2.1. Measurements

Figure 1 gives the location of all ice-station sites during the first leg of WWSP'86 as well as the genetic ice class (for explanations, see Eicken and Lange, 1989; Reference LangeLange and others, 1989) determined at these sampling locations. Closed symbols denote coring sites, which were selected for isotope analysis. As can be seen, a fairly even distribution over the area under investigation has been achieved, thus providing information on sea-ice isotope composition throughout the east-central and south-eastern Weddell Sea.

Instead of taking equally spaced samples, sampling for isotope analysis was performed according to stratigraphic units. The assignment of these units is based on the ice texture of each core. Textural analysis includes visual inspection of continuous thick sections, frequently supplemented by detailed structural analysis on thin sections (Reference LangeLange, 1988). Each stratigraphic unit was sampled only once, cutting an approximate 200 ml sample from the central part of the unit in our Bremerhaven cold laboratory. The solid piece was put into a small zip-lock bag and was allowed to melt at room temperature. Immediately after melting, the water was poured into 100 ml bottles, filling them completely, and they were closed tightly. Samples were then shipped to Heidelberg, where they were analyzed with a commercial mass spectrometer following standard procedures. Measurement precision was typically ±0.05%. Salinities were determined on the same (melted) samples using a WTW salinometer, which gives direct temperature-compensated salinities at 20°C.

In the following, we will give ¹⁸O/¹⁶O ratios in the samples (index s) as 6 values (i.e. δ¹⁸O) relative to ¹⁸O/¹⁶O ratios of “standard mean ocean water” (abbreviated/indexed as SMOW):

(1)

Stable-isotope concentrations in precipitation vary as a function of several parameters, such as distance from the coast, altitude, or temperature (Reference Dansgaard, Johnsen, Clausen and GundestrupDansgaard and others, 1973). δ¹⁸O in Antarctic precipitation falls in the range between −20 and −60% (Reference Dansgaard, Johnsen, Clausen and GundestrupDansgaard and others, 1973). Measurements of δ¹⁸O in surface precipitation, close to the ice edge of the Filchner-Ronne Ice Shelf, revealed values between −25 and −29% (Reference Graf, Moser, Oerter, Reinwarth and StichlerGraf and others, 1988). Thus, it is expected that precipitation over the Weddell Sea will have increasing δ¹⁸O values ranging between approximately −25 and −10% for near-coastal sites and for sites with increasing distance from the shore, respectively (cf. Reference RobinRobin, 1983). Figure 2 gives two typical profiles of δ¹⁸O values as a function of snow depth (unpublished) measured on samples obtained on sea-ice floes in the western and inner Weddell Sea. As can be seen, the range of values agrees well with our assumption.

Fig. 2. δ¹⁸O profiles as a function of snow depth on sea-ice floes in the western and central Weddell Sea at lat. 63°12′S., long. 53°W. (a) and lat. 69°34′S., long. 06°20′ W. (b), respectively.

Isotopic fractionation during the freezing of sea-water leads to enrichment of ¹⁸0 in the ice phase. The equilibrium solid/liquid fractionation was determined as +2.7% by Reference Craig and HomCraig and Hom (1968). Recent measurements by Reference Beck and MuennichBeck and Muennich (1988) yielded a value of +2.8% for the same conditions. Thus, snow ice, even if “diluted” by sea-water, should have 8¹⁸0 values significantly below those found in sea ice.

