5.1.1 Optimisation

The point-scale optimisation strategy at AWS-L results in a well identified group of parameter sets (Pareto solutions) that minimise multiple objective functions simultaneously (Fig. 3). The objective functions of each set of original parameters are largely scattered with the range of r ² and MAE of albedo being 0.06–0.54 and 0.11–0.25, respectively (Fig. 3a). Similarly for surface temperature, r ² and MAE are in-between 0.81–0.92, and 1.37–3.24°C, respectively (Fig. 3d). The range of AE is 0–3.92 m w.e. for the point mass balance at AWS-L (Figs 3b, c, e, f). The 200 solutions closest to the utopia point in terms of how well they perform across all objective functions represent the Pareto solutions (Fig. 3: bold black dots). All these multiple Pareto solutions are almost equally good and plausible. The metrics of the Pareto solutions are less scattered than the original ensemble, with the range of r ² and MAE of albedo being 0.31–0.54 and 0.11–0.15 (Fig. 3a), and the range of r ² and MAE of surface temperature being 0.87–0.92 and 1.58–2.33°C (Table 4). The range AE is 0–1.28 m w.e. for the point mass balance at AWS-L (Table 4).

Figure 3. Solution space for the multi-objective optimisation for the period 1 November 2018 – 31 October 2019. One dot represents results obtained with one set of parameters, and bold black and red dots define the Pareto solution space and optimised solution, respectively. Plots show the scatter plot between (a) 1 − r ² and MAE from albedo comparison, (b) MAE from albedo comparison and AE from mass-balance comparison, (c) AE of mass-balance comparison vs 1 − r ² from albedo, (d) 1 − r ² and MAE from surface temperature comparison, (e) MAE from surface temperature comparison and AE from mass balance and (f) AE of mass balance vs 1 − r ² from surface temperature comparison.

Table 4. Range of different objective function values in the first 200 Pareto solution space for 2018/19 period at AWS-L

Since Pareto solutions perform well over all time and space ranges, the best parameter set among these Pareto solutions is then chosen as the optimised set (Table 3). The r ² and MAE between the observed albedo and that resulting from the selected optimised parameter set are 0.48 and 0.12, respectively; similarly, for surface temperature r ² and MAE are 0.91 and 1.92°C, respectively (Fig. 4), and AE for the point mass balance is 0.17 m w.e. This final optimised set of parameters corresponds to a time scaling factor of 3 days and a depth scaling factor of four centimetres for the albedo model (Oerlemans and Knap, Reference Oerlemans and Knap1998) as well as values of albedo of snow (0.85), firn (0.55) and ice (0.30) similar to the default values used in COSIPY (Table 3).

Figure 4. Mean daily snow albedo (top) and surface temperature (bottom) from observation (Obs., black line) and simulated with COSIPY between 1 November 2018 and 31 October 2019 at AWS-L. r ² and MAE represent the correlation coefficient and MAE between the observed and simulated variables, respectively. The red thick line and the brown thin lines represent the simulated variables using the final optimised parameter set and using all other solution spaces, respectively.

5.1.2 Glacier-wide simulation of COSIPY

The good performance of COSIPY simulations at point scale with the optimal set of parameters does not guarantee the good performance of the distributed simulations that rely on additional hypotheses, such as the meteorological forcing distribution that changes the meteorological forcings even at AWS-L location, because for instance SW_in is re-computed at AWS-L based on the slope and the aspect of the considered gridcell. We thus evaluate the distributed COSIPY simulations over the period 2016–20 with the albedo and surface temperature at AWS-L and AWS-H, and with the glacier-wide mass balance. r ² (MAE) for albedo is 0.32 (0.15) and 0.16 (0.14) for 2016/17 and 2019/20 at AWS-L, respectively (Fig. S8). At AWS-H, over the 3 year period 2017–20, r ² for albedo and surface temperature are 0.50 and 0.92 respectively, and the mean AE for 2016–20 at AWS-H is only 0.15 ± 0.14 m w.e. The surface temperature is always highly correlated with a low bias in both sites (Fig. S8). These metrics are close to the ones from point-scale simulations.

