3.1. Temperature and meteorological measurements

Measurements of T _a were made at 14 on-glacier sites using Gemini TinyTag thermistors housed 2 m from the surface in naturally ventilated Campbell MET20/MET21 radiation shields on free-standing tripods (hereafter referred to as T-loggers and indicated by TE(n) – see Fig. 1, with details in Table 1). TinyTag sensors are either TGP-4520 loggers with a PB 5001 probe type (accuracy ±0.20°C) or TG-4505 loggers with temperature-relative humidity sensors (accuracy ±0.35°C – see Table 1). The distribution of stations was designed to sample the variability of T _a along the centreline of the glacier (determined as a maximum horizontal distance from the lateral glacier boundary) and at lateral positions to the side of a lower weather station (LWS) and of T-Logger TE10 (Fig. 1). Sites TE11–13 and an upper weather station (UWS) are located in the 2015 glacier accumulation zone (Fig. 1). TE10 is sited below a steeper slope (20°) at the approximate equilibrium line altitude of ~3100 m a.s.l. The T-loggers on the glacier tongue (TE0 and TE1) are at similar elevations and are ~100 m apart. The location of TE1 is considered to better represent the centreline of the glacier, based on the distance to the lateral glacier margins.

Table 1. Station details including coordinates, elevation and measured variables

The last columns indicate the availability of data for the 2015 ablation season in July–August (Jul–Aug) and August–September (Aug–Sep) where an ‘O’ indicates minor data gaps and an ‘X’ indicates larger gaps in the data for the period. Northing and easting values are reported in UTM 32N. Centreline stations are shown in bold text. ‘T _a’, air temperature; ‘u’, wind speed; ‘v’, wind direction; ‘Rad_NET’, all fluxes of net radiation; ‘RH’, relative humidity.

a, MET20 radiation shield;.

b, MET21 radiation shield;.

t, temperature TinyTag (accuracy ±0.20°C);.

r, temperature/relative humidity TinyTag (accuracy ±0.35°C).

Off-glacier T _a data were available from two locations near to Tsanteleina Glacier: Grand Croux (GC), 2 km northeast from the glacier tongue at a similar elevation to the glacier tongue (2750 m a.s.l.) and a valley site Chaudanne (CH), ~8.5 km north from the tongue (1794 m a.s.l. – see Fig. 1). Data from GC and CH were provided by the Regione Autonoma Valle d'Aosta, including precipitation data at CH (Table 1).

On-glacier meteorological and energy-balance data were collected at lower and upper automatic weather stations, LWS (2986 m a.s.l., ablation zone) and UWS (3145 m a.s.l., accumulation zone), respectively, which sampled data every 5 s and recorded at 30 min intervals on Campbell CR3000 data loggers. All AWS and T-logger data were processed into hourly means for analysis. The meteorological data available consists of T _a and relative humidity (TinyTag TGP-4520 for LWS and Campbell HMP45C for UWS – accuracy also ±0.2°C), incoming and outgoing shortwave and longwave radiation (Kipp and Zonen CNR4 for LWS) and wind speed/direction (Campbell open path eddy covariance sonic anemometer and Young 05103 anemometer for LWS and UWS, respectively). All variables were measured at ~2 m height.

Stations were installed on the glacier on 19 June and removed on 14 September. Because several T-logger stations fell over due to differential ablation, the available data for analysis of T _a variability was split into two periods, 17 July–2 August (‘Jul–Aug’ hereafter) and 16 August–14 September (‘Aug–Sep’ hereafter). For the two periods of ‘best data’ availability (Fig. 2), small (<30 h) data gaps still exist for some stations (indicated in Table 1). Stations with data gaps were excluded from the calculation of regression-derived VTGs for that time step and temperature distribution models (see Methodology section) were not calculated for time steps where data gaps existed. Larger data gaps at TE11–13 exist for the Aug–Sep period (~70% of this period).

Fig. 2. Tsanteleina Glacier meteorological conditions for the entire data period of 2015 including the two outlined periods of ‘best T-logger data availability’: (a) incoming and reflected shortwave radiation (W m⁻²) at LWS, (b) incoming and outgoing longwave radiation (W m⁻²) at LWS, (c) T _a at both AWSs (°C), (d) wind speed (m s⁻¹) measured at both AWSs and (e) the precipitation rate (mm hr⁻¹) recorded at Chaudanne station.