2.2. Estimates of the meteoric ice fraction in sea-ice cores

Despite the relatively unambiguous identification of snow-ice sections (i.e. the presence of meteoric ice) in a sea-ice core based on ¹⁸O measurements, textural identification of polygonal granular sections (i.e. sections with a texture that is indicative of snow ice) is often not as easily achieved. Thus, δ¹⁸O measurements help identify the meteoric contribution in sea-ice cores. In order to estimate quantitatively the fraction of meteoric ice in a given core, we assume that ice-core sections with negative δ¹⁸O values comprise a sea-ice fraction, f_i , a snow (or meteoric) fraction, f_s , and a sea-water fraction, f_w . For each ice-core section and its salinity (=S) and δ¹⁸O (=δ) values, the following set of equations must hold:

(2)

(3)

(4)

In these equations, f_i f_s , and f_w are unknown. Thus, in order to solve Equations (2)–(4), the following boundary conditions for the remaining variables are defined:

(5)

(6)

In our calculations, we assume a mean salinity of 34.45% for the winter mixed layer found in the Weddell Sea (Reference Gordon and HuberGordon and Huber, in press), salt-free precipitation and salinities of newly formed sea ice that are derived from our ice-core analyses (Reference Lange, Ackley and EickenLange and others, unpublished). For the δ values, we assume maximum fractionation for the sea-ice component, the range of δ values for precipitation given above, and a measured value of Weddell Sea winter water of 0.35% (Reference Schlosser, Bayer, Foldvik, Gammelsrod, Rohardt and MünnichSchlosser and others, 1989). Given the measured salinity and 8 value of a particular section (i.e. S and 6), we can estimate its fraction of meteoric ice (i.e. f_s ) in this section. Using the minimal value of S-_i and the maximum value of δ_s, will result in a lower limit for f_s and vice versa.

By using Equations (2)–(4), we assume each ice-core section is a closed system, i.e. we neglect any possible losses of fluid phases during formation of the ice. Because some loss of salt (from the sea-water component) will occur during freeze-up and as a result of the sampling itself (e.g. brine drainage during core retrieval), the measured salinity represents a lower limit for the salinity value used in our equations. The loss of sea-water also implies an isotopic fractionation towards higher δ¹⁸O values. Thus, the measured value must be regarded as an upper limit of the value used in our approach. This means that the fraction of meteoric ice computed here represents a lower limit of the actually achievable value.

Fig. 3. Profiles of δ¹⁸O (solid circles) and salinity (dashed line) as a function of depth in a sea-ice core of mainly congelation (a) and predominantly frazil ice (b), together with ice texture.

2.3. Conditions for flooding of sea-ice floes as a prerequisite of snow-ice formation

In order for snow ice to develop, a prerequisite is the flooding of a sea-ice floe and the infiltration of the snow layer by sea-water. This can be quantified by a simple hydrostatic balance for a snow-covered floe:

(7)

(8)

Equation (7) yields

(9)

Here, ρ_i, ρ_s, and ρ_w are the (mean) densities of sea ice, snow, and water, respectively; t, d, f, and s are the total ice thickness, the thicknesses of the ice floe below and above the water line, and the snow-layer thickness, respectively. For flooding to occur, f must approach zero (and thus d → t), hence Equation (9) becomes:

(10)

Thus, for ρ_w = 1.03 Mgm⁻³ and ρ_i = 0.91 Mg m⁻³. Equation (10) becomes:

(11)

For snow densities ρ_s of 0.2, 0.3, and 0.4 Mg m⁻³, s/t is found to be 1/2, 1/3, and 1/4, respectively.

In order to determine the potential for flooding in a given observational area, one needs to know mean values of snow and ice thicknesses, and of snow density. This will be addressed in section 3.3

3.1. δ¹⁸O-depth profiles in relation to ice texture

Figure 3 gives typical examples of δ¹⁸O profiles for two cores representing the mainly congelation (a) and the predominantly frazil-ice class (b), respectively. Also given are the stratigraphy, i.e. ice texture as a function of depth and salinity-depth profiles for both cores. Despite the gross differences in genetic ice class, the δ¹⁸O profiles show remarkable similarities, starting at negative values in the top parts and approaching a δ¹⁸O value of 2% towards the bottom part of the cores. This is in contrast to the results of Reference Gow, Ackley, Buck and GoldenGow and others (1987), who virtually did not find any sections with negative δ¹⁸O in their cores. However, their range of positive δ¹⁸O values (+0.21 to +2.30%, averaging at +1.75%) agrees well with our findings.

