3.1. Exploratory analysis of mass balance data

We begin with an analysis of the composite mass-balance time series computed from all available data per year since 1920. Figure 4 shows the annual average of mass balance for all glaciers included in the WGMS database. High uncertainty in this mass-balance composite for the period prior to 1950 is evident as the 95% confidence intervals are remarkably wide, peaking with maxima/minima of ~− 6 and + 3 m w.e. a⁻¹ during the 1920s (Fig. 4a). Mass-balance uncertainty diminished drastically since the early 1950s, with a positive maximum of ~0.4 m w.e. a⁻¹ in the mid 1950s, and practically no year after 1980 recording a positive upper limit of the confidence interval (Fig. 4b). The reason for some years with high uncertainty and others with zero uncertainty in the annual average mass-balance series at the earlier sections of the series is obviously the extant number of data points during those first decades of continuous monitoring (Fig. 4c). Four periods concentrate the narrowest confidence intervals since 1950: 1962–1966, 1968–1970, 1996–2000 and 2008–2010. The narrow uncertainty detected in the two periods since 1996 are interesting for two reasons. First, those later periods record at least 25% more surface mass balance data, with 1996–2000 having an average of 120 while 1968–1970 registering 90 (Fig. 4c). Second, the last two periods are the only in which such a low uncertainty includes glaciers from the Southern Hemisphere as well as from the Tropics, suggesting a more globally consistent mass-balance response during that period. After 1950 the number of monitored glaciers began to increase significantly, triplicating the records from 1945, quadruplicating 1950's figure by the early 1960s, and then increasing to more than 150 by the late 2000s. Comparing panels a and c in Figure 4, there seems to be a moderate inverse relationship between uncertainty and the number of mass-balance data per year since 1960, as more mass-balance data become available. However, the opposite seems to occur as there is a moderate statistically significant positive linear correlation between the number of monitored glaciers for the whole period 1920–2017 and the standard deviation of mass balance computed for the corresponding year (0.65 with p < 0.001) which lowers after 1950 (0.52 with p < 0.001) whereas the correlation before 1950 is 0.63 (p < 0.001). What in fact seems to happen is that before 1950 the low number of monitored glaciers produces extreme fluctuations in the signal to noise ratio, leading to an overall positive relationship. After 1950 the uncertainty varies less, leading to a more stable signal to noise ratio.

Fig. 4. Different views of glacier mass-balance data. (a) Annual average of mass balance for all glaciers included in the WGMS database since 1920; (b) the same data but zoomed in for the period 1950–2017; (c) the total number of monitored glaciers per year since 1920; and (d) the annual latitude distribution of monitored years since 1950 shown as a boxplot per year. In (a) and (b) the gray envelope indicates the 95% confidence interval. In (d), positive latitudes indicate the Northern Hemisphere while outliers, mostly glacier locations of the Southern Hemisphere, are not shown.

As presented in Figure 1, it seems that today there is better global coverage of surface mass balance in the world. Figure 4d provides an alternative spatial view indicating the existence of a biased distribution. Most of the signal recorded in Figure 4b may be actually a product of a majority of glaciers sampled since 1950 being located within a relatively narrow latitudinal band, between 48°N to 62°N more precisely. By comparison, the average latitude of the glaciers included in the RGI is 37°56’N± 33°23’ (1 standard deviation). The narrow band where most glaciers are currently monitored leaves several important regions weakly represented, as for example the High Mountain Asia, having its largest concentration of mountain glaciers in the band 26°N to 42°N. The bias is also evident when inspecting the situation of Southern Hemisphere glaciers. Although the distribution of mass-balance programs has become increasingly even, with a peak in the late 2000s, especially toward low latitudes, all monitored glaciers in the Southern Hemisphere still remain as outliers in each annual boxplot shown in Figure 4d; all boxplot ranges extend along Northern Hemisphere latitudes only. The mean latitude of all monitored glaciers classified as outliers is 32°32’S± 32°31’ (1 standard deviation). In the RGI, the mean latitude of outliers is 42°16′S± 13°12’ (1 standard deviation), evidencing that most of the tropical and mid-latitude glaciers in the Southern Hemisphere are underrepresented in the current global network of mass-balance programs. The distribution according to latitude of the WGMS reference glaciers is more biased since currently only one glacier of the Southern Hemisphere is included (Fig. 1). Furthermore, the set that contains all monitored glaciers represents more features of the RGI than the reference glaciers, particularly for minimum and maximum elevation, and area (see Supplementary Fig. S1).

