The mass-balance model

In order to perform calculations with a glacier dynamical model coupled to climate, knowledge of both the glacier mass balance and the geometry is needed. However, only a few direct mass-balance measurements have been carried out at Briksdalsbreen (Reference PedersenPedersen, 1976). Mass-balance measurements on the adjacent Nigardsbreen, initiated in 1963, are therefore used. The distance from the head of Briksdalsbreen to the head of Nigardsbreen is <5 km. Nigardsbreen, which flows east-southeast, is 9.6 km long, covers an area of 48 km² and ranges in elevation from 355 to 1950 m. A degree-day model for Nigardsbreen based on temperature and precipitation data from Bergen was established (Reference Laumann and NesjeLaumann and Nesje, 2009) (Figs 1 and 3). Ablation and accumulation are calculated on the basis of daily temperature and precipitation. The ablation at a certain elevation in a given time interval is calculated, following the procedure of Reference Andreassen, Elvehøy, Jóhannesson, Oerlemans, Beldring and van den BroekeAndreassen and others (2006). The temperature on the glacier is found by using a constant lapse rate. It is supposed that the precipitation will fall as snow when the temperature is below a specific value. The accumulation during the time interval is calculated by summarizing precipitation that falls as snow. The precipitation on the glacier is found by using both a vertical and horizontal precipitation gradient. The model yields the specific net-balance curve for the selected glacier. The calculation of the mass balances on Briksdalsbreen is performed with an accumulation correction factor (on average ∼20% less accumulation at Briksdalsbreen than at Nigardsbreen; for details see Reference Laumann and NesjeLaumann and Nesje, 2009, p. 224).

Fig. 3. Measured specific net mass balance, b _n, for Nigardsbreen at 1650 m elevation for the period 1963–2006 and b _n calculated for Nigardsbreen from the model based on instrumental temperature and precipitation data from Bergen. An elevation of 1650 m is selected because this is close to the modern mean equilibrium-line altitude. The interannual differences may be due to wind drifting of dry snow (not included in the model).

The ice-flow model

The ice-flow model has been applied in several previous related studies (Reference Stroeven, van de Wal, Oerlemans and OerlemansStroeven and others, 1989; Reference GreuellGreuell, 1992; Reference Oerlemans and BoutronOerlemans 1996, Reference Oerlemans1997a,Reference Oerlemansb). Therefore, only a short description is given here. It is basically a vertically integrated flowline model solved on a 100 m grid. The longitudinal profile (x = 0 at the head) is divided into a number of transverse profiles. The independent variable in each profile is the glacier thickness, H. The surface width, W, and cross-sections of a transverse profile area, S, are parameterized by supposing that the transverse section is a trapezoid, i.e.

W _b is the cross-section width at the base of the glacier and λ represents the angle of the valley side with the vertical. λ is set to zero on the glacier plateau so the cross-section becomes a rectangle with width W _b and depth H.

The continuity equation for this system becomes (constant density)

where t is time and b is specific mass balance. U is the mean velocity in the cross-section, i.e.

where τ is the local ‘basal driving stress’ for simple shearing flow. The first term on the right in the expression is the velocity contribution from internal deformation, and the second term is from basal sliding. The constants f_d and f_s vary somewhat in the literature. Here f_d = 2 × 10⁻¹⁷ Pa⁻³ a⁻¹, equivalent to A = 6.3 × 10⁻²⁴ Pa⁻³ s⁻¹ in Glen’s law (Reference PatersonPaterson, 1994), and f_s = 1.8 × 10⁻¹² Pa⁻³ m² a⁻¹ = 5.7 × 10⁻²⁰ Pa⁻³ m² s⁻¹ (Reference Budd and JenssenBudd and Jenssen, 1975).

Frontal time-lag of Briksdalsbreen

Previous studies based on simple statistical analysis of glacier-front data from Briksdalsbreen and mass-balance data from Nigardsbreen suggest that the maximum frontal response rate of Briksdalsbreen lags 3–5 years behind a mass-balance perturbation (Reference Nesje, Johannessen and BirksNesje and others, 1995; Reference NesjeNesje, 2005; Reference Laumann and NesjeLaumann and Nesje, 2009). This is a relatively short time-lag compared with other glaciers (Reference OerlemansOerlemans, 2007), so it is of interest to see whether the dynamical flowline model can reproduce this time-lag.

Initially, the model was run to steady state with an area distribution for a length of 8600 m, which was a position that the glacier oscillated around for several years between 1950 and 2000. The applied specific balance curve was found by displacing the mean specific net-balance curve (1950–2000) in such a way that the area-integrated mass balance was zero. A change was then introduced by increasing the specific net balance for 1 year (equal over the entire glacier). Figure 8 shows the frontal time-lag using two mass-balance perturbations (1 and 2 m w.e.). The front reacts immediately due to less melting, and maximum advance rate lags the perturbation by 4–5 years, which is in agreement with previous estimates (Reference NesjeNesje, 2005; Reference Laumann and NesjeLaumann and Nesje, 2009). The glacier will, however, continue to advance for about 10–12 years. Subsequently, the glacier should undergo a slow retreat to its initial frontal position. Several runs with different amplitudes (not shown here) show the same trend.

