Air temperatures were recorded by the six meteorological stations located in Fig. 1. Their main topographic characteristics are summarised in Table 1, Supplementary data, online, Appendix A. These characteristics were retrieved from the DEM in the surroundings each meteorological stations. The stations are all located within or in the close vicinity of the Rheraya catchment, with a large range of altitudes (1400 m to 3200 m) and aspects (from 20° northern to 184° southern exposures). The Solar Position Algorithm (Reda and Andreas, 2003) was used to calculate sun position angle.

All these stations were equipped with HMP45C probes (Vaisala, Finland) that measure air temperature and vapour pressure on a half-hourly time step, except at the Caf station where only minimal and maximal temperatures are available. In order to have a maximal sampling, data analysis is performed for daily maximum air temperatures. As illustrated in the Fig. 2, the altitude is a principal factor controlling air temperature variation: an average lapse rate of –0.56 °C per 100 meters was observed during winter 2007/2008.

The Enhanced Thematic Mapper (ETM + ) sensor is operational onboard the Landsat 7 satellite. ETM+ observes the Earth in seven spectral bands, amongst which one in the thermal infrared region (ETM + 6: 10.40–12.50 μm). ETM+ images are acquired with a regular revisit time of 16 days at a spatial resolution of 30 m in the solar domain and 60 m for the thermal band (Table 2, Supplementary data, online, Appendix A). The scene size is 170 × 183 km when orbiting at an altitude of 705 km. For this study, six images were available over the Rheraya sub-catchment (Table 3, Supplementary data, online, Appendix A).

The Moderated Resolution Imaging Spectroradiometer (MODIS) is an Earth Observing System (EOS) instrument on board the Terra and Aqua platforms, launched in December 1999 and May 2002, respectively. The sensor observes the Earth from a sun-synchronous position near the polar orbit at an altitude of 705 km. The sensor scans ±55° from nadir in 36 spectral bands in the visible, near- and short-wave and thermal infrared parts of the electromagnetic spectrum. During each scan, 10 along-track detectors per spectral band simultaneously sample the Earth. From its polar orbit, MODIS views the Earth's entire surface ranging from every day at high latitudes to every other day at low latitudes (Justice et al., 1998).

In this article, we used the datasets of the daily surface reflectance product “MOD09GHK”, which is a product computed from the MODIS Level 1B land bands 1-7. Images were ordered from September 2003 to June 2006 through the Earth Observing System (EOS) data gateway (https://wist.echo.nasa.gov). The main characteristics of MODIS images are provided in Table 4, Supplementary data, online, Appendix A. In this study, we used surface reflectances acquired at 500m spatial resolution of 500m in the blue (band 3), the green (band 4) and the short-wave infrared (band 6) part of the electromagnetic spectrum.

The digital elevation model (DEM) used in this study was derived from the Shuttle Radar Topography Mission (SRTM) data, which consists of a specially modified radar system that flew onboard the Space Shuttle Endeavour during an 11-day mission in February of 2000. It is an international project led by the U.S. National Geospatial-Intelligence Agency (NGA), U.S. National Aeronautics and Space Administration (NASA), the Italian Space Agency (ASI) and the German Aerospace Center (DLR). SRTM obtained elevation data on a near-global scale to generate the most complete high resolution digital topographic database of Earth, including three resolution products, of 1 km and 90 m resolutions for the world, and a 30 m resolution for the US (USGS, 2004). All SRTM data are freely available at: http://srtm.csi.cgiar.org/SELECTION/inputCoord.asp.

In this study, we used the STRM-DEM version 4 acquired at the full 90m spatial resolution over the area covered by landsat scenes (latitudes 30°28′ - 32°24′ North, longitudes 9°14’ and 9°9’ West). Altitude and derivatives (aspect and slope) were calculated through the ENVI DEM extraction module (© 2008 ITT Visual Information Solutions).

The computation of brightness temperature from ETM + 6 data first requires the conversion of digital numbers to radiances. For this purpose we used the following formula developed by the National Aeronautics and Space Administration (Eq. (1), after Markham and Barker, 1986).