Intercomparison tests of all T-loggers at off-glacier locations were performed to understand the reliability of our on-glacier data and provide suitable thresholds indicating significant temperature differences between sites, independent of manufacturer or measurement errors. The intercomparison tests revealed instantaneous temperature differences between individual sensors and the mean temperature of all remaining sensors to be ≤0.30°C (maximum SD of any individual sensor = 0.14°C) using a leave-one-out analysis. Tests revealed no bias in T-logger differences under high insolation and low wind speed conditions (Georges and Kaser, Reference Georges and Kaser2002). The details of these tests are given in the Supplementary Information. Based on these results, we interpret differences between individual sensors of >0.30°C as indicative of real temperature differences at different locations on Tsanteleina Glacier.

3.2. Mass-balance measurements

Surface lowering was measured (for the dates of each period) using 3 m PVC stakes installed at each station site below UWS (Fig. 1), using a Kovacs ice drill. The measurements were converted to w.e. values using an average snow density of 565 kg m⁻³, calculated from a 1.08 m snow pit at TE11 (dug 16 July), and an assumed ice density of 900 kg m⁻³. Due to logistical constraints in the field, no measurements of mass balance were possible at elevations above TE10.

3.3. Additional data

Elevation information for the glacier was provided by a 30 m resolution ASTER (Advanced Spaceborne Thermal Emission and Reflection Radiometer) global digital elevation model (DEM), with an estimated elevation error of ±1 m (Tachikawa and others, Reference Tachikawa, Hato, Kaku and Iwasaki2011). Boundaries of the glacier were determined using a high-resolution Digital Globe image for the valley, taken on 30 September 2014 (Courtesy of Digital Globe Foundation).

5.1. Temperature variability under different meteorological conditions

Mean station T _a values conform to an approximate linear relationship with elevation, particularly when only considering the centreline stations (Fig. 3). Table 3 shows the mean VTGs for all subsets of time and meteorological conditions. Mean VTGs for all subsets are similar to, or more negative than the ELR, with the exception of high off-glacier temperatures (90th percentile, see Methodology section). This is particularly the case during Aug–Sep, when the on-glacier temperature distribution can no longer be explained by elevation (low, non-significant R ² values in Table 3). In contrast, under the coldest off-glacier temperatures (tenth percentile, typically clear nights), VTGs become very steep and a strong relationship to elevation is evident.

Fig. 3. Mean T _a-elevation relationships for all stations (upper panels) and centreline stations only (lower panels). The circles indicate mean T _a (green), and the means of the 90th (red) and tenth (blue) percentiles of off-glacier temperatures at Grand Croux (GC) station. The shaded area represents one SD (this is larger for the green plots as they represent all data). Data for TE11–13 are not shown for Aug–Sep due to larger data gaps. Sites investigated as cold spots (Fig. 4) are shown by the filled circles. Their elevation information is given in Table 1.

Fig. 4. The difference in measured T _a at three lateral sites (TE0, TE6 and TE12) and one centreline site (TE3) from T _a estimated by VTG_CL (x-axis), plotted against wind speed at LWS (UWS for TE12) (y-axis) and mean sea-level pressure (colour scale) derived from the ERA-interim reanalysis dataset (http://apps.ecmwf.int/datasets/data/interim-full-daily/levtype=sfc/). Reanalysis data were linearly interpolated from 6-hourly to hourly intervals to correspond with hourly data for Tsanteleina. Negative x-axis values indicate that station temperatures are cooler than the corresponding elevation on the centreline.

Table 3. Vertical temperature gradients (VTG) derived from linear regression of temperature observations against elevation for all available on-glacier data in each period and for different conditions

VTGs are reported in °C m⁻¹ with R ² (coefficient of determination) values in parentheses for means of all stations (including lateral stations) and centreline stations only

^aIndicates where the R ² relationship is statistically significant to the 99% level, ^bwhere it is significant at the 95% level and ^xwhere it is not statistically significant.