An important result of our study is the (slightly) negative δ¹⁸O value for core sections not classified as polygonal granular (for an explanation of textural terms, see Eicken and Lange (1989); genetically, polygonal granular ice can be called snow ice in most cases). While strongly negative values are expected for pure snow ice, granular or columnar ice should have positive δ¹⁸O values because of the fractionation effect during freezing (see above). However, a mixture of surface precipitation, sea ice, and sea-water would readily explain the slightly negative δ¹⁸O concentrations (see above) that are found despite the difficulty in identifying such sections texturally. An alternative explanation would be the addition of precipitation to surface water that subsequently forms frazil ice. This process would lead to orbicular granular textures but leaves isotope concentration affected by the precipitation (i.e. negative values).

Figure 4 gives the δ¹⁸O profile and the stratigraphy of one of the few long ice cores retrieved during WWSP’86. Starting with the same sequence of δ¹⁸O values as the majority of our cores (cf. Fig. 3), there are two well-defined deviations to a slightly negative value at depths of about 0.7 and 2.4 m, corresponding to core sections texturally identified as orbicular granular and polygonal/ orbicular granular ice. This demonstrates the potential of ¹⁸O measurements in detecting contributions of meteoric ice in a sea-ice floe on the one hand, and in supporting and confirming the stratigraphie analysis on the other.

Fig. 4. Profile of δ¹⁸O and ice texture as a function of depth in sea-ice core AN5221101.

Fig. 5. Profile of δ¹⁸O and ice texture as a function of depth in sea-ice core AN5221501.

Fig. 6. Profile of δ¹⁸O and ice texture as a function of depth in sea-ice core AN5223701.

As can be seen (Fig. 4), δ¹⁸O values vary significantly with varying ice texture. However, as demonstrated in the following figures, we hypothesize that a straightforward relation between single ice-textural units and their ¹⁸O concentrations cannot be identified. Figure 5 displays the same general trend of increasing δ¹⁸O values with increasing depth (i.e. parallel to the growth direction) as seen in Figure 4, despite the fact that the ice texture in core AN5221501 changes abruptly from columnar (0.13–0.28 m) to polygonal/orbicular granular (below 0.28 m).

Our hypothesis regarding the lack of clearly identifiable correlations between δ¹⁸O and ice texture is emphasized by the profile in Figure 6. This core (AN5223701; Fig. 6) most likely represents two rafted floes (above and below 0.23 m). The slightly negative δ¹⁸O value at the top of the second orbicular granular section probably indicates some meteoric ice contribution at the upper surface of the previously separate floe. While we would expect to see two independent δ¹⁸O profiles for each core section representing the originally unrafted floes, the measured values follow the same pattern as those found for single-unit floes. Extensive deformation and a high degree of rafting and ridging activity can be seen as a prerequisite for these composite floes. Observations during WWSP’86 clearly revealed the occurrence of such activities (Cassarini and Massom, 1987; Reference LangeLange and others, 1989).

The profiles shown in Figure 7 (AN5223401) represent a particularly interesting but puzzling observation. The core was retrieved from a refrozen lead, which showed clear signs of multiple (finger) rafting. Each of the orbicular granular-columnar sequences identified texturally most porbably depicts one slice of newly (and simultaneously) formed nilas, which subsequently became rafted to form the floe that was sampled. Thus, one would expect similar distributions of δ¹⁸O values for each combination of orbicular granular-columnar ice. However, while this might have been present initially (i.e. immediately after the rafting events), we observe the same steadily increasing δ¹⁸O values with increasing depth as in the other cores. Thus, post-deformational processes, such as redistribution of fluid phases in the composite floe, might have led to the observed δ¹⁸O profile. Another, less likely hypothesis, would be a change in δ¹⁸O values of the water during growth.

Fig. 7. Profile of δ¹⁸O and ice texture as a function of depth in sea-ice core AN5223401.

