2.1. SAR data

Our source data were delivered in the form of unfocused (Level-0) SAR image data from the Alaska Satellite Facility (ASF). The RADARSAT image data were all collected using the Fine-Beam-1 mode with HH polarization with a nominal incidence angle range of 37°–41°. All of the ALOS-PALSAR data were collected with Fine-Beam Single-Polarization (HH) mode with a nominal incidence angle of 36.4°–40.8°. We used the Gamma Modular SAR Processor (MSP) (Werner and others, Reference Werner, Wegmuller, Strozzi, Wiesmann and Sawaya-Lacoste2000) to process these data into uncalibrated, detected SAR images referenced to a fixed-gain setting with no antenna-pattern correction applied at this stage.

As a spaceborne radar's several-kilometer-wide beam sweeps past a target on the ground, the Doppler frequency of the energy backscattered by the target changes with time (or equivalently with relative position in the beam). To focus the data, a SAR processor correlates (match filters) each point in the output image with its expected Doppler history, which rejects energy from other points, which have different Doppler histories. This process synthesizes an aperture with resolution of a few meters from data collected by a real aperture with resolution of a few kilometers. This procedure requires knowledge of the parameters that describe the expected Doppler history, including the Doppler centroid (center of the returned Doppler spectrum). If the Earth did not rotate, then the Doppler centroid would be zero for a beam that is directed broadside (i.e. orthogonal to the satellite track). While the RADARSAT antenna is nominally directed broadside, its Doppler centroid drifts due to the additional latitude-dependent contribution of the Earth's rotation to the Doppler centroid, complicating processing, which often assumes a constant centroid. Thus, we processed the data with a modified version of the Gamma processor that uses a fixed reference Doppler centroid, but which tracks the drift of the actual Doppler bandwidth about the true centroid (Joughin, Reference Joughin2002). This allows the much longer segments of raw data to be processed into single images. The ALOS-PALSAR data were delivered as individual, overlapping frames, which we concatenated together for processing as longer (several hundred km) segments. Because the PALSAR antenna is nominally steered to zero Doppler, there is little variation of the Doppler centroid along track. As a result, we estimated a Doppler centroid for each scene, which was subsequently used to process the entire image.

2.2. Mosaicking

We produced SAR-image mosaics on a polar-stereographic grid with standard latitude of 70° N and the x-axis extending along 45° E, using the WGS84 as the reference ellipsoid. The MSP SAR processor produces the detected (power) images in deskewed range-Doppler coordinates. Thus, the mosaicker must map between the coordinates of the output grid and the SAR images. To do this, the algorithm first uses the satellite-ephemeris data (state vectors) to determine where a point in the output grid would lie in the radar image if the Earth were perfectly ellipsoidal (i.e. with zero surface elevation everywhere) (Joughin, Reference Joughin1995). Except for the points truly on the ellipsoid, this position is incorrect because the slant-range SAR coordinate depends on the surface elevation relative to the ellipsoid. To correct the positions, the algorithm applies an elevation-dependent range correction to determine the actual radar coordinates for the point in the output grid (Curlander and Mcdonough, Reference Curlander and Mcdonough1991). The GIMP-DEM provides the ellipsoidal heights required for this correction (Howat and others, Reference Howat, Negrete and Smith2014).

In creating a mosaic, as the software cycles through the radar images, it determines the subregion of the output grid that corresponds to the current image. For each of these subregions, the algorithm loops over each point, interpolating a value from the source image where valid data are present. At this stage, the mosaicker uses the GIMP-DEM surface elevation to determine and apply a look-angle-dependent correction for the radar antenna pattern. For RADARSAT, the mosaicker uses a pattern supplied by the ASF and for ALOS-PALSAR it uses the pattern supplied with the Gamma MSP software.

There are many areas where images overlap, so that data from two or more images correspond to the same point in the output grid. Such overlap can produce visible seams in the mosaic due to differences in the images caused by changes in the surface backscatter (energy scattered back toward the radar) between passes (e.g. snowfall or melt events), surface displacement (e.g. fast moving glaciers) or processing artifacts (e.g. imperfect correction for the antenna pattern). To reduce the appearance of such seams, the mosaicker uses a feathering algorithm. First, a distance transform is applied to each image to determine the distance in pixels to the nearest edge, d _e. Next, the algorithm uses these distance values to compute a weighting function that varies linearly from 0 to 1 as a function of d _e, which saturates at 1 for distances greater than a fixed feathering length, d _f. This weighting function is used to scale the images and both the weights and scaled data are summed in output buffers. When all the data have been incorporated into the mosaic, the summed weights are used to scale the result to produce a weighted average as the final result. Points on fast moving glaciers features can move substantially between acquisitions of images in regions of overlap where feathering is applied, producing ‘blurring’ artifacts. While we could have avoided such artifacts by not feathering and using one image or the other in the overlap regions, this would have produced ‘image shear’ artifacts, which also are undesirable. Ultimately, we selected the feathering procedure because it produced better results over slow moving regions, which comprise the majority of area imaged.

