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Climate variables along a traverse line in Dronning Maud Land, East Antarctica

Published online by Cambridge University Press:  20 January 2017

Michiel R. van den Broeke
Affiliation:
Norwegian Polar Institute, P.O. Box 399, N-9005 Tromsø, Norway
Jan-Gunnar Winther
Affiliation:
Norwegian Polar Institute, P.O. Box 399, N-9005 Tromsø, Norway
Elisabeth Isaksson
Affiliation:
Norwegian Polar Institute, P.O. Box 399, N-9005 Tromsø, Norway
Jean Francis Pinglot
Affiliation:
Laboratoire de Glaciologie et Géophysique de l’Environnement du CNRS, BP 96, 38402 Saint-Martin-d’Hères Cedex, France
Lars Karlöf
Affiliation:
Department of Physical Geography, Stockholm University, S-106 91 Stockholm, Sweden
Trond Eiken
Affiliation:
Norwegian Polar Institute, P.O. Box 399, N-9005 Tromsø, Norway
Louk Conrads
Affiliation:
Institute for Marine and Atmospheric Research, Utrecht University, P.O. Box 80005, 3508 TA Utrecht, The Netherlands
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Abstract

Temperature, density and accumulation data were obtained from shallow firn cores, drilled during an overland traverse through a previously unknown part of Dronning Maud Land, East Antarctica. The traverse area is characterised by high mountains that obstruct the ice flow, resulting in a sudden transition from the polar plateau to the coastal region. The spatial variations of potential temperature, near-surface firn density and accumulation suggest that katabatic winds are active in this region. Proxy wind data derived from firn-density profiles confirm that annual mean wind speed is strongly related to the magnitude of the surface slope. The high elevation of the ice sheet south of the mountains makes for a dry, cold climate, in which mass loss owing to sublimation is small and erosion of snow by the wind has a potentially large impact on the surface mass balance. A simple katabatic-wind model is used to explain the variations of accumulation along the traverse line in terms of divergence/convergence of the local transport of drifting snow. The resulting wind- and snowdrift patterns are closely connected to the topography of the ice sheet: ridges are especially sensitive to erosion, while ice streams and other depressions act as collectors of drifting snow.

Type
Research Article
Copyright
Copyright © The Author(s) 1999 

1. Introduction

Within the European Project for Ice Coring in Antarctica (EPICA) it is planned to obtain two deep ice cores from the Antarctic ice sheet. The first one is at present being drilled at Dome C, and will hopefully provide scientists with one of the longest undisturbed climate archives to date. The second core site should be characterised by higher accumulation rates with a dominant contribution of precipitation from the South Atlantic Ocean (the “Atlantic signal”), to make the link with climate data obtained from cores retrieved on the Greenland ice sheet. Although it has been decided that this core will be drilled somewhere in Dronning Maud Land (DML), its exact position is yet to be determined. To this end, a reconnaissance phase has been planned that consists of several pre-site surveys. This paper presents some results of the Norwegian/Swedish/Dutch ground traverse that was held during the 1996–97 field season as part of the EPICA programme. The traverse, supported by the Norwegian Antarctic Research Expedition, started out from the edge of the Fimbulisen ice shelf and ended at 75° S, 15° E (3453 m a.s.l.), via the Norwegian station Troll (1298 m a.s.l.) (Fig. 1). The end-point is situated approximately halfway along the ridge connecting Troll and Valkyrjedomen, the highest point of DML (3810 m a.s.l.), on which the Japanese station Dome F is situated.

Fig. 1. Traverse area in DML. Solid line show, traverse route with sites and names where shallow firn cores were drilled (Table 1). Elevation data are from the Antarctic Digital Database.

From a glaciological and meteorological point of view, the part of DML between 0° and 15° E and 70° and 75° S is practically unknown; most glaciological data are available from areas further north, south and east. The South Pole–Queen Maud Land Traverse (1964–68) covered large areas between the South Pole and 76° S, 7° E (Reference Picciotto, Crozaz., Breuck. and CraryPicciotto and Crozaz, 1971). East of 15° E, Japanese expeditions have collected glaciological data since the launch of the Enderby Land Glaciological Observation Programme in 1969, which recently resulted in the publication of a glaciological folio covering the area 15–55° E, from the coast to 80° S (NIPR, 1997). To the north and west of Troll, data are available from two early expeditions that operated from the Maudheim and Norway stations (Reference SchyttSchytt, 1958; Reference LundeLunde, 1961). To the south and west, recent German and Swedish traverses obtained data from shallow and medium-deep ice cores as well as snow radar (Reference Isaksson, Karlén, Gundestrup., Mayewski., Whitlow. and Twickler.Isaksson and others, 1996; Reference Richardson, Aarholt., Hamran, Holmlund. and Isaksson.Richardson and others, 1997).

