Cloud masking

It is often difficult to detect clouds over an ice cap, because clouds, ice and snow frequently have similar reflectance characteristics in the visible and infrared wavelengths. Thus, cloud masking becomes a matter of pattern recognition. Reference De Ruyter de Wildt, Oerlemans and BjörnssonDe Ruyter De Wildt and others (2002) found that the differences between bands 3 and 4 could be used to aid in the detection of clouds. A parameter R is defined as:

where c ₃ and c ₄ are the raw count values per pixel in the AVHRR bands 3 (3a for NOAA-16) and 4. If R is higher than a chosen threshold, the pixel is classified as cloud. Threshold values are not equal for every image, and anomalies like cloud shadows are not detected. However, in addition to this procedure, we also examined a composite image of bands 1 (blue), 3 (red) and 4 (green). By including the visible band it was easier to see the extent of the ice cap and it was also possible to distinguish clouds from patterns in the ice itself and this enabled us to better tune R. Portions of the ice cap that were still suspect after the best possible R had been chosen were removed manually.

Geolocation

We used a digital elevation model to produce a mask of the ice-cap margin. This mask was moved over the image until the fit with the margin was optimized. These fits were checked manually afterwards. We estimate that the accuracy of the geolocation is within one to two pixels.

Calibration

The raw count numbers of the AVHRR images in bands 1 and 2 were converted into top-of-the-atmosphere radiances. Reference Rao and ChenRao and Chen (1995, Reference Rao and Chen1999) and http://noaasis.noaa.gov/NOAASIS/ml/n16calup.html provide calibration coefficients for bands 1 and 2 for the AVHRR instruments aboard NOAA-11, NOAA-14 and NOAA-16 respectively. Instrumental drift is taken into account for NOAA-11 and NOAA-14, while the instruments aboard NOAA-16 have shown no systematic instrumental drift so far. However, the calibration coefficients have been updated several times, so the sensor is not completely stable. The zenith of the sun and the variable distance between the Earth and the Sun are also taken into account.

Atmospheric correction and BRDFs

The incoming radiation at the top of the atmosphere is not equal to the radiation received at the surface, because of the influence of the atmosphere. We used the 6S (Second Simulation of the Satellite Signal in the Solar Spectrum) model to determine this influence (Reference Vermote, Tanré, Deuzé, Herman and MorcetteVermote and others, 1997). The model incorporates descriptions of both the anisotropic reflection of the atmosphere and the surface. The anisotropy of the latter is described using bidirectional reflection distribution functions (BRDFs). The BRDF for ice was derived by Reference Greuell and de Ruyter de WildtGreuell and de Ruyter de Wildt (1999) using measurements made on Morteratschgletscher, Switzerland, and the BRDF for snow was determined by Reference KoksKoks (2001) on the basis of measurements made on Glacier du Géant, Italy. We present the results with and without correction for anisotropy of the surface.

To distinguish between ice and snow we used the broadband albedo threshold of 0.43 determined by Reference Greuell, Reijmer and OerlemansGreuell and others (2002). We selected this value because it was determined on Vatnajökull itself. If the broadband surface albedo after all corrections lay below 0.43, the surface was classified as ice and otherwise as snow. If the images contradicted each other, i.e. the image with the snow BRDF classified the pixel as ice, while the ice BRDF image classified it as snow, the mean of the two broadband albedos was taken. With this method it is not a priori possible to say if a surface is ice or snow, because the broadband albedo is used to determine that. Therefore we had to calculate the albedo for all images with both BRDFs and select the correct surface type of each pixel afterwards.

The relation between the reflectance at the top of the atmosphere and the surface albedo depends on the sun– target–satellite geometry, water vapour, ozone and visibility. The latter is a measure for the aerosol content of the atmosphere. We generated a look-up table (LUT) that describes the relation between all possible zenith and azimuth angles of the sun and the satellite. The calculations were done for a standard sub-arctic summer profile with constant values for water vapour (10.6 kg m^–2), total ozone (341 Dobson units) and visibility (109 km), all at 1500 m a.s.l.