When analyzing the EPS and spatial coverage among time series (Fig. 5), the EPS applied to 20-year moving windows indicates this index never goes below 0.65, suggesting that the variance is consistently shared by the individual time series. An abrupt descent occurs at 1965 that does not fully recover until late 1990s, with the most monotonic increase beginning in 1987 (Fig. 5a). Not all glaciers fulfill the requirements of having a continuous 20-year record within a given moving window, and in fact <50% of the reported programs in 2017 account for the signal. The 1965's drop occurs despite the number of glaciers in the calculation almost doubling, from 3 to 5 (Fig. 5b), with a non-significant change in the latitudinal distribution of glaciers relative to the previous years (Fig. 5d). EPS descent toward the minimum in 1987 is punctuated by short periods of increases as the number of monitored glaciers climbs without interruptions to 47 (Fig. 5b), more than nine times in 30 years. After 1987, the monotonic EPS increment follows the number of monitored glaciers (although the maximum of the period 1987–1989 is only surpassed by 2003, Fig. 5b), and the noticeable expansion of the lower whisker in the latitudinal distribution (Fig. 4d). From 2003, the EPS reaches a stable value above 0.9. A − 0.3(p > 0.005) linear correlation between EPS and the number of monitored glaciers per 20-year window since 1920 further indicates that more glaciers do not necessarily mean a stronger common signal. Conversely, it seems that if the growing number of monitored glaciers is accompanied by a better spatial distribution, in this case expressed in the latitude, the signal may become more robust. Since 1987, the linear correlation is 0.69 (p < 0.001), even though the average number of available time series only barely doubles during the period 1965–1987, from 22 to 54. Figure 5c reinforces the finding that the signal benefits from a more diverse sample of glaciers. Though the spatial coverage curve for the Northern Hemisphere appears to be the one that more closely follows the number of monitored glaciers, showing a correlation of 0.81 since 1920 and a consistent coverage above 15% since the late 1970s, the Southern Hemisphere correlates higher (0.87) while showing a similar shape as the global spatial coverage curve, with a maximum of almost 5% by the end of the studied period. Even more, after 1987, the Southern Hemisphere displays the only positive correlation with EPS that accounts for more than 50% of the variance, with 0.77 (p < 0.001), while the world's and Northern Hemisphere spatial coverage are 0.68 and 0.58 (both with p < 0.001), respectively. These correlations corroborate the fact that more continuous mass-balance programs are becoming broadly distributed around the world. However, the finding that most programs are within a relatively narrow latitudinal range suggests that certain zones of the RGI sectorization that are used for the calculation of the reference glaciers surface mass balance curve pertain to overrepresented latitudes (notably zones 2, 8, 10 and 11) and therefore the current averaging might be improved by representing the evolving nature of the surface mass balance coverage through an alternative regionalization scheme.

Fig. 5. Time series of EPS (a) and spatial coverage (c) considering 20-year running windows, with (b) indicating the number of glaciers used for the calculation on each 20-year window.