For a more detailed description of the traverse and methods used, the reader is re[erred to Reference Winther and WintherWinther and others (1997). Results of chemical analysis of snow pits and firn cores, as well as detailed accumulation records obtained with snow radar, will be presented in forthcoming papers.

2. Results

Table 1 lists the location, elevation, 10 m temperature and accumulation rate at the 15 locations at which shallow (9–20 m) firn cores were drilled; site names correspond to those presented in Figure 1. In the following, some results are discussed in more detail.

Table 1. Position, surface elevation, 10 m temperature and accumulation at drilling sites along the traverse (for locations, see Fig. 1)

2.1. Elevation and slope

The morphology of DML differs substantially from other areas in East Antarctica: between 15° W and 30° E, high mountains obstruct the ice flow at many places, which results in an abrupt transition from the polar plateau (>2500 m a.s.l.) to the coastal zone (˂ 1500 m a.s.l.). Between the mountains, deep drainage basins are present that are visible as depressions in the surface of the ice sheet for hundreds of km upstream. The largest ice stream in this part of DML is Jutulstraumen which drains an area of approximately 124 000 km2 (Fig. 1).

Figure 2 shows surface elevation and slope along the traverse line; the distance to the coast was calculated assuming the coastline to be at 70° S. The large-scale terrain slope (based on 5 km mean elevation) shows several maxima; the broadest peak represents the transition from the polar plateau to the coastal zone via the glacier Slithallet, and several narrower peaks identify the transition from the land-based ice sheet to the Fimbulisen ice shelf (Fig. 2). Based on the elevation profile, three zones can be defined, as indicated in Figure 2: ice shelf, coastal zone and plateau.

Fig. 2. Surface elevation (solid line) and terrain slope (dashed line). For the calculation of distance to the coast (x axis), the coastline is assumed to be 70° S. Drilling locations are indicated by triangles.

2.2. Temperature at 10 m depth

Ten-metre temperatures at drill sites are listed in Table 1 and Figure 3. At 10 m depth, the amplitude of the annual temperature wave at the snow surface is reduced to approximately 5% of its surface value, i.e. typically 0.75°C for coastal stations and 1.75°C on the plateau. The 10 m temperature is therefore a reasonable measure of the annual mean surface temperature. Deviations from the real annual mean surface temperature arise from various (non-instrumental) sources: during summer, when most measurements are performed, the cold wave from the previous winter is just passing the 10m depth level (Reference Schlatter.Schlatter, 1972; Reference Bintanja, Jonsson. and Knap.Bintanja and others, 1997), leading to a systematic underestimation of the annual mean value. Another problem is the long period needed for the thermistor string to reach thermal equilibrium with its surroundings, typically 15 h (Reference SeppäläSeppälä, 1992). This caused problems at sites E and G, where only short stops were made and values had to be adjusted downward by 1.1 K to achieve better agreement with neighbouring values (Fig. 3). At sites H, K and L, the boreholes were slightly less than 10 m deep (Table 1). At these sites, temperatures were measured at the lowest possible level. The uncertainties described above culminate in an estimated uncertainty of ±°C. Note that recalibration of the thermistor string after the expedition for temperatures down to –60°C resulted in an upward adjustment of 0.8–2.9°C compared to the preliminary temperatures listed in Reference Winther and WintherWinther and others (1997).

Fig. 3. Absolute and potential temperature at 10 m depth in the firn. White dots indicate uncorrected temperatures at sites E and G. Error bars indicate ±1 standard error.

