Experiment

A block of 30 × 30 × 30 cm³ of homogeneous natural dry snow was extracted from the snow cover at 2540 m altitude in Davos, Switzerland. The experiment was prepared in a large box (50 cm wide, 100 cm long) with insulated walls and an electrically heated and temperature-controlled bottom plate. First, the bottom was covered with a 2 mm thick solid ice layer. Then the block was placed and cut to a height of 20 cm. Around the block, the box was filled up to a height of 20 cm with sieved snow to allow homogeneous temperature conditions. The temperature at the bottom was set to −15°C, and the air temperature to −25°C, causing a temperature gradient of 50 Km⁻¹ through the snowpack. Temperatures at the top and bottom of the block were measured with temperature sensors (iButton DS1921 L, Maxim Integrated Products) with an accuracy of ±0.5°C.

A first sample was extracted from the natural snow block (Group 1) before being submitted to the temperature gradient. Afterwards, five samples were extracted after 1, 2, 4, 6 and 12.5 weeks. The samples were always cut out 10 cm below the top of the block. The same procedure was used for samples of sieved snow (Group 2), with a total of five samples after 0, 1, 4, 6 and 11.5 weeks (the last sample was collected 1 week earlier than the last Group 1 sample). The same snow as in Group 1 was used for sieving. The initial snow of Group 1 was classified as partly decomposed precipitation particles, and the initial snow of Group 2 as wind-broken precipitation particles (Reference FierzFierz and others, 2009). The initial structural properties of the two groups at t = 0 week are shown in Figure 2.

Once extracted, the samples were scanned with the μCT to measure the geometrical properties of the microstructure and afterwards filled with diethyl phthalate (CAS 84-66-2) to make thin sections and analyze the c-axis orientations (fabric) with the AITA.

X-ray tomography and microstructural parameters

The technique used in the present study has been described elsewhere (Reference Kaempfer, Schneebeli and SokratovKaempfer and others, 2005; Reference Riche and SchneebeliRiche and Schneebeli, 2010). We therefore summarize the main characteristics briefly. The 10.8 mm height of each sample was scanned in a 36 mm diameter probe in a micro-CT 80 (Scanco Medical). The 3-D image resolution was 18 μm. Image Processing Language (IPL) was used to segment the 3-D images. A block of 600³ voxels (10.8³ mm³) was extracted at a fixed position of the μCT measurement. A Gaussian filter was used on this volume (sigma = 1, support = 2), then an adaptive threshold was applied to segment the image between air and ice. Grain thickness Th, pore size Sp, volume density and SSA were evaluated from the 3-D image, using a surface triangulation method implemented in IPL (Reference Hildebrand and RüeseggerHildebrand and Rüegsegger, 1997; Reference Hildebrand, Laib, Müller, Dequeker and RüeseggerHildebrand and others, 1999). To calculate the degree of anisotropy of the structure (DA-S), the orientation and area of the triangles were calculated (Reference Hildebrand, Laib, Müller, Dequeker and RüeseggerHildebrand and others, 1999). A polar histogram with 30° bins was calculated based on the area and orientation of the triangles. A second-order tensor was calculated from the histogram. DAS is then the ratio between the major and minor eigenvalues. The structure is isotropic when DA-S = 1 (Reference Thorsteinsson, Kipfstuhl and MillerThorsteinsson and others, 1997; Reference Hildebrand, Laib, Müller, Dequeker and RüeseggerHildebrand and others, 1999; Reference Schneebeli and SokratovSchneebeli and Sokratov, 2004).

