3.1 Distribution and drift of icebergs in the Southern Ocean

Monitoring the drift of tabular icebergs has been carried out initially utilizing transponders (Vinje, Reference Vinje1980; Tchernia and Jeannin, Reference Tchernia and Jeannin1984) and later from satellite observations; e.g. England and others (Reference England, Wagner and Eisenman2020) have presented daily positions of icebergs >5 km size for the period 1992–2019. Antarctic icebergs generally follow the counter-clockwise coastal current until they leave the continent in exit zones and enter the clockwise ACC, but there can be significant deviations caused by winds and currents. Because the Coriolis effect is greatest for the largest icebergs, they tend to veer more to the left than smaller icebergs. With a deeper draft than smaller icebergs, changes in current with depth may also affect large iceberg drift differently than that of smaller icebergs.

Figure 1, modified from Figure 6 of Orheim and others (Reference Orheim, Giles, Moholdt, Jacka and Bjørdal2022), shows the iceberg concentration around Antarctica and the major iceberg exit zones, within which icebergs leave the coastal currents to drift into the Southern Ocean. The exit zones are regions extending >500 km from the coast characterized by pronounced differences in iceberg densities, from high concentration inside the zone compared with low levels in adjoining grid boxes. Exit zone 3 is the physically largest and has also the largest set of iceberg observations, containing icebergs that derive from the Antarctic Peninsula and icebergs that have drifted north from the western Weddell Sea after originally calving further east. This zone is investigated further in the following analysis and discussion.

Figure 1. Iceberg concentration around Antarctica in 1° latitude × 5° longitude boxes. Major iceberg exit zones 1–4 are outlined in white. Concentration is defined as the sum of icebergs observed in a box divided by the number of observations. Green areas are locations of one or a few observations, and have higher uncertainty, particularly north of 50°S. White areas denote that no icebergs were observed or that there were zero observations. In Figures 1 and 2 the 1° × 5° box distributions have been contoured using the IDL software routine MIN_CURVE_SURF, which interpolates and smooths sets of regularly gridded but incomplete data.

Figure 2. Iceberg concentrations in exit zone 3, which is divided into 17 segments of 178 km width, shown in white. The eastern point of Joinville Island at 63°20′S, 55°W (small dot), is taken as the end point of the Antarctic Peninsula. Note South Shetland Islands (~61–63°S), South Orkney Islands (~60°30′S) and South Georgia (~54°30′S). The zone consists of 73 1° × 5° grid boxes with a total area of 2.312 × 10⁶ km². Its northern boundary is quite sharp, while the southern boundary is more diffuse because of the influx of icebergs from the central Weddell Sea, discussed further below.

3.2 The iceberg data in exit zone 3

Exit zone 3 extends more than 3000 km east-northeast of the northern tip of the Antarctic Peninsula, ranging south to north from 64° to 53°S and west to east from 55°W to 0° (Fig. 2).

To investigate the changes along the drift path, we compile all data collected in this zone independent of when they were collected and we make three assumptions: (1) that all observations are equally representative, (2) that the different times of observation do not preclude compiling them and (3) that the icebergs move in a confined corridor into which no new icebergs enter. The first assumption can be justified by the large number of observations (2893). The second assumption can be separated into two parts. Compiling data independent of year of collection means that year-to-year variations are discounted; the practical reality of this is borne out by the changes in frequencies being very much larger than any year-to-year variation in iceberg numbers presented in the SCAR database. Compiling data independent of when in the year they are collected means ignoring the effect of real seasonal changes in iceberg density (Orheim, Reference Orheim1980). This is justified because the data cover all months from spring to autumn, and because the changes in concentration are much larger than seasonal effects. With regards to the third assumption, Figures 1 and 2 and discussion below show that this assumption is only partially fulfilled, as there is likely influx of icebergs into the zone. At the same time, the data show that dissolution-caused changes in numbers and concentration along the drift paths dominate over any random effects caused by iceberg influx. It is therefore concluded that the data can be considered as an instantaneous view of the icebergs in the exit zone and that this gives a good basis for making quantitative calculations of dissolution processes.

Altogether 53 606 size-classified icebergs were recorded in the exit zone. In addition to these, another 1265 observations were made of 11 108 icebergs not classified by size, so that in the whole exit zone there were 4158 observations of 64 714 icebergs yielding 15.6 icebergs per observation. Figure 3 and the Appendix (Table 2) show how the observations vary with the segments. Particularly, the two largest sizes show a marked decline in numbers along the drift trajectories.

Figure 3. Concentration of icebergs vs segment distance from the Antarctic Peninsula.