The temperature of –17.5°C at the coastal site S20 compares well with values obtained further west on the Fimbulisen ice shelf at Norway station (–18.2°C; Reference LundeLunde, 1961), Maudheim (–17.4°C; Reference SchyttSchytt, 1958) and SANAE III (–18.4°C); further east, annual mean temperatures at or close to sea level are significantly higher, for example at Novolazerevskaya (–10.4°C), Syowa (–10.5°C) and Molodezhnaya (–11.0°C). The colder climate further west can be ascribed to the presence of the extended Fimbulisen ice shelf, where strong temperature inversions develop at the surface, in contrast to places that are subject to katabatic winds from the inland ice.

The 10 m firn temperature shows a continuous decline further inland (Fig. 3), as would be expected given the increasing elevation of the ice sheet and greater distance from the ocean. A better variable to study is the potential temperature, defined as the temperature an air parcel would have if it were brought to sea level without heat exchange with its surroundings:

. (1)

where T v = T(1 + 0.61q) is the virtual temperature, q is the specific humidity (kg moisture per kg air), p 0 = 1000 hPa is the reference pressure, R d = 287 J kg1K1 is the dry gas constant of the atmosphere and C p = 1005 J kg−1 K−1 is the specific heat at constant pressure. Because we do not have information on the local air pressure, we use an empirical relation that expresses annual mean air pressure as a function of elevation h s, based on data of 21 Antarctic stations (Reference Schwerdtfeger and OrvigSchwerdtfeger, 1970: In p = 11.504–0.00013324h s). Because the humidity content of Antarctic air is very low (0.1–0.5 g kg−1 in winter, 0.1–3 g kg1 in summer), we can assume TT v within 0.1–0.3°C. The potential temperature thus obtained is included in Figure 3. If surface-temperature changes with elevation were to be dry adiabatic (no mixing, no phase changes), potential temperature would be constant along the traverse line. Clearly, this is not the case, with a maximum in θ at site C, at the edge of the plateau. This is a signature of enhanced mixing, which will be further discussed in section 3.

2.3. Firn density

The vertical density profile of the uppermost 10–20 m of polar firn is usually described as a function of overburden pressure and local physical quantities like annual mean temperature, wind speed and accumulation. Higher temperatures enhance grain growth, increasing the densification rate, while mechanical rounding of snow particles by wind action facilitates settling and enhances density in the upper metres. The latter effect is dampened by high accumulation. Extending work of Reference Kameda, Shoji., Kawada., Watanabe. and Clausen.Kameda and others (1994), Reference Craven and Allison.Craven and Allison (1998) presented the following implicit equation describing the density profile of dry polar firn:

. (2)

where the overburden pressure P is the depth-integrated weight of the overlying snow, S = (ρ iρ)/ρ i is the porosity, with ρ i the density of bubble-free pure ice (taken as 917 kg m3), T 10m is 10 m temperature, V is annual mean wind speed and Acc is annual accumulation. Values of the coefficients c 1 to c 5 were obtained by Craven and Allison through multiple regressions, using data from ten stations where density profiles and climate data were available. Reference Kameda, Shoji., Kawada., Watanabe. and Clausen.Kameda and others (1994) included only temperature, setting c 3 and c 4 to zero.

Figure 4a shows the average density of depth intervals 0–1 and 0–10 m of the firn along the traverse line as a function of distance to the coast. On the ice shelf, densities are high and the abundance of ice lenses indicates that surface melting occurs during summer, which is confirmed by observations somewhat further west (Reference Winther and WintherWinther and others, 1997). Further inland, the 0–10 m average density decreases in a uniform fashion in response to lower temperatures. The 0–1 m average density has a clear maximum at site E, probably caused by the combined work of low accumulation and strong winds. We compared our results to values obtained with the formula of Reference Kameda, Shoji., Kawada., Watanabe. and Clausen.Kameda and others (1994) (Fig. 4b). The most striking feature is the linear dependence of 0–10 m average density on temperature for T 10m , –25°C, with density increasing at a rate of 3.3 kg m−3 K−1. This increase is twice as large as the increase predicted by the formula of Reference Kameda, Shoji., Kawada., Watanabe. and Clausen.Kameda and others (1994). According to Reference Craven and Allison.Craven and Allison (1998), this can be ascribed to the action of strong (katabatic) winds. This will be further discussed in section 3.