3.2. Analysis of the glacier inventory and clustering of the world's glaciers

3.2.1. Correlations among inventory fields

Correlations among pairs of variables from the geodatabase reveal some differences in the relationships at the global scale and between hemispheres (Table 2). The only glacier descriptors showing some consistent moderate to strong correlations with climatic variables are Zmi, Zme and Zma. The high mutual correlation among Zmi, Zme and Zma is a predictable outcome as generally Zme is derived from Zmi and Zma. Rn is highly correlated with Zmi, Zme and Zma, with the figures consistently higher for the Southern Hemisphere. The lack of statistical relationship of slope and area with the other glacier descriptors and climatic variables suggests that these morphometric properties play a discriminant role only within regional to local scales, and that most of the glacier distribution is explained by how glacier altitudinal descriptors relate to climate variables. A remarkable correlation pattern occurs with temperatures, since only Tmin correlates with Zmi, Zme and Zma, with a moderate negative figure. This negative correlation is stronger for Zmi and Zme in the Southern Hemisphere relative to the Northern, and this likely reflects a pattern within the Andes mountains where freezing temperatures become more common on glaciers at the highest elevations of the Tropics and Subtropics. This is also detectable for vapor pressure, as the relatively moderate negative correlation with Zmi, Zme and Zma is higher in the Southern Hemisphere, which is concomitant with the strong positive correlation between Tmin and Vap, also suggesting that glaciers at high elevations are characterized by dry environments that allow energy loses to the atmosphere, leading to lower temperatures. While mean temperatures (Tav) do not correlate strongly with any of the glacier descriptors, Tmax presents a slight relationship with Zma in the Southern Hemisphere. The highest linear correlation between glacier and climate parameters is in Rad, but in this case with the Northern Hemisphere reaching the highest values. The high correlation of Rad with Zmi, Zme and Zma reaffirms the fact that radiation is the most important component of the energy balance (Schaefer and others, Reference Schaefer, Fonseca-Gallardo, Fariás-Barahona and Casassa2020), as it at least explains 69% of the variance in glacier descriptors. The case with precipitation is noteworthy, as global correlations are the same for Zmi, Zme and Zma, − 0.45. That variable correlates higher in the Northern Hemisphere, probably reflecting a stronger continentality control on precipitation. In fact, the correlation of precipitation with longitude is of opposite sign depending on the Hemisphere, negative in the Northern reflecting a tendency to decrease on glaciers located more inland. On the other hand, the increase in the Southern Hemisphere is probably related to the fact that glaciers in the Subtropical Andes and the Southern Alps are at a more similar distance to the ocean and that there is a significant rain shadow effect given the height of these mountains (Viale and Nuñez, Reference Viale and Nuñez2011; Caloiero, Reference Caloiero2014; Schumacher and others, Reference Schumacher, Fernández, Justino and Comin2020). This is also seen in the correlations between Zmi, Zme and Zma relative to latitude and longitude. At the planetary scale, latitude does not correlate with Zmi, Zme and Zma unlike longitude. In the Northern Hemisphere, both coordinates correlate significantly with Zmi, Zme and Zma while only latitude does it in the Southern Hemisphere. A final noteworthy finding is about wind speed (Wind), a climate parameter that presents an identical moderate negative correlation with Zmi, Zme and Zma globally, but that behaves quite differently depending on the hemisphere. While in the Northern Hemisphere Wind practically does not correlate with glacier parameters, in the Southern Hemisphere correlations are almost as high as Tmin relative to Zmi, Zme and Zma, following correlations associated with Rad.

Table 2. Linear correlations among the variables of the compiled database for the world, northern (NH) and southern (SH) hemispheres

Correlations for latitude and longitude were calculated using absolute values. Meaning of abbreviations can be found in Table 1.

3.2.2. Multivariate analysis of the inventory using PCA

From the previous exploratory analysis, it becomes clear that the variables related to glacier morphometry, namely Area, Slope (Sl), Aspect (Asp), Length (Lm) and the hypsometric integral (Hyp), do not correlate with the climate parameters included in the geodatabase, neither at global nor at hemispheric scales. This finding is also reinforced with the PCA that includes all variables indicated in Table 1. The fact that six components are needed to capture more than 70% of the variability, with the first three components summing up only 46.1%, suggests that some of the global signal in glacier distribution is hidden by local morphometric effects (Fig. 6a). This can be seen when comparing the variables with the highest absolute weight in each PC. While the variables with the highest correlations relative to Zmin, Zme and Zma appear important in PC1 and PC2 (e.g. Rad), morphometric variables have minimal influence, with Lm and Area showing up strongly in PC3 (with positive moderate mutual correlation in all cases), Hyp and Asp in PC4, and Sl in PC6. This result allows us to infer that, in order to maximize explained variance of the glacier distribution, the dimensionality reduction should only include Zmin, Zme, Zma and climatic parameters.

