Glacier inventory parameters

While glacier area is provided automatically for each glacier polygon in a GIS, further topographic parameters for each glacier were calculated by combining glacier outlines with a DEM and DEM-derived parameters (Reference HoelzleKääb and others, 2002; Paul and others, 2002; Paul, 2007). The latter include a slope grid as well as a sine and cosine grid (both derived from the aspect grid) which were used to calculate mean aspect. The slope and aspect grids are visualized for a subsection of the analysed scenes in Figure 2a and b, respectively. The slope grid illustrates that glaciers are generally flat and only the highest parts of tributaries are steeper. This has to be considered in the interpretation of mean glacier thickness.

Fig. 2. Illustration of DEM-derived topographic parameters coded by greyscale. (a) Slope variability, ranging from low slopes (dark) to high slopes (white); and (b) aspect sectors for a subsection of the study site (see Fig. 3for location).

The small-scale variability of the aspect facets (Fig. 2b) demonstrates the irregular DEM surface as well as the fact that a mean aspect might have little climatological relevance for some glaciers. The statistical values (e.g. minimum, maximum, mean, standard deviation) are then calculated for each zone (i.e. coded glacier entity) from the respective value grid (DEM, slope, sine and cosine) following Paul and others (2002). Mean aspect is calculated from the arc tangent of the mean values of the respective sine and cosine grid in order to avoid wrong values for circular variables, and is expressed in a 0–360^˚ range as well as for the eight cardinal directions. Compared to the calculation of the mean aspect from the direction of the central flowline as applied in the World Glacier Inventory (WGI; WGMS, 1989), the grid-based approach considers all cells equally and is thus free from a bias due to human interpretation.

Hypsography (area-elevation distribution) is calculated for each glacier and the entire glacierized area in 50m elevation bins from the ASTER-derived DEM and the glacier outlines from 2000. For comparison with calculations based on WGI data, mean slope is also calculated from the arc tangent of elevation range (h _max – h _min) divided by glacier length. The latter is derived from central flowlines which were digitized manually because automated algorithms (e.g. based on the steepest downward gradient) generally fail in the ablation area where the curvature of the surface is convex. The central flowlines were digitized from the terminus to the highest point of the glacier and cross elevation contours perpendicularly. For glaciers in sample C they start at the LIA terminus position. In the case of a glacier that split into two or more parts after the LIA, flowlines were also digitized for the individual parts (see Svoboda and Paul, 2009). Due to the uncertainties in deriving the correct glacier length for glaciers with several compound basins or a complex topology, the slope value derived from length and elevation range could vary with the interpretation of glacier length.

Several possibilities exist to calculate the mean elevation of a glacier. When mean elevation is used as a proxy for the equilibrium-line altitude (ELA), it is useful to analyse these methods in more detail. At first, the arithmetic mean elevation h _mean,a = (h _min + h _max)/2 is calculated. This mean elevation is available for tens of thousands of glaciers which have their values stored in the WGI (cf. Haeberli and Hoelzle, 1995). The second method is the statistical mean value (h _mean,s) that is calculated by the GIS from summing up all elevation values within the glacier limits and dividing them by the number of cells. The third method of calculation is the area-weighted mean value (h _mean,w) that results from the area–elevation distribution (hypsography) and divides the glacier into two equally sized parts. In mass-balance terms, it represents an accumulation–area ratio (AAR) of 50% and can be derived in the GIS as the median of all elevation values per glacier. In this study, all three methods of calculating mean values are applied and compared.

Changes in glacier area and length

The changes in glacier area are calculated directly by subtracting the total area values of the respective years for each glacier. In Figure 3 the mapped glacier extents from the year 2000 and the digitized LIA extents are illustrated for the entire study site. This provides a visual representation of glacier distribution, types and changes. Relative changes in area between the LIA and the 1975/2000 extent use the LIA extent as a base; the relative area changes between 1975 and 2000 refer to the 1975 extent (see Table 2, further below). For glaciers that have split since the LIA, the component parts of the former entity are added up. Length changes are calculated by intersecting the central flowline with the respective glacier outline. This approach was successful for the glaciers in this region, as complex geometric changes such as in the Alps (e.g. emerging rock outcrops) were less frequent (Paul, 2007). Length changes starting from the LIA maximum are generally calculated only for the main glacier. The maximum extent of tributaries that split from the main glacier after the LIA is in most cases not followed up to the LIA terminus position but only up to the former contact zone. Thus, for those glaciers the given length changes represent minimum estimates. As far as possible, doubtful cases were excluded from the sample.