Fig. 4. (a) Average firn density for the depth intervals 0–1m (white dots) and 0–10 m (black dots). Error bars indicate ±1 standard error. (b) Average firn density (0–10 m) as Junction if 10 m temperature. Solid line indicates values calculated using the expression if Reference Kameda, Shoji., Kawada., Watanabe. and Clausen.Kameda and others (1994). Error bars indicate ±1 standard error.

2.4. Accumulation

To obtain local accumulation rates, the depths of the reference levels of March 1955 and January 1965 (Reference Pourchet, Pinglot. and Lorius.Pourchet and others, 1983) were located by total ß radioactivity measurements of snow samples (Reference Pinglot and Pourchet.Pinglot and Pourchet, 1979). For cores S20 and S15, seasonal variations of oxygen isotopes (δ 18O) were used for dating. Following the approach of Reference Venteris and Whillans.Venteris and Whillans (1998), the local accumulation rate (in m w.e. a1) is expressed as:

. (3a)

where t is the time-span between core retrieval and the dated stratum (in years), and M i is the mass and d i the diameter of core section i above the dated horizon. The standard error in the accumulation σ Acc due to measurement uncertainties equals the sum of the first terms in a Taylor series of the local derivatives in Equation (3a):

. (3b)

where σ d and σ M are the uncertainty in diameter (2 mm) and mass (3 g), respectively. The bar indicates average values for the core pieces above the dated stratum. The uncertainty in the time-span σ t arises from the dimension of the core piece to which the β surge was assigned (typically 10–20 cm). In low-accumulation areas σ t/t is typically comparable in magnitude to , both of the order of 5%, but usually the uncertainty in diameter dominates. The contribution to the total error of is small, typically <1 %.

The resulting accumulation figures are presented in Table 1 and Figure 5. Accumulation on the high plateau (>400 km from the coast) for the period 1965–97 appears to have been somewhat lower than for 1955–97, while the opposite is true of plateau sites closer to the coast, but the differences are not statistically significant. Upon closer inspection Reference Isaksson, van den Broeke, Winther, Karlöf, Pinglot. and Gundestrup.Isaksson and others (1999) found statistically significant differences between the periods 1955–65 and 1965–97, which agrees with earlier measurements in this part of Antarctica (Isaksson and others, in press) and could be due to a recent weakening of meridional exchange of air masses since the 1970s (Reference Van den BroekeVan den Broeke, 1998a, Reference Van den Broekeb). In the coastal area and on the ice shelf, accumulation increases to 240–270 mm w.e. The accumulation at site S20 is lower than the value for Maudheim, some 600 km to the west (365 mm w.e.; Reference SchyttSchytt, 1958), and Norway station, some 300 km to the west (495 mm w.e. for the period 1940–59 (Reference LundeLunde, 1961), and 480 mm w.e. for the period 1955–94 (personal communication from K. Melvold, 1998)). The crosses in Figure 5 represent stake measurements during the International Geophysical Year (1957–58) and the following years, that were performed between Norway station and Troll (Reference LundeLunde, 1961).

Fig. 5. Annual accumulation along the traverse line, 1955–97 (white dots) and 1965–97 (black dots). Crosses represent accumulation values between. Norway station and Troll and onto the glacier Slithallet (Reference LundeLunde, 1961). Error bars indicate ±1 standard error.

On the plateau, yearly accumulation rates vary between 40 and 60 mm w.e., but 300–400 km from the coast the accumulation has a significant local minimum (24 mm w.e. at site F). In agreement with the low accumulation are the137 Cc deposition rates at sites F and G (32 and 38 Bq m−2), which are about half the value of the adjacent sites (65 Bq m−2). At these locations, extensive hoar layers have developed in the snowpack. The most likely reason for the low accumulation is the combined work of low precipitation and divergence of snowdrift transport, a topic that will be discussed in the next section. A similar dry area with annual accumulation of <50 mm w.e. has been observed further east (NIPR, 1997), so this feature is likely to be representative of large parts of DML and possibly other parts of Antarctica (Reference Pettré, Pinglot., Pourchet. and Reynaud.Pettré and others, 1986). Other, less significant, minima in the accumulation profile are found at the foot of Slithallet (the glacier that connects sites A and B) and 500 km from the coast (sites K and L).

