SAR interferometry

Neglecting the influences of noise and atmosphere, the interferometric phase ϕ measured by InSAR on the surface of a moving ice sheet consists of two components:

where ϕ _topography denotes the phase due to a varying topography and ф_displacem℮n_t denotes phase due to ice motion. The relative height change corresponding to a 2π phase difference is defined as HA (height ambiguity):

where λ is the wavelength, R is the slant range from the first antenna to the ground point, θ is the incidence angle and B _n is the perpendicular component of the baseline. Shorter B _n or longer λ correspond to larger HA. It is obvious that HA of the JERS-1 (L band) is larger than that of ERS InSAR (C band) when the lengths of B_n are the same.

The phase term associated with the change in range adds directly into the interferometric phase as a motion phase:

where δR is the amount of line-of-sight (LOS) motion towards the radar that occurs between two observations, v _s is the LOS component of ice-flow velocity and ΔT is the time between two observations. The value of LOS displacement causing a 2π phase difference is λ/2 and is defined as SD (sensitivity to displacement). So InSAR is highly sensitive to deformations with measurements at centimeter (L-band) or sub-centimeter (C-band) level.

The topographic phase should first be removed from the total phase to obtain the pure motion phase. Four-pass differential InSAR (DInSAR) requires two pairs of SAR images from repeat passes of a SAR satellite over the area of interest. One pair is used to generate a DEM which contains the topographic information. The other pair, referred to as a targeting pair, is used to identify the possible or expected ground deformation that occurred between the two acquisitions. The InSAR DEM is used to remove the topographic phase contributions from the interferogram of the targeting pair, so that changes of ground surface can be detected (Reference HanssenHanssen, 2001).

Flow estimation

The velocity of ice flow is a three-dimensional vector field. However, side-looking InSAR detects only the LOS component of ice flow. To map surface-parallel flow, we modified the procedure of Reference Mattar, Vachon, D. Geudtner, Gray, I.G. Cumming and BrugmanMattar and others (1998). As shown in Figure 2, the relationship between surface displacement D(D_x , D_y , D_z ) and the LOS measurement δR can be given as:

Fig. 2. Diagram showing the surface displacement, D, and the InSAR-measured LOS displacement δR. x, y and zare ground range, radar azimuth and zenith directions, respectively. LOS is in the x–z plane for SARs that are processed close to zero Doppler. δR is in the direction of radar LOS. The incidence angle, θ, is measured with respect to local zenith, u is the angle between D and the x-y plane, and v is the angle between D _h and x.

where D _h is the motion projected onto the plane tangent to the surface of the ellipsoid, D_x and D_y are defined on the range and azimuth directions, respectively, D_z is the vertical component, and u and v are the angles shown in Figure 2.

The derivative of D varies with respect to both u and v. As u and v approach their critical values, δR becomes less sensitive to D and D becomes increasingly sensitive to errors in u and v. The root-mean-square error of D increases proportionately as the errors in u and v increase. In the interior of the Antarctic ice sheet, angle u hardly varies. Under such circumstances, a small angle v is preferred and the accurate estimation of flow direction is a prerequisite.

If the three-dimensional direction of the true flow is assumed and if a direction of the LOS displacement is not perpendicular to the glacier flow direction, the magnitude of the flow along this direction may be estimated. Furthermore, an algorithm of composing LOS measurements from two directions (e.g. ascending and descending orbits), with the assumption that ice flow is along the maximum slope (Reference Joughin, Kwok and FahnestockJoughin and others, 1998), is useful when more than one viewing direction is available.

For an ice sheet, the flow direction is dominated by the surface topography (slope and aspect), and using the DEM to determine the ice flow is straightforward. However, for ice flow on inland glaciers, especially those with widespread ice-free nunataks, the flow patterns are usually complicated (mostly in side-constrained forms) and the directions are hard to estimate. As for side-constrained ice flow, it is assumed that the horizontal component of flow direction is along the central line or parallel to its boundaries (Reference PatersonPaterson, 1994).

The boundary of ice flow could be estimated from visual features in SAR amplitude or InSAR correlation products. In SAR images, ice-flow stripes could sometimes be seen, and low-correlation areas in the correlation image usually indicate shear margins.

Error analysis

There are several error sources, including errors of spatial baseline, flow direction, residual flow phase in the DEM, atmospheric and ionospheric artifacts, and SAR penetration.