Additionally, we compare the observed and simulated surface point and glacier-wide mass balances. The simulated point surface mass balances match well with the in situ measurements obtained at stakes for all the 4 years (Figs 5 and 6). The location of the equilibrium line altitude is well represented in COSIPY simulations and the general shape of the dependency of the surface point mass balance on elevation is satisfyingly reproduced (Fig. 5). The glacier-wide mass balance from the model is the mean value from all 51 individual gridcells and it is compared to the in situ glacier-wide mass balance taken from Wagnon and others (Reference Wagnon2021). Over the 4 year period, the mean observed glacier-wide in situ mass balance is −0.74 ± 0.18 m w.e. a⁻¹ (Table 2) and the simulated mass balance is −0.66 m w.e. a⁻¹ with a std dev. of ±0.26 m w.e. a⁻¹. The largest difference between the observed and modelled glacier-wide mass balance occurs in 2019/20, with the simulated mass balance being 0.22 m w.e. less negative than the observed one (Fig. 5).

Figure 5. In situ (blue dots) and simulated at each gridcell (red dots) point mass balances as a function of elevation on Mera Glacier for each year of the 2016–20 period. MB is the glacier-wide mass balance obtained from field measurements (blue text) (Wagnon and others, Reference Wagnon2021) and simulated with COSIPY (red text). Also shown are the hypsometries of Mera Glacier used for in situ glacier-wide mass-balance calculations (light blue histograms) and for COSIPY (light brown histograms).

Figure 6. Distributed simulated annual mass balance (MB, in m w.e.) for each year of the study period. Also shown as white circles are the point mass-balance observations (ablation stakes and accumulation pits) with the inside colour corresponding to the respective annual measurement. The glacier outlines (black) are from Wagnon and others (Reference Wagnon2021).

5.2.1 Seasonal and annual energy-balance components

Figure 7 shows the monthly glacier-wide surface energy and mass-balance components at Mera Glacier for the period 2016–20, and Figs S9–S16 are maps of the glacier, showing the distributed annual energy and mass fluxes for each year of the study period. SW_net is the primary energy source available at the surface throughout the year, the second energy source being the Q _S, that is significant only between November and March. Along the year, SW_in is controlled by the position of the sun responsible for the potential SW_in and also by cloudiness, explaining why it decreases from 274 W m⁻² in the pre-monsoon to 195 W m⁻² during the monsoon (Table 5). Similarly, SW_net decreases from 83 W m⁻² during the pre-monsoon to 61 W m⁻² during the monsoon because of SW_in reduction rather than change in albedo (glacier-wide values of 0.71 during the pre-monsoon and 0.70 during the monsoon). The change in air temperature and water vapour (moisture) is responsible for a strong increase of LW_in from the pre-monsoon (217 W m⁻²) to the monsoon (296 W m⁻²), the only season when LW_in nearly counterbalances the LW_out.

Figure 7. Glacier-wide monthly (a) energy fluxes, (b) mass fluxes and (c) mass balance from November 2016 to October 2020 on Mera Glacier (left panels) and mean monthly annual cycle (right panels). SW_net, net shortwave radiation; LW_net, net longwave radiation; Q _L, latent heat flux; Q _S, sensible heat flux; Q _C, subsurface heat flux; Q _R, rain heat flux; Q _M, available melt energy at the surface; SnowF., solid precipitation; Subl., sublimation; Surf. M., melt at surface; Sub S. M., subsurface melt and Refr., refreezing. Blue shaded areas visualise the monsoons.

Table 5. Annual and seasonal surface energy fluxes (W m⁻²) and their contribution to the total energy intake (Q _in) and outtake (Q _out) over the whole Mera Glacier area, at AWS-L and at AWS-H

The annual values are calculated between 1 November and 31 October of the following year, using all data over the study period. The negative (−) sign indicates the energy loss from the surface.

Winter, Dec–Feb; pre-monsoon, Mar–May; monsoon, Jun–Sep; post-monsoon, Oct–Nov.

The total energy intake at the surface is highest and almost similar during the pre-monsoon (496 W m⁻²) and the monsoon (491 W m⁻²) (Table 5). However, the net all-wave radiation, calculated as the sum of SW_net and LW_net, is 32 W m⁻² during the pre-monsoon and 20 W m⁻² higher during the monsoon. This indicates that the change in cloud cover and atmospheric condition has a relatively minor effect on the total energy absorbed at the glacier surface, but does impact the net all-wave radiation. In the pre-monsoon, this net all-wave radiation is equally compensated by Q _L and Q _M (~−16 W m⁻² each). During the monsoon, LW_net and Q _L are both reduced or close to zero leaving all the energy available for melt with an average energy value of −43 W m⁻². The contributions of Q _S and Q _C are always low during the pre-monsoon and the monsoon, while the Q _R is negligible all the time.