Fig. 3. Extent of glaciers and ice caps as mapped from ASTER for the year 2000 (black) by automated techniques and for the LIA (white) by manual trimline/moraine delineation. The location of the subset displayed in Figure 2 is indicated by a white square.

Glacier volume and volume changes

In this study, we make full use of the topographic information available for each glacier to calculate a slope-dependent thickness following Haeberli and Hoelzle (1995). This allows us to obtain different glacier volumes for equally sized glaciers when they have different mean slopes. The approach is based on the shallow-ice approximation (SIA) which assumes ideal plasticity for ice Reference Ohmura(Paterson, 1994) and leads to a simple formulation for the basal shear stress τ (kPa):

τ = d _f f ρg sin α

where d _f is the mean thickness along the central flowline (m), f is the form factor to account for varying glacier cross-sections, ρ is the density of ice (kgm^–3), g is the acceleration of gravity (m s^–2) and α is the mean glacier slope (°). When this equation is used to calculate mean glacier thickness d _F, τ must be obtained from other relations. An empirical approximation which relates basal shear stress to the elevation range △h and mass turnover db/dt of a glacier is proposed by Reference Granshaw and FountainHaeberli (1991). Here we use a regression fitted to the measured values of continental-type glaciers from that study

τ = 0:005 + △h - 0.3△h ²

and use an upper limit for τ of 1.5 kPa for glaciers with △h > 1.6 km. The form factor f is assumed to be 0.8 (a typical value for valley glaciers) and the same for all glaciers. Mean slope is taken from the DEM. The obtained mean thickness along the central flowline d _f is converted to mean glacier thickness d _F by multiplying d _f with a correction factor k, which is π/4 for an assumed semi-elliptical glacier cross-section. Glacier volume is then obtained from V = Skd _f, where S is surface area (km²). According to Reference Kääb, Paul, Maisch, Hoelzle and HaeberliMaisch (1981), the variability of the derived thickness values is about ±30%.

Volume changes between the LIA and the 2000 extent are also derived from cumulative length changes in this period following Jόhannesson and others (1989). The method has been applied successfully by Hoelzle and others (2003) for glaciers in the Alps. In a first step, a mean mass-balance change is calculated which is then multiplied by the mean glacier size in that period to obtain the volume change. The method relates the changes in glacier length between two steady states to a corresponding shift (step change) in the ELA after full dynamic response. For continuity reasons, the added mass δb over the total length L ₀ has to be removed by ablation at the glacier tongue (b _t) over the length change δL. This gives δb = b _t(δL/L ₀), with the mean mass balance 〈b〉 = δb/2. While L _⁰ and δL are taken from the glacier inventory, the balance at the tongue b _t is calculated from a mass-balance gradient db/dh and the elevation range of the ablation area: b _t = (db/dh)(h _mean,a – h _min). For this region near the polar circle, db/dh is fixed to a value of 0.3mw.e. (100m^–1) a^–1 which has been measured for Decade Glacier, Baffin Island, under steady-state conditions (PSFG, 1973).

Strictly speaking, the approach is only valid between two steady states, and the response time of the glaciers must be smaller than or equal to the considered time period (Jόhannesson and others, 1989). Here we assume that glacier retreat started around 1920 and thus have an 80 year period to consider. While this is too short for a full dynamic response for most of the larger glaciers, we found it worth testing nevertheless, as it should be valid for most glaciers in sample C. The cumulative volume change △V is then calculated from the mean mass balance 〈b〉 (i.e. the mean thickness change), the mean glacier area of both points in time (S ₁, S ₂) and the time period △t (80 years):

V = 〈b〉[(S ₁ + S ₂)/2]△t:

Glacier inventory parameters

The following glacier parameters are available from the attribute table of each glacier for the year 2000: code, WGI code (where it could be assigned), latitude/longitude, area, minimum/maximum/mean elevation, length, mean slope and aspect (both with standard deviation) and mean thickness. This allows several parameters to be combined for a more detailed characterization of the glacier sample. Figure 4a shows a histogram of the count and area covered versus size class (see Table 1 for values). Nearly 90% of the 664 glaciers in this sample (A) are smaller than 5 km² and they cover <25% of the total area (2416km²), whereas the eight largest glaciers larger than 50km² (1% by number) cover 33% of the area. Glaciers from 1 to 10 km² and from 10 to 50km² each cover 30% of the area. Figure 4b shows a histogram of the count and area covered in each aspect sector. The distribution is dominated by glaciers facing towards the three northern sectors, regardless of whether the count or the area covered is considered. When glaciers >50km² are discounted, the preference for the northern sectors in respect to the area covered is much less pronounced.