Baseline uncertainty, the main error source, has different effects on the topographic and displacement pairs. It leaves height trends in the generated DEM product from the ERS-1/-2 pair; while in the JERS-1 pair the uncertainty in baseline affects the magnitude of topography in the composite interferogram. Our attempts to reduce the baseline uncertainty include introducing DEOS (Delft Institute for Earth-oriented Space Research) precise orbit information and refining the baseline using ground-control points and the RAMP DEM for the ERS pair, and adopting a shorter baseline for the JERS-1 pair.

The error in flow direction is partly caused by the assumption of side-constrained ice flow, which is not valid everywhere. The miscalculation in flow direction thus affects the flow-speed estimate. For instance, when v = 20°, ∆v = 5° will cause a relative error of about 3% in the estimate of flow rate.

Considering only glacier motion for the tandem ERS pair, and assuming v = 0, one fringe is equivalent to ice flow at about 24 m a^–1, so 8m a^–1 is about 1/3 of a fringe. This may be hard to see in the composite interferogram, but could be an error (1/3(HA) = 18 m) for the DEM. Such an error is equivalent to about 1/19 of a fringe in the JERS-1 pair, which is negligible.

Interferogram images may exhibit artifacts due to spatial and temporal variations of atmospheric water vapor. Other tropospheric variations, such as pressure and temperature, also induce distortions, but the effects are smaller in magnitude and more evenly distributed throughout the interferogram than the wet troposphere term. Since the atmospheric humidity is quite low on the Antarctic Plateau, these atmospheric artifacts can be ignored. Ionospheric phenomena may also create local artifacts on interferograms especially on L-band InSAR, but these, too, were ignored in this research.

Another factor that might be considered for the proposed method is the different penetration of L-band and C-band radar waves in firn layers. InSAR topography generally closely follows the surface profile of ice sheets and glaciers (Reference Bindschadler, Fahnestock and SigmundBindschadler and others, 1999), yet the phase center of the radar data is typically located several meters below the surface. C-band penetration is small (1–2 m) on exposed ice, but up to 10 m on dry, cold firn. Penetration depth is 5–10 m greater for the L band, and up to 60–120 m on smooth, cold, exposed ice (Reference Rignot, Echelmeyer and KrabillRignot and others, 2001). The operation of removing topographic effects from the JERS-1 interferogram using the ERS DEM causes a residual topographic height effect (3–8 m). However, this residual height is negligible for the 333 m HA of the JERS-1 pair, since the corresponding phase is <1/40 of a fringe.

Differential result

The steps for generating a differential result are coregistration, interferogram generation, phase unwrapping and finally generation of the DInSAR result from the phase. It is obvious that precise co-registration is most important. To achieve this, two images are needed. The JERS-1 master image is used for reference and for the second we have two choices: one is the simulated SAR image from the ERS DEM and the other is the SAR image from the ERS pair.

The simulated SAR image differs significantly from a normal SAR image, especially in the featureless ice surface, which makes co-registration difficult. However, it is also challenging to co-register SAR images acquired at different bands (L and C), incidence angle (38° vs 23°) and polarization (VV vs HH).

The JERS-1 and ERS-1 SAR images selected for coregistration are illustrated in Figure 3. The appearance of the two images differs significantly, especially in the nunatak regions. The right side of the mountains, which directly faces the SAR sensor, usually appears much brighter while the other side appears darker in the JERS-1 than in the ERS-1 image. The larger incidence angle, deeper penetration and stronger volume scattering of JERS-1 SAR leads to stronger corner-reflector effects on the side facing the sensor, and a high shadowing effect on the opposite side. The glacier surface beyond the nunataks looks almost the same in JERS-1 and ERS-1 images, for instance in the right portion of the images.

High-quality co-registration can be achieved by having sufficient tie points. However, in this case, the number of tie points automatically generated by the EarthView® InSAR program is insufficient; extra tie points were identified and input manually. The ERS DEM was used to co-register the images and remove terrain distortion.

The resulting differential interferogram superimposed on TM imagery is shown in Figure 5. From the underlying TM imagery, we could interpret many of the glacial features. The nunataks (e.g. Wilson Ridge, Mount Harding, Zakharoff Ridge and Davey Nunataks) and mountains (Gale Escarpment) extend from north to south, which impedes the movement of glacier ice towards Lambert Glacier. However, the nunataks are separated and the mountain ridge of Gale Escarpment is divided into three parts (north, middle and south) with two low-elevation gaps. Surface elevation decreases from right to left.

Fig. 5. Ice flow in JERS-1 differential interferogram (the whole scene). Nunataks and mountains are in bright red. The ice branches marked as A and B curve among the nunataks and join together at C.