The energy-balance components vary across different glacier areas; they are analysed in the ablation area at AWS-L and in the accumulation area at AWS-H. When considering the annual means, the magnitudes of SW_net and Q _M are higher at AWS-L (93 and −34 W m⁻², respectively) than at AWS-H (61 and −15 W m⁻², respectively). LW_net, Q _L and Q _S exhibit similar annual means throughout the year at both sites. At AWS-L, SW_net remains similar during the pre-monsoon (87 W m⁻²) and the monsoon (88 W m⁻²) because the decrease in SW_in (287 W m⁻² in the pre-monsoon and 201 W m⁻² in the monsoon) is compensated by a decrease in albedo (0.70 in the pre-monsoon and 0.56 in the monsoon). The albedo remains high at AWS-H during the whole year, and there is thus a decrease of SW_net in the monsoon (43 W m⁻²) compared to the pre-monsoon (76 W m⁻²). The variation of LW_net at AWS-L and AWS-H is rather small as the difference between LW_in and LW_out remains similar. Comparing both sites, Q _L remains rather similar during all seasons. Q _M dominates Q _L all year round except during the winter at AWS-L, but at AWS-H, Q _L always dominates Q _M, except during the monsoon. Q _S is significant only during the cold months of the winter and the post-monsoon, with a similar magnitude whichever the location. Q _C is positive and rather small (<5 W m⁻², slightly higher during the post-monsoon) all year round except during the monsoon at AWS-L where it is slightly negative (Table 5).

5.2.2 Seasonal and annual mass-balance components

Table 6 lists the annual and seasonal mass-balance components of Mera Glacier. After the direct accumulation (through snowfalls) and surface melt on Mera Glacier, annual refreezing and sublimation are two major mass-balance components, refreezing being even higher than snowfalls. Indeed, at glacier scale, 44% of the total (surface + sub-surface) melt refreezes annually. The glacier-wide sublimation is −0.15 m w.e. and therefore contributes 23% of the total mass balance or 6% of the ablation terms (total melt + sublimation).

Table 6. Glacier-wide annual and seasonal mass-balance components (mm w.e.) over the total glacier area and at point scale at AWS-L and AWS-H using all data over the study period 2016–20

The negative (−) sign indicates a mass loss from the surface

Looking at seasonal scale, pre-monsoon and monsoon are important seasons in terms of mass-balance processes, as more than 86% of solid precipitation falls and 84% of annual melt happens from March to September. However, post-monsoon is not completely negligible in terms of melt (−0.30 m w.e. or 14% of the annual melt). This melt is almost equal to the surface mass balance (−0.17 m w.e.) due to the limited magnitude of the other processes, and in particular the limited refreezing in the snow-free areas of the glacier. The winter is characterised by limited mass-balance processes, with ~11% of the annual solid precipitation and 2% of the annual total melt (Table 6).

At glacier scale, the total melt (−0.42 m w.e.) and sublimation (−0.05 m w.e.) during the pre-monsoon are balanced by the refreezing (0.30 m w.e.) and snowfall (0.14 m w.e.), leading to a near zero surface mass balance (Table 6). The glacier-wide total melt during the monsoon is −1.42 m w.e., which is higher at AWS-L (−2.15 m w.e.) and lower at AWS-H (−0.99 m w.e.). Depending on the presence and the state of a snowpack (snow depth, density and temperature), meltwater refreezes below the surface. Glacier-wide refreezing is 0.49 m w.e. during the monsoon, it is lower at AWS-L (0.19 m w.e.) where ice is often exposed at the surface, and higher at AWS-H (0.70 m w.e.) where there is always a snowpack with negative temperature. The refreezing preserves 35% (0.49 m w.e) of the total glacier-wide melt during the monsoon; its relative contribution is higher at AWS-H (71%) than at AWS-L (9%).

The annual glacier-wide sublimation is −0.15 m w.e. and is nearly identical at both AWSs (−0.16 and −0.15 mm w.e. at AWS-L and AWS-H, respectively; Fig. S6). Most of the sublimation (93% glacier-wide) happens outside the monsoon, when cold, dry and windy conditions prevail. Wind is not spatially distributed in our simulations, leading to rather homogeneous sublimation across the glacier. There are few exceptions, like a slightly higher sublimation in winter at AWS-L (−0.07 m w.e.) than at AWS-H (−0.05 m w.e.) due to higher roughness length linked to the surface state (exposed ice at AWS-L vs snow at AWS-H) and to the mixing ratio that depends on the air temperature. Due to the lower wind speed, sublimation is insignificant at both AWS sites during the monsoon (Table 6).

