2.1 Study area

The study area is between Upper Bavaria (Germany) and North Tyrol (Austria), at the Zugspitze Massif, in the European Northern Limestone Alps (Fig. 1a). It has an extent of 29.6 km², a mean altitude of 2,078 m a.s.l. and fully covers in the upper parts the 11.4 km² research catchment Zugspitze. Annual average temperature therein is −4.5°C, and annual precipitation is 2,080 mm (Voigt and others, Reference Voigt2021; Weber and others, Reference Weber, Koch, Bernhardt and Schulz2021). Altitude range spans over more than 2,100 m, encompassing Mount Zugspitze, the highest peak in Germany with 2962 m a.s.l., and the valley floors down to 830 m a.s.l. Large topographic variability and complexity lead to different meteorological conditions over the entire area, originating into distinct spatiotemporal snow-cover patterns during the snow season (Weber and others, Reference Weber, Feigl, Schulz and Bernhardt2020), making this site of particular interest snow wise. Most of the area is not or sparsely vegetated. Between ~1,400 and ~2,000 m a.s.l. the area is mainly covered with mountain pines, while below 1,400 m a.s.l. mainly coniferous forests are found. There are three very small glaciers in the upper part of the catchment (see Fig. 1a), i.e. (1) northern Schneeferner, (2) southern Schneeferner and (3) Höllentalferner, with a total surface of 0.34 km² in 2018 (Hagg, Reference Hagg2022). Nevertheless, in 2022 the southern Schneeferner lost its status as glacier due to a significant decline in both thickness and extent during 2018–21, and it is projected that the remaining ice may completely melt within 2024 (Mayer and others, Reference Mayer, Hagg and Rehm2022).

Figure 1. Overview of the study site Zugspitze: (a) spatial distribution of altitude and the locations of the glaciers, examples of snow-cover maps of five different days during the season 2019/20, representing typical phases of snow-cover evolution, acquired respectively on (b) 16/10/2019, (c) 18/11/2019, (d) 12/6/2020, (e) 6/8/2020 and (f) 18/9/2020, overlapped on a satellite image of the area under investigation (Google Earth Pro, 2021). The red lines in (b–f) show the outline of the snow cover/glaciers.

The high-alpine seasonal snow-cover dynamic at the study site displays five main stages, as seen from Sentinel-2-derived snow-cover maps (Figs 1b–f; see Section 2.2 regarding satellite data description). Figure 1b shows start of accumulation. The first snowfall events of the season start typically between the end of September and beginning of October in the upper parts of the catchment. Snow cover can appear patchy if some melt occurs in this phase. Figure 1c shows extended and homogeneous SCA. This happens typically in November/December–March in the upper and mid parts, and can reach the valley floors during the high-winter season. Figure 1d displays start of snow ablation. Snowmelt starts predominantly in the mid-elevation range usually during April and May. Snow is mainly patchy in the middle parts. Figure 1e displays the end of snow ablation season. Intense snowmelt with patchy snow in the upper parts occurs in June and July. Figure 1f show snow-free period. August and September are mainly snow free, with occasional snowfall events, with snowpack usually not reaching until autumn. The three glaciated areas are visible with bare ice or firn.

2.2 Satellite-derived snow-cover maps

For the snow-cover mapping exercise in this study, we used Copernicus Sentinel-2 images from the European Space Agency (ESA), available as level 2A product (atmospherically corrected) in the area of investigation, since November 2016. The multispectral images with visible, and near to shortwave infrared bands, were downloaded through the EO Browser of Sentinel Hub (EO Browser, 2022), supported by the ESA. We considered a 5 year time period during November 2016–October 2021, and we selected 129 images (excluding images with cloud cover), distributed in time as shown in Figure 2. The images originally come in a spatial resolution of 10 m in the visible bands, and 20 m in the shortwave infrared bands. However, the Sentinel Hub performs a downscaling procedure as due to WGS84 projection, achieving a value of 6.78 m for the 16-bit TIFF image downloaded within the area of investigation. The identification of SCA was carried out using the NDSI, with a threshold of NDSI ⩾0.42, based upon the Scene Classification algorithm developed by ESA, specifically for Sentinel-2 images (ESA, 2023). Notice that in this study shadows were blind spots. However, more sophisticated algorithms for snow-cover detection in satellite images, e.g. based on machine learning (Barella and others, Reference Barella, Marin, Gianinetto and Notarnicola2022) could help to extent the investigated area.

Figure 2. Sentinel 2 - L2 products monthly availability (excluding images with cloud cover) in the study area for the period between November 2016 and October 2021.