3. Discussion

3.1. Temperature, wind speed and density

Antarctica reflects most of the solar radiation back to space, resulting in a negative radiation balance at the surface (except during the summer months). As a result, a quasi-permanent surface-temperature inversion is present which varies in intensity from 1–2°C at coastal stations at the foot of the ice cap (Reference StretenStreten, 1990) to about 10°C on the ice shelves (Reference King and Turner.King and Turner, 1997) and 20–25°C on the polar plateau (Reference Phillpot and Zillman.Phillpot and Zillman, 1970). Over sloping terrain, the cold, dense air is forced downward by gravity and deflected to the left by the Coriolis force, resulting in “inversion” or “katabatic” winds.

A proxy annual mean wind speed can be obtained by fitting the observed density profiles to empirical firn profiles (Equation (2)), and minimising the sum of the squared residuals. We chose 2–10 m as fitting interval, in order to obtain comparable results for all sites. To illustrate this procedure, Figure 6 shows theoretical and observed density profiles for a 12 m core at site C, for various values of the prescribed wind speed. Apart from the uncertainty in the coefficients in Equation (2), the error in the annual mean wind speed thus obtained arises mainly from uncertainties in observed density (i.e. core diameter): error propagation yields a 20% uncertainty in annual mean wind speed. Results of this procedure are presented in Figure 7. The method was not used for the sites to the north of site A, because Equation (2) is known to yield poor results in high-accumulation areas (Reference Craven and Allison.Craven and Allison, 1998). Instead, annual mean wind speeds at Norway station and Maudheim have been plotted as representative wind speeds on Fimbulisen. As a typical value for the high plateau in DML, the annual mean wind speed at Dome F has also been included. One year of wind-speed data is available from automatic weather stations (AWSs) at sites A and C; these observations confirm the density-derived wind speeds.

Fig. 6. Example of fitting theoretical fun profiles (Reference Craven and Allison.Craven and Allison, 1998) to observations, in order to obtain a proxy annual mean wind speed. Fitting procedure is based on minimising the squared residuals at 10 cm intervals between 2 and 10 m depth for various wind speeds (wind-speed interval: 0.1 m s−1).

Fig. 7. Proxy annual mean wind speed, derived from firn-density profiles (see text for more details). Crosses represent observations. Error bars indicate ±1 standard error.

The proxy wind-speed profile in Figure 7 shows a rapid increase in the area where surface slope increases, which is typical for gravity-driven winds. In the coastal area, radiational cooling is less pronounced and the katabatic component is smaller. In the absence of a significant katabatic component on the flat ice shelves, the annual mean wind speed is determined by the large-scale pressure gradient.

Under strong wind conditions, the temperature inversion near the surface will be (partly) destroyed by enhanced vertical mixing, because the latter process warms the surface through the increased downward turbulent transport of sensible heat; these warm signatures are detectable on infrared satellite imagery, and are often interpreted as areas where katabatic winds are active (Reference BromwichBromwich, 1989). Another factor that modifies near-surface air temperatures is en-trainment of warm air at the top of the atmospheric boundary layer (ABL) and subsequent downward mixing. Entrainment is most vigorous when the ABL wind speeds are high compared to the free atmosphere (i.e. large wind shear at the ABL top). For both these processes, surface temperature increases at higher wind speeds.

Following the line of reasoning above, the maximum value of the surface potential temperature along the traverse line in Figure 3 is indicative of a katabatic-wind climate, with weak winds in the interior, stronger winds at the edge of the plateau where the surface slope increases and again weaker winds on the ice shelves. This qualitatively confirms the wind-speed profile presented in Figure 7.

3.2. Accumulation

In general, accumulation as measured at an Antarctic snow surface is the sum of precipitation, sublimation/deposition of water vapour, erosion/deposition/sublimation through snowdrift and melting. Except in the coastal zone, melting is assumed to be small. Reference Bintanja and van den Broeke.Bintanja and Van den Broeke (1995), Reference Bintanja, Jonsson. and Knap.Bintanja and others (1997) and Reference Van den BroekeVan den Broeke (1997) showed that sublimation can be an important term in the mass balance of lower-lying areas in Antarctica ( ,2000 m a.s.l.), where relatively high surface temperatures allow for significant water-vapour pressures at the snow surface. However, annual sublimation at site F (2840 m a.s.l.) is unlikely, at such a high elevation, to exceed 10 mm w.e. a1. Sublimation is therefore insufficient to explain the observed minimum in accumulation in Figure 5.