2.3. RADARSAT radiometric calibration

The MSP processor produces uncalibrated SAR images. Calibrated SAR images typically are distributed as radar backscatter coefficient σ ⁰, values, which are the ratios of the reflected power per unit area to the power incident on the surface (El-Darymli and others, Reference El-Darymli, McGuire, Gill, Power and Moloney2014). Since many SAR processors produce imagery with no knowledge of the topography, σ ₀ typically is computed as though the Earth were flat (i.e. zero elevation relative to the ellipsoid). Because ground-range resolution varies strongly with surface slope, the true σ ₀ has a slope-dependent component. Hence, for a surface with uniform scattering properties (i.e. constant σ ⁰), the radar derived σ ⁰ will appear brighter for slopes facing the radar, while it will appear darker for slopes facing away. Although the mosaicking algorithm uses a DEM, we have chosen not to perform a slope correction. This avoids potential spurious variations in backscatter due to errors in, and limited resolution of, the GIMP DEM, and is consistent with the way the RADARSAT Antarctica Mapping Project and Modified Antarctic Mapping Mission (MAMM) mosaics were produced (Jezek, Reference Jezek1999; Jezek and others, Reference Jezek, Farness, Carande, Wu and Labelle-Hamer2003). For the relatively flat interior of the ice sheet, this approach produces values relatively close to the actual values. For the mountainous areas at the coast, it produces an image in which it is easier to distinguish topographic features (i.e. it adds a shaded-relief-like effect).

After application of the antenna pattern correction, the imagery was calibrated as

(1) $${\sigma ^{0}} = a \cdot DN - b.$$

Here the antenna-pattern-corrected output of the processor is given by a digital number (DN), and a and b are processor-dependent calibration coefficients, which were initially unknown. Because σ ⁰ values have a large dynamic range, the backscatter coefficients are provided in dB (i.e. 10 log₁₀[σ ⁰]).

To determine the backscatter coefficients, we calibrated the processor output using the MAMM mosaic of Antarctica (Jezek and others, Reference Jezek, Farness, Carande, Wu and Labelle-Hamer2003) to compute the parameters in Eqn (1). The MAMM mosaic was calibrated using processor parameters determined from global surveys of targets with known backscatter properties, and is thus a good reference surface to calibrate our processor. To do this, we processed uncalibrated RADARSAT images for 17 areas around Antarctica, which we multi-looked (averaged) 4 pixels in range and 6 pixels in azimuth. After correction for the antenna pattern, we extracted data from areas of overlap with the MAMM mosaic, smoothing both datasets to 400 m resolution. For each area we performed a least-squares fit to extract the calibration parameters. Based on this analysis, we used the mean values of a = 0.03663 and b = 0.0058 to calibrate the Greenland RADARSAT mosaics. With these values the mean difference between the MSP processed data and the MAMM mosaic was 0.0 with a standard deviation of 0.7 dB. Some of this variance likely reflects the fact that we could not ensure that we used the same images as those that went into the MAMM mosaic.

We used a single set of parameters and antenna pattern to calibrate the RADARSAT data. As a consequence, potential variability in the instrument performance or antenna pattern with time could affect our radiometric precision (Srivastava and others, Reference Srivastava, Cote, Le Dantec, Hawkins and Murnaghan2007). To assess the extent to which such drift might be present in our data, we examined average radar backscatter coefficients for three 12 km × 12 km regions of exposed rock where we expect natural variation in backscatter to be small. For these regions, the data were consistent to within ~1.5 dB with a decreasing trend of ~0.11 dB a⁻¹ (−0.09, −0.13, −0.12 dB a⁻¹ at three sites). We did not attempt to correct for this apparent drift. The MAMM mosaic that we used as our reference was collected at the same time as the 2000/01 Greenland mosaic. Hence, the 2000/01 mosaic should have the least uncertainty in an absolute sense in so much as the reference MAMM mosaic is correct.

Because we produced only a single mosaic and did not have a calibration reference for ALOS-PALSAR, we did not calibrate the L-band data. Nonetheless, as an image product it is still useful for studying changes such as glacier retreat (see examples below).

2.4. Geometric accuracy

Geolocation errors of 10s to 100s of meters are often introduced by errors in the satellite-along-track time relative to the state-vectors, δ _a, and errors in the range-delay times, δ _r. Thus, the SAR images also require geometric calibration to improve location accuracy.