2.3 Snow-cover pattern descriptors: Minkowski numbers and average CL

To quantitatively describe snow-cover patterns, we used two indexes, i.e. (1) MN and (2) CL, which have been recently used to describe morphological features of different binary patterns.

MNs are morphological descriptors related to curvature integrals, which characterize extent, shape and connectivity of spatial patterns (Mecke and Klaus, Reference Mecke and Klaus2000). This set of morphological descriptors was successfully used to quantify complex binary objects, as well as their temporal dynamics (e.g. Schlüter and Vogel, Reference Schlüter and Vogel2011), and it has been applied in a variety of fields, in particular in soil sciences (e.g. Vogel and others, Reference Vogel, Hoffmann and Roth2005), but also for snow microstructure analysis (Schleef and others, Reference Schleef, Löwe and Schneebeli2014). For a two-dimensional (2-D) space it is possible to compute three MNs (Parker and others, Reference Parker2013), i.e. (1) total area of the pattern (MN1), i.e. the total extent of the snow-covered parts, (2) total perimeter of the pattern (MN2), i.e. the total length of the boundary between SCAs and no-snow areas and (3) Euler number (MN3). MN3 is given by the difference between the convex elements and the concave elements of the pattern, giving information on the connectivity between the elements of the pattern (thus the degree of homogeneity and clustering). In plain words, if a pattern is mainly composed of isolated convex objects, MN3 is a positive value, and describes the number of elements in the pattern. If a pattern is a connected network MN3 is a negative value, and the absolute value describes the number of meshes in the network (Vogel and Babel, Reference Vogel, Babel, Benckiser and Schnell2006). MN3 is given as

(1)$${\rm MN}3( X ) = \displaystyle{1 \over {2\pi }}\mathop \smallint \limits_X^\;\left[{\displaystyle{1 \over R}} \right]dc\;\;$$

where X is the pattern, R is the radius of curvature of the circumference of a single object in the pattern and dc is an infinitesimal element of the circumference of the object (Vogel and others, Reference Vogel, Hoffmann and Roth2005). To compute the MNs for the snow-cover patterns, we used the QuantImPy Python package (Boelens and Tchelepi, Reference Boelens and Tchelepi2021). Intuitive examples of the MNs computed on synthetic binary patterns are shown in Figure 3a.

Figure 3. (a) Examples of MNs of different synthetic patterns with white circular elements of different radius, r, belonging to an area of 100 cm². (b) Schematic of CL measurements for cross sections of two-components random patterns. The chords are defined by the intersection of lines with the two-components interface. In the examples, two lines of segments in vertical and horizontal directions are represented.

CL distribution p(z) is a probability function associated with one of the two components of a binary pattern. It has a direct relationship with the morphology of a pattern, and therefore it is a useful tool to describe complex binary structures (Roberts and Torquato, Reference Roberts and Torquato1999). The CL distribution describes the probability p_i(z)dz that a randomly selected chord identified in the component i (defined as a segment starting and ending at the boundary between the two components, see Fig. 3b) is characterized by a length in the range [z, z + dz] (Roberts and Torquato, Reference Roberts and Torquato1999). All segments spaced by a given distance and orientated in the same direction are selected; different distance and orientations can be considered, in this case we decided for a distance of one pixel and vertical orientation (i.e. parallel to the north–south axis). The average CL is the first moment of the distribution, which is used in the study as a representative index, since it provides an estimation of the length scale associated with the elements of the component i (Schlüter and Vogel, Reference Schlüter and Vogel2011). The calculation of CL was carried out through the PoreSpy Python package (Gostick and others, Reference Gostick2019), originally designed to extract information from 2-D and three-dimensional (3-D) images of a porous material.

2.4 Topographic descriptors

The topography of the area was calculated from a 1 m DEM (LDBV, 2022) resampled to 6.78 m (resolution of snow-cover maps). We considered topographic descriptors of altitude, aspect, slope and curvature. Altitude is a main driver for snow accumulation and ablation: because of the temperature gradient, at the highest altitudes snow-cover accumulation starts earlier in the season, and lasts longer, often leading to a deeper snowpack. Aspect becomes especially significant during snow ablation, and needs to be considered due to both different effects of solar radiation, i.e. north-facing slopes are more shaded than south-facing slopes, and different effects of wind, i.e. leeward slopes are more subjected to snow accumulation then windward slopes (Lòpez-Moreno and others, Reference López-Moreno2013). The area of interest includes cells with aspect in almost all directions. We considered two components of aspect, i.e. (1) along the north–south direction and (2) along the east–west direction. This means their values increase monotonically with exposition to solar radiation. Accordingly, such components of aspect are more clearly related to snow processes: higher values indicate lower exposure to solar radiation, and often deeper and more extended snowpack, while lower values indicate vice versa. Slope and curvature mainly affect snow deposition due to gravitational transport. Slope is the inclination of the ground to the horizontal, and it is related to the local effect of gravity (Rowbotham and others, Reference Rowbotham, Scally and Louis2005), affecting processes such as deposition, and lateral snow transport (Bernhardt and Schulz, Reference Bernhardt and Schulz2010; Bombelli and others, Reference Bombelli, Confortola, Maggioni, Freppaz and Bocchiola2021); steeper slopes have generally thinner snow cover. Curvature is the convexity/concavity of the ground, with implications in the acceleration/deceleration, and convergence/divergence of materials like snow, affecting erosion and snow deposition (Hanzer and others, Reference Hanzer, Helfricht, Marke and Strasser2016). Convex features were attributed to positive values up to +1 and concave features to negative values down to −1. Histograms with the frequency distributions of each topographic feature are shown in Figure 4.

