Calculation of surface area, elevation and geodetic mass balance

Widely used until the 1950s, ground-based photogrammetry surveys have gradually been superseded by aerial photography and, more recently, by both satellite and airborne remote sensing (e.g. Reference andreassenandreassen, 1999; Reference Arendt, Echelmeyer, Harrison, Lingle and ValentineArendt and others, 2002; Reference Bauder, Funk and HussBauder and others, 2007; Reference Thibert, Blanc, Vincent and EckertThibert and others, 2008). However, ground-based photogrammetry remains an accurate tool and can provide a very useful comparison with historical surveys to estimate glacier change. Neither aerial photographs from 1963 nor more recent aerial imagery suitable for assessing glacier volume change are available for the Kodar mountains. However, the data from the August 1979 survey were made available and this survey was repeated in August 2007 using the same control points (CPs) and baselines as in 1979. This enabled an estimation of changes in the area and surface elevation of Azarova glacier and its geodetic mass balance for the 1979–2007 period. Indeed, the geodetic method of mass-balance measurement is considered to be more accurate over longer time periods than the short-term glaciological method using stake measurements (Reference Cox and MarchCox and March, 2004; Reference CogleyCogley, 2009). Use of the direct glaciological method is also complicated on glaciers that gain mass through refreezing of meltwater (Reference Fujita and AgetaFujita and Ageta, 2000). The two consecutive surveys therefore provided a unique opportunity to assess glacier volume change and mass balance on one of the Kodar glaciers, and represent the only available mass-balance record for this region.

Changes in the surface area and elevation of Azarova glacier were estimated as follows: (1) a photo-theodolite survey of the glacier was conducted in July–August 2007; (2) a map and a digital elevation model (DEM) of the glacier were developed using the results of the 2007 survey; (3) a DEM was derived from the 1979 map; (4), changes in surface area and surface elevation and volume were inferred from a comparison of the 1979 and 2007 maps and DEMs respectively; and (5) geodetic mass balance, G, was calculated using Equation (1), from Reference CogleyCogley (2009):

(1)

where is ice density (kg m^–3), is the change in glacier surface elevation averaged over the surface, and Δt is the 1979–2007 time span. The variable was averaged over the mean of 1979 and 2007 glacier surface areas following Reference Thibert, Blanc, Vincent and EckertThibert and others (2008). Volume changes were calculated for the common glaciated areas covered by the 1979 and 2007 DEMs and include ice that had disappeared altogether (Reference Bauder, Funk and HussBauder and others, 2007).

The photo-theodolite survey used two pairs of ground-based photographic images of Azarova glacier from the same two baselines that were used in 1979 (Fig. 2). Two baselines were considered sufficient because of the very simple shape of the glacier and the good visibility of its entire surface (Fig. 2). A local geodetic network of 55 CPs was established using topographic features on the stable terrain around the glacier. Seventeen of the CPs were used in both 1979 and 2007 and were used as tie points for a relative control and co-registration of the 1979 and 2007 maps and DEMs. The CPs located on stable terrain were used to calculate root-mean-square errors (RMSE). RMSEx _, y of their positions for 1979 and 2007 was ±2.4 m.

A 1 : 10 000 scale map of Azarova glacier with 10m equidistant contours was produced from the 2007 survey using a stereo-autograph. The 1 : 10 000 map from 1979 with 10m equidistant contours was digitized manually with an average horizontal deviation of ±0.3mm on the map, which is ±3m on the ground. Changes in the surface area of Azarova were estimated by the superimposition and subtraction of the two maps. Digitized contours of the surrounding area were superimposed where possible.

Two DEMs for 1979 and 2007 were developed from the maps using ArcView 3.2 software. Elevations were interpolated on regular grids with a resolution of 5 m using the kriging method. The 5 mgrid spacing was found to be optimal for co-registration of DEMs, in line with the recommendations by Reference Cox and MarchCox and March (2004) for calculating geodetic mass balance. Changes in elevation of the glacier surface were derived by subtracting the 2007 elevation data from the 1979 data for individual cells of the regular grids and averaging for different elevation zones and for the entire glacier.