Once the spectral radiance L_(λ) is computed, the brightness temperature at the satellite level can be directly calculated either by inverting Planck's radiance function for temperature (Sospedra et al., 1998) or by using approximation formula (Eq. (3)), after Goetz et al., 1995; Schott and Volchok, 1985, Wukelic et al., 1989:

Maps of maximal air temperatures were established on the Rheraya watershed by combining ETM+ images and local measurements, with the assumption that air and brightness temperatures (Tb) are linearly related. In principle, there is a tight coupling between the surface and the air temperature under bare soil conditions. Coupling can also be strong when snowpack is below zero degree. Under melting conditions, snow surface is close to zero degree and there is little coupling with the air above. However, T_b distributions according to slope and elevation can be used as additional information to distribute spatially the variations in available melting energy (radiative or sensible heat) in all conditions for use within empirical degree days models¹. It is therefore a proxy for these variations rather than a fully deterministic variable. For each image, the brightness temperatures (T_b) of the pixels that include weather stations were extracted and compared with maximal air temperatures (T_am) obtained from the meteorological stations. It appeared that T_b was well correlated with T_am, with a correlation coefficient R² of 0.82 (Fig. 3). T_am were thus calculated for T_b using a unique regression equation (T_am = 0.7 × Tb–3.2) that was successively applied on each image.

Fig. 4 represents an example of the co-variation of maximal air temperature and altitude over the Rheraya watershed in 27/02/2003. Not surprisingly, the two variables were found highly correlated, with a decrease by 18 °C of air temperature associated to a 3000 m difference in elevation. This corresponds to an equivalent lapse rate value of 0.60°/100 m. Not shown here, the Tam versus elevation curves extracted for the remaining images display the same pattern, with lapse rates varying between 0.43°/100 m to 0.75°/100 m. These values appear consistent with that of an international standard atmosphere (0.65 °C/100 m according to the International Civil Aviation Organization).

Fig. 5 provides an example of air temperature variations with aspect in February 27, 2003. The aspect values are expressed in degrees, with the values 0° (or 360°), 90°, 180° and 270° corresponding to the facing North, East, South and West, respectively. A difference of 10 °C in air temperature between northern and southern exposures was observed this day. The variations of air temperature with aspect followed a sinusoidal curve centred on about 140°, in coherence with the sun diurnal course (the sun azimuthal angle is 165° at the time of acquisition).

A deeper investigation shows that the dependence of Tam with aspect is function of altitude, slope and sun elevation. Fig. 6 presents the amplitude of T_am variations with aspects for seven altitudinal zones from 1000 to 4200 m (with steps of 400 m), together with slopes. Variations of T_am with exposures match the altitudinal distribution of slopes, especially during the winter period when the sun elevation is low. For the ETM+ image acquired in May with a maximal sun elevation of 77°, this effect appears very limited.

The air temperature in any point T_am(i,j) of the Rheraya sub catchment's was calculated from the air temperature recorded at one reference meteorological station (T_am(I_ref,J_ref), OukaSM and Armed stations, and topographical differences between this point and the reference station. These differences were accounted for using the MSPAT model with the altitude, exposition and slope extracted at the pixel (i,j) and at the location of the reference station (Eq. (4)). The MSPAT was set up to obtain daily images of maximal air temperature at a 90m spatial resolution.

where:G is the air temperature lapse rate calculated from the two reference meteorological stations (Armed and OukaSM) at a daily time step; ΔAlt=Alt(i,j)−Alt(ref) is the difference in elevation between the reference station and the pixel where air temperature is calculated.

AS(I,j) and AS_ref are the aspect in degree of the pixel (i, j) and of the reference station, respectively.

For a given altitude, the model accounts for aspect, slope and sun elevation according to equations (Eqs. (5) and (6)). In details, the air temperature was calculated from the temperature averaged for a given altitudinal band with a correction of the effect of exposure based on a cosine function (Eq. (5)). The maximal air temperature was logically supposed to be the highest when the surface is fully oriented at South (aspect of 180°). The amplitude of the cosine was adjusted as a function of the ratio of the local slope to the sun elevation (A coefficient in Eq. (6) and Fig. 7).

In the lowest 10–15 km of the atmosphere, temperature declines with an increase in altitude. This decline, known as temperature lapse rate, is controlled by the balance between heat convection from the surface and radiative cooling. However, lapse rates vary with: (1) altitude, (2) season, (3) latitude, and (4) interactions between topography and weather (e.g. dry versus moist air and inversions).