Figure 4. Frequency distribution of the topographic features in the study area: (a) altitude, (b) aspect (classes are defined as follows: north: −22.5° to 22.5°, north–east: 22.5–67.5°, east: 67.5–112.5°, south–east: 112.5–157.5°, south: 157.5–202.5°, south–west: 202.5–247.5°, west: 247.5–292.5°, north–West: 292.5–337.5°), (c) slope and (d) curvature.

2.5 Method for spatial correlation of morphology of snow-cover pattern and topographic descriptors

To assess the correlation level between snow-cover features as quantified with MNs and CL (Section 2.3) and the chosen topographic characteristics (Section 2.4), we calculated the spatial distribution of the morphological indexes and the topographical features within the entire area of investigation. To do so, we developed an algorithm to compute MNs and CL across a moving window upon the snow-cover maps. The moving window needs to be (1) large enough to cover a snow-cover pattern, representative of local geometry, and topology of snow distribution, and still (2) small enough to be represented by spatially averaged topographic indexes. To identify (a range for an) optimal window extent, a qualitative sensitivity analysis was performed. We computed the MNs in multiple areas within the catchment, using different side lengths ranging between 50 m and 1 km, during October 2020–September 2021. We then visually compared the resulting time series in order to identify the smallest window size that could still capture a representative snow pattern. Based on this analysis, we established that, for the purpose of this study, a window size of 250 m × 250 m was the minimum extent required to identify most significant temporal variations in the spatial distribution of the snow pattern morphologic indexes. This size was effective in capturing changes, both during the onset of winter accumulation and during the melting phase in spring/summer, while also effectively describing the local topographic features. Smaller window extents were found to capture poorly the spatiotemporal variability of snow-cover patterns. On the contrary, larger window sizes, although capturing well the variability of the indexes in time, were less representative of the underlying topography. Thus, using larger windows result in lower (estimated) correlation values between the indexes and topography. We believe that a window size of 250 m × 250 m is an optimal choice for our study, since it balances capturing significant temporal variations in snow-cover patterns, while adequately describing local topographic features. It is important to highlight that the optimal window size is influenced by the topographic characteristics of individual mountain regions. In areas with higher topographic variability, a smaller window size is required to represent the ground sufficiently, whereas in regions with lower topographic variability, a larger window size is beneficial to encompass less frequent changes of snow-cover patterns. In this regard, for future studies, the choice of the moving window size could be optimized using statistical algorithms, which take into consideration the prevailing topography and the magnitude of the geometric features of the snow-cover patterns. The outputs of the moving window approach are four raster files, displaying the spatial distribution of the four snow-cover pattern descriptors, MN1–MN3 and CL, for each of the snow-cover images. To link snow-cover patterns to topography, the same moving window frame was applied to compute a spatial average of the topographic descriptors. Examples of the spatial distribution of the morphological indexes, together with the distribution of the spatially averaged topographic descriptors are shown in Figure 5. Spatial correlation was quantified through Spearman rank correlation coefficient (ρ). Spearman's ρ is a non-parametric measure, and it quantifies strength and direction of a (monotonic) relationship between two variables, without an a priori functional assumption (e.g. a linear relationship).

Figure 5. (a) SCA of 21/09/2017 (top) and 16/10/2017 (bottom) and the corresponding spatial distribution of the morphological indexes: SCA (MN1), perimeter of the snow cover (MN2), Euler characteristic of the snow cover (MN3) and average chord length of the snow cover (CL). White areas regarding MN1, MN2, MN3 and CL represent no calculated morphological value either due to no or full snow coverage in the moving window frame. (b) Spatial distribution of the averaged topographic descriptors in the area of study. A moving window algorithm with a window extent of 250 m × 250 m was applied to compute the morphological indexes (a) and to average the topographic descriptors (b).