Fig. 6. Results of the two PCA attempts. Panels PC1 to PC6 located on the (a) side of the figure show the results including morphometric descriptors. Panels PC1 to PC6 on the (b) side correspond to the second attempt, output utilized in the rest of the analysis for this study.

Results of the second PCA now indicate that 71.57% of the variance is explained with only three PCs (Fig. 6b). The first PC (32.9%) of this subset clearly shows a direct relationship between glacier parameters and radiation while inverse with respect to Tmin, Vap and Pp. Radiation's direct relationship is logical when interpreted in the light of Vap and Pp inverse relationship with glacier parameters, indicating the fact that elevations tend to correlate with drier, clear skies. Conversely, the opposite relationship with temperatures, and especially with Tmin, can be interpreted as the general decrease of temperatures according to the increase in elevation and corroborates the finding described in the previous section. The PC2 (25.84%), on the other hand, highlights the relationships among climatic variables, especially for temperatures. The spatial distribution of the PC scores of every glacier within the geodatabase evidences certain patterns worth highlighting. In the PC1 (Fig. 7a), there seem to be well differenced two groups, with most positives above 0.4 spreading South America between 15°S to 38°S and High Mountain Asia, and negatives below − 0.4 mainly occurring in North America, the South Coast of Greenland, Iceland, Scandinavia, Svalbard, Indonesia, Patagonia, New Zealand and the Antarctic Peninsula. The rest of the glaciers are generally between − 0.2 to 0.2. In turn, the PC2 clearly discriminates the polar regions from the rest of the world, as almost all glacier polygons poleward 70°N/S show values negative below − 0.6, while almost all other regions are between 0 and 0.4 (Fig. 7b). Extreme negative numbers in the PC3 are overwhelmingly located in the continuum from the Andes to the Antarctic Peninsula, followed by a secondary cluster in Iceland (Fig. 7c). In the PC3 too, there is a relatively well-defined gradient from positive (West) to negative (East) in the Pacific coast of North America and in High Mountain Asia.

Fig. 7. Global maps displaying the spatial distribution of glaciers, color-coded according to their respective score in the PC1 (a), PC2 (b) and PC3 (c), as a result of the second PCA attempt.

3.2.3. From self-organizing maps to glacier clusters

Two attempts to determine the optimal number of clusters indicated similar results. When using the first three PCs (71.57%) or the first four PCs (80.13%), NbClust found three clusters to be the optimal number in 99 and 98% of the iterations, respectively. With the Kohonen SOM, 11 (48%) of the NbClust's indices also find that the most suitable number of clusters is 3, followed by 5 (2.2%). The hierarchical clustering delivers a set of three groups with very few glaciers located within regions where they seem to not fit (Fig. 8). Our approach finds that at the global scale High Mountain Asia glaciers can be classified together with the southernmost section of the Rocky Mountains, Zagros Mountains, most Tropical regions and the arid subtropical Andes north from ~ 36°S. However, it is worth mentioning that a number of High Mountain Asia glaciers pertain to a different group.The Pacific coast of the American Continent and the West Antarctic Peninsula contain the largest proportion of glaciers in the cluster 2, a group that also includes all New Zealand glaciers, almost all glaciers located in continental Europe, Iceland and the southern third of Greenland. Glaciers located south/north of the ~ 70th parallel in both hemispheres configure a group where Antarctica's glaciers appear similar to those in Arctic Canada, Central and North Greenland, and most Arctic archipelagos. Within the Antarctic peninsula there is a clear separation between groups 3 to the East and 2 to the West. These results also reveal discrepancies relative to the RGI zonation, as for example in the first-order region 2 (Western Canada and USA) our method suggests only two subgroups compared to 5 from the global inventory, with the section containing the southern part of the Rocky Mountains roughly coinciding with the second-order 02–05. In Greenland (region 5), our results firmly split the region in two sections while currently these glaciers are considered as one unit. High Mountain Asia is other remarkable case with all three regions there pertaining to the same cluster. In the Southern Hemisphere, there is a clear mismatch between the limits that our method finds and those utilized in the RGI, in particular the limit between first-order regions 16 and 17, since our clustering suggests the boundary is around 36°S. The clustering also shows that in very few cases glaciers are located in large regions where a majority pertains to a different cluster. For example, nearly two dozen of glaciers in Alaska that are classified as from cluster 1 show up in the middle of a large area of cluster 2, a few Ecuadorian glaciers classified in cluster 2 are within this large region of cluster 1, and there are certain mixes in Kamchatka Peninsula. However, there is almost no case where a glacier of cluster 1 lies within a region of cluster 3 or vice versa (more detailed view of the clustering can be observed in Figs S2–S20).

