Porosity characteristics of atmospheric ice

Figure 4 presents a reconstruction of the scan of two samples, one from the leading edge (sample 0) and one from the stagnation point (sample I). These reconstructions show the ice sample produced during the extraction process as well as its internal structures. The porosity of all samples is <1%, which, according to percolation theory, implies that it is impossible to form channels between the pores. The representation of the samples in Figure 4 confirms this theory since no channels are observed. This means that the airflow over the ice accretion does not penetrate the ice layer, which is an important result for aerodynamic numerical simulations because it simplifies the treatment of the ice geometry as a closed surface. The sample location and the porosity are displayed in Table 3. The mean porosity for each location (0.319% for the leading edge and 0.537% for the stagnation line) suggests that the porosity is higher in the stagnation line than in the leading edge. We conducted a t-test to prove that the difference in the porosity between the two locations is statistically significant (Student, Reference Student1908). The test considered the number of samples, the mean value, the standard deviation (0.134% for the leading edge and 0.258% for the stagnation line) and a confidence interval of 95%. Under these conditions, the higher porosity in the stagnation line was confirmed. The pore diameter distribution, presented in Figure 5, provides additional information about the ice. This plot also shows the resolution limit and cumulative porosity. The pore size distribution for both locations is similar and follows a log-normal distribution presented by the black bold line in the figure. The resolution limit of our measurements is indicated by the striped bar. Even though we were not able to capture the smallest pores in the samples, the cumulative porosity proves that the contribution of these pores to the overall porosity of the samples is negligible and that increasing the resolution of the measurements would not have an impact on the overall porosity estimation. On the other side of the cumulative porosity curve (for an equivalent diameter >150 μm) the steep behaviour in the curve suggests that a single sample does not capture enough pores to be representative. This issue is overcome by scanning several samples on each position.

Fig. 4. Tomographic reconstruction of samples from the leading edge (sample 0) and the stagnation line (sample 1).

Fig. 5. Pore size distribution, cumulative porosity for samples (discontinuous line), median pore diameter (mpd) and resolution limit (striped region) from the leading edge (sample 0) and the stagnation line (sample 1).

Table 3. Location and porosity of each sample

Table 4 shows the mean pore diameter, median pore diameter and MVD from the pores distributions and the IWT cloud droplets. The median pore diameter lies at around 37.9 μm for the stagnation line and around 33.1 μm for the leading edge. These values are in the same order of magnitude of the size of the droplets of the wind tunnel cloud, which is expected when a spray impacts a water surface according to Kalantri and others (Reference Kalantri, Roisman and Tropea2006). Nevertheless, large discrepancies appear in the mean volume diameter, which are produced by the presence of large pores.

Table 4. Comparison of mean diameter, median diameter and MVD for cloud conditions and two ice samples

Local impact conditions

We compared the impact conditions on the leading edge and the stagnation line using the results of the shadowgraphy approach. Figure 6a shows an example of the images used to estimate the droplet impact conditions. The figure shows only a few droplets because the field depth of the set-up is <2 mm and droplets out of the focal plane cannot be detected. The time interval between the two positions of the droplet is 5 μs. We estimated the velocity and the angle of impingement on the surface using the distance travelled by the droplet during this time and its trajectory. We considered a droplet with a 32 μm diameter for the leading edge and a droplet with a 50 μm diameter as a representative droplet for the stagnation line. The velocities obtained were 37.4 and 37 m s⁻¹, respectively. We estimated 20° and 22.2° impingement angles at both locations. The velocity and the angle of impact suggest that the local droplet impact conditions are similar in both positions, which is in agreement with the similarity in the pore size distribution presented in Figure 5.

Fig. 6. Visualisation of the ice layer on the model (a) including a corona splash resulting from the impact on a water film (b).

We calculated the number of droplets in 1 cm³ about to impact the surface of the model, taking into account the LWC of the icing cloud and the mean volume diameter of the droplets in it. A droplet with a diameter equivalent to the MVD of the cloud (40 μm) would have a mass of 3.35 × 10⁻⁸ g. An LWC of 0.64 g m⁻³ means that ~18 droplets would be present in each cm³. Given an airflow velocity of 50 m s⁻¹, ~90 000 droplets impact 1 cm² each second. This estimation applies for the leading edge and the stagnation line.

We explained the difference in the porosity estimation between the two locations by addressing the local pressure produced by the flow on the model. Previous investigations showed that the surrounding air pressure plays an important role in promoting or damping the splash upon impact on dry surfaces (Xu and others, Reference Xu, Zhang and Nagel2005). Furthermore, higher ambient pressure reduces the chances of the existing air bubbles leaving the water film after they have formed. By definition, the local pressure on the stagnation point is the highest pressure in the entire model. The local pressure on the leading edge region was estimated to be 5500 Pa lower than that on the stagnation line. In our findings, larger pressure correlates with larger porosity.