It was assumed that changes in elevation were due to loss of ice with a constant density of 900 kg m^–3, which is used in the majority of geodetic mass-balance calculations (Reference andreassenandreassen, 1999; Reference Arendt, Echelmeyer, Harrison, Lingle and ValentineArendt and others, 2002; Reference CogleyCogley, 2009). Reference ZempZemp and others (2010) commented that this assumption often leads to overestimation of mass balance due to changes in snow and firn layers. However, we consider this assumption realistic for Kodar glaciers where ice formation through refreezing is dominant and, as a result, firn content is minimal (Preobrazhensky, 1960).

Quantification of error

The accuracy of the estimation of surface area and elevation changes depends on (1) errors in triangulation and map and DEM construction; (2) comparison of two maps and DEMs; (3) delineation of glacier boundaries; and (4) seasonality in glacier thickness change (Reference Sapiano, Harrison and EchelmeyerSapiano and others, 1998; Reference andreassenandreassen, 1999; Reference Arendt, Echelmeyer, Harrison, Lingle and ValentineArendt and others, 2002; Reference Thibert, Blanc, Vincent and EckertThibert and others, 2008).

The planimetric error resulted from (1) errors in triangulation and co-registration of the 1979 and 2007 maps, and (2) errors in glacier boundary delineation due to the presence of snow and, more importantly, debris cover. Term (1) was calculated as the root sum square of RMSEx _, y (±2.4 m) of the 1979 and 2007 tie-point locations and errors resulting from digitization of contours on both maps (±3m on the ground), giving a total of ±4.8 m. To express this error term as a percentage of glacier area, a buffer 4.8m wide was created along the 1979 and 2007 glacier outlines (Reference Granshaw and FountainGranshaw and Fountain, 2006). The error term was calculated as an average ratio between the original 1979 and 2007 area and the areas with an increment of 4.8 m, yielding an error of 5.7%. Both the 1979 and 2007 surveys were conducted in August, in the second half of the ablation season. In 2007, the glacier tongue was free of seasonal snow which remained along the shaded glacier margins at higher elevations only. The uncertainty due to the presence of snow was resolved by mapping glacier boundaries from the Earth Resources Observation Systems EROS-B satellite image with a resolution of 0.70 m, obtained on 7 September 2007 in the final days of the ablation period (which in 2007 extended into September) under cloud-free conditions. The difference between the satellite-derived (0.55km²) and ground-based (0.56km²) surface areas of the glacier was 2%, which was taken as an error due to the presence of snow along the glacier margins in both 2007 and 1979. This is likely to be an overestimation reflecting errors in mapping from a satellite image as well as the presence of snow, especially for 2007. The summer of 1979 was one of the coldest on record (see Fig. 7a further below), and although the extent of snow cover was low in mid-August when the survey was conducted (personal communication from V.M. Plyusnin, 2009), a 2% error is likely to be realistic.

The presence of debris cover on the glacier tongue is the most significant source of uncertainty, as debris cover masks transition between the glacier and the body of dead ice located in front of the glacier. A marginal hollow around the glacier snout, which is shallow on Azarova due to the very low ice flow velocities (Reference Novikova and GrinbergNovikova and Grinberg, 1972), was used as an indicator of the glacier boundary. The same indicator was used in 1979 (personal communication from V.M. Plyusnin, 2009). The adoption of the same approach to the definition of glacier boundaries in 1979 and 2007 helped to minimize this uncertainty. However, potential errors in the 1979 delineation cannot be evaluated numerically from the available data. To account for them, an additional error of 2%, based on our experience of repeated in situ mapping of debris-covered glacier tongues by different surveyors, was added to the 1979 area calculation. The total planimetric error was calculated as the root sum square of all the above terms and is 6.9%.

Vertical precision of the 1979 map was estimated as ±5m, which is the half-distance between the contours (Reference SeymourSeymour, 1980). However, it is not the absolute elevations but consistency between the 1979 and 2007 DEMs that is important in calculating changes in glacier surface elevation (Reference Cox and MarchCox and March, 2004; Reference Thibert, Blanc, Vincent and EckertThibert and others, 2008). A comparison of the elevations of the 1979 and 2007 DEM gridcells representing ice-free stable terrain produced RMSEz of ±1.8 m. This value was taken as an error in the calculation of elevation change. The error in seasonality of thickness change related to the seasonal snow cover and firn on the glacier surface was negligible given the small extent of seasonal snow cover in August and the low amount of firn.