Fig. 8. Frontal advance rates after mass-balance perturbations of 1 and 2 m w.e. with a duration of 1 year. The maximum advance rate lags the mass-balance perturbation at year 0 by 5 years. The glacier will continue to advance approximately 10–12 years after the mass-balance perturbation.

A possible explanation for this relatively short time-lag for maximum advance rate may be sought in the longitudinal profile together with Nye’s wave theory (Reference NyeNye, 1958; Reference Jóhannesson, Raymond and WaddingtonJóhannesson and others, 1989; Reference Van de Wal and OerlemansVan de Wal and Oerlemans, 1995). The theory describes how a steady-state glacier of constant width will react to a sudden mass-balance perturbation, b ₁. The resulting equation is:

where C ₀ is the kinematic wave velocity, D ₀ is diffusion of the kinematic wave, t is time and h ₁ is elevation change. Subscript 1 refers to the perturbed condition and 0 to the steady-state glacier.

The lower part of Briksdalsbreen is generally very steep, with a few stretches where the longitudinal profile is somewhat flatter (Fig. 6). This results in large variations in the velocity gradient, ∂u/∂x (or ∂C ₀ /∂x). In our experiments, b ₁ is equally distributed over the glacier with a duration of 1 year, so that immediately after the mass-balance perturbation ∂h ₁ /∂t is determined by b ₁ and the velocity gradients (because ∂h ₁ /∂x = 0). Figure 9 shows how the elevation change (∂h1/∂t) develops along the glacier at different times. A mass-balance perturbation that is evenly distributed over the glacier may cause perturbations that will move down-glacier as kinematic waves due to glacier geometry. The glacier will move forward until the last of these perturbations, the one initiated highest on the glacier, has reached the glacier front.

Fig. 9. Elevation changes, ∂h ₁/∂t along the glacier from 4000 m to the front at four times after a mass-balance perturbation of 1 m w.e. with a duration of 1 year.

To further illustrate the importance of the geometry along the longitudinal profile, we perturbed the steady-state glacier by two perturbations, h ₁, in glacier thickness, one 1000 m from the head to illustrate what may occur in the upper part and another 5000 m from the head (covering the lower part of the glacier tongue). Both perturbations had a height of 5 m, a length of 100 m and lasted 1 year. Figure 10 shows the development of the perturbations. In the same figure, variations of ∂u/∂x for the initial stage along the profile are shown. The bump at 1000 m diffuses up- and down-glacier and disappears rapidly due to small angle and large diffusion. At 5000 m, in contrast, the perturbations may be affected by the geometry (which affects ∂u/∂x), giving transient and unstable elevation changes along the profile and in the frontal position.

Fig. 10. Surface changes of Briksdalsbreen relative to a steady-state glacier after 1 year perturbation in glacier thickness of 5 m at 1000 and 5000 m from the head. t denotes time (years) after glacier perturbation. The curve for ∂u/∂x is for the initial stage.

Response time of Briksdalsbreen

The length response time of glaciers, τ _L, is commonly defined as the time it takes to achieve of the difference between the new and old equilibrium position after a sudden and long-lasting change in mass balance, ∂b _n (e.g. Reference PatersonPaterson, 1994). This is tested for Briksdalsbreen by running the model for 200 years with different mass-balance perturbations. The results are shown in Figure 11. For ∂b _n = +0.3 m w.e. the response time is ∼52 years and for +0.6 mw.e. it increases to 60 years. Reference Oerlemans and BoutronOerlemans (1996) calculated the response time of Nigardsbreen (Fig. 1) as about 70 years for ∂b _n = +0.4 m w.e., and that of Franz Josef Glacier, New Zealand, was 27 years for ∂b _n = +0.5 m w.e. (Reference OerlemansOerlemans, 1997b). Reference BruggerBrugger (2007) calculated the response times of Rabots Glaciär and the nearby Storglaciären in northern Sweden as ∼215 and ∼125 years, respectively, considerably longer than we calculated for Briksdalsbreen. The theoretical estimate for volume time response given by Reference Jóhannesson, Raymond and WaddingtonJóhannesson and others (1989), τ _v = H/−B, is 15 years for Briksdalsbreen. B is the specific net balance at the snout (B = −10 m w.e.) and H is what Reference Jóhannesson, Raymond and WaddingtonJóhannesson and others (1989) denote the ‘characteristic ice thickness’, here calculated as the mean thickness over the entire glacier (H = 150 m). This is smaller than found by our model, but can probably be explained by the fact that the volume response is commonly smaller than the length response, and that Briksdalsbreen has a height/mass-balance feedback, not taken into account by Reference Jóhannesson, Raymond and WaddingtonJóhannesson and others (1989) and Reference OerlemansOerlemans (1997a).