Generally, night-time VTGs are steeper than daytime, particularly in Jul–Aug; although day/night differences are less distinct in general than between high- and low-temperature conditions (Table 3). Overcast conditions had little effect on VTG magnitude compared with clear sky conditions in Jul–Aug, but were associated with much less negative VTGs in Aug–Sep. Elevation dependency of T _a is strong (high R ² values) for overcast conditions in both periods.

5.2. Lateral and centreline anomalies

As shown in Table 3, elevation becomes a poorer predictor of T _a when lateral stations are included, evident from the reduction in R ² (coefficient of determination) for all stations in both periods. Furthermore, for the warmest conditions, cross-glacier T _a variability is greatest (Figs 3a, b).

Lateral sites TE0, TE6 and TE12 (Fig. 1) frequently exhibited lower T _a than expected when compared with centreline temperatures for the same elevations (Fig. 3). Furthermore, centreline site TE3 also exhibited notably cooler temperatures during both periods than its elevation would suggest (these stations are indicated by filled circles in Fig. 3). Hourly temperature deviations at these sites were quantified by comparison with the centreline temperatures estimated for their elevations, based on VTG_CL (Table 2).

Hourly T _a depressions at these sites are largest at relatively low, but not calm, wind speeds of 2–3 m s⁻¹ (derived from the nearest weather station) under warm, high-pressure conditions (Fig. 4). During periods of low-pressure and high synoptically forced wind speeds, differences from the centreline T _a are very small, particularly for TE0 and TE6. This feature is less consistent for sites TE3 and TE12, which also show several hours of positive temperature anomaly for moderately high pressure and low-to-moderate wind speeds. The lowest 10% of wind speed values (≤1 m s⁻¹) resulted in less negative (though significant) VTGs in Aug–Sep, though wind speed percentiles show no clear differences in elevation dependency or slope of VTGs for Jul–Aug (Table 3).

6.1. Off-glacier VTGs

The VTG between the two off-glacier stations CH and GC fluctuates between strong negative (<−0.0100 °C m⁻¹) gradients to moderate inversions (up to +0.0031 °C m⁻¹) over their large elevation difference (>900 m – Fig. 5). Due to the position of the CH in Val di Rhêmes, cold air which sinks into the valley during the night results in a frequent inversion layer whereby the GC station is warmer. This reiterates the suggestions of Oerlemans (Reference Oerlemans2001) and Carturan and others (Reference Carturan, Cazorzi, De Blasi and Dalla Fontana2015) that high-altitude stations are preferable to those within valleys for distributing air temperature.

Fig. 5. Boxplots of hourly VTGs for (a) centreline stations (VTG_CL) and (b) between off-glacier stations Chaudanne (1794 m a.s.l.) and Grand Groux (2750 m a.s.l.) in both periods. Boxplot limits show the 25th and 75th percentiles and outliers are shown by the red crosses.

The mean diurnal variation of the off-glacier VTG is generally the inverse of that of the glacier centreline, though with less variance (Fig. 5). During the day, VTGs along the glacier centreline (VTG_CL) are relatively shallow, especially for warm, high-pressure conditions where a KBL begins to develop. In contrast, off-glacier VTGs become more negative due to stronger warming at CH. However, at night, the tendency towards inversions for the off-glacier data contrasts with more negative gradients for the glacier centreline (Fig. 5 and Table 3). The mean VTG for the off-glacier stations is −0.0047 °C m⁻¹ for the combined periods. The application of the off-glacier VTG (GC_off) or ELR (GC_ELR) overestimates on-glacier temperature by up to 1.5°C on average (Fig. 6a). For the warmest ambient conditions, this overestimation can be as high as 4°C for GC_ELR (Fig. 6b) leading to an RMSE of 3.6°C compared to the measured data.

Fig. 6. Measured centreline T _a (red) and estimation of T _a for the mean of all hours (a, c, e) and the mean of the warmest T ₀ bin (12–13°C, n = 12) (b, d, f). Panels a and b show the estimation of T _a using extrapolation with the off-glacier VTG (GC_off – blue) and the ELR (GC_ELR – green) from the Grand Croux station (red star). Panels c and d show estimated T _a when applying Shea and Moore with original parameters (SM₁₀ – blue) and recalibrated parameters (SM_opt – green). Panels e and f show estimated T _a with the modified Greuell and Böhm model (ModGB – green), together with VTG_CL (blue). RMSE values (°C) represent the fit of each method to the mean measured data.