In our early processing of the RADARSAT mosaics, we noticed along-track location inconsistencies of up to ~70 m between the adjacent tracks. To fix this, we cross-correlated patches in adjacent, overlapping images of the 2005/06 data at 15 m resolution to determine the relative timing errors. We used these relative values of δ _a to adjust the satellite timing to bring all the tracks into relative agreement and then corrected by an additional term so that the mean shift (for 54 data takes) was zero. For the other C-band mosaics, we used a similar registration procedure except that we determined values of δ _a by aligning the data for each track with the 2005/06 mosaic. The ALOS-PALSAR along-track positions were consistent from track to track, but required a uniform correction of δ _a = 0.062 s to align the mosaicked results with independent data (e.g. LandSat and TerraSAR-X).

Comparison of the RADARSAT data with other independent images indicated that there was an approximately constant (for a given year) range delay. To fix this error, we located several easily identifiable features that were visible in both the 2005/06 mosaic and other well-geolocated data (e.g. WorldView and TerraSAR-X). Using these features, we determined that a correction in δ _r equivalent to 70 m was required to align the 2005/06 RADARSAT data with independent data. After evaluating all the RADARSAT data, we used a fixed δ _r correction for each year ranging from 66 to 70 m. For the ALOS data no range correction was required.

After application of the range and along-track timing corrections, all the RADARSAT mosaics were internally consistent to within better than the 20 m pixel spacing of the final mosaics. Comparison with other data (Landsat, WorldView, TerraSAR-X) indicates that mean errors are also <20 m. Thus, the remaining source of error is the GIMP DEM used for terrain correction (Howat and others, Reference Howat, Negrete and Smith2014). For a nominal incidence angle of 38°, the horizontal range-dependent location error at a point should be a factor ~1.25 (1/tan[38°]) greater than the corresponding elevation error (Curlander and Mcdonough, Reference Curlander and Mcdonough1991). For the ice sheet the GIMP-elevation error is 8.5 m (Howat and others, Reference Howat, Negrete and Smith2014), indicating subpixel (<20 m) location errors for ice-covered regions. For ice-free terrain the elevation errors assessed in different areas of Greenland vary substantially (8–40 m), indicating location errors of up to 50 m. In areas with severe slopes such as mountainous regions along the southeast coast (see Fig. 6 in Howat and others, Reference Howat, la Peña de, van Angelen, Lenaerts and van den Broeke2013), the DEM errors may be substantially larger.

In general, the DEM-dependent errors are common to all RADARSAT mosaics, so relative positions are consistent to better than 20 m. An exception occurs where glaciers have thinned by tens of meters over the 12 a period during which the images were acquired. In such regions, horizontal location errors are similar (~1.25×) in magnitude to the corresponding elevation change.

While the RADARSAT mosaics are relatively self-consistent, location differences between the RADARSAT mosaics and ALOS-PALSAR mosaic can be substantially larger. Such differences arise because the RADARSAT images were acquired along descending orbits (satellite moving toward the equator in the northern hemisphere) and the ALOS-PALSAR data were acquired along the ascending orbits (satellite moving toward the pole). As a result, points in the mosaics were imaged from opposing sides by the two satellites. Thus, if the location error due to terrain distortion is ΔX in a RADARSAT mosaic, the corresponding error in the ALOS-PALSAR image will be roughly in the opposite direction in the ALOS-PALSAR image, so the relative error between the images will be $\sim 2{\rm \Delta} X$ , assuming that the elevation error is the same for both images. In addition, because of this opposite-side viewing, areas that are shadowed in the RADARSAT image will be laid-over or foreshortened in the ALOS-PALSAR image and vice versa. Foreshortening occurs when radar-facing slopes are such that slant-range pixels project to a large area on the ground, causing the radar-side of a mountainous feature to be compressed in slant-range coordinates. Layover occurs when slopes are such that points that are farther in ground range are nearer when mapped into slant-range coordinates than other points that are actually closer in ground range (i.e. a peak may be closer to the radar due to its height, even though it is farther way horizontally than a lower elevation point). Although the terrain correction can fix much of this distortion, differences can be large (tens of meters) in areas of extreme slopes.

2.5. Resolution

We produced all the mosaics with postings of both 20 and 100 m. All the RADARSAT data were collected using the FN1 (Fine-1) beam, which has a single-look resolution of ~4.6 m in the slant-range direction and ~5.6 m in the azimuth direction. For the 20 m mosaics, the data were multi-looked by incoherently averaging by 3 pixels in range by 4 pixels in azimuth to reduce speckle. This degree of averaging translates into a nominal 22 m×22 m ground resolution. Actual resolution varies with incidence angle (Curlander and Mcdonough, Reference Curlander and Mcdonough1991). For the 100 m mosaics, we multi-looked (downsampled by averaging groups of adjacent n×m pixels) the data using 12 pixels in range and 18 pixels in azimuth, which yields a nominal 89 m×99 m ground resolution. The 20 m ALOS-PALSAR mosaics were produced from images multi-looked 3 pixels in range by 6 pixels in azimuth, which yields a nominal ground resolution of 22 m×19 m. Finally, the 100 m L-band mosaics were multi-looked 12 pixels in range by 24 pixels in azimuth (~88 m×86 m).