Fig. 11. Calculated response times (52 and 60 years) for Briksdalsbreen for different mass-balance perturbations.

For negative changes in the mass balance at Briksdals breen, a comparable response time cannot be calculated. The steep glacier profile causes the front to retreat rapidly several hundred metres because the glacier is thinned and the lower part of the glacier is separated from the upper part, forming a regenerated glacier and making the response time theory inappropriate.

Climate scenarios and future glacier-front positions

The Intergovernmental Panel on Climate Change (IPCC) presented several scenarios for future greenhouse gas emissions (Reference SolomonSolomon and others, 2007 (hereafter IPCC, 2007)). These are used in general circulation models (GCMs) to simulate future climate development. The two most widely used were developed at the Max Planck Institute in Germany and at the Hadley Centre in the UK. These are denoted as ECHAM4/OPYC3 and HadAM3H, respectively.

These models are used for boundary conditions when downscaling to regional climate models (RCMs). In this study, eleven simulations using eight European regional climate models were used to downscale the IPCC (2007) A2 scenario for the 21st century to western Norway (Reference Sorteberg and AndersonSorteberg and Andersen, 2008). In addition, as in Reference Laumann and NesjeLaumann and Nesje (2009), we have applied downscaled climate scenarios from the Norwegian RegClim project (http://regclim.met.no/index_en.html). These are values for western Norway from a combination of two models (Hadley Centre and Max Planck Institute) based on the IPCC (2007) B2 scenario.

Temperature and precipitation changes are commonly provided in relation to 30 year meteorological normal periods. We have used measured values for the period 1961–90 (the present normal period) and scenario-estimated values for the period 2071–2100. The first period was given the year 1975 (mean of the 1961–90 period) and the second was given the year 2085 (mean of the 2071–2100 period). Calculations of temperature and precipitation for each year between 1975 and 2085 are carried out by supposing a linear trend from the first to the last period, and by displacing the 30 year periods 1 year at a time. The resulting temperature and precipitation values are used to calculate the annual net mass-balance values at four different elevations (Fig. 12).

Fig. 12. Calculated specific net mass-balance series for 12 different climate scenarios on Briksdalsbreen at elevations of 350, 950, 1650 and 1950 m.

There are relatively large differences between the values from the different climate scenarios. The largest differences are in the lower parts of the glacier, where the difference between the largest and smallest value is about 4 m w.e. It is also worth noting that the most negative values show that the equilibrium line will be located above the glacier from approximately AD 2060 onward. For a plateau glacier this normally means rapid down-wasting of a glacier that is responding to increased temperature by melting but has lost its accumulation area and therefore the mass balance is negative.

Of the 12 calculated net mass-balance scenarios, we chose for the dynamic model computation maximum (resulting in minimum retreat), minimum (yielding maximum retreat) and mean mass-balance values inferred from scenarios from IPCC SRES A2, in addition to the result from the IPCC (2007) B2 scenario. The dynamical model was then run from 1963 to 2085 with measured mass-balance data from 1963 to 2007 and scenario-calculated values until AD 2085. The frontal position relative to 1963 is shown in Figure 13a and b. Calving is irrelevant because the model indicates that the glacier has retreated from the lake and the model predicts increasing retreat up the steep valley from the lake inlet (Fig. 2).

Fig. 13. (a) Calculated front positions of Briksdalsbreen from 1975 to 2085 for different climate scenarios. (b) Longitudinal profiles of Briksdalsbreen in 2085 for different climate scenarios. The numbers indicate where the glacier surface profiles intercept the bedrock topography for the different models.

The largest frontal retreat is suggested by the HIRHAM model from the Danish Meteorological Institute (DMI) with ECHAM4/OPYC3 as boundary model. The smallest retreat is predicted by a combination of the Hadley Centre and Max Planck Institute models for the B2 scenario. Close to this are the results from RCAO from the Swedish Meteorological and Hydrological Institute (SMHI) with ECHAM4/OPYC3 as boundary condition. In the middle is a model (CLM) run by GKSS Research Centre in Germany with HadAM3H (for details of the different climate models, see Reference Sorteberg and AndersonSorteberg and Andersen, 2008).

The result from the empirical formula in Reference Laumann and NesjeLaumann and Nesje (2009) is also drawn as a trend line in Figure 13a for comparison. This formula is based on a relationship inferred from area-integrated mass balance and glacier-front variations that does not take into account the glacier thickness distribution. The importance of the basal geometry is seen at two times in Figure 13a, when the glacier front has retreated ∼1000 and ∼3000 m from the 1963 position. This model predicts that the glacier should experience rapid retreat even though the climate forcing is not appreciably different from that in the preceding years. The model indicates that the glacier may retreat by a total of 2.5–5.0 km by the later part of the 21st century. A spectacular icefall may therefore disappear and the glacier will likely become a plateau glacier that gradually melts down because the equilibrium-line altitude is projected to be above the glacier surface.