4.1. InSAR coherence

InSAR coherence determines the statistical noise of the phase in an interferogram between two SAR images (Michel and Rignot, Reference Michel and Rignot1999; Frey and others, Reference Frey, Paul and Strozzi2012). The coherence of two images S ₁ and S ₂ can be calculated by averaging over M × N pixels (coherence window) in the image dimensions m × n, mathematically defined as

(1)$$\vert \gamma \vert = \displaystyle{{\sum\nolimits_{m = 1}^M {\sum\nolimits_{n = 1}^N {S_1(m,n)S_2^* (m,n)} } } \over {\sqrt {\sum\nolimits_{m = 1}^M {\sum\nolimits_{n = 1}^N {{\left \vert {S_1(m,n)} \right \vert }^2} } \sum\nolimits_{m = 1}^M {\sum\nolimits_{n = 1}^N {{\left \vert {S_2(m,n)} \right \vert}^2} } } }}$$

(López-Martinez and Pottíer, Reference López-Martínez and Pottier2007). $S_{2}^{\ast}$ is the complex conjugate of S ₂.

If other decorrelation effects like thermal noise, geometric or volume decorrelation (Li and others, Reference Li, Guo, Li and Wang2001; Atwood and others, Reference Atwood, Meyer and Arendt2010) are neglected, a coherence value of 1 signifies maximum stability, while 0 shows complete temporal decorrelation of the surface between the two acquisition dates. In the case of the glacier, movement or melt processes cause decorrelation resulting in low coherence, but also supraglacial lakes and ponds can induce local decorrelation. The first two parts of Fig. 2 show the proposed processing chain for estimating coherence from the three different SAR sensors, including the intermediate processing steps (multi-looking factor, co-registration, interferogram formation, optional filtering and topographic phase removal and geocoding). The multi-looking factor (MLF) is the numerical factor by which an input single look complex (SLC) SAR image is averaged in slant-range and azimuth directions. In our processing chain, the resulting SAR amplitude image is used to determine the output resolution of the multi-looked complex interferogram generated from the two co-registered SLC images without further resampling. Before interferogram generation, we co-registered the InSAR image pairs using a cross-correlation optimization technique (Werner and others, Reference Werner, Wegmüller, Strozzi and Wiesmann2005). In case of TerraSAR-X and ALOS PALSAR data, with a co-registration accuracy of around 0.2 pixel, the temporal decorrelation should not be biased by more than 5% (GAMMA, Reference GAMMA2011). Due to a highly variable doppler centroid throughout the image, a comparable higher co-registration accuracy is required in case of Sentinel-1 IW mode using Terrain Observation with Progressive Scans SAR (TOPSAR). Sentinel-1 IW data consist of three sub-swaths, each of them consisting of several bursts. Therefore, a special procedure for co-registration and a de-bursting step is necessary to join all burst data of Sentinel-1 (Veci, Reference Veci2015). We processed Sentinel-1 data without multi-looking in open source Toolbox SNAP provided by ESA. After co-registration, the complex interferogram as the pointwise complex multiplication of corresponding pixels in the co-registered InSAR pairs was calculated (Touzi and others, Reference Touzi, Lopes, Bruniquel and Vachon1999). The subsequent coherence estimation measures the phase noise in the interferogram. Therefore, besides the scattering properties of the target, system and sensor parameters (wavelength, slant range resolution, interferometric baseline, incidence angle, system noise) have an impact on the decorrelation (Frey and others, Reference Frey, Paul and Strozzi2012). To minimize the effect of volume scattering by different surface properties and to extract the temporal change, we used summer scenes where seasonal snow is not present in the ablation area.

Fig. 2. Processing chain to derive glacier outlines using InSAR coherence, slope and morphological operations. The processing chain was implemented in GAMMA (except Sentinel-1 without topographic phase removal in Fig. 4e was performed in SNAP). The post-processing and accuracy assessment for every case was carried out in R. Background image(p7-p9): © CNES/Airbus DS (2008-01-15).

Topographic decorrelation depends on the baseline and the local slope and generates non-stationarity of the phase within the coherence estimation window (Lee and Liu, Reference Lee and Liu2001). Therefore, previous authors suggested subtracting the topographic phase from the complex interferogram in order to account for such effects (Atwood and others, Reference Atwood, Meyer and Arendt2010; Jiang and others, Reference Jiang, Liu, Wang, Lin and Long2011). However, we determined the coherence directly from the complex interferogram and in the second step from a differential interferogram where we subtracted the topographic phase simulated by SRTM C-band DEM. Voids in the SRTM DEM were filled with zero in order to have no influence on the topographic phase. Our processing chain was not successful after topographic phase removal at the date of our image processing in SNAP. However, we managed the removal in GAMMA software, but only with a too high MLF for a useful delineation. Nevertheless, the results are shown for every scenario to point out the strong influence of the resolution before coherence estimation. In Table 3, the different combinations of MLF, topographic phase removal and coherence window sizes, presented in this study, are listed. In the first section of results, we present the outlines for TerraSAR-X for different resolutions and coherence window sizes. In the second section, we compare different radar frequencies (X-, C- and L-band) for which we produced coherence images of the same ground resolution (15 m) by varying the MLF to match the output resolution.