Thin sectioning and fabric measurements

Thin sections were cut out of the impregnated samples to a thickness of 120–150 μm as described by Reference Riche, Schneebeli and TschanzRiche and others (2012). Once prepared, the thin sections were analyzed with the AITA. The AITA is an automated polarizing optical microscope G50 (Russell-Head Instruments) that determines the orientation of the c-axes of uniaxial crystals at each pixel in the field of view (Reference Wilson, Russell-Head and SimWilson and others, 2003, Reference Wilson, Russell-Head, Kunzi and Viola2007). The analyzer provides a spatial resolution of 6.5 μm per pixel and an angular resolution for the c-axis orientation of ∼3° (Reference Peternell, Kohlmann, Wilson, Seiler and GleadowPeternell and others, 2009). The impregnated thin section consists of ice crystals surrounded by diethyl phthalate (DEP). Crystallized DEP is birefringent and disturbs the observation of ice crystals under polarized light. To liquefy the DEP, a few drops of tetraline (solvent for DEP) were added at the edge of the section. We verified that this operation caused only very slight rotation or translation of a few of the smallest snow crystals. These rotations would induce errors below the range of accuracy of the AITA. Three horizontal thin sections were randomly cut out of each sample, and a total of 100–300 grains per sample were analyzed. For each pixel, the analyzer provides the orientation of the c-axis, relative to the thin section (horizontal plane), in spherical coordinates: the azimuth θ (angle in the horizontal plane, 0–360°) and the co-latitude ϕ (angle in the vertical plane, 0–180°). Based on azimuth and co-latitude, a colored image is produced (Reference Peternell, Kohlmann, Wilson, Seiler and GleadowPeternell and others, 2009). Hue indicates the azimuth. Decreasing brightness stands for decreasing co-latitude (black stands for a vertical c-axis). For each pixel, a quality factor (0–100%) is provided, which depends on how well the orientation could be determined. The raw data serve to produce eigenvalues of the orientations and to calculate the Schmidt plot, a stereo-graphic projection of the c-axes. The number of crystals in a volume can be estimated by the Rhines–DeHoff relation N_A = E_N [H]·N_V , where N_A is the number of counted crystals in the section, E_N [H] the mean particle height, corresponding to the thickness Th, and N_V is the number of particles per unit volume (Reference Baddeley and Vedel JensenBaddeley and Vedel Jensen, 2005, section 11.1.1).

The number of crystals was counted on a slice within the reference area of 8.4 × 8.4 mm² (Fig. 3). Close observation of the images showed that complex shapes of new snow, as capped columns, were split into several blobs of the same color. This also occurred for depth-hoar crystals. We counted such neighboring blobs of the same color with identical orientation as a single crystal. By combining the thickness of ice structures from μCT with the counting of crystals on the thin section, we estimate that the error in the number of crystals is <10%. We are aware that this method of counting may not be unbiased. However, the dissector technique (Reference Baddeley and Vedel JensenBaddeley and Vedel Jensen, 2005) was impossible to apply, as we cannot produce consecutive thin sections.

Processing of the fabric measurements

The raw data produced by the AITA were analyzed using a MATLAB toolbox based on Reference Durand, Gagliardini, Thorsteinsson, Svensson, Kipfstuhl and Dahl-JensenDurand and others (2006). This toolbox, originally designed for thin sections of solid polycrystalline ice, had to be adapted to snow samples. To this end, a new filter was added to the toolbox to suppress air pores. In a first step, the ‘black’ (in reality transparent and not birefringent) DEP pixels are removed by thresholding. In a second step, an opening operation is performed, which removes spurious pixels at the interface between the ice crystals and the liquid DEP. In a second step, the data are filtered following Reference Peternell, Kohlmann, Wilson, Seiler and GleadowPeternell and others (2009), and all pixels with a quality factor lower than 70% are removed. Pixels with co-latitude and azimuth equal to zero were considered as artifacts and eliminated.

Spherical data, as produced for the c-axis orientation data, are commonly analyzed by a transformation to a second-order orientation tensor (Reference FisherFisher, 1993). The tensor a ⁽²⁾ is given by

(1)

where c^k is the crystal orientation of one measured pixel of the thin section, given in spherical coordinates, ⊗ is the tensor product and N _p is the number of measured pixels in the thin section. Since the c^k values are obtained at pixel size, the definition of a ⁽²⁾ given by Eqn (1) implicitly takes into account the volume fraction of grains. The eigenvectors of a ⁽²⁾ give the axis directions of the ellipsoid containing the orientation distribution. The eigenvalues,a _1,2,3, (with 1 > a ₁ > a ₂ > a ₃ > 0 and a ₁ + a ₂ + a ₃ = 1) give the length of the three principal axes (the eigenvectors) of this ellipsoid. By definition, when the fabric is isotropic, the three eigenvalues are equal to 1/3. A single-maximum fabric is given when the majority of the c-axes of the crystals are vertical, and a girdle fabric is where the c-axes are randomly oriented in the horizontal plane (in our case the plane of the thin section). When two eigenvalues are close and smaller than 1/3, the fabric is a single-maximum fabric, and when two eigenvalues are close and larger than 1/3, the fabric is characterized by a girdle. A supplementary visualization tool which reveals the evolution and strength of the fabric is based on Reference FisherFisher (1993). Here the logarithms of the ratios a ₁/a ₂ and a ₂/a ₃ are used as ordinate and abscissa. We also defined a degree of anisotropy for the orientation (DA-O), as DA-O = a ₁/a ₃. If DA-O = 1, the distribution of the c-axis orientation is isotropic.