Another process that could account for the accumulation variations along the traverse line is erosion/deposition arising from the divergence/convergence of snowdrift transport, that can be expressed as

(4)

where Q is the local snowdrift transport (kg m−1 a−1), and x, y are aligned in the down- and cross-slope directions, respectively. Unfortunately, from our one-dimensional proxy wind-speed profile in Figure 7 it is not possible to estimate the cross-slope divergence ∂Q/∂y, nor can we incorporate the influence of a changing wind direction along the slope. Wind direction is known to show important variations in response to a changing ratio between katabatic, Coriolis and friction forces (Reference Van den Broeke and Bintanja.Van den Broeke and Bintanja, 1995b; Reference Van den BroekeVan den Broeke and others, 1997). From the continuous increase of wind speed on the plateau (Fig. 7) it is clear that ∂Q/∂x alone cannot account for a maximum in erosion at site F, and cross-slope divergence is likely to play an important role.

To account in a more complete way for the effect of spatial variations in the wind field on the distribution by snowdrift transport, we used a theoretical katabatic-wind model developed by Reference BallBall (1960) to calculate wind speed and wind direction, analogous to the approach of Reference Takahashi, Naruse., Nakawo. and Mac.Takahashi and others (1988) and Reference Van den Broeke and Bintanja.Van den Broeke and Bintanja (1995a). In addition to the downslope pressure gradient, we prescribed a climatic synoptic pressure gradient that forces easterly-winds of 6 m s−1 at the coast and that decreases as a linear function of elevation. Furthermore, instead of an expression for the temperature inversion as a function of altitude, we calculated the inversion strength using a power relation between our proxy mean wind speed and three variables: elevation, distance from the coast and surface slope. The local annual transport of snow by the wind Q was then estimated from the annual mean wind speed V, using a relation based on drift data of Reference Loewe and RadokLoewe (1970) and annual mean wind speed at 18 Antarctic stations, and erosion/deposition calculated with Equation (4) on a 10 km × 10 km grid.

The resulting climatic near-surface wind field is presented in Figure 8a. The wind field shows two main characteristics. First, there is a distinct meridional variation, with low wind speeds on the high plateau, an increase over the steeper slopes of the ice-sheet topography and a decrease over the ice shelves. This results in an approximately 50 km wide band where significant erosion is predicted (> 5 mm w.e.a−1; Fig. 8b), at 2000–3000 m a.s.l. Significant deposition (>50 mm w.e.a−1) occurs in the coastal zone and on the ice shelves where the katabatic wind ceases. Note that the synoptic pressure gradient enhances the east–west directed component of the katabatic wind. Superimposed on this pattern, zonal variations can be detected where the wind field diverges over ridges and promontories in the topography and converges in depressions and glacier basins.

Fig. 8. (a) Calculated climatic wind field, based on expressions by Reference BallBall (1960), assuming an easterly geostophic wind of 6 m s−1. Solid line indicates traverse route, dots drilling locations. Largest vector represents annual mean wind speed of 11 m s−1. See text for more details. (b) Annual erosion (mm w.e.) caused by divergence of snowdrift transport, calculated from the wind field presented in (a). Areas where significant deposition occurs (>50 mm w.e.) are stippled. See text for more details.

The pattern of erosion/deposition as calculated from this simple model is presented in Figure 8b. Along the traverse line, the model predicts significant erosion in three regions: 5–25 mm w.e. between sites K and L, 5–50 mm w.e. in the region of sites E–G, and 25–100 mm w.e. at the transition between plateau and coastal zone (sites C and D). These values correspond well to the local accumulation minima on the polar plateau at site L and around sites F and G. Further north, the observations lack the spatial resolution needed for a comparison with model output, but sites A, S15 and S20 do not appear to be situated in areas with active erosion/deposition. Since we have no additional information on the amount of precipitation, melt and sublimation, a further quantitative treatment of the mass-balance distribution is not justified at this stage. Our results demonstrate, however, that in this part of DML, where strong variations in wind speed occur at relatively high altitudes, the spatial variation of snowdrift transport can have a significant impact on the local mass balance. In areas where most of the wind action takes place at lower elevation, sublimation of snow (both from the surface and from suspended snow particles) is also expected to playa significant role.