The glacier flow pattern is quite complicated. As we can see in Figure 5, the ice-sheet flow is divided by the three portions of Gale Escarpment. Two concentric fringes, marked as A and B, are present in the nunataks region, which indicate two ice-flow branches. They run downstream and join together at C. Outside the nunataks and to the north and south, glacier flow is less restricted, and dense fringes (high phase gradient) indicate shear margin regions bounding the range.

A subscene of the study area, ‘region A’, is investigated further (Fig. 6). Mount Harding and Zakharoff Ridge are on the lower left, and Wilson Ridge lies to the north of Mount Harding. On the right is the northern gap of the Gale Escarpment. Glacier flow curves among the gaps between separated nunataks, as seen from the concentric fringes. There is no visible fringe between Gale Escarpment (middle) and Zakharoff Ridge, which means little or no motion occurs here. The densities of the fringes are much larger along the boundaries of the glacier, which indicates shear zones where flow changes rapidly. Field expeditions report that crevasses are widespread here.

Fig. 6. Ice flow in JERS-1 interferogram (region A). The look direction of SAR is marked. The overall flow direction of the glacier is from right (east) to left (west).

Ice-flow field

The glacier center line, with four tangential vectors indicating the flow direction, is shown in Figure 6. The angle between the vector and the look direction of SAR is v (see Fig. 2). Of the four sites (a–d), the value of v is largest at d, where InSAR is the least sensitive to glacier flow. The much sparser fringe at d is coincident with that.

Calculating from the ERS DEM, the average slope along the center line is <2.5°. Therefore, ice flow is assumed to be horizontal for simplicity. In order to obtain the absolute flow velocities, one or more ground points with known flow velocities are needed. Since no in situ flow measurements have been taken in this area, we work outward from the fixed nunataks.

The ice is generally taken to move at constant velocity in inland Antarctica (that is, without seasonal variations), so the measured glacier displacement during the 44 day JERS-1 cycle is used to calculate the annual displacement. Using Mount Harding as zero reference, the peak of phase fringes is about five rings near site b. Each circle denotes a LOS displacement of 11.75 cm, so the horizontal flow velocity at site b is about 7.91 ma^–1.

After phase unwrapping, the slant-range change product is generated. Based on a grid-based (3 × 3) algorithm, the change value is multiplied by the transformation coefficients calculated from the aspect of ice flow and the local incidence angle of the SAR system on each gridpoint. The resulting grid file contains information on both flow direction and flow speed.

The ice-flow field of the Grove Mountains is illustrated in Figure 7. The AMM RADARSAT mosaic of the area is set as the background, over which is laid the composite of TM imagery and differential interferogram. The uppermost layer is the ice-flow vectors (indicated as arrows).

Fig. 7. Flow velocity map in the Grove Mountains. The lower-left arrow mark is a referential length of the flow vector at 10ma ¹. The background image is from the AMM RADARSAT mosaic.

The maximum flow rates of the two branches that curve inside the nunatak region are about 8ma^–1, while the velocities are >10 m a^–1 where ice flow is outside the nunataks region and, thus, less obstructed.

The available flow velocity results given by other methods are introduced for comparison and interpretation.

Using the method of speckle matching and interferometry with 24 day repeat-pass RADARSAT imagery acquired in 2000, Reference JoughinJoughin (2002) estimated the ice-flow field of the whole Lambert Glacier–Amery Ice Shelf. From the resultant image, the ice flow in this region is about 10 m a^–1. Beside that, about 60 km east of the research area, along the Chinese and Australian inland traverse route, scientists measured the flow velocities by repeating GPS observations on established poles (Reference Manson, Coleman, Morgan and KingManson and others, 2000; Reference Wang and ChenWang and others, 2001). The coordinates and flow rates of seven GPS points east of the Grove Mountains are given in Table 2. They are also marked in Figure 7. The distribution of the seven flow vectors and pattern of flow stripes surrounding the nunataks region as seen in background SAR imagery indicate the obstructing effect of the Grove Mountains on ice flow. At four sites (LGB61, DT063, LGB60 and DT085) just upstream of the Grove Mountains, the flow rates are around 8ma^–1. This is coincident with the maximum flow rates amidst the nunatak groups revealed by DInSAR. Flow rates at the other three sites (DT038, LGB62 and LGB59) are greater; at DT038 and LGB62, the flow rates exceed 20ma^–1.

The RAMP result and the GPS-surveyed flow rates indicate that the DInSAR results are reasonable, and that the integrated four-pass DInSAR using JERS-1 and ERS-1/-2 data is a good method for complex inland ice flow.