Dataset I: AMSR-E ASI ice concentration (SIC_ASI)

The AMSR-E sensor was operating aboard the NASA Aqua platform between 2002 and 2011. It provides data on both horizontally and vertically polarized brightness temperatures at six different frequencies between 6.9 and 89.0 GHz. Standard AMSR-E daily sea-ice concentrations are derived using the NASA NT2 algorithm (Reference Markus and CavalieriMarkus and Cavalieri, 2000), with spatial resolutions of 12.5 and 25.0 km. The ASI algorithm (Reference KaleschkeKaleschke and others, 2001; Reference Spreen, Kaleschke and HeygsterSpreen and others, 2008) was developed as a way to obtain more detail from the high spatial resolution of the 89GHz channels and shows a performance similar to other sea-ice algorithms (Reference Spreen, Kaleschke and HeygsterSpreen and others, 2008). In this study, we selected an ASI ice concentration grid at a 6.25 km spatial resolution to capture the edge location. Because the ASI is applied to daily average products and not to daily ascending or descending images, a publicly distributed ASI daily average grid was chosen to enable users of the products to benefit from a better understanding of their qualities.

Daily average ASI grids (SIC_ASI) with a 6.25 km resolution were obtained using the current version of the ASI algorithm, which is described in detail by Reference Spreen, Kaleschke and HeygsterSpreen and others (2008). All the data were produced by the Institute of Environmental Physics (IUP) at the University of Bremen, Germany, and were downloaded from http://iup.physik.uni-bremen.de:8084/amsredata/asi_daygrid_swath/l1a/s6250/. The SIC_ASI were in a GeoTIFF format, which is available as bytes (0-255) and with a polar stereographic projection. The ice concentrations between 0% and 100% were scaled to values between 0 and 200, so that every value of the GeoTIFF byte data represents a 0.5% ice concentration range.

Dataset II: MODIS

The MODIS image was chosen to serve as the primary independent evaluation source. MODIS has 36 visible/ infrared bands with spatial resolution ranging from 250 m to 1 km. Four MODIS images were obtained for the dates when the synchronous Landsat TM images also had atmospherically clear conditions. Although MODIS has a coarser resolution than TM, it covers a much wider swath, thereby permitting greater coverage of both AMSR-E pixels and ice edges. Landsat TM images were used in this study as a secondary referencing source for explaining our results.

The four MODIS scenes that were used in this study cover portions of the Weddell Sea, Pacific Ocean and Bellingshausen Sea (Fig. 1). The MOD 02-Level-1B Calibrated Geolocation Data Set were downloaded from the Atmosphere Archive and Distribution System (http://ladsweb.nas-com.nasa.gov. Using a MODIS geolocation product, a sun-angle correction was applied to the reflectance of band 1 (0.620-0.670 m) and band 2 (0.841-0.876 m) at a 250 m resolution and to band 4 (0.545-0.565 m) and band 6 (1.628-1.652 m) at a 500 m resolution, to generate top-of-the-atmosphere reflectance. Next the top-of-the-atmosphere reflectances for each band in swath form were transformed into a polar stereographic projection.

Fig. 1. Location of the four MODIS scenes in the Antarctic. Date format is year.month.day.

Data processing I: sea-ice binary map and pseudo-ASPeCt observations

A multiple thresholds method was employed following NASA’s MODIS sea-ice product processing approach (Reference Riggs, Hall and SalomonsonRiggs and others, 2006). This approach defines ice and no-ice thresholds using multiple bands, by allowing each MODIS pixel to be classified either as ice or not ice. First we regridded bands 4 and 6 to a 250 m resolution and calculated the normalized-difference snow index (NDSI) using NDSI = (Ref_band4- Ref_band6)/(Ref_band4 + Ref_band6), where Ref_band4 and Ref_band6 indicate the reflectance of bands 4 and 6, respectively. Next if a MODIS pixel fulfilled the three criteria NDSI˃0.4, Ref_band1˃0.1 and Ref_band2˃ 0.11, it was labeled as ice, otherwise it was labeled as no ice. Using this method, the MODIS images were classified into binary sea-ice maps with values of 1 (ice) and 0 (no ice) at a 250 m resolution. This binary map was used to generate pseudo-ship points in the next step.