Evolution of the snow microstructure

The evolution of the geometrical microstructure was evaluated using the μCT images (Fig. 1). Temperature gradient metamorphism caused the snow structure to evolve from decomposed and fragmented precipitation particles (DFdc for Group 1 and DFbk for Group 2) to small rounded grains (RGsr) and to large depth hoar (DHcp).

Fig. 1. Evolution of snow structure for both groups at 0, 4 and 12.5 (11.5) weeks. The upper row shows Group 1 (natural snow), the lower row Group 2 (sieved snow). The pictures represent a vizualization of 3-D vertical slices of 10 × 10 mm² and 0.2 mm thickness.

The image of the natural snow block, Group 1, shows the preferentially horizontal arrangement of the snowflakes at week 0. The snow crystals were mainly platelets and dendrites. Small facets (edges) were observed after the first week, followed by the formation of larger facets and finally large cup crystals. This initial structure was completely dissolved after 4 weeks. The structure after 4 weeks corresponds to solid faceted particles (FCso). Pores grew much larger, and most grains were spaced at least two crystal sizes from each other (Sp_gr1/Th_gr1 ratio). After 12.5 weeks, well-defined depth hoar had formed with local chain-like structures in the vertical direction. Pores were even larger, and facets could grow unhindered at the bottom side of the structures.

The initial image of the sieved snow block, Group 2, shows no preferential horizontal arrangement of the grains. Pores were smaller than in Group 1. Again, the initial structure completely changed after 4 weeks, but facets were expressed much less than for Group 1, and the individual crystals were more rounded. Well-formed depth hoar (DHcp) developed after 11.5 weeks. In morphology, but not size, the crystals of Groups 1 and 2 were very similar.

The basic structural parameters, density, specific surface area (SSA) and grain and pore thickness, are shown in Figure 2. For Group 1, the density evolved from 178.4 kg m⁻³ at week 0, to 294.8 kg m⁻³ at week 12.5. For Group 2, it evolved from 255.7 kg m⁻³, to 369.1 kg m⁻³ at week 11.5.

Fig. 2. Evolution of density, specific surface area (SSA), structural thickness (Th) and pore size (Sp) for both groups. The estimated error in the density measurement is close to 10%.

The two snow blocks differed in density by 30%, while the SSA, as well as the thickness of the ice structures, was almost identical. Similarly, density evolved alike, increasing by ∼30% (∼100 kg m⁻³ within 3 months). SSA decreased more or less linearly by almost 50%, again alike for natural and sieved snow (Group 1: 22.1 mm⁻¹ to 9.3 mm⁻¹; Group 2: 19.9 mm⁻¹ to 9.3 mm⁻¹). The pore size of the two samples differed, however, by ∼20%. It increased steadily during metamorphism, and was, together with density, the outstanding contrast between the two samples.

Evolution of c-axis orientation

Thin sections, colored with respect to azimuth and colatitude, are shown in Figure 3. The number of crystals decreased about linearly from ∼32 mm⁻³ to ∼3 mm⁻³ for Group 1 samples, and from ∼32 mm⁻³ to ∼6 mm⁻³ for Group 2 samples. The number of crystals in Group 2 increased in the first week due to settlement of the sieved snow. Afterwards, the same decrease in the number of snow crystals was observed as in Group 1 (Table 1).

Fig. 3. Horizontal thin sections imaged by the fabric analyzer for Group 1 (natural snow) and Group 2 (sieved snow), with color-coded orientation of the c-axis. Hue indicates azimuth, darkness co-latitude. The orientation code is given by the color wheel close to the scale bar.

Table 1. Evolution of the number of crystals during the temperature gradient metamorphism experiment

The distributions of the c-axes for each block at the beginning and end of the experiment are shown in Figures 4 and 5 as Schmidt plots. The initial c-axes of the crystals were slightly more vertically oriented (concentrated in the center) for Group 1 than for Group 2. The Schmidt plot for Group 1 between the beginning and end of the experiment showed much more change than for Group 2. Below, we quantify this qualitative information using the eigenvalues of the second-order orientation tensor.