The relatively low iceberg densities evident in Figure 3 for segments 1–3 compared with the latter segments reflect that a large proportion of icebergs in the western Weddell Sea do not drift close to shore, a feature also shown by the satellite-tracks of large icebergs (Stuart and Long, Reference Stuart and Long2011). In addition, there is influx (Fig. 2) from the north into segment 4, of icebergs drifting from the western side of the Antarctic Peninsula around the South Shetland and South Orkney Islands. Segment 4 is therefore taken as the starting point for the calculations below regarding the changes with time of the iceberg population in exit zone 3.

From segment 4 onwards, a general reduction in concentration for all size classes is evident, but with spikes caused by influx of icebergs from the central Weddell Sea. Satellite tracking shows that while nearly all large icebergs hug the coastline from 20°E to ~10°W, their drift directions differ thereafter. Many icebergs drift into the southern Weddell Sea and these end up leaving the continent close to the northeastern tip of the Peninsula. Other icebergs leave the coastal current into exit zone 4 (Fig. 1). Schodlok and others (Reference Schodlok, Hellmer, Rohardt and Fahrbach2006) showed that the drift of 52 GPS-tracked icebergs in the Weddell Sea varied greatly in direction from year to year, and that some drifted north into the central part of exit zone 3. These icebergs give rise to the spikes in density seen at segments 7, 10 and 14.

There are few data on drift speeds for small icebergs, but data on larger icebergs tracked utilizing transponders or satellites give consistent values and can be used as good indicators. The most comprehensive set of data in this region is provided by Schodlok and others (Reference Schodlok, Hellmer, Rohardt and Fahrbach2006), who give drift rates ranging from 2.9 to 12.2 km d⁻¹ for different iceberg populations, but with large individual variations. Collares and others (Reference Collares, Mata, Kerr, Arigony-Neto and Barbat2018) give an average drift speed of 5.5 km d⁻¹ for satellite-tracked icebergs in the northwestern Weddell Sea. A drift speed of 5.93 km d⁻¹ is used in the following calculations. Taking 5.93 km d⁻¹ is done for numerical convenience as this results in the icebergs taking 30 d to cross from one segment to the next. As will be shown later, it is the combination of drift speed and melt rates that is most important, and the initial choice of drift speed is not critical for the following discussions.

The travel distance from segment 1 to 17 is ~3000 km. An iceberg must therefore drift for more than one year to reach segment 17, mostly in open water. In the summer, the minimum sea-ice extent is south of 64°S in this part of the Southern Ocean, while in winter, the sea-ice maximum reaches to between 55° and 60°S. Essentially all the ship-based iceberg observations were made in open water, and the results presented apply to open water situations.

3.3. Producing ‘normalized’ data to reduce random observational errors

The slight increase in ocean temperature from segment 4 to 17 is without abrupt change. There are also no other reasons to expect abrupt change in dissolution rates in the drift zone. We assume changes in iceberg distribution and dissolution during the drift from segment 4 to 17 are continuous, and that the variations shown in Figure 3 derive from random effects. To remove these variations, ‘normalized’ changes in iceberg concentration with distance are computed from the Appendix (Table 2) using linear regression fits. Figure 4a and the Appendix (Table 3) show the derived number of icebergs in each segment for an initial starting population set at 10 000 icebergs.

Figure 4. (a) Number of icebergs in each segment for a normalized population, initially of 10 000 icebergs. (b) Changes in percentages with travel distance for the normalized population of different sizes, from smallest (10–200 m) to largest (>500 m) icebergs.

The observations presented in Figure 3, normalized in Figure 4, show that counter-intuitively, the proportion of smallest icebergs increases with time, even though most icebergs in size classes 1 and 2 in segment 4 are melted (to <10 m length) before reaching segments 7 and 16, respectively. This demonstrates that repeated fracture of larger icebergs occurs throughout the exit zone. As shown in more detail in the Appendix (Table 3), the percentage reduction is largest for the two largest iceberg sizes. Only 7% of size class 5 icebergs in segment 4 are found in segment 17. For class 4, the corresponding percentage is 11%. Thus, for the two largest classes, the main loss in size is caused by fragmentation, as attrition from the sides would only slowly shift some of these icebergs down one size class. Fragmentation on the other hand increases iceberg numbers, so that in the three smaller classes, numbers remain high at 65–75% of those in segment 4. Table 3 suggests that the half-life of icebergs decreases with drift from segment 4 to 17, but this is misleading. The >1 km icebergs in the different segments are not the same size, as the composition of the family of icebergs >1 km changes along the drift because fragmentation of the largest icebergs give rise to many new icebergs, all still belonging to the size class >1 km. This is illustrated below.

Figure 5 shows that with increasing drift distance, there are changes in size distribution and a rapid fall-off in numbers of icebergs >1 km. The above sums of icebergs for the four groups of three segments are based on data presented in the Appendix (Table 4). No icebergs >6 km length are found beyond segment 9, and only icebergs <4 km persist into segment 12.