The sea-ice edge was defined as the northernmost occurrence of sea ice with at least a 10% concentration, where the ice concentration within a 1 km radius of the ship is estimated from the ship’s bridge (Reference Worby and ComisoWorby and Comiso, 2004). To simulate the ice-edge determination it was necessary to ‘look at’ an ice concentration map from space with a 1 km radius, instead of from a ship, and to identify the northernmost 10% concentration point. In this study we replaced the 1 km radius with a 2 km resolution grid, which was derived from the binary ice map by averaging the values of every 8 x 8 cell grid. Next, we established the contours of a 10% SIC from the 2 km ice concentration grid and marked the ASI pixels passing the contours as pseudo-ship-observed pixels. In total, 917 pseudo-ASPeCt observations were sampled from four scenes (Table 1).

Data processing II: comparison of ice edges and transects

Ideally, we might expect that all 917 ASI pixels covering pseudo-ASPeCt observations have the same SIC value of 15%; if so, the 15% threshold for passive microwave images would be pertinent. To be more flexible, we hypothesized that the mean concentration should not be significantly different from 15%. Furthermore, the 917 ASI pixels should have concentration values (SIC_ASI) similar to their corresponding MODIS pixels (SICMODIS). SICMODIS is calculated as the average value of the 25 x 25 cells on a binary ice map that match the size of the corresponding 6.25 km ASI pixel. Descriptive statistics and a correlation analysis were performed to compare SIC_ASI and SIC_MODIS data. In addition to the ice concentrations, the spatial variability of the ice edges was also considered. The outlines of the cell regions with a 10% concentration on the 2 km resolution grid were marked as the pseudo-ice edge. The distance between the location of the pseudo-ice edge and the 15% SIC_ASI contour was analyzed.

To assess the accuracy of SIC_ASI at the ice edge with that in open water and in the interior zone, we drew eight transects (i.e. two on each scene). All the transects started at the ice interior, passed the ice edge and marginal zone, and reached the open water. The SIC_ASI and SIC_MODIS data along these transects were compared. The pseudo-ASPeCt observations on the transects were marked out to be compared with the 15% SIC.

Comparison of ASI ice concentration (SIC_ASI) and pseudo-ASPeCt observations

The summary statistics of SIC_ASI at the pseudo-ASPeCt points for each scene are shown in Table 1 . The mean and standard deviation of SIC_ASI ranged from 0.8% to 19.9% and 2.9% to 24.1%, respectively. Scenes 2, 3 and 4 had similar mean ice concentrations of ∼15% and standard deviations of -20%. The closest concentration to the 15% standard threshold was 12%, derived from scene 3. Of the four scenes, scene 1 is the exception, with a lower mean concentration and smaller standard deviation than the others. Putting all the sample points together, we observed that the mean SIC_ASI value was 13%. Means testing (Z tests) indicated that all the mean values were significantly different from 15% at a 0.05 significance level, although a 2% difference seems remarkably good. The reason could be the large number of sample points. Therefore, the difference between the mean and 15% was so large that we know with 95% certainty the difference was not by chance.

Table 1. Details of the four MODIS scenes and a comparison of SIC_ASI and SIC_MODIS from pseudo-ASPeCt observations

Although the differences between the ice concentration values were significant, the spatial separation of the edges could be small. For example, the ice edges derived from the ASI and ASPeCt observations have a small distance within one or half a pixel size, but their concentration values can be significantly different. Consequently, we checked the spatial locations of the 15% ASI threshold and pseudo-ice edges, and overlaid these on the original MODIS image and the ASI product (similar to Fig. 2). Generally, the 15% ASI contour was located south of the pseudo-ice edge. We found that the average distance between the two lines did not exceed three ASI pixels, whereas 58% of the separation space is approximately one pixel in width. Some small gaps within one pixel or half a pixel were due to the coarse resolution of the AMSR-E image (region A in Fig. 2). Large distances, such as region B in Figure 2, primarily occurred in thin-ice areas with low sea-ice concentration.

Fig. 2. Contour of the 15% ASI SIC threshold and the pseudo-ice edge overlaid on the original MODIS band 2 (a) and the ASI concentration product (b). This region is the subset of scene 2. Yellow circles highlight regions A and B where representative types of gaps occur.