The mean cooling effect (mean error) and RMSE between measured and estimated temperature at each station is given in Table 4. The mean cooling effect of all lateral stations using GC_ELR is −1.43°C, compared with −1.12°C for centreline stations (Table 4). Although the difference in mean cooling effect between sites for the whole period is not largely different from the measurement error of the sensors, the main differences are found in the warmest conditions (Figs 3, 4).

Table 4. The mean ‘cooling effect’ (MCE) and root mean square error (RMSE) of the fit to measured data for the centreline (top half) and lateral sites (bottom half) from extrapolated temperatures using GC_ELR, SM_10, SM_opt and ModGB (Table 2)

The MCE is calculated as measured T _a−estimated T _a. MCE and RMSE are expressed in °C. The mean of all centreline and lateral sites are also given.

6.2. SM approach

The SM approach using the original (SM₁₀) and optimised (SM_opt) coefficients estimates mean T _a along the centreline of Tsanteleina Glacier well (Fig. 6c). For the mean of all conditions in both periods, the SM approach performs worse than using GC_ELR or GC_off (RMSE difference of 0.40 and 0.36°C for SM₁₀ and SM_opt, respectively, compared with GC_ELR – Figs 6a vs c). However, for the warmest conditions at the top of the glacier flowline (T ₀ = 12–13°C), the application of the SM model offers a clear improvement over GC_ELR (Figs 6b vs d).

However, the exponential parameterisation of k ₂ from SM₁₀ (blue line in Fig. 7b) does not suitably describe the cooling of T _a above the threshold for katabatic onset and thus cannot replicate the warmer T _a on the glacier tongue for the highest ambient temperatures (Fig. 6d). Although lateral observations on Tsanteleina Glacier appear to be less sensitive to ambient temperatures at greater flowline distances (small triangles in Fig. 7b), centreline k ₂ parameters stabilise at ~2000 m along the flowline and are not replicated by the exponential equation provided by SM₁₀. The k ₁ parameter, however, is less variable for centreline and lateral stations compared with the k ₂ parameter and similar to the values from the literature (Fig. 7a – Shea, Reference Shea2010; Carturan and others, Reference Carturan, Cazorzi, De Blasi and Dalla Fontana2015). The original and optimised coefficients (Eqns (3) and (4)) are provided in Table 5.

Fig. 7. Parameter values for the Tsanteleina dataset for the Shea and Moore method (SM) (a and b) and the modified Greuell and Böhm (ModGB) (c and d) compared with the parameter values from the published literature. k ₁ (a) and k ₂ (b) parameters are presented for Tsanteleina (red triangles – small triangles for lateral stations), the study sites of Shea and Moore (Reference Shea and Moore2010) (blue circles) and of Carturan and others (Reference Carturan, Cazorzi, De Blasi and Dalla Fontana2015) (green squares). The parameterisations in Eqns (2) and (3) are shown for SM₁₀ and SM_opt by the blue and red lines, respectively. ModGB parameters H (c) and K (d) are plotted as functions of T ₀ for Tsanteleina Glacier (red triangles) and Arolla Glacier (blue circles). Upper panels are cropped and do not show a parameter of Shea and Moore (Reference Shea and Moore2010) at ~10 000 m flowline distance.

Table 5. The parameter/coefficient set for the boundary layer models SM and ModGB as given for the current dataset and as published in the literature

Parameters for the SM model are taken from Shea (Reference Shea2010) and ModGB values for Arolla Glacier are taken from Ayala and others (Reference Ayala, Pellicciotti and Shea2015). The β coefficients from Shea and Moore (Reference Shea and Moore2010) are originally β3–7 (for parameters k ₁ and k ₂).

SM_opt estimates T _a better at centreline locations such as TE10 than at lateral sites at similar flowline distances (e.g. TE9 – Table 4). The improvement over the use of SM₁₀ is more noteworthy for centreline sites, though SM_opt consistently has the lowest RMSE between the measured and estimated temperatures as the k ₁ and k ₂ parameters are fitted to the station data for the glacier (Figs 7a, b). Lateral stations have a higher RMSE on average for SM_opt than centreline stations though they show the largest average improvement in RMSE compared to GC_ELR (Table 4).

