5.1 Seasonal snow depth

The mean of the depth-averaged RWV in snow determined at 48 points (see Methods section) was v = 210.0 m  μs⁻¹, with a standard deviation σ = 5.3 m  μs⁻¹, which is within the expected range of values for such media (e.g. Moore and others, Reference Moore1999). This velocity value is typical of dry snow. This is consistent with the fact that our measurements were done before the onset of summer melting. The presence of thin internal ice layers and lenses within the snowpack reveals that some surface melting with subsequent meltwater percolation and refreezing happened, likely in high-temperature peaks during the late spring. However, the winter snowpack was mostly dry when the end-of-winter snow pits were measured, which justifies the mentioned velocity typical of dry snow. Furthermore, Recio-Blitz and others (Reference Recio-Blitz, Navarro, Otero, Lapazaran and Gonzalez2018) reported a mean end-of-winter density of 510 ± 14 kg m⁻³ at Hurd and Johnsons glaciers over the period 2004–2016. If we use this value with Robin's equation $\varepsilon = ( 1 + 0.851 \rho ) ^2$ (Robin and others, Reference Robin, Evans, Bailey and Bullard1969), relating density ρ and permittivity $\varepsilon$ of dry snow, and then apply the relationship $v = c/\sqrt {\varepsilon }$ (Dowdeswell and Evans, Reference Dowdeswell and Evans2004), with c the radar wave velocities in free space, we get a radar wave velocity in snow of 209.2 ± 1.8 m μs⁻¹.

The 2016 seasonal snow depth maps, based on manual snow probing and snow probing combined with GPR are shown in Figures 5(a,b) respectively. The average snow depth from snow probing measurements was 1.44 m ± 0.09 m (the quoted error is the standard deviation). The largest values were found in the higher-elevation areas of the glaciers. The maximum snow depth, of 2.45 ± 0.21 m, was found in the northern part of Johnsons Glacier, where snow redistribution by wind accumulates a large amount of snow (see Fig. 2) . The interpolation error associated with the snow depth map is 0.42 m.

The distribution of snow accumulation on both glaciers depends on both meteorological and orographic conditions. The altitude range of these glaciers is in the order of 300 m, so there is a moderate difference between the amount of snow initially deposited at high and low altitudes. The linear fit of snow depth vs elevation shown in Fig. 6 spans a range of ~1 m. However, the glacier hypsometry implies that most of the glacier area is concentrated in a relatively narrow altitude range (150–300 m), and therefore most data points are clustered in the mentioned elevation range, for which the snow depths vary between 1.0 and 1.6 m. Consequently, the variation of snow depth with elevation is not a critical issue. On the other hand, snow redistribution by the prevailing north-north-easterly and south-westerly winds (Fig. 2) causes slightly higher accumulations on Johnsons Glacier, and in general in the concave parts of both glaciers. In particular, the south-westerly winds remove by erosion part of the snow initially deposited on the upper reaches of Hurd glacier and deposit it on the more concave Johnsons Glacier. This results in systematically more positive winter (and annual) surface mass balances in Johnsons Glacier as compared with Hurd Glacier (Navarro and others, Reference Navarro, Jonsell, Corcuera and Martín-Español2013). On the other hand, higher temperatures at lower elevations imply a higher degree of compaction of the snow, and hence a thinner snow layer. Compaction alone, however, is insufficient to explain the difference in snow depth between the upper and lower elevations. Some additional factors have to be taken into account. Rain should in principle be discarded, as it normally occurs much later in the season. However, some surface melting and runoff at the lowermost part of the ablation zone should not be discarded; another intervening process could be the erosion of snow away from the glacier at the lowermost elevations. Unfortunately, for most of these processes, we lack observational evidence, so we cannot quantify their influence.

Figure 6. Combined end-of-winter snow depth for Hurd and Johnsons glaciers in December 2016 and linear fit to the data.