Fig. 4. Schmidt plots for Group 1 c-axis orientation data, at the beginning (left) and end (right) of the experiment. Each dot is the stereographic projection of the c-axis orientation for one pixel of the fabric analyzer raw data.

Fig. 5. Schmidt plots for Group 2 c-axis orientation at the beginning (left) and end (right) of the experiment.

The evolution of the eigenvalues is shown in Figure 6. For Group 1, a ₁ decreased continuously while a ₂ increased, toward values typical for a girdle-type fabric. In contrast, in Group 2, a ₁, a ₂ and a ₃ oscillate slightly around a constant value. For both groups, the a ₁ eigenvalues remain larger than the others throughout the experiment, so the fabric remains anisotropic. These trends were supported by fitting a linear model between time and eigenvalues. The trends were all tested for statistical significance. The p-value is the probability that the trend is significantly different from zero. In Group 1, the trends for a ₁ and a ₂ are different from 0 with a p-value <0.01, and for a ₃ with p < 0.1. The trends for Group 2 were all not different from zero, with p-values >0.5. The standard deviations for the eigenvalues (a ₁, a ₂, a ₃) were calculated following Reference Durand, Gagliardini, Thorsteinsson, Svensson, Kipfstuhl and Dahl-JensenDur and others (2006), by taking into account the effect of the limited number of grains on the estimation of the fabric parameters. This standard deviation is the same for all three eigenvalues, and was therefore only plotted for a ₁ (see error bars in Fig. 6). The higher the number of grains, the lower the standard deviation (e.g. for Group 1, at week 0 (N_a = 927), and 0.027 at week 12.5 (N_a = 171)).

Fig. 6. Evolution of the three eigenvalues of the second-order orientation tensor a ⁽²⁾ for the two groups (gr1: Group 1; gr2: Group 2). An isotropic fabric would be characterized by three eigenvalues equal to 0.33 (dotted line). Error bars show the standard deviation of the measurements at the beginning and end of the experiment. They are the same for the three eigenvalues.

The plot of the ratio between the eigenvalues (Fig. 7) differentiates the evolution between the two groups. According to Reference WoodcockWoodcock (1977), the ratio κ = ln(a ₁/a ₂)/ln(a ₂/a ₃) gives objective information about the fabric shape: κ > 1 for single-maximum fabric and κ < 1 for girdle-type fabric. For Group 1, although the fabric concentration remained weak, it evolved from a single-maximum fabric to a girdle-type fabric. The strength of the fabric orientation continuously decreased during the experiment. By contrast, the fabric of Group 2 did not evolve, as the variations in fabric are within the range of error from random variations. Note that around week 6, the fabrics of Groups 1 and 2 reached very similar characteristics, and their evolutions differentiated again thereafter.

Fig. 7. Evolution of the fabrics of Groups 1 and 2 shown as the natural logarithm of the ratio of eigenvalues. The x-axis indicates girdle-type fabric, the y-axis single-maximum fabric. Group 1 evolves from a weak single-maximum fabric towards a weak girdle-type fabric. Group 2 remains a weak single-maximum fabric. Well-expressed fabrics have values of ln(a ₁ / a ₂) and ln(a ₂ / a ₃) around 6 (as described in Reference FisherFisher, 1993, ch. 3).

The degree of anisotropy evolved alike for the structure (DA-S) and orientation (DA-O) for both groups (Fig. 8). Although the magnitudes of DA-S and DA-O differed, the curves are very close when scaled and offset. The magnitude of DA-S was about twice as small as that of DA-O. The structural anisotropy is therefore smaller than the orientation anisotropy. Both measures of anisotropy are initially large for Group 1 samples, and decreased. Note that the fabric did not evolve toward isotropy, but toward a girdle-type fabric, as the eigenvalues a ₁ and a ₂ were getting closer,corresponding to an in-plane isotropy. This anisotropy cannot be revealed by the DA-O parameter. The evolution of the DA-O of Group 2 was more scattered, although a slight tendency toward anisotropy seemed to appear, but this was not discernible from random error.

Fig. 8. Comparison of the degree of anisotropy of the structure (DA-S) and of the c-axis orientation (DA-O) for the two groups.