6.3. Application of ModGB

Under warm ambient temperatures (temperature at T ₀ ≥ 6°C), ModGB is able to replicate the initial down-glacier cooling effect and warming on the glacier tongue (Figs 6e, f). Fitted parameters H and K are ~2–3 m and 6–7°C, respectively, for T ₀ ≥ 6°C, smaller and more stable values than those found by Ayala and others (Reference Ayala, Pellicciotti and Shea2015) for Arolla Glacier (Table 5, Figs 7c, d).

For comparison with ModGB, all methods of T _a distribution are binned into T ₀ intervals to assess their performance at replicating on-glacier temperature (Fig. 8). The ModGB approach better fits to the mean measured centreline data than the other temperature distribution methods (based on RMSE) for all T ₀ bins. Compared with GC_ELR, the SM approaches and ModGB are both superior because the cooling effect of the glacier surface is accounted for, even when including lateral T _a variability (crosses in Fig. 8a). For cooler ambient conditions (e.g. T ₀ = 2–5°C), the application of GC_ELR is more appropriate for representing on-glacier temperatures, but is still out-performed by the on-glacier T _a distribution models. Even compared with VTG_CL, ModGB has a lower RMSE for the warmest ambient conditions (Fig. 8b). This is, however, the result of inappropriate fitting of the ModGB equation when the air temperature is more linear with elevation (Fig. 6e). In a time-series application, ModGB reduces error compared to GC_ELR, but is out-performed in modelling hourly T _a by the SM approaches (Table 4). The suitability of extracted parameters is an important consideration for the ModGB approach which is addressed in the Discussion section.

Fig. 8. Calculated RMSE (°C) of measured T _a and estimated T _a using GC_ELR, SM₁₀, SM_opt and ModGB for T ₀ bins (panel a). Panel b shows the same ModGB performance relative to the RMSE of VTG_CL as a function of T ₀ bins. RMSE calculated using the measured mean data for centreline stations and all stations (‘lateral’) for each T ₀ bin.

Model errors are greater when ModGB is assessed against all T _a data (including non-centreline) for all ambient temperature ranges (RMSE of 1.1°C for T ₀ = 12–13°C, red crosses in Fig. 8). However, ModGB is not, by definition, designed to account for marginal temperature variability. Furthermore, the SM_opt method (Fig. 8a) or VTG_CL (Fig. 8b) also lead to a high RMSE of 1.17 and 0.99°C, respectively, for T ₀ = 12–13°C and much of the variability in lateral T _a under warm ambient conditions is also poorly estimated.

7.1. Validation of melt models

‘Reference model’ melt values are provided by running the energy-balance model using meteorological inputs as described in the Methods section and measured on-glacier T _a at each T-logger/AWS site (Fig. 9). There is a tendency towards model underestimation in Jul–Aug and overestimation in Aug–Sep, but RMSEs of 0.0030 m w.e. d⁻¹ in Jul–Aug and 0.0034 m w.e. d⁻¹ in Aug–Sep are acceptable given potential error sources in both model and data (error bars in Fig. 9). Notably, reference model melt and stake ablation agree very well at LWS in both periods, suggesting extrapolation of meteorological input variables and glacier parameters accounts for at least some of the scatter between model and data. Distribution of wind is a possible cause of strong melt overestimation at TE5 and TE6 in both periods (circled) which are considered to be topographically sheltered areas of the glacier (see Discussion section). Measured daily average melt range from 0.048 to 0.059 m w.e. d⁻¹ for Jul–Aug and 0.030 to 0.038 m w.e. d⁻¹ for Aug–Sep.

Fig. 9. Reference measured vs modelled average daily ablation (m w.e. d⁻¹) for all stake data in Jul–Aug (red) and Aug–Sep (blue) with the RMSE for the fit in each period. An error range of 5 cm (Reid and others, Reference Reid, Carenzo, Pellicciotti and Brock2012) for each period is shown by the horizontal error bars (averaged over the number of days). Vertical error bars indicate the uncertainty associated with a uniform air temperature perturbation of ±0.35°C. The dashed circles indicate sites of consistent model overestimation associated with calm wind flow (see text).