To justify the use of constant values, we repeated all processing steps with atmospheric properties specific to each date for the years 2001 and 2002. Water vapour was taken from the ERA-40 re-analysis by the European Centre for Medium-Range Weather Forecasts, ozone content from NASA (http://www.toms.gfc.nasa.gov/ozone/ozone.html) and visibility from Fagurhólmsári station (63˚53’ N, 16˚39’ W) just south of Vatnajökull. This justified the use of the LUT values because the difference between the albedo calculated with both methods was only a few per cent at most.

Slope correction

All calculations above assume a horizontal surface, but this is seldom the case. We used the method of Reference Knap, Brock, Oerlemans and WillisKnap and others (1999, equation 4) to correct for the slope of the surface. The correction factor is defined as:

where 9 _s is the solar zenith angle, y is the angle between the normal vector of the surface and the vector pointing to the sun, and a is the ratio of diffuse to direct solar radiation under clear-sky conditions. Its value depends on the wavelength (0.138 and 0.079 for bands 1 and 2, respectively).

Narrow-to-broadband conversion

The calculations described above compute the narrowband albedos in AVHRR bands 1 (α₁) and 2 (α₂). These narrowband albedos have to be converted to a broadband albedo (a). We used several narrow-to-broadband (NTB) conversion equations and compared the results, namely:

Reference De Ruyter de Wildt, Oerlemans and Björnssonde Ruyter de Wildt and others (2002):

Reference Greuell, Reijmer and OerlemansGreuell and others (2002):

Reference Greuell and OerlemansGreuell and Oerlemans (2004):

Reference LiangLiang (2001):

Satellite-derived albedo

The differences between the isotropic and anisotropic cases are typically on the order of a few per cent, as shown in Figure 4, and the correlation between both cases is large (0.98). The anisotropic albedo tends to be higher than the isotropic albedo, but there are exceptions. Not accounting for the anisotropy of snow and ice will, however, lead to errors in the calculated surface albedo. Reference Knap, Brock, Oerlemans and WillisKnap and others (1999) did not correct for anisotropy and they considered this the main source of errors in their method. Reference De Ruyter de Wildt, Oerlemans and BjörnssonDe Ruyter de Wildt and others (2002) corrected for snow, but not for ice, while Reference Klok, Greuell and OerlemansKlok and others (2003) used BRDFs for both snow and ice. However, Reference Greuell and OerlemansGreuell and Oerlemans (2004) argue that it is better to use no BRDF at all than one made for a glacier with completely different surface properties. Reference Reijmer, Bintanja and GreuellReijmer and others (2001) also mention that the BRDFs they derived for Antarctica cannot be used for other places. Albedo variations on Morteratschgletscher are mainly caused by the amount of water at the surface (Reference Klok, Greuell and OerlemansKlok and others, 2003), while the dust content is more important for Vatnajökull (Reference Greuell, Reijmer and OerlemansGreuell and others, 2002). Until these calculations are repeated with BRDFs specifically determined for Iceland, it is impossible for us to choose between the isotropic and the anisotropic case. Unfortunately, such BRDFs do not yet exist.

Fig. 4. Radiation calculated with an isotropically reflecting surface vs radiation calculated with an anisotropically reflecting surface. The correlation between the two cases is high (R = 0.985).

The NTB equations by Reference Greuell and OerlemansGreuell and Oerlemans (2004) (Equation (6c)) and by Reference LiangLiang (2001) (Equation (6d)) are based on modelling and were subsequently compared with measurements, while Equations (6a) and (6b) are solely based on measurements. Equations (6c) and (6d) have been determined for a wide range of possible albedos. This is important, because extrapolation of NTB conversion equations beyond the range of albedos that were used as input for the equations is hazardous. However, by using different NTB equations we could estimate the effect of the NTB step on the calculated albedo. A scatter plot of the standard run albedo vs the other albedos is shown in Figure 5. Equation (6a) is a preliminary form of Equation (6b), so we expected that this version would perform worst. It was only included because it had been used in a previously published paper (Reference De Ruyter de Wildt, Oerlemans and Björnssonde Ruyter de Wildt and others, 2002). However, the standard run albedo is more strongly correlated with Equations (6a) and (6d) than with (6b). Although Equation (6b) is more recent than (6a), it is based mostly on measurements of surfaces with low albedo. Indeed, the largest differences between the Equation (6b) and (6c) results are found among the higher albedos, with differences as large as 13%. The correlation between 〈Q _pot,net〉 over the summer for these NTB conversion equations is strong in most cases (around 0.9). This comparison has shown that selection of a NTB conversion equation is no trivial matter, because it can lead to significant variations in the calculated albedo and also in 〈Q _pot,net〉, as shown in the next subsection.