Fig. 8. Meteoric ice fractions in a sea-ice core in per cent of total ice thickness (a) based on model calculations (see section 2.2) for different combinations of the free parameters: ice-core section salinity (Si) and δ¹⁸O value for snow component (¹⁸O_s) in a given core section (note that values are given in per cent and not in ppt). In (b) are given the fractions of sea-water, meteoric ice, and the sum of both components making up the sections with negative δ¹⁸O as computed for the minimum cases of Figure 8a.

3.2. Contribution of meteoric ice to the sea-ice cover

Using the formalism outlined in section 2.2, we estimated the contribution of meteoric ice (snow ice) to the total ice thickness of sampled floes. For ice-core sections with negative values of δ¹⁸O, we derived the snow fraction _s, i.e. the mass fraction of meteoric ice in the considered ice-core section. Neglecting density differences between meteoric ice, sea ice, and sea-water (i.e. assuming a density of 1 Mg m⁻³), f _s is multiplied by the ratio of the section length to the length of the core yielding the relative contribution of meteoric ice, F_m , to the total ice thickness. Where more than one section with negative δ^l8O is encountered, the individual contributions are added to yield the cumulative contribution F_m for the sampled core.

Figure 8a gives values for F_m for 12 of our cores, where we determined δ¹⁸O and salinities simultaneously (the other remaining cores are only incompletely sampled and are not included in the analysis). For each core, we give F_m for three different combinations of the “free” parameters S_i and δ¹⁸O_s. This yields a minimum, a standard, and a maximum value of F_m for S_i and δ¹⁸O_s being 7 and −25%, 10 and −17.5%, and 13 and −10%, respectively. Here, we regard a combination of 10 and −17.5% for S_i and δ¹⁸O_s as the most common values (cf. Fig. 2) found in the Weddell Sea, and thus representing a standard case. Also given are means and standard deviations of all available values.

As can be seen, there is a considerable scatter in the calculated values of F_m for the cores considered. It appears that a mean value of 3 ± 3% is a representative value for the contribution of meteoric ice to the total ice cover in the Weddell Sea. However, the complete effect of snow-ice formation on sea-ice growth includes the contribution of the sea-water fraction as well. Figure 8b gives the sea-water fraction for the minimum case (see above) along with the added sea-water-meteoric-ice fraction. As can be seen, even the smallest possible effect results in a significant fraction of an ice core (i.e. 7.1 ± 5.6% of the total ice cover) originating from snow-ice formation. Thus, we hypothesize that a mean ice thickness between 0.4 and 0.7 m (Reference Wadhams, Lange and AckleyWadhams and others, 1987) will result in 0.01–0.08 m of the total ice thickness being derived from the transformation of surface snow and sea-water to snow ice. We want to point out that, based on our procedure, this has to be regarded as the minimum contribution of meteoric ice to the total ice cover.

However, while the data can be regarded as representative for a significant part of the Weddell Sea, the sparse spatial resolution of our sampling somewhat limits the validity of this hypothesis. One means of gaining independent support lies in an estimate of the likelihood of flooding events on sea ice floes in the Weddell Sea, based on thickness and freeboard data. This will be addressed in the following section.

3.3. Potential for flooding events based on snow- and ice-thickness data

As outlined in section 2.3, an essential prerequisite for snow-ice formation is the depression of the snow-ice interface below the water line; i.e. a negative freeboard. The conditions required for this are given in Equation (11) in terms of snow density and snow and ice thicknesses.