7.2. Distributed temperature and modelled melt rates

Figure 10 shows the daily mean melt rates for model runs with the distribution of T _a using VTGs, ModGB or SM approaches. These results (solid coloured circles) are compared with measured stake data and reference model runs as in Figure 9 (hollow black circles and error bars). The RMSE and bias of all model runs are shown in Table 6.

Fig. 10. Measured and modelled daily average melt (m w.e. d⁻¹) at stake sites using different T _a distribution methods (see Table 2). Data are shown for selected centreline and lateral sites with observations in both Jul–Aug (red) and Aug–Sep (blue) (see Fig. 9). Horizontal error bars indicate a 5 cm error for measured ablation and vertical error bars indicate the uncertainty associated with a uniform air temperature perturbation of ±0.35°C in the reference model. RMSE and mean bias values are reported in m w.e. d⁻¹ for each model run/period. Panel c shows the performance of ModGB if applied to all T ₀ temperatures ≥2°C. Metrics of all model runs are shown in Table 6.

Table 6. RMSE and mean bias of melt model results for the different temperature distribution methods (reported in m w.e. d⁻¹)

P-values indicate the results of a Wilcoxon rank-sum test of the statistical differences in the median RMSE between the reference model results at all stakes and different T _a distribution methods compared to the use of an on-glacier VTG (VTG_CL). The reported p-values indicate the statistically significant differences compared to VTG_CL at the 95% level for Jul–Aug and Aug–Sep. Where p > 0.05, the method does not perform significantly different to the use of on-glacier data and a local VTG (these instances are shown in bold).

VTG_CL provides a good fit to the measured melt rates at stake locations (RMSE = 0.0032 m w.e. d⁻¹ in Jul–Aug) as it represents the on-glacier recorded T _a at LWS and a VTG calculated from several on-glacier T-loggers (Fig. 5 upper panel, Fig. 10a). T _a extrapolation from off-glacier sites using VTGs results in model overestimation (a positive bias). For example, melt at LWS is overestimated by ~0.006–0.010 m w.e. d⁻¹ using all three VTG methods during Jul–Aug (Table 6). This overestimation of the melt is shown for GC_ELR in Figure 10b.

SM₁₀ is found to underestimate melt rates at many sites compared to the reference run (negative bias), particularly at lower elevations/greater flowline distances (Fig. 10e). The application of SM_opt provides improved melt model performance compared to SM₁₀, though still underestimates the reference model melt rate at some stations (Fig. 10f). For lateral sites TE5 and TE6, SM_opt performs similarly to the reference. Performance of SM₁₀ and SM_opt is very similar for the cooler Aug–Sep period.

The application of ModGB for T ₀ ≥ 6°C (the convergence of H/K in the literature – Ayala and others, Reference Ayala, Pellicciotti and Shea2015, Reference Ayala, Pellicciotti, Peleg and Burlando2017) resulted in an RMSE reduction of 0.0023 m w.e. d⁻¹ compared with an off-glacier VTG distribution (Fig. 10d), in spite of only ~35% of the total time steps at T ₀ being ≥6°C, and T _a was otherwise distributed using a GC_ELR approach. As H and K parameters are stable for all T ₀ ranges on Tsanteleina Glacier (Figs 7c, d), ModGB was also run for T ₀ ≥ 2°C. However, as this method is designed for warm ambient temperatures, reducing this threshold implies a too greater warming effect on the glacier tongue for cooler ambient temperatures and melt rates are overestimated at TE2 (Fig. 10c). Applying ModGB for T ₀ ≥ 2°C nevertheless improved estimates of melt compared to GC_ELR.

The use of the SM and ModGB temperature distribution methods improves modelled melt rates by an RMSE of between 0.0020 and 0.0024 m w.e. d⁻¹ (28–36% RMSE reduction) compared to GC_ELR, though only SM_opt is statistically similar to the on-glacier VTG_CL distribution when compared to the reference model using a Wilcoxon ranked-sum test (Table 6). In the context of model errors, both ModGB (for T ₀ ≥ 6°C) and the SM approaches are within the maximum uncertainty of T _a records assuming a uniform ±0.35°C air temperature perturbation.