Fig. 5. Albedo of the standard run (NTB conversion equation (6c)) vs albedo of the runs with NTB conversion equations (6a) (crosses), (6b) (squares) and (6d) (circles). The correlations are 0.996 for the (6a) run, 0.837 for the (6b) run and 0.997 for the (6d) run.

Mass balance determined by satellite compared with in situ measurements

The mass balance was measured on the various drainage basins using a stratigraphic method. This method has been described in detail in Reference Björnsson, Pálsson, Guðmundsson and HaraldssonBjörnsson and others (1998c). Briefly, it consists of measuring changes in thickness and density along a number of selected flowlines which span the elevation ranges of the drainage basins. The estimated error of the mass balance per outlet is <20%. The measured mass-balance data were obtained from various reports from the Science Institute, University of Iceland (Reference Björnsson, Pálsson, Guðmundsson and HaraldssonBjörnsson and others, 1997, Reference Björnsson, Pálsson, Guðmundsson and Haraldsson1998a, Reference Björnsson, Pálsson, Guðmundsson and Haraldssonb, Reference Björnsson, Pálsson, Guðmundsson and Haraldssonc, Reference Björnsson, Pálsson, Guðmundsson and Haraldsson1999, Reference Björnsson, Pálsson and Haraldsson2002).

Figure 6 shows the potential absorbed radiation for the standard run vs the mass balance for several years for six drainage basins combined (Tungnaarjökull, Köldukvíslarjökull, Dyngjujökull, Brúarjökull, Breiðamerkurjökull and Eyjabakkajokull). The correlation between measured mass balance and 〈Q _pot,net〉 varies strongly between drainage basins (Table 2). Correlation coefficients are low if there are not enough mass-balance measurements and if not enough good images through the year are available. In particular, it was difficult to find good images at the beginning and at the end of the melt season, because clouds are more prevalent in those periods. The residual standard deviation (m w.e.) is low in all cases (Table 2), showing that the data points are strongly related to each other even if the correlation is low. The choice of the NTB conversion equation has a large effect on the correlation coefficient and there is no single NTB conversion equation that performs best for all drainage basins (Table 2).

Fig. 6. Mean summer 〈Q _pot,net〉 for the standard run vs mean measured mass balance (B) over the whole area where mass-balance measurements were taken. The largest outlets were given the largest weight in the calculation of the mean. Every point shows a year, and only those years for which mass-balance measurements were available for all outlets are included.

The correlations we determined are generally lower than those found by Reference De Ruyter de Wildt, Oerlemans and Björnssonde Ruyter de Wildt and others (2002). The addition of the years 2000-02 is partly responsible for this, as 2001 and 2002 decrease the correlation substantially. The images from these years come from the NOAA-16 satellite, while all other images were acquired by NOAA-11 and NOAA-14. Köldukvìıslarjökull gives by far the worst correlation coefficients for all three NTB equations, contrary to Reference De Ruyter de Wildt, Oerlemans and Björnssonde Ruyter de Wildt and others (2002) who found a correlation of 0.92. However, if the years 2001 and 2002 are removed, the correlation for the mean summer 〈Q _pot, net〉 and the measured mass balance becomes 0.8˚ for NTB conversion equation (6a) at Köldukvìslarjökull. Using data from different satellites may not be as straightforward as it seemed at first and this should be dealt with in future studies.

Assuming that the combination of the six drainage basins is representative of the whole ice cap both in space and time, we can estimate the total mass balance of the whole ice cap using the linear relation shown in Figure 6. This is shown for the years 1991-2002 in Figure 7. We intend to validate this result in future work by comparing our findings with modelling studies and by adding more satellite images. The derived relation is unique for Vatnajökull, but this method can be applied to other ice masses which are large enough compared to the AVHRR pixel size; it has already been applied to part of Greenland by Reference Greuell and OerlemansGreuell and Oerlemans (2005).

Fig. 7. Estimated mass balance for Vatnajökull based on the relation illustrated in Figure 6.