Reference Sapiano, Harrison and EchelmeyerSapiano and others (1998) and Reference Elsberg, Harrison, Echelmeyer and KrimmelElsberg and others (2001) estimated the uncertainty in geodetic mass-balance calculation due to the use of glacier-wide average density to be 5– 6% for glaciers with snow, firn and ice in vertical profiles. A sensitivity test based on snow and firn covering 20% of the glacier surface and with an average firn layer depth of 3 m (both assumed values exceed the 2007 observations) showed that neglecting snow and firn densities on Azarova resulted in a 1% error in the calculation of the glacier-wide average density.

Climate data

The time series of air temperature and precipitation from the Chara meteorological station (Fig. 3) were used to evaluate the observed variations in regional climate. The air-temperature and precipitation time series started in 1938 and 1951, respectively. In addition to these data, a Campbell Scientific automatic weather station (AWS) was deployed on Azarova at 2280ma.s.l. (Fig. 3) from 25 July to 13 August 2007, providing data on air temperature, incoming and outgoing short- and longwave radiation fluxes measured by GNR4 Kipp & Zonen radiometer, and wind speed and wind direction every 15 min. Due to a deficiency in the electric circuit of the AWS, the sonic ranger data were intermittent. However, ablation was measured daily by the stake method using a network of seven stakes installed along the vertical profile of the glacier.

In addition to meteorological observations, regional climate-change scenarios were generated using the Providing REgional Climates for Impact Studies (PRECIS) regional climate modelling (RCM) system based on the HadRM3P RCM. PRECIS is a hydrostatic model with a horizontal resolution of 25 km. Its full details are given by Reference JonesJones and others (2004). PRECIS (HadRM3P) has been successfully used in mountainous regions, demonstrating particularly robust performance in the Altai (Reference Shahgedanova, Nosenko, Khromova and MuraveyevShahgedanova and others, 2010). Three integrations have been performed for two time slices: 1961–90 represents the ‘baseline’ climate and 2071– 2100 is used for future climate-change projections for the A2 and B2 CO₂ emission scenarios. These two scenarios assume increases in mean CO₂ concentrations to 830 and 600 ppm by 2100, respectively (Reference Nakiáenoviá and SwartNakiáenoviá and Swart, 2000). The model domain extent was 40.5–61.5^˚ N, 67.5– 130.5^˚ E. Model output for the area 56.5–57.5^˚ N, 117– 118.5^˚ E was used in the analysis performed here.

Prior to the interpretation of regional climate-change scenarios, model output was validated against the data derived from CRU TS3 gridded datasets of observed air temperatures and precipitation intensities with a resolution of 0.5^˚ (Reference Mitchell and JonesMitchell and Jones, 2005). In addition, validation was performed using data for the 1961–90 period from three meteorological stations (Chara; Bolshaya Leprinda (56.6^˚ N, 117.6^˚ E; 1001ma.s.l.); and Nichatka (57.4^˚ N, 117.3^˚ E; 561ma.s.l.)) located in the selected domain. The gridded datasets incorporate data from the stations that were functioning intermittently in the region in the 1961–90 period (Reference Mitchell and JonesMitchell and Jones, 2005). However, gridded temperature and precipitation data were not adjusted for altitude and, in this sense, the gridded datasets have little advantage over data from the individual stations, all of which are located in valleys. The average altitude of the model validation domain was 1425ma.s.l. The average altitude of the three stations was 758 ma.s.l.