The data recorded with the GX750 in 2016 present a large amount of noise and stratification, mostly due to refreezing of percolating surface meltwater. Although the field measurements were carried out in the early austral summer, before the onset of strong surface melting, some melting and subsequent percolation and refreezing of meltwater happen in the glaciers in this region during the late spring (Recio-Blitz and others, Reference Recio-Blitz, Navarro, Otero, Lapazaran and Gonzalez2018). The wavelength (λ) of our 750 MHz radar in snow (RWV = 210 m μs ⁻¹) is 0.28 m, so its vertical resolution is between 0.07 m (λ/4) and 0.14 m (λ/2). Ice layers and lenses observed in the snow pits are in general thinner than this (typically ca. 1–3 cm). However, the radar wave actually integrates the energy reflected from all discontinuities in physical properties within a spatial range equal to its resolution. At the glaciers under study, quite often adjacent thin ice layers are separated by distances lower than the radar resolution and can therefore be detected, though not resolved individually. Also thin individual layers will be detectable when they have strongly altered electrical properties. However, this is not the usual case in glacier environments. Because of such noise, the interpretation of the seasonal snow layer would not have been possible without the additional information provided by the data analysis of stake readings, snow probing, and snow pit measurements. In fact, in our case study it was often impossible to track the GPR internal layers (in particular, the snow–ice and snow–firn transition surfaces) between manual point measurements (snow pits, stake readings, snow probing). This is illustrated in Fig. 7, where we can see that, although close to the snow pits, the snow–firn interface can be identified with the help of the snow depth determined at the pit, but when we move away from the pit such an interface cannot be longer tracked. The central panel of Fig. 7 shows a section of a radargram at an intermediate distance between two snow pits, and we are unable to identify which is the layer corresponding to the snow–firn interface. In fact, the distribution of layers and lenses of refrozen ice has a high spatial variability even at short-scale distances. Note that there is often no correspondence between the ice layer location determined in the snow pits (shown as blue lines in the two lateral panels of Fig. 7) and the occurrence of internal reflections in radargrams taken just 5–10 m from the snow pits. Consequently, the snow-thickness product that includes the GPR data does not improve significantly on previous observations from stake measurements such as that by Navarro and others (Reference Navarro, Jonsell, Corcuera and Martín-Español2013). This contrasts with other studies in which high-frequency radar profiling added important information (Harper and Bradford, Reference Harper and Bradford2003), or even constituted the main source of data, with snow pits/probing providing calibration and validation data (Grabiec and others, Reference Grabiec, Puczko, Budzik and Gajek2011).

Figure 7. Sections of a radargram of a 750 MHz GPR profile registered in December 2016. The radargrams at both sides correspond to locations adjacent to snow pits EH01 and EH03, while the central one (marked M) corresponds to a location in between both boreholes. Their locations are shown in Fig. 5b. The red dashed line indicates the end-of-winter snow depth. The yellow dot marks the depth of the snow layer determined at the snow pits. The blue lines indicate the location of refreezing layers measured in the snow pits.

Calibrating the snow layer thickness identified in the radargrams with snow depth from the probing measurements could result in small differences between the snow depth maps shown in Figures 5a,b. The map incorporating the GPR data (Fig. 5b) provides additional detail due to greater data coverage.

5.2 Cold ice layer thickness

The polythermal structure of Hurd Glacier, first suggested by Navarro and others (Reference Navarro2009), can be inferred from Fig. 8a, which shows the thickness of the cold ice layer, while Fig. 8b shows the error in thickness. The cold ice layer is only present at lower elevations, basically corresponding to the ablation zone. Its average thickness is 29.1 ± 1.5 m (this error is the mean of the individual measurement errors), and the highest values are found along the central flowline in the lower ablation zone of Sally Rocks tongue, where the thickness of the cold layer reaches its maximum value of 80.8 ± 2.5 m. The ice below the firn layer in the accumulation zone is temperate, and the thickness of the corresponding layer gradually decreases towards the glacier snouts in all lobes of Hurd Glacier. The ice in the frontal zones is cold, meaning that the glacier is frozen to bed. The purple lines in Fig. 8a indicate where the CTS reaches zero value, meaning that the glacier is frozen to bed from those lines to the glacier margins. This distribution of the cold and temperate ice layers is characteristic of so-called Scandinavian type glaciers, typical of the Scandinavian and Svalbard regions (Aschwanden and others, Reference Aschwanden, Bueler, Khroulev and Blatter2012), but seldom reported in sub-Antarctic islands such as the South Shetland Islands. In this archipelago, in addition to our studied glaciers in Livingston Island, polythermal glaciers have been reported or suggested in King George Island, either from borehole temperature data (Wen and others, Reference Wen1998), from modeling studies (Breuer and others, Reference Breuer, Lange and Blindow2006), or from GPR data (Blindow and others, Reference Blindow2010). Other glaciers and ice caps in this archipelago with a similar morphology, particularly those ending on land, could be expected to be polythermmal. Having the ice frozen to bed in the terminal zone of a land-terminating glacier has strong implications for glacier dynamics. The largest velocities found in the central part of the glacier sharply decrease when approaching the terminus, resulting in strong compression, often accompanied by reverse faulting (Molina and others, Reference Molina, Navarro, Calvet, García-Sellés and Lapazaran2007).