Fig. 4. Glacier count and area covered versus (a) size class and (b) aspect sector for sample A.

The dependence of mean elevation on aspect is depicted in Figure 5a. This figure also illustrates the higher abundance of north-facing glaciers. When mean values for the eight sectors are computed, an increase in mean elevation of about 200 m from north to south is noted. This indicates that exposure to solar radiation influences glacier location, because the energy and mass balance of glaciers (and thus their growth or decay) is also determined by solar radiation (e.g. Reference Driedger and KennardEvans, 2006). On the other hand, glacier size is not correlated with glacier mean elevation (992m for the entire sample), but a high scatter is present (Fig. 5b). The scatter increases slightly towards smaller glaciers, which implies that local topographic characteristics become more important for the location of smaller glaciers.

Fig. 5. (a) Mean glacier elevation versus aspect. The solid line gives mean values for the eight cardinal sectors. (b) Mean glacier elevation versus size. The solid line gives mean values for distinct size classes.

In Figure 6a the dependence of mean slope on glacier size is depicted, revealing that larger glaciers tend to have lower mean slopes. However, the scatter towards smaller glaciers is large and a considerable number of small glaciers are comparably flat. This could be because some glaciers are situated in local topographic depressions (e.g. perennial snow banks). The large variability of mean slope for glaciers of the same size results in a related variability of mean glacier thickness up to a factor of two (Fig. 6b). The consideration of the slope-dependent thickness variability is in our opinion thus a clear improvement over two-dimensional approaches that use planar information only to obtain glacier volume (Reference DowdeswellDriedger and Kennard, 1986; Reference HaeberliHaeberli and others, 2008).

Fig. 6. (a) Mean slope versus glacier size for sample A. (b) Mean thickness versus glacier size for sample C.

A comparison of mean slope, as calculated from zonal statistics using the DEM and from the arc tangent of glacier length divided by elevation range, is given in Figure 7a. A linear regression gives a correlation coefficient of 0.85, with a regression slope of 0.999 and an intercept of –2.33. This implies that the mean slope from the zonal statistics calculation is on average 2.3^˚ steeper, without any slope-dependent trend. The outliers and the large scatter suggest that the mean slope derived from length and elevation range is subject to higher uncertainty. However, the comparably high correlation (0.87 when neglecting six outliers) confirms that the approach used by Reference GroveHaeberli and Hoelzle (1995) gives a reasonable approximation of the mean slope in most cases. The correlation of mean elevation as derived from zonal statistics (h _mean,s) with the arithmetic mean elevation (h _mean,a) is depicted in Figure 7b. The correlation coefficient is comparably high (r = 0.97) and has only a slight trend (regression slope = 0.93). This implies that h _mean,a could indeed be used as a proxy for mean elevation.

Fig. 7. (a) Mean slope derived from DEM statistics versus mean slope derived from elevation range and length. (b) Mean elevation derived from DEM statistics (h _mean,s) versus arithmetic mean elevation (h _mean,a).

A scatter plot displaying minimum and maximum elevation vs glacier size for individual glaciers is depicted in Figure 8a. Mean elevations for distinct size classes are also included. While the scatter plot clearly reveals an increase (decrease) in mean maximum (minimum) elevation with glacier size, it also illustrates that the scatter of values for glaciers <5 km² is high and that glaciers <1km² could reach far down (Fig. 5b). Figure 8b illustrates the area–elevation distribution for nine selected larger glaciers. While a large portion of the ice cover is situated between 600 and 1400 ma.s.l., the large variability of the hypsographic curves indicates that the response of individual glaciers in this region to the same climatic forcing might be different.

Fig. 8. (a) Minimum and maximum elevation for each glacier (sample A) versus glacier size. Mean values for discrete size classes are also given. (b) Area elevation distribution in 50m bins for nine selected larger glaciers.