Figure 5. Number of observed icebergs of different lengths, in four groups (of different color), each of three segments.

The observed icebergs in the five size classes are reasonably well represented by a linear fit on log–log scales of decreasing numbers with increasing size. Assuming the icebergs to be a continuum of sizes, this scale could theoretically be extended to derive the length distribution of icebergs >1 km, but with obvious uncertainties. Fortunately, there are relevant observational data. The recording instructions for the observations asked that size be noted for icebergs >1 km, and this was done by many observers. Of the 818 icebergs >1 km within exit zone 3 (Appendix, Table 2), the length (and sometimes width and freeboard) was recorded for altogether 436 icebergs (Appendix, Table 4), including 302 in segments 1–4 which are taken as representative for the initial iceberg population. Their size distribution approximately follows a linear trend, when plotted on log–log scales (Fig 6). From these observations, we then calculate a normalized size distribution for the initial 123 icebergs >1 km, and use this to derive the initial size distribution for the large icebergs as shown in the Appendix (Table 5).

Figure 6. Size distribution of observed 302 icebergs >1 km in length as given in Appendix (Table 5), with axes drawn on logarithmic scales.

The linear relationship in Figure 6 follows a power law with a slope of −2.2. This relates to iceberg length, for iceberg area the slope would be −1.1, which is lower than the satellite-derived slope of −1.52 from Tournadre and others (Reference Tournadre, Bouhier, Girard-Ardhuin and Rémy2016). Further information on this size relationship is given in Supplementary Materials.

The complete SCAR dataset includes more than 3000 length observations of individual icebergs >1 km length. It would be of interest to compare these observations with the statistics of satellite observations, and to investigate how the size distribution of icebergs >1 km vary around the continent and between the different exit zones. Such studies are outside the scope of the present article.

3.4. Half-life for fracturing

The above has clarified that there is a marked reduction in tabular iceberg numbers with travel time in open water, so that practically all the largest icebergs in zone 3 have disappeared within one year of drift. Of the 49 icebergs >5 km length that were recorded, only one observation was beyond segment 7. In other words, after about half a year of travel in open water most large icebergs had disappeared, and all icebergs larger than 5 km had fractured at least once. Clearly fragmentation, rather than melting, is the overriding dissolution process, and the largest icebergs experience many fractures, to give rise to many ‘children’ of varying sizes.

Table 1 illustrates this process. Here the number of icebergs from segment 4 to 17 is added in groups of two to reduce random variations. No iceberg >1 km was observed in segment 17. The sum of icebergs >1 km is approximately halved in moving across two segments, implying the half-life of large icebergs is on average ~60 d. This half-life is used as the starting point in the following discussions.

Table 1. The observed icebergs >1 km grouped in pairs of segments (derived from the Appendix (Table 4)).

It is not possible to clarify from the above whether fragmentation takes place in successive fracture events with a time spacing of days, weeks or months, or in a single event shattering into many pieces. Satellite records of break-up of spectacular giant icebergs indicate that both processes occur, however it is not clear how relevant this is for fragmentation of the mostly much smaller icebergs discussed here. Smaller icebergs formed as a by-product of splitting of large icebergs are also frequently noted in satellite studies, e.g. Li and others (Reference Li2018). However, the persistence of the two smallest sizes of icebergs into the easternmost segments indicates a repeated introduction of new small icebergs formed by fracture of larger icebergs; in other words, the largest icebergs have fractured in more than one event, spaced weeks or months apart.

3.5. Quantifying the dissolution processes

The changes in iceberg population with travel time in open water in exit zone 3 can now be used to investigate dissolution processes and rates, taking as a starting point the normalized iceberg population given in the Appendix (Tables 3, 5). The changes from segment 4 to 16 place constraints on fragmentation and melt rates, thus limiting boundary conditions for simulations. For example, the persistence of high numbers of small icebergs means that there must be larger icebergs undergoing fracture throughout the exit zone.

We assume icebergs are evenly distributed in length within a size class and simulate the changes in iceberg population evolving during drift by numerical iteration of changes in the iceberg population travelling from segment 4 to 16. Details of the iteration are given in Supplementary Table S1. The iteration starts with the following boundary conditions based on earlier discussions and on general knowledge of iceberg behavior in open water.

1. 1. Drift rate: 5.93 km d⁻¹.

2. 2. Attrition rate: Taken as 0.2 m d⁻¹ for iceberg sides and base in segment 4, increasing gradually to 0.26 m d⁻¹ in segment 16 because of warmer waters. Wave action makes the side attrition larger than the basal melt, as described earlier. The effect of this is discussed below but is not important for the immediate discussion.

3. 3. Fracture sizes: An iceberg that fractures is taken to split into two iceberg ‘children’ of ~equal length.