Figure 8. (a) Cold ice-thickness map retrieved from the radar measurements. The red segment A–B indicates the radar profile shown in Fig. 4. (b) Spatial distribution of the total error in thickness of the cold ice layer.

The errors in cold ice layer thickness shown in Fig. 8b, calculated combining the method by Lapazaran and others (Reference Lapazaran, Otero, Martín-Español and Navarro2016) and the interpretation error, are lower along the locations of the radar profiles, as a consequence of the interpolation error, except in the middle part of the central flow line, where the maximum CTS interpretation error occurred. The dashed line in the figure indicates the zero depth of the CTS, which approximately corresponds to the location of the equilibrium line. As the ice below the firn is temperate, the cold ice layer thickness is zero to the east of the dashed line. Consequently, the errors in cold ice thickness in that zone are meaningless and we have blanked them.

The largest values of the cold layer thickness of Hurd Glacier have been confirmed by thermistor chain measurements in boreholes. In Fig. 8 we have indicated the location of a borehole drilled in January 2015, where a string of 32 thermistors, spaced 2 m apart, was installed. They were first measured one year later, to ensure that the thermistor temperatures were in equilibrium with the neighboring ice. All temperatures were below 0 °C. Unfortunately, the CTS depth was larger than expected for this zone, so the lowermost thermistor, at a depth of 60.55 m below the ice surface, did not reach melting temperature; it measured ~−0.15 °C. Taking into account the readings of the above thermistors, the CTS could be located at a depth between 60 and 70 m. This CTS depth is larger than that measured in a borehole drilled in Johnsons Glacier in January 2015, where a CTS depth lower than ~50 m was found (at another borehole, closer to the glacier calving front, only temperate ice was identified) (Sugiyama and others, Reference Sugiyama2019).

The temperature of the cold ice measured at 15 m depth at Hurd borehole (located at 116 m a.s.l.) was of −1.1 °C. Corresponding values for ice cores at King George Island recovered in the summer of 1991/92 were −1.9 °C (site at 100 m a.s.l.) and −1.4 °C (site at 150 m a.s.l.) (Wen and others, Reference Wen1998). For comparison with other regions, these values are similar or slightly warmer than those measured at comparable elevations on Scandinavian-type glaciers in Svalbard, where e.g. 15-m depth temperatures at East Grönfjordbreen, at sites between 160 and 225 m a.s.l., provided values of ~−2°C (Chernov and others, Reference Chernov, Vasilyeva and Kudikov2015); at Hansbreen, values were between −1.6 and −1.8 °C at a site at ~160 m a.s.l., and between −2.4 and −3.1 °C at another site at ~240 m a.s.l. (Jania and others, Reference Jania, Mochnacki and Gadek1996). The reason for the slightly lower borehole temperatures in Svalbard is probably that the mean annual air temperatures in Svalbard (e.g. −5.2 °C at Ny-Alesund and −4.6 °C at Svalbard Airport over the period 1981–2010; Førland and others, Reference Førland, Benestad, Hanssen-Bauer, Haugen and Skaugen2011) are colder than those at the South Shetland Islands (e.g. −2.2 °C at Bellingshausen Station, King George Island, over the period 1986–2015; Oliva and others, Reference Oliva2017). Nevertheless, in both cases the warmer temperatures at 15-m depth as compared with the mean annual temperature probably reflect the importance of meltwater refreezing on the release of latent heat (Jania and others, Reference Jania, Mochnacki and Gadek1996).