Changes in glacier area, length and other parameters

Area changes between the LIA extent and 2000 have been calculated for 264 glaciers (sample B). The mean relative area change for the LIA–2000 period is –12.5% (–7.3% until 1975), which gives a 55% increase in the total area loss rate for the period since 1975. The related scatter plot (Fig. 9a) reveals a dependence of the change on glacier size (increasing loss towards smaller glaciers), with a limited increase in scatter towards smaller glaciers. Table 2 lists the mean values per size class and time period.

Fig. 9. (a) Relative change in glacier area versus glacier size for the period LIA–2000. Mean values for discrete size classes are also given. (b) Absolute length change versus glacier length at the LIA maximum (sample C).

Length changes from the LIA maximum extent to the year 2000 extent range from one pixel to 3.3 km (Fig. 9b). A linear regression through the data points shows a good correlation between length changes and original glacier length (r = 0.79). This confirms the general rule and long-term observations that longer glaciers have stronger length changes (e.g. Jόhannesson and others, 1989; Reference Haeberli and HoelzleHoelzle and others, 2003) and that averaging length changes over different-sized glaciers could be done for statistical purposes only. Keeping this in mind, the mean retreat rate for the sample analysed here is about 10 ma^–1, with a maximum of 35ma^–1 and with little change of the rates in the two investigated periods. Similar retreat rates (about 10–30ma^–1) have been measured for glaciers in the European Alps (e.g. Reference Haeberli and HoelzleHoelzle and others, 2003). It seems that this region is nearly free from surging glaciers (e.g. absent looped moraines) which occur quite often in the Canadian High Arctic (Reference Braithwaite and RaperCopland and others, 2003) or on neighbouring Disko Island, Greenland (Yde and Knudsen, 2007).

The change in mean and minimum glacier elevation was calculated using glacier outlines mapped from the LIA moraines and year 2000 outlines combined with the ASTER DEM. For a glacier geometry in balance with climate, one proxy that can be used to estimate the steady-state ELA (ELA₀) is the arithmetic mean elevation (e.g. Haeberli and Hoelzle, 1995). This is because h _mean,a divides a glacier into two parts, where the upper part is generally somewhat larger than the lower part, reflecting typical steady-state accumulation–area ratios (AAR₀) >0.5 (e.g. Braithwaite and Raper, 2007; WGMS, 2007). On average, mean glacier elevation in this region increased between the LIA extent and 2000 from 880 to 926 m (+46 m). Based on an assumed overall 1–1.5˚C increase of mean annual air temperature since the LIA in the Arctic (ACIA, 2004), the ELA should have risen by at least 150 m. Although mean elevation is only a proxy for ELA, it can be concluded that glacier geometries are not yet in balance with the current climate and most glaciers will continue to shrink and retreat (which will further increase their mean elevation). Between two steady states and for purely geometrical reasons, the change in minimum elevation is twice as large as the change in h _mean,a (assuming that maximum elevation is constant). This allows approximation of the change in mean elevation between two steady states, from the change in minimum elevation. For example, within sample C, the mean minimum elevation increased from 455m to 547m (+92 m), which is twice the mean elevation change.

Glacier volume and volume change

Total glacier volume was calculated with the method described above for the LIA and the year 2000, based on the respective glacier sizes and the calculated glacier-specific mean thickness. The strong spread (up to ±50%) of mean thickness for glaciers of the same size is depicted in Figure 6b for the sample (C) of 194 glaciers. The total glacier volume calculated from the LIA extent (1369km² in total) is 65.96 km³, while it is 49.74 km³ for the year 2000 extent (1145 km²). This gives a total volume loss of 16.22 km³ in approximately 80 years over a mean surface area of 1257km², or –0.22mw.e. a^–1. The mean volume change was also derived from cumulative mass changes as described above. Because the year 2000 glacier length of several larger glaciers is presumably not in balance with the current climate, further retreat is expected to occur for these glaciers. For this reason, the length-change method might underestimate the mean mass loss when compared with the other method. Indeed, the mean mass loss hbi derived from the length-change method for sample C is –0.11mwe a^–1, or –11.73km³ in total. When a 100 year period is assumed for the change period, the first method gives a mass change of –0.18 mw.e. a^–1 and the second method a total volume change of 13.2 km³, so both results come closer. In any case, total volume has decreased by about 13–24% which is in the range of the respective relative area change (–16%) for this sample.