The lapse rate method (LRM) takes the maximum air temperature observed at a reference station and extrapolates that value over the entire basin via a functional relationship between air temperature and elevation data. This method assumes 1) a linear relationship between air temperature and elevation, and 2) horizontal gradients due to topographic and orographic effects are negligible. In this study, the temperature lapse rates (G) on a daily basis using the stations where the longest dataset is available as:

Air temperature lapse rates were calculated for each study year and then applied to elevation data for Rheraya basin to determine air temperature for each pixel using air temperature measured at a reference station (Tam(I_ref,J_ref)) (Eq. (8)).

Snow-covered areas were estimated using two methods: (1) Simulation of snowfall and snowmelt, (2) Mapping using MODIS images.

3.6.1 Simulation

Daily maximum air temperatures modelled using MSPAT at the location of meteorological stations were evaluated against all measurements available over the Rheraya watershed, together with estimates of air temperature based on the lapse rate method (referred to as “LRM”). The evaluation was carried out using classical statistical variables (RMSE, BIAS, and R²).

Fig. 8 present the scatter plots between observed and simulated air temperatures during the 2007/2008 season, year with the largest number of available climatic data. Table 5 (Supplementary data, online, see Appendix A) shows the statistical variables obtained by comparing the predictions and the measurements of daily maximum daily air temperature on an annual basis. Biases and RMSE were null for the Armed station which provides with the reference air temperature. Bias was also null for the OukaSM station since it was used for calculating the altitudinal lapse rate. From the statistics calculated on the remaining stations, we noted that the performance of LRM and MSPAT models were similar, with moderate to excellent correlation (R² from 0.35 to 0.94), low biases (from –0.5° to 1.2°) and error varying from 1 to 3.2°. The MSPAT model performed slightly better than the LRM method for 2 stations (Caf and Neltner), whereas it is the opposite for 2 others (Imsker and Tachdert). These results showed that, at local scale, the MSPAT model did not improve the estimate of air temperature.

The snow-covered areas derived from MODIS data and simulated with climatic data (LRM and MSPAT models) were compared for the three seasons of study (2003–2004 to 2005–2006). The time series of SCAs averaged on the whole Rheraya watershed were plotted in Fig. 9. The two simulated snow covered area compared favourably to that derived from MODIS images. However, there was a slight underestimation of SCA simulated using the LRM method during the two previous years (2003 to 2005) and a slight overestimation of SCA simulated using the MSPAT model at the beginning of the last year (December 2005). The peaks of SCA were well modelled with the two methods, even though those occurring after generalized snowfall events were clearly underestimated. This smoothing effect was due to the use of an asymptotic function between SCA and snow water equivalent.

The Fig. 10 show three examples of SCA maps simulated by the two climatic models and derived from MODIS data during a snowmelt period between 03/12/2003 and 30/12/2003. Simulated SCA appeared much more realistic when the MSPAT model was used to distribute air temperature. This was obvious on the two first dates when looking at the north-eastern and at the western part of the catchment, as well as for the last date for which the spatial extent of snowy areas simulated using the LRM data pattern appeared too limited. This qualitative comparison allowed to show that patterns of SCA were not only matching altitude variations but also exposures. This was consistent with previous studies carried out at the scale of the whole High-Atlas mountains range showing that southern facing slopes have lower SCA than northern ones (Boudhar et al., 2007).

The scatter plot between SCA simulated by the two climatic models and derived from MODIS allowed to quantify the previous findings (Fig. 11). This comparison was carried out at a degraded resolution of 2 km² in order to limit the impact of miss-registration between MODIS and simulated SCA images. SCA modelled with LRM model were found very under-estimated, especially during seasons 2004/2005 and 2005/2006. In contrast, SCA modelled using the MSPAT were less scattered. The statistics results for each season are summarized in Table 6, Supplementary data, online, see Appendix A. We noted a remarkable improvement of the SCA modelled with MSPAT model. This improvement was significant in the two seasons 2004/2005 and 2005/2006 with decreasing in bias by 2.9 and 1.8%, respectively. Theses differences in SCA estimating between LRM and MSPAT models are due principally to the aspect effect not taken account by LRM formulation. In the later, air temperature varies only with altitude and horizontal gradients due to topographic and orographic effects are negligible.