5.3.1 Link between meteorological forcing anomalies and mass-balance anomalies

In order to analyse the link between the different input meteorological variables and the outputs from the simulations, we calculate anomalies of each variable from the 180 scenarios by subtracting the mean of the original unshuffled 2016–20 simulations (Fig. 8). From all synthetic scenarios, the magnitude of variation of air temperature is nearly ±1°C, whereas for precipitation, it varies from −35 to +55% annually. The anomalies of relative humidity (±5%) and incoming radiations (±10 W m⁻²) are rather narrow. There are many significant correlations (p < 0.001) between the anomalies of the different variables, suggesting that they are likely to be physically related to each other. On an annual scale, the anomaly of air temperature correlates significantly and positively with the wind speed and the air pressure anomalies, and negatively with the precipitation and relative humidity anomalies. Regarding radiations that are expected to have an impact on the mass balance, the SW_in anomaly correlates significantly and negatively with the relative humidity, the precipitation and the LW_in anomalies. The LW_in anomaly correlates significantly and positively with the relative humidity and the precipitation anomalies, and negatively with the SW_in and wind speed anomalies.

Figure 8. Scatter plot between anomalies of different input variables and glacier-wide mass-balance anomalies for the 180 synthetic runs. Also shown are the Pearson correlation coefficients between the series of annual anomalies. The black lines represent the linear regressions and the grey shaded areas indicate the standard error. The anomalies of each variable are calculated by subtracting the mean of the original unshuffled 2016-20 simulation. (Asterisks represent significance levels, accordingly: *0.05, **0.01, ***0.001.)

The mass-balance anomaly correlates significantly with the anomalies of every meteorological variable except for SW_in (Fig. 8). The correlations between mass-balance anomalies and those of LW_in, atmospheric pressure or wind speed are moderate but significant, positive in case of LW_in, and negative for the other variables. The correlation between mass-balance anomalies and air temperature is significant and highly negative (r = −0.79). Mass-balance anomalies are highly and positively correlated with those of precipitation (r = 0.87) and relative humidity (r = 0.84; Fig. 8).

5.3.2 Mass-balance sensitivity to air temperature and precipitation

From the classical method, we find that perturbing the temperature by +1 (−1)°C leads to a change in glacier-wide mass balance of −0.61 (+0.41) m w.e. (Table 7). A −20 (+20)% change in precipitation leads to a −0.79 (+0.48) m w.e change in glacier-wide mass balance (Table 7). With the synthetic scenario method, we find that a temperature change of +1 (−1)°C leads to a glacier-wide mass-balance change of −0.75 ± 0.17 (+0.93 ± 0.18) m w.e., and a −20 (+20)% change in precipitation results in a mass-balance change of −0.60 ± 0.11 (+0.52 ± 0.10) m w.e. Due to the physical link between variables, and in particular the negative correlation between temperature and precipitation, we find that the sensitivity of mass balance to temperature is significantly higher when calculated from synthetic scenarios than from the classical method, especially in case of cooling. For precipitation, it is significantly reduced in case of a precipitation deficit but almost unchanged in case of an increase.

Table 7. Mass-balance anomalies as compared to the mean of the four 2016–20 years from the classical and synthetic scenarios’ methods

This synthetic scenario approach allows to derive mass-balance sensitivities to any meteorological variable, as long as a significant correlation exists between the anomalies of mass balance and the variable under consideration. In particular, as we find a high correlation between mass balance and relative humidity anomalies, we can also assess the mass-balance sensitivity to this variable: a −4 (+4)% change in RH corresponds to a −1.02 (+1.38) m w.e. change in mass balance. However, we caution on the interpretation of these correlations, as most of the input meteorological variables covary, the correlations may be significant, but they do not show a causal relationship, that needs to be discussed in the light of the knowledge of the processes (see Section 6).

