along the line A5-S1 to A1-S9 (Fig. 8b) contain the optimal combinations. Although the start of the observed BG BIA at 156.4° E is not well captured, they simulate a start location of 158–158.5° E. Experiments A4-S2, A3-S4 and A2-S5 seem the most realistic, assuming that the feedback mechanisms (accumulation and sublimation) are similar in strength.