Table 3. Values of different parameters for coherence estimation in case of TerraSAR-X (TSX), Sentinel-1 (S-1) and ALOS PALSAR (Palsar) data. The corresponding figure number for every combination is listed

4.2 Methods for post-processing

Following the processing chain proposed by Atwood and others (Reference Atwood, Meyer and Arendt2010), coherence and slope thresholds were applied. Bolch and others (Reference Bolch, Buchroithner, Kunert and Gomarasca2007) reported a maximum average slope of 10° for the debris-covered parts of the Mount Everest region in ASTER DEM. Paul and others (Reference Paul, Huggel and Kääb2004) applied a maximum gradient of 24° for Oberaletschgletscher in the Swiss Alps. Therefore, we applied a slightly higher threshold of 30° similar to Atwood and others (Reference Atwood, Meyer and Arendt2010) to hold validity for all regions. Every pixel with a coherence value of <0.2 and a slope value up to 30° was classified as a glacier pixel. In case of Yazgyl Glacier, slope values up to 15° occur even at almost flat (mean slope of ~4°) debris-covered parts, possibly due to ice cliffs. This requires a higher slope threshold than the mean slope value. From the coherence and slope thresholding, we obtained a binary mask consisting of two classes - glacier and no-glacier (p2 in Fig. 2). We subsequently applied binary morphological operations that consist of opening and closing patches based on their sizes (Haralick and Shapiro, Reference Haralick and Shapiro1992). One patch is generally a number of connected pixels of one class (e.g. patch of no-glacier pixels within the glacier surface and patch of glacier pixels outside of glacier surface). For this, we defined the kernel size referring to the number of pixels in both directions in a two-dimensional space. In the closing operation, the patches smaller than the kernel are filled whereas, in the opening operation, patches smaller than the kernel are deleted. In an initial step, we applied a closing operation with a smaller kernel size to include real glacier pixels in close proximity to the main glacier, but to avoid integration of wrong patches (p3 in Fig. 2). In the next step, we performed an opening operation with a larger kernel size to delete wrong patches (p4 in Fig. 2). Finally, the larger kernel size was used for a second closing iteration to fill most of the holes within glacier (p5 in Fig. 2). In one processing path, we masked out layover and shadow areas (p6 in Fig. 2) before converting the raster binary mask into a vector format (p7 in Fig. 2) to give also corrected error values (Fig. 4g). All post-processing steps with associated parameters are illustrated in the third part of Fig. 2.

4.3. Accuracy assessment

We compared our glacier outlines, derived from different sensors and processing parameters, with the reference data. We created a buffer zone of 500 m (white polygon in Fig. 1, p8 in Fig. 2) for the assessment. We distinguish four cases (p9 in Fig. 2): (a) ‘true positive’ refers to the intersection of measured glacier area and the glacier area from the reference dataset (correctly classified). (b) ‘True negative’ refers to pixels that were classified as no-glacier in both the cases (correctly not assigned). (c) ‘False negative’ shows the area classified as glacier only by the reference dataset and (d) ‘false positive’ refers to the glacier area mapped by our processing only. It is quite evident from visual inspection that the reference datasets do not detect the debris-covered part or miss large parts of it. Therefore, the ‘false positive’ area mainly appears in this part of the glacier. We adapted nomenclature from statistical hypothesis testing and defined a type II error which refers to the ratio of ‘false negative’ area and the glacier area from the reference dataset (in contrast to type I error which refers to the ratio of ‘false positive’ area and the glacier area from the reference dataset and is in our case no real ‘error’). When possible, we estimated the type II error twice, firstly considering the whole ‘false negative’ area and secondly the corrected ‘false negative’ after masking out the area influenced by layover and shadow. Areas of layover and shadow show mostly low coherence values, but it is not possible to gain any information about the surface. Therefore, we excluded these areas in the second step of error calculation (named ‘corrected’ error) for a better comparison between the sensors. Our results in Fig. 4g show that in case of Yazgyl Glacier the difference is negligible. As this may not be the case for other study sites and only the error including layover and shadow areas is measuring the overall performance, combining data from different image directions should be considered in this case.

4.4. Velocity measurements

Additionally, we exploited the high-resolution TerraSAR-X scenes for surface velocity measurements. We performed SAR offset tracking over already co-registered InSAR image pair using a cross-correlation optimization technique (Strozzi and others, Reference Strozzi, Luckman, Murray, Wegmüller and Werner2002; Seehaus and others, Reference Seehaus, Marinsek, Helm, Skvarca and Braun2015). A window of 128 × 128 pixels (~251 m × 116 m) patch size with a step size of 25 × 25 pixels (~49 m × 23 m) was used to calculate azimuth and slant range displacements. The erroneous displacement values were discarded using an algorithm defined by Burgess and others (Reference Burgess, Forster, Larsen and Braun2012). This algorithm discards a displacement vector if its orientation differs by a certain threshold from the average orientation computed over surrounding pixels.