Fig. 8. Clustering results over the world's map. Each glacier is colored according to the cluster they are classified. Boundaries of RGI regions included in light gray.

It is evident the inverse relationship between the total surface area of each cluster and the number of glaciers contained (Fig. 9), where glaciers of the cluster 3 concentrate the largest area with the smallest number of associated polygons. But, what does our procedure tell about glacier regimes that characterize the regions presented in Figure 8? In order to attempt an explanation on the reasons, we need to dig into the variables utilized in the dimensionality reduction and clustering processes (Fig. 9). Although in no case the variables presented as boxplots in Figure 9 suggest significant statistical differences in the distribution of variables according to each cluster, it is possible to identify distinct patterns. In cluster 1, Zme, Zmi and Zma tend to be on average 3000 m higher than the other groups, with larger temperature range and radiation overall. In turn, salient features in cluster 2 are the generally higher temperatures, slightly more remarkable for Tmin, and also higher Vap and precipitation. Somewhat of a mixture in certain variables occurs for cluster 3, a group that while evidencing differences on the three temperature descriptors relative to the other clusters, coincides with cluster 2 regarding glacier elevations, and in Vap and precipitation with cluster 1. Therefore, cluster 1 seems to represent a group of generally high elevation glaciers located in relatively cold, dry areas with large radiation input, also characterized by significant temperature range. Subsequently, cluster 2 features suggest a regime of low elevation glaciers with more frequency of temperatures above zero on relatively humid climates. Finally, cluster 3 represents glaciers located very close to sea level, in cold and dry areas with the lowest average radiation input.

Fig. 9. Statistical characterization of clusters (indicated in the x-axis) according to the input data used for the classification. The top-left panel is a barplot where the bars represent the percentage of global glacierized area covered by each cluster, while the ‘n’ on the top of each bar indicates the percentage of glaciers. The rest of the panels are boxplots showing clusters’ characteristics for each variable included in the PCA second attempt (see Fig. 6). Abbreviations are according to Table 1.

3.3. Temperature sensitivity per cluster

One obvious outcome of the clustering procedure is that glaciers do not conform regions or zones with strict limits and rather it seems that this data-driven approach indicates long distance connections while unveiling particular regimes associated with elevation, moisture availability and radiation. It follows that agglomerating glaciers with similar regime relative to the global population should allow for building surface mass balance composites more representative of the glacio-climatic regime diversity at this large scale. Our results also allow us to suggest that surface mass balance for glaciers within a similar regime should respond in a roughly similar fashion to climate and thus average composites of all available time series would be more representative of sensitivity to climate changes. Figure 10 presents an analysis of surface mass balance for each cluster, where the proportion of glaciers per year since 1950 reveals the fact that all regimes are represented since that year, although cluster 3 presents systematically less members (Fig. 10a). surface mass balance composites for each proposed regime show a decreasing trend which in all cases becomes more evident since late 1960s and even more notorious after 1980 (panels b to d). The linear trend 1950–2017 for each group is only statistically significant for clusters 1 and 2, with − 8.84 and − 9.26  mm w.e. a⁻¹ (p < 0.001 in both cases) respectively, while for cluster 3 it is − 2 mm w.e. a⁻¹ (p > 0.1). However, after 1980 all groups’ negative trends speed-up, with − 14.33 mm w.e. a⁻¹ (p < 0.001) for cluster 1, − 21.29,mm w.e. a⁻¹ (p < 0.001) for 2 and − 12.18 mm w.e. a⁻¹ (p < 0.01) for 3, i.e. from almost twofold to sixfold increase. Cluster 3 shows the largest uncertainty bounds, expressed in the 95% confidence interval. Computation of the EPS with 20-year windows for each group reaffirms the finding on uncertainty in cluster 3 (panel e). While within each 20-year window EPS remains above 0.6 for much of the period since 1960 for clusters 1 and 2, in 3 the shared variance actually shows a declining trend. Reasons behind this result are perhaps the fact that for every 20-year window <6 glaciers contribute to the cluster composite and that only by 1970 there is enough number of continuous records allowing calculation of the respective surface mass balance composites (Figs 10f–h).