4. 4. Fracture rate and half-life for icebergs >0.5 km: Icebergs 0.5–4 km long are given a half-life of 30 d, meaning 75% are split after 60 d. Icebergs >4 km length are given an average half-life of 60 d, i.e. half the icebergs >4 km are split after travel across two segments.

5. 5. Fracture rate for icebergs <0.5 km: Dissolution by attrition increases in importance as the length decreases, and only 25% of icebergs 0.2–0.5 km length are assumed to fracture after 60 d.

6. 6. Small icebergs as by-products of fracture: Each fracture is taken to produce as a by-product three icebergs <50 m length.

7. 7. Shattering rate: In each segment from 5 to 13, it is assumed that one iceberg of size 4–8 km shatters completely into icebergs of 0.5–1 km length. This rate is chosen to make the simulation fit observations. The resulting nine icebergs represent 2% of the icebergs >1 km length.

Discussion of the boundary condition chosen for the simulations:

(1) and (2) As shown above, the observed iceberg drift rates in the region vary considerably, and different, most probably higher, rates could be chosen. However, the iceberg numbers clarify that attrition and drift correlate, e.g. a 50% increase in drift rate would also require a 50% increase in attrition rate to match the iceberg distribution throughout the exit zone. Average attrition rates can be deduced from known iceberg drift rates, but without that knowledge any appropriate combination of the two rates will achieve an acceptable fit. The numbers chosen here are within the range of observed rates.

(3) Icebergs >0.5 km can be assumed to be tabular. Introducing choices of unequal lengths after splitting do not significantly change these calculations.

(4) and (5) The choices of half-lives for the simulations are constrained within a fairly narrow range to arrive at iceberg numbers that are consistent with observed distribution throughout the exit zone.

(6) Personal observations and literature descriptions of tabular iceberg fracture show that small icebergs are a by-product of break-up, but there are no data to indicate quantities. We chose a factor of three as reasonable, and because it makes our simulations fit observations.

(7) With regards to shattering rate, good fits could be achieved also by different combinations of shatter numbers, size and drift time, but within clear limits. Shattering the largest icebergs is not realistic as this would give too large a deviation from the observed sum for class 1–4 icebergs. Letting all shattered icebergs have size 0.5–1 km is likely not realistic but allows simple calculation of the number of generated ‘children’, which is proportional to the ratio of the area of original to new icebergs, i.e. length², assuming the same average length/width ratio. But changing the shattering parameters will not necessarily provide new insight. The important take-away is that complete shatter must only affect a small proportion of the tabular icebergs, and not include the largest of these.

Simulations based on these boundary conditions closely reproduce the normalized observations, as shown by Figure 7 and the Appendix (Table 6). The decreases in numbers are closely mirrored, and most numbers for all size classes and segments agree within ~±10%. This indicates that these boundary conditions are close to reality. Given the number of assumptions underlying this numerical exercise, we do not aim to fine-tune to get closer fits, even though this could easily be achieved by assuming different size composition of the ‘children’ after fracture. We further note that one realistic explanation that would reduce the deviation for size class 2 (50–200 m) is that a proportion of these icebergs undergo fracture. In the simulation above fracture has only been assigned to tabular icebergs >200 m. In reality, many icebergs <200 m while not tabular, nevertheless have shapes, such as ‘dry-dock’, that lead to fracture. The fracture model applied here assumes that the splitting divides the iceberg length, but we note that after a number of such reductions in length the initial width would likely become the longest side. Compensating for this effect would only have minor impact on the simulated numbers. Some icebergs may drift at higher speeds, which would imply longer drift distance before disintegration. The rapid fall-off in iceberg numbers east of the Greenwich meridian in the SCAR database suggests that a large increase in drift speed combined with unchanged attrition rate is not realistic. Proportionally increasing speed and attrition rate would lead to unchanged results, but after shorter travel times. Large changes in attrition rate alone are not commensurate with the changes in iceberg population. Higher attrition rates from wave action at the sides compared with basal melt results in overturning events occurring sooner in the lifetime of small tabular icebergs; this is included in the simulations by assigning that only 25% of 200–500 m icebergs are fractured after 60 d.

Figure 7. Normalized and simulated number of icebergs from segment 4 to 16 for the five size classes. The normalized observations start at segment 4, the simulated at segment 6. Exact numbers are given in the Appendix (Table 6). (a) Size classes 1–3, (b) size classes 4 and 5.

The ship-based observations of the extensive presence of small icebergs after a year of drift in open water provide a boundary framework relevant for discussions of iceberg dissolution based on satellite databases referred to above. Analyses that ignore fracturing and relate dissolution processes mainly to melting (e.g. Rackow and others, Reference Rackow2017) will result in iceberg lives and trajectories not consistent with the observations presented here. These results also have potential for quantifying further iceberg fragmentation theory (e.g. Åström and others, Reference Åström2021).

3.6 Iceberg contribution to the Southern Ocean