5.3.3 Specific meteorological conditions leading to the most positive/negative mass balances

From the synthetic scenarios, the annual glacier-wide mass balances range from −1.76 to 0.54 m w.e. (Figs 9 and S17), which is a wider range than the historically measured glaciological mass balance since 2007 (min = −0.92 m w.e. in 2017/18 and max = 0.26 m w.e. in 2010/11; Wagnon and others, Reference Wagnon2021). The simulated annual mass balances are compared with the original mean annual glacier-wide mass balance of −0.66 m w.e. (Table 6) over the 2016–20 study period, referred to hereafter as the reference year. Most of the scenarios that have warm or dry conditions as a baseline correspond to the first category of scenarios characterised with negative mass balances ranging from −1.76 to −0.81 m w.e. They have a positive SW_net anomaly compared to the reference year (+2 to +17 W m⁻²), associated either with a change in air temperature towards a warming (−0.71 to +1.13°C) or to a decrease in snowfall (0 to −0.29 m w.e.) or to both, resulting in a low glacier-wide albedo (0.53–0.64). With more energy intake, melting is enhanced, and due to the reduced snowfalls, ice is more exposed at the glacier surface favouring runoff, and in turn <46% of this meltwater refreezes, ultimately leading to the most negative glacier-wide mass balances (Fig. S17).

Figure 9. Glacier-wide (a) energy fluxes, (b) mass flux components and (c) mass balance (MB) from (left panels) 12 selected synthetic scenarios (in red, grey, and blue, on the x-axis), as well as (right panels) from the four mean classical scenarios (in black) and the reference year (RY, in green, on the x-axis). The results from the classical scenarios or the reference year have been averaged over the 4 years 2016–20. Based on the MB results, 12 synthetic scenarios are selected (four corresponding to the most negative MBs, four from the middle of the MB set with moderately negative MBs, and four most positive MBs) out of the 180 scenarios (all shown in Fig. S17). The colour code of synthetic scenarios visualises the MB range, from the most negative (red), to the most positive (blue), grey being intermediate and moderately negative. 2019 and 2020 represent the 2018/19 and 2019/20 mass-balance years, respectively. SW_net, net shortwave radiation; LW_net, net longwave radiation; Q _L, latent heat flux; Q _S, sensible heat flux; Q _C, subsurface heat flux; Q _R, rain heat flux; Q _M, available melt energy at the surface; SnowF., solid precipitation; Subl., sublimation; Surf. M., melt at surface Sub S. M., subsurface melt and Refr., refreezing.

The second category of scenarios corresponds to glacier-wide mass balances from −0.80 to −0.25 m w.e. close to that of the reference year. Here, we find scenarios combining a baseline and a seasonal component that would normally lead to opposite mass-balance responses such as dry with wet conditions or warm with cold conditions (e.g. Wa_We_mon, D_We_mon, Wa_We_win, D_C_win). We also find the majority of scenarios that have the unperturbed data as baseline (Figs 9 and S17). The mass balance is affected equally but in an opposite direction by the temperature anomalies (−0.97 and +1.02°C) and the precipitation anomalies (−0.16 to +0.23 m w.e.). In this category, the refreezing ranges from 37 to 56% of total melt, which is close to that of the reference year (44%), and the ranges of SW_net (−8 to +6 W m⁻²) and LW_net (−4 to +3 W m⁻²) anomalies are small (Fig. 8).

The third category corresponds to positive or near-balanced glacier-wide mass balances (>−0.25 m w.e.) mostly produced by scenarios with wet or cold baselines. They have temperature anomalies between −1.00 and +0.52°C and precipitation anomalies between −0.04 and +0.45 m w.e. (Figs 9 and S17). The higher amount of snowfall increases the accumulation, increases the albedo, and in turn decreases the SW_net (−19 to −4 W m⁻²). In addition, the refreezing is high (46–71% of total melt). Overall, the scenarios with a wet year baseline always create a mass balance that is close to balance, and specifically, the highest positive mass balance is produced by the wettest conditions all year round (scenario We_We) (Figs 9 and S17).

For all scenarios, we find that the mass balance is primarily influenced by the baseline conditions, and not by the seasonal variation. We do not find any season that has an influence larger than the other ones (Fig. S17). In particular, when we look at the scenarios of unperturbed data with seasonal variations, we find that winter seems to have as much influence, if not even more influence, than the other seasons on the mass balance (Fig. S17). This result is rather counterintuitive, as most of the mass-balance processes happen in monsoon and pre-monsoon (e.g. Fig. 8).

Regarding the classical scenarios, as expected, both −20% and +1°C scenarios produce negative mass balances, but less extreme than the dry and warm synthetic scenarios. In contrast, both +20% and −1°C classical scenarios are characterised by near-balanced mass balances, far from the positive glacier-wide mass balances obtained with the wet and cold scenarios. The energy and mass fluxes in the classical scenarios are also comparable to those of the synthetic scenarios. The LW_net is similar in all classical scenarios. However, SW_net is 13 W m⁻² higher and refreezing is 25% lower in the −20% precipitation and +1°C scenarios than those in the +20% and −1°C scenarios.