Fig. 10. Mass-balance characterization according to the corresponding cluster. Panel (a) indicates the proportion of measured glaciers per cluster relative to the respective annual global total, (b)–(d) show the mass-balance time series per cluster since 1950, with the gray envelope indicating the 95% confidence interval; (e) the annual evolution of EPS per cluster; while (f)–(h) the number of glaciers considered in the calculation per year.

Figure 11 shows global surface mass balance time series computed using different combinations of available data, which allows comparison of surface mass balance trends. A global trend averaging the three clusters (red curve in Fig. 11) delivers − 6.27 mm w.e. a⁻¹ (p < 0.001), i.e. less pronounced than the trend computed from the mean of reference glaciers (black curve in Fig. 11), − 7.54 mm w.e. a⁻¹ (p < 0.001). The cumulative surface mass balance of the clusters’ average composite is also less negative than that determined from the reference glaciers, − 25.74 versus − 28.04 m w.e.; by comparison, the same figure calculated from averaging all glaciers per year (blue curve in Fig. 11) results in a loss equivalent to − 26.07 m w.e. On average, the difference between the global surface mass balance composite computed from the clusters and the reference glaciers’ time series is 0.034 m w.e., with a linear correlation of 0.71 (p > 0.001). Unlike the global mean computed from either reference glaciers or all glaciers, which present negative surface mass balance since mid 1970s, the composite from clusters evidences this since 1986, after two positive spikes. Since 2000, our averaging points to a stronger negative trend.

Fig. 11. Mass-balance curves calculated with different combinations of annual data. The blue line is the arithmetic average using all glaciers reported per year since 1950, the red line is the average calculated from annual means of each cluster, while the black line is the average of the reference glaciers available from the WGMS database.

Unlike calculation of sensitivity using modeling approaches, where simulations using tweaks of climatic variables are used to calculate the rate of change of surface mass balance, in the regression approach we test the behavior of the β parameter. In addition, self-correlations and cross-correlations can be indicative of the hysteresis of each individual variable and the delay of the response variable adjusting to a given stimulus from the independent variable. In our case, we interpret this time window, should it exist, as the temporal scale where sensitivity maximizes. A first hint can be appreciated in Figure 12, where both the global mean of each climatology and the average surface mass balance curve per cluster show significant self-correlations. At the 95% confidence level, all three climatologies show statistical relationships with delays up to 15 years, with the stronger values (>0.65) within a 4-year window. For surface mass balance, significant self-correlations show up from lag-1 to about decadal lags for clusters 1 and 2, while for cluster 3 only at lags 1 and 4, although in all cases these self-correlations plummet after lag-1 when compared to the climatologies.

Fig. 12. Self-correlations since 1950 for all climatologies and mass-balance time series of each cluster. Dots indicate correlations significant at the 95% confidence level.

Cross-correlations between the climatologies and the surface mass balance per cluster reveal number 3 with the smallest figures (Fig. 13). The plots suggest a slightly significant cross-correlation at the 95% confidence level for a window from − 2 to + 7 years. Wider windows and higher correlations can be seen for the mean from the WGMS reference, clusters 1 and 2. While at the zero lag the values are near 0.6, windows extending to ~− 5 to + 10 years remain above 0.4, and even − 10 to + 15 years are still significant for clusters 1 and 2 considering all climatologies. These cross-correlations allow us to infer that at this global scale the surface mass balance average time series have a memory of ~15–20 years relative to global air temperature averages, supporting the choice of 20-year windows for most of the time series analysis included in this paper. In addition, this result may mean that surface mass balance sensitivity corresponds to a non-stationary property of glacier response.

Fig. 13. Cross-correlations since 1950 between clusters’ mass-balance time series and climatologies, with the reference glaciers’ time series also included. Dots indicate correlations significant at the 95% confidence level.