4. Summary and Conclusions

We presented new temperature, firn-density and accumulation data that were obtained along a traverse line in DML. This part of Antarctica is characterised by high mountains that block the ice flow, resulting in a sudden transition from the polar plateau to the coastal area. The spatial variation of potential temperature, density and accumulation suggests that katabatic winds are active in this region. This is confirmed by deriving proxy wind data from the density profiles of shallow firn cores. A simple katabatic-wind model can explain the variations of accumulation along the traverse line in terms of divergence/convergence of the local transport of drifting snow. Because of the cold, dry climate associated with the high surface elevation south of the mountains, spatial variability of erosion/deposition of snow by the wind has a noticeable impact on the surface mass balance. At these low temperatures, sublimation from the snow surface and of drifting snow particles is likely to be small.

Acknowledgements

This is contribution No. 151 of the Norwegian Antarctic Research Expedition (NARE) and EPICA publication No. 1. The authors wish to thank all members of the traverse team, participants in NARE 96/97 who assisted at Troll and all the people in the Netherlands, Sweden and Norway who were involved in the preparation of the traverse. T. Braadland, L. Høvik and S. Teigre (Norsk Polarinstitutt) are gratefully acknowledged for preparing the ß samples and assisting with electrical conductivity measurements. G. Anker (Norsk Polarinstitutt) is thanked for drafting Figure 1. This work is a contribution to EPICA, a joint European Science Foundation/European Commission scientific programme, funded by the EC under the Environment and Climate Programme (1994–98) contract ENV4-CT95-0074 and by national contributions from Belgium, Denmark, France, Germany, Italy, the Netherlands, Norway, Sweden, Switzerland and the U.K.

Footnotes

*

Present address: Institute for Marine and Atmospheric Research, Utrecht University, P.O. Box 80005, 3508 TA Utrecht, The Netherlands.

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Figure 0

Fig. 1. Traverse area in DML. Solid line show, traverse route with sites and names where shallow firn cores were drilled (Table 1). Elevation data are from the Antarctic Digital Database.

Figure 1

Table 1. Position, surface elevation, 10 m temperature and accumulation at drilling sites along the traverse (for locations, see Fig. 1)

Figure 2

Fig. 2. Surface elevation (solid line) and terrain slope (dashed line). For the calculation of distance to the coast (x axis), the coastline is assumed to be 70° S. Drilling locations are indicated by triangles.

Figure 3

Fig. 3. Absolute and potential temperature at 10 m depth in the firn. White dots indicate uncorrected temperatures at sites E and G. Error bars indicate ±1 standard error.

Figure 4

Fig. 4. (a) Average firn density for the depth intervals 0–1m (white dots) and 0–10 m (black dots). Error bars indicate ±1 standard error. (b) Average firn density (0–10 m) as Junction if 10 m temperature. Solid line indicates values calculated using the expression if Kameda and others (1994). Error bars indicate ±1 standard error.

Figure 5

Fig. 5. Annual accumulation along the traverse line, 1955–97 (white dots) and 1965–97 (black dots). Crosses represent accumulation values between. Norway station and Troll and onto the glacier Slithallet (Lunde, 1961). Error bars indicate ±1 standard error.

Figure 6

Fig. 6. Example of fitting theoretical fun profiles (Craven and Allison, 1998) to observations, in order to obtain a proxy annual mean wind speed. Fitting procedure is based on minimising the squared residuals at 10 cm intervals between 2 and 10 m depth for various wind speeds (wind-speed interval: 0.1 m s−1).

Figure 7

Fig. 7. Proxy annual mean wind speed, derived from firn-density profiles (see text for more details). Crosses represent observations. Error bars indicate ±1 standard error.

Figure 8

Fig. 8. (a) Calculated climatic wind field, based on expressions by Ball (1960), assuming an easterly geostophic wind of 6 m s−1. Solid line indicates traverse route, dots drilling locations. Largest vector represents annual mean wind speed of 11 m s−1. See text for more details. (b) Annual erosion (mm w.e.) caused by divergence of snowdrift transport, calculated from the wind field presented in (a). Areas where significant deposition occurs (>50 mm w.e.) are stippled. See text for more details.