The annual cycles of both air temperature and precipitation intensity are reproduced by the model (Fig. 4), and the differences in absolute values are mostly accounted for by the difference in altitude between the model domain elevation and station elevations. The monthly temperatures derived from the gridded datasets are in close agreement with the modelled data in summer, only exceeding the model by 0.6–1.7˚C between April and September (Fig. 4a). The differences between the modelled and the station data are larger, at 4.7–5.7˚C, but this is largely due to the 667 m difference in altitude between the meteorological stations and the model domain, which accounts for 4˚C under the average environmental lapse rate of 0.6˚C (100 m)^–1. Between November and February, modelled temperatures exceed station temperatures by 2.2–4.7˚C (Fig. 4a), in line with the persistent temperature inversions characteristic of the region (Reference Shahgedanova and ShahgedanovaShahgedanova, 2002). Validation of precipitation intensities in eastern Siberia is extremely difficult due to the absence of high-altitude stations and a considerable difference between the precipitation amounts received in valleys and at high elevations, especially in winter (Reference Shahgedanova and ShahgedanovaShahgedanova, 2002). The modelled precipitation intensities significantly exceed the observed intensities (Fig. 4b), but this difference is consistent with altitudinal precipitation gradients and with the short-term precipitation measurements conducted at high elevations in the 1950s–60s. In the Kodar and adjacent mountain ranges, Preobrazhensky (1960) and Reference Novikova and GrinbergNovikova and Grinberg (1972) report annual precipitation totals of 600– 960 and 840–1200mm in the 1000–1700 and 2000–2500m elevation bands, respectively. The average annual precipitation total simulated by PRECIS is 1146 mm. Our precipitation measurements conducted in July–August 2008 indicated that monthly precipitation totals measured near Azarova glacier (at 2055 ma.s.l.) exceeded monthly precipitation totals at the Chara station by a factor of 2.7. This is consistent with an overestimation of station precipitation by PRECIS by a factor of 2.6.

Fig. 4. Modelled versus observed mean monthly temperatures (a) and precipitation intensity (b) for 1961–90 for the Kodar mountains (56.5–57.5˚ N, 117–118˚ E).

Links between glacier change and climate

The sensitivity of Azarova glacier mass balance to climatic warming is difficult to quantify due to the lack of continuous observations. Modelling studies suggest mass-balance sensitivity of ~350mm w.e. a^–1 per 1˚C warming for glaciers with a melt season of 60 days (Reference Braithwaite, Zhang and RaperBraithwaite and others, 2002), and 200 mm w.e. a^–1 for glaciers with the continentality index of 50 (de Woul and Hock, 2005), which are characteristic of Azarova. Estimation of mass-balance sensitivity for a 1˚C temperature increase and 10% precipitation increase proposed by Reference Oerlemans and PeltierOerlemans (1993) yields a sensitivity of –390mm w.e. for the annual precipitation, exceeding that observed at the Chara station in 1979–2007 by a factor of 2.6, and is consistent with the PRECIS simulation of precipitation intensities at higher altitudes during the baseline period. The assessments by Reference Braithwaite, Zhang and RaperBraithwaite and others (2002) and de Woul and Hock (2005), however, refer to subpolar glaciers and those located north of 60^˚ N, and these generally experience lower summer temperatures. In July– August 2008, incoming solar radiation on Azarova averaged 243Wm^–2, daytime net radiation was 178Wm^–2 and daily mean air temperature was 6.4˚C, which is comparable with meteorological conditions on temperate glaciers (e.g. in the European Alps (Reference Oerlemans, Giesen and van den BroekeOerlemans and others, 2009) and in the Caucasus (Reference Shahgedanova, Popovnin, Alaynikov, Petrakov and StokesShahgedanova and others, 2007)). Daily ablation rates were 20–50mm w.e. d^–1 for snow and 20–90mm w.e. d^–1 for ice. This occurred under temperatures close to the long-term average and indicates glacier melt more typical of temperate glaciers. Preobrazhensky (1960) reports similar values for the summers of 1958 and 1959. Reference Oerlemans and PeltierOerlemans (1993) explains the higher sensitivity of glaciers located in wetter regions as being a consequence of the lower elevations of glacier tongues and, consequently, higher temperatures. Azarova glacier (as well as other glaciers in the Kodar) is positioned at low elevations, and thus experiences comparatively high net radiation and air temperatures in summer. Its strongly negative mass balance indicates high sensitivity to climatic warming, enhanced by a diminishing fraction of snowfall in the warm season, and a limited compensating effect of cold-season precipitation.