Comparison of ASI and MODIS ice concentration (SIC ASI -S I C MODIS) at the pseudo-ASPeCt observation points

The correlation of SIC_ASI vs SICMODIS ice concentrations at pseudo-ASPeCt points in each scene is illustrated by the scatter plots in Figure 3. Because all the SIC_ASI and SICMODIS values were collected at sea-ice edges, the points were clustered near the bottom left-hand corner of the plots with low ice concentrations. Many dots have a zero SIC_ASI but a non-zero SICMODIS value, thereby aligning on the left-hand side border of the scatter plot. A large number of these dots will reduce the strength of the correlations, as confirmed by their low R² values (R²˂0.2). The test results, however, showed that the correlation coefficients were significantly different from zero, indicating low but significant linear relationships (Table 1).

Fig. 3. Sea-ice concentrations from SIC_ASI vs SIC_MODIS at pseudo-ASPeCt observation points in four scenes. The solid black line represents the best linear fit of the data and the dashed line represents a 1 : 1 relationship.

The bias (SIC_ASI-SIC_MODIS) and RMSE values for each scene are summarized in Table 1 . Three of the four scenes had a negative bias, ranging from -15.1% to -12.3%, whereas the fourth scene had a bias close to zero. The average bias for all the sample points was negative, indicating a general underestimation by the AMSR-E ASI products at the sea-ice edges. All the RMSE values were between 19% and 31%, with an average of 27.7%. These values were compared with previous studies, as discussed below.

Comparison of ASI and MODIS ice concentrations (SIC ASI -SIC MODIS) along transects

To illustrate the concentration differences in the ice cover along the ice edge, eight transects across the pseudo-ASPeCt observation points were derived from the four scenes (Fig. 4). The order of the starting point, end point and pseudo-ASPeCt point was labeled. All the transects start from the ice interior, pass the ice edges of the pseudo-ASPeCt points and reach 100% open water. Some transects had relatively sharp and compact ice edges (e.g. 2005a), others had more uncertain and gradual edges (e.g. 2009b), and others had obvious low-concentration segments in the interior ice region (e.g. 2004b and 2005b). The R² values of a sion between SIC_ASI vs SIC_MODIS along the transects ranged d between 0.69 and 0.96 and were therefore much higher than the values observed at the pseudo-ASPeCt points along the ice edge. Clearly, strong agreement exists between SIC_ASI and SIC_MODIS in the inner dense ice zones and in the open sea areas, whereas the differences in the transition zones were larger, with generally higher SICMODIS values This underestimation of SIC_ASI in the marginal zone is consistent with our results (Fig. 3).

Fig. 4. Sea-ice concentrations from SIC_ASI vs SIC_MODIS along eight transects. The x-axis units are pixels. The vertical dashed lines represent the location of the pseudo-ASPeCt observation points, and the horizontal dotted and dashed lines show the 1 5% passive microwave concentration.

The vertical dashed lines in Figure 4 represent the locations of the ice edge as observed from the pseudo-ASPeCt points, and the horizontal dotted and dashed lines represent the 15% ice concentration threshold. At the locations of the ice edge, only the SIC_ASI in 2004a achieved a 15% threshold, whereas all the others were below 15%. However, the comparisons in Table 1 show a higher mean SIC_ASI over 15% in scene 4 in 2010. This inconsistency suggests that the small number of ship-based observations at the ice edge cannot accurately represent the overall ice-edge line. Combining the transect analysis with robust statistics based on a large number of points generated from our proposed method provides a full understanding of the data quality. The distance between a pseudo-ASPeCt point and the northernmost SIC_ASI pixel with at least a 15% SIC were all between zero and three pixels wide, with an average of 1.625 pixels (-10 km). These values are in good agreement with our observations (Fig. 2).

Separating the data into summer (scenes 1, 2 and 3) and winter (scene 4) highlights the underestimation of SIC_ASI in summer: many more red points lie above the diagonal than below it (Fig. 5). In contrast, the blue points are distributed more evenly around the diagonal and do not have a large bias. The overall R² values were 0.82 and 0.81 in summer and winter, respectively. Figure 5 also revealed that the majority of points were clustered in the top right-hand and bottom left-hand corners, i.e. located in the ice interior and in 100% open water, respectively. Only a small portion of the points had moderate ice concentrations and most were scattered far from the regression lines. This suggests that the high correlation coefficient values were mainly attributable to the major corner points, and the small number of ice edge points prohibited further conclusions being drawn from this transect analysis.

Fig. 5. Scatter plot of SIC_ASI vs SIC_MODIS from all ASI pixels in eight transects.