As part of our field operations, we measured snow depths (at 1 m intervals) and snow densities along two perpendicularly crossing sections of about 20–25 m in length. Basic results of these measurements are given in Table I (Reference Ackley, Lange and WadhamsAckley and others, 1988). As a part of the thickness survey during the first leg of WWSP’86, about 4000 snow depths and ice thicknesses were measured at ice stations along the cruise track (for details, see Reference Wadhams, Lange and AckleyWadhams and others, 1987). The probability density function (=pdf) of all snow-depth data has a maximum at thicknesses between 0.06 and 0.15 m (Reference Wadhams, Lange and AckleyWadhams and others, 1987, fig. 13c). This range of thicknesses, in combination with a mean density of 0.3 Mg m⁻³ (cf. Table I) will lead to flooding (i.e. negative freeboard) for ice thicknesses π.45−0.6 m. This range corresponds to the already mentioned maximum in the pdf for ice thicknesses seen during WWSP’86 (Reference Wadhams, Lange and AckleyWadhams and others, 1987). Consequently, flooding should be a widespread phenomenon on sea-ice floes in the Weddell Sea. This is supported by our ice observations (Reference Casarini and MassomCasarini and Massom, 1987). It follows that snow-ice formation should indeed contribute significantly to sea-ice growth over the entire Weddell Sea (see above).

TABLE. I. Snow depths and densities of antarctic sea ice

Additional support for this hypothesis is gained when measured freeboard heights are considered. Table II (Reference Wadhams, Lange and AckleyWadhams and others, 1987) gives the percentage of drilled holes with negative freeboard as a function of latitude. As can be seen, 705 (17.4%) out of a total of 4055 holes were found with the water line above the snow-ice interface.

TABLE. II. Frequency of drilled holes with negative ice freeboards

This hypothesis is also supported on the basis of a different approach. Thickness changes, Δh/Δt, beneath an existing ice cover (assuming 100% ice concentration, i.e. no leads) are governed by (Reference Parkinson and WashingtonParkinson and Washington, 1979):

(12)

Here, L is the latent heat of melting (=302 MJ m⁻³), k_i (=2 W m⁻¹ K⁻¹; Weeks and Ackley, 1982), and h_i (=0.5 m) are mean thermal conductivity and mean thickness of the ice cover, respectively, and T_b (=271.2 Κ) and T_s are the temperatures at ice bottom and ice surface, respectively. Using a surface temperature T_s between −5° and −20°C (i.e. 268–253 K; this represents a typical range of surface temperatures observed during WWSP’86; Reference RabeRabe, 1987) and a value for the oceanic heat flow, F, between 2 and 40 W m⁻² K⁻¹, one can compute melting and freezing at the ice bottom, respectively (Fig. 9). Reference Hibler and AckleyHibler and Ackley (1983) used a value of 2 W m⁻² K⁻¹, while recent measurements during WEPOLEX (Reference Gordon, Chen and MetcalfGordon and others, 1984) suggested significantly larger values. Reference Gordon and HuberGordon and Huber (in press) concluded, based on an extensive survey during WWSP’86, that the winter mean oceanic heat flux lies at 25–30 Wm⁻²K⁻¹ with a maximum of 41 W m⁻² K⁻¹.

Fig. 9. Melting or freezing at the bottom of a sea-ice floe computed using Equation (12) for different combinations of surface temperature, Tsf, and oceanic heat flow, F (for details, see section 4).

Heat-flow values of this magnitude will result in melting or a very modest growth rate (Fig. 9). The observed growth rate of 0.4 cm d⁻¹ (Reference Wadhams, Lange and AckleyWadhams and others, 1987) agrees well with this conclusion and implies mean surface temperatures in the range 258–260 K. However, as an alternative mechanism, we propose that snow-ice formation may be causing the observed thickening. This hypothesis, i.e. growth of the ice cover by snow-ice formation rather than by congelation growth, is supported by our textural analysis of retrieved ice cores. The majority of the mainly and predominantly frazil-ice cores, which represent the initially formed ice cover (via the pancake cycle), shows no additional congelation growth (i.e. ice with columnar texture) that could account for the increase in thickness.

In summary, these results strongly support the hypothesis that the snow cover in the Weddell Sea generally enhances the overall ice thickness rather than leading to decreasing growth rates throughout the austral winter months.