Using the 20-year window for calculating moving linear correlations since 1950 further support the finding of surface mass balance sensitivity as non-stationary. Figure 14 displays these linear correlations computed for the WGMS average and the three clusters, relative to each global climatology. Considering only the climatologies, results are remarkably similar for each cluster. The closer to the present, the correlations seem to become more negative, revealing a stronger inverse relationship with temperature. However, the clusters do not show the positive values between 1965 and 1975 that can be appreciated for the WGMS average. In fact, even averaging the three clusters this positive spike does not show up, indicating that the averaging process using the clusters identifies a slightly different surface mass balance sensitivity. While in all clusters the correlation remains consistently negative, with very few exceptions, becoming statistically significant (p<0.005) during the 1980s, for the WGMS-CRUTEM correlation that only occurs in 20-year periods starting in 1978, 1996 and 1997. However, considering all the time series only in a couple of cases the explained variance was higher than 50%, all of them during the 1980s too. Another noticeable finding for that decade is that it is the only one in which the 95% uncertainty envelope is always negative. For cluster 3's average, however, negative values only appear after 1956, which is probably linked to the fact that fewer surface mass balance time series were available during those years. For all the clusters, windows starting in the late 1990s tend to show fewer negative correlations. These results are somewhat different when compared to the correlations calculated for the whole period (Table 3), as the WGMS average from reference glaciers shows values close to the correlations for the 1980s in the 20-year window analysis. The global average built from the clusters displays higher and more consistent correlations with respect to each climatology (− 0.62). Analyzed separately per cluster, number 3 shows the lowest correlation, below − 0.3, much smaller than the values computed with the 20-year window. For cluster 1, correlations are close to those for the early 1980s in Figure 14, while for cluster 2, all are nearly the same as for the period 1980–1990.

Fig. 14. Linear correlations, using 20-year moving windows, between the surface mass balance time series and the climatologies’ global time series. Gray envelopes represent the 95% confidence level, segmented lines indicate the 0 and 50% of explained variance, and black dots indicate the starting year of the window when the linear correlation was significant at p < 0.005.

Table 3. Linear correlations and sensitivity of surface mass balance time series relative to global climatologies

Slopes of regression models using 20-year windows also reveal a time-varying sensitivity to global climatology trends for each cluster (Fig. 15). Statistically significant slopes (at p < 0.005) are indicative of maximum sensitivity to temperatures of global climatologies since the 1980s, with values larger than − 0.5 m K⁻¹. The Durbin–Watson test applied to the residuals indicates serial correlation for the linear model relating cluster 1 and Berkeley at the beginning of the study period, and for all the models in cluster 3, prior to 1960. As with linear correlations, in all groups slopes tend to be more negative toward the present, although there is an incipient upward trend after 1996. For the three clusters, the 95% confidence interval becomes negative only after 1980. The confidence interval in all clusters also reveals that the average, although different, has considerable overlap. Linear models applied to the whole study period since 1950 for each clusterreveal that for cluster 2 with the highest figures, larger than − 0.49 m K⁻¹, followed by cluster 1, with non-statistically significant slopes (p > 0.1), and then by cluster 3, group with slopes smaller than − 0.21 m K⁻¹, i.e. less than half the sensitivities of the other two (Table 3). The most negative slopes for cluster 1 are larger than − 0.8 m K⁻¹ in the late 1980s and early 1990s. In turn, slopes for cluster 2 are generally the most negatives of all, with statistically significant values as low as − 1.1 m K⁻¹ since the mid-1980s. Cluster 3 presents similar values as cluster 1, although this is the only case where linear models in particular 20-year explain more than 50% of the variance, periods starting in 1986 and 1987 for CRUTEM, and 1986 for GISS and Berkeley.

Fig. 15. Slopes of the linear models, using 20-year moving windows, between the surface mass balance time series and climatologies’ global time series. Gray envelopes represent the 95% confidence interval, red dots correspond to slopes significant at p < 0.005, black circles indicate linear models that explain more that 50% of the variance, and blue triangles point to the initial year of the 20-year period in which the Durbin–Watson test finds serial correlation in the residuals.