Future climate projections indicate a strong warming in July–August under the moderate B2 and aggressive A2 scenarios (Fig. 8a). Importantly, June temperatures will increase by 2.6˚C and 4.7˚C under these two scenarios, resulting in positive temperatures at the glacier tongue altitude. Furthermore, September temperatures will increase by 4.4˚C and 5.9˚C (Fig. 8a) and these shifts will affect the length of the ablation season which will extend into June and the first half of September. The annual amount of solid precipitation will increase relative to the baseline period under the B2 scenario by 20%. This increase is projected for October–May, and half of it will occur in three months: April, early May, and October. Under the A2 scenario, an 8% increase in solid precipitation will occur between November and March, but cold-season precipitation will remain relatively low, with monthly totals of 42–78 mm. A decline in solid precipitation projected for May, June and September will result in a decrease in the annual solid precipitation total by 3%. The difference between projected trends for solid precipitation, resulting from different rates of warming, is an important finding because of its potential impacts on future glacier change. Results of previous modelling studies suggest that a 20% increase in annual solid precipitation does not compensate the impacts of 3–5˚C warming on glaciers gaining mass though snow accumulation (Reference Oerlemans, Giesen and van den BroekeOerlemans, 1993; Reference Braithwaite, Zhang and RaperBraithwaite and others, 2002). However, the impact of such a warming on glaciers that predominantly gain mass through refreezing requires further investigation.

Comparison to other Siberian regions

The observed 20±6.9% shrinkage of Azarova between 1979 and 2007 is in line with an average shrinkage of similar-sized (0.5–1 km²) glaciers in the Russian Altai (Reference Shahgedanova, Nosenko, Khromova and MuraveyevShahgedanova and others, 2010). The small Altai glaciers lost 28±6% of their surface area between 1952 and 2004, but analysis of ground-based measurements of glacier front fluctuations confirmed that most of this retreat occurred after the mid-1970s (Reference Shahgedanova, Nosenko, Khromova and MuraveyevShahgedanova and others, 2010). From 1979 to 2007, the average glaciological mass balances of Maliy Aktru and Leviy Aktru, in the Altai, were –95 and –133mm w.e. a^–1, respectively (WGMS, 2007 and earlier volumes). Geodetic and glaciological mass-balance measurements are subject to different instrumental and physical biases (Reference CogleyCogley, 2009), but these are likely to be smaller than the observed differences between these regions. Indeed, most of the difference between the strongly negative mass balance of Azarova and the Aktru glaciers is likely to result from the higher elevation of the Aktru glaciers (2000– 4000 ma.s.l.).

In another glaciated Siberian massif, the Suntar-Khayata, glaciers lost 19% of their surface area between 1957 and 2003 (Reference Ananicheva and KotlyakovAnanicheva, 2006). This rate of glacier wastage appears to be more comparable to Azarova, but it is possible that results for the Suntar-Khayata are overestimated due to use of the 1957 WGI data. The use of the WGI data was previously found to result in an overestimation of glacier shrinkage in different regions (e.g. by 5% in the Altai (Reference Shahgedanova, Nosenko, Khromova and MuraveyevShahgedanova and others, 2010) and by 16% in the Polar Urals (ongoing analysis)). Indeed, the 1963 area of Azarova is reported by the WGI as 1.3 km² including the area of dead ice located in front of the glacier (Reference Novikova and GrinbergNovikova and others, 1972). A slower rate of glacier shrinkage in the SuntarKhayata is suggested by other measurements. For example, glacier thinning on glacier no. 31 averaged 10m for the 1957–2003 period, where the mass balance was estimated at –206mm w.e. a^–1 (Reference Ananicheva and KotlyakovAnanicheva, 2006), i.e. three times lower than the average mass balance of Azarova glacier in 1979– 2007. Even slower glacier wastage of glacier surface area was reported in the Buordakh massif of the Chersky mountains by Reference Gurney, Popovnin, Shahgedanova and StokesGurney and others (2008). There, the extent of 80 glaciers was measured and it was reported that 38% have not undergone a measurable retreat since 1850, although most glaciers exhibited signs of downwasting (Reference Gurney, Popovnin, Shahgedanova and StokesGurney and others, 2008). Glaciers of both the Suntar-Khayata mountains (61.5–63^˚ N, 139–143^˚ E) and Buordakh massif (65^˚12^' N, 145^˚56^' E) are located further north and at higher elevations (extending to 2800–3000ma.s.l.) than Azarova. They are therefore exposed to lower summer temperatures, as indicated by continuous observations at the regular meteorological stations (Reference Shahgedanova and ShahgedanovaShahgedanova, 2002) and by episodic observations in the glaciated areas (Reference Ananicheva and KotlyakovAnanicheva, 2006).