Origin of the pores observed in the samples

Several processes relating the freezing of water, droplet impact and air entrapment have been studied previously. All of these processes could account for the porosity we found in our measurements. The freezing of water over a surface produces the appearance of air bubbles in the frozen structure. The origin of these bubbles is the dissolution of air present in the water. It was shown by Carte (Reference Carte1961) that the size of the bubbles produced by the dissolved air is difficult to estimate because it depends on several factors, including the freezing rate and the amount of dissolved air in the water among others. This mechanism was also observed by Schremb and others (Reference Schremb, Roisman and Tropea2017), who studied the presence of air inclusions on an impinged supercooled droplet on a dry surface. Nevertheless, our visualisation (Fig. 6b) shows a lamella spreading from the impact location and forming a crown. This is a typical structure of high-speed impacts on wetted surfaces (Burzynski and Bansmer, Reference Burzynski and Bansmer2018), demonstrating the presence of water over the ice layer. The impact on the wetted surface causes other types of air entrapment that could explain the size of the pores we found in our samples. Different approaches used to estimate the size of the entrapped bubbles are shown in Table 5. Droplet impact on wetted surfaces entraps more air than on dry surfaces since the impacting drop interacts with a free interface of the same liquid, promoting cohesion. If the depth of the liquid phase on the surface is large enough, a crater filled with air is formed by the impacting droplet. If not, other air entrapment mechanisms take place, such as the torus-like bubble break. The size of the entrapped bubbles in such impacts has been quantified by several studies. Unfortunately, one of the limitations of our study is that we were not able to estimate the thickness of the water layer to narrow down which kind of interaction is taking place. Most of the related studies deal with a low-speed impingement and larger impacting droplets than the ones used in our experiments. Despite these differences, we can extract trends and rough estimations of the size of the air bubbles produced by the impact of droplets on surfaces.

Table 5. Air bubble diameter (D _b) from different water impact studies considering air bubble volume (V _b), impact droplet volume (V _drop), diameter (D _drop), radius (R _drop), Stokes number (St) and impact velocity (U)

Thoroddsen and others (Reference Thoroddsen, Etoh and Takehara2003) reported air bubbles entrapped between the droplet and the water layer with a volume of ~2% of the volume of the impacting droplet. In our case, assuming a droplet of 40 μm, the entrapped bubbles would have a size of 5.4 μm. Weiss and Yarin (Reference Weiss and Yarin1999) quantified the size of the bubbles produced by other entrapment mechanisms, such as the torus-like bubble break. In this case, it was estimated that the air bubble radius is 2 × 10⁻³ times the radius of the impacting droplets. For our 40 μm droplet, the bubbles would be around 0.1 μm in diameter. Hendrix and others (Reference Hendrix, Bouwhuis, van der Meer, Lohse and Snoeijer2016) suggested a universal scaling for the ratio between the volume of the impacting droplet and the air bubble depending on the Stokes number of the impacting droplet. According to this scaling, our conditions produce air bubbles with an approximate diameter of 2 μm. Recently, San Lee and others (Reference San Lee2020) suggested a relationship between the impingement velocity and the radius of the entrapped bubble. This results in an air bubble diameter of 0.4 μm for a 40 m s⁻¹ velocity impact. All the estimated sizes of the air bubbles reported by previous studies are well below the resolution we can achieve with our scanning techniques.

Moreover, the amount of droplets impacting the ice layer (90 000 cm⁻² in 1 s) suggests that several droplets impact the surface within a short period of time, which is not the case in the studies mentioned, where one isolated droplet impinges on a wetted surface. This phenomenon is comparable to the impact of a spray on a wetted surface. Kalantri and others (Reference Kalantri, Roisman and Tropea2006) studied this case, showing that the size distribution of the air bubbles entrapped (between 20 and 50 μm) is similar to the droplet distribution produced by the spray (between 30 and 40 μm). Furthermore, the pore size distribution in our samples follows a log-normal distribution, which is commonly observed in the study of atomisers and the characterisation of the droplets forming the spray (Nasr and others, Reference Nasr, Yule and Bendig2002). Given the resolution of our measurements, we were not able to identify pores which might be produced by individual droplet impingement. Nevertheless, the pore size distribution and the number of droplets impacting per second suggest that the accumulation of water on the model might be addressed as a spray phenomenon, rather than individual droplet impingement. A spray impact would also change the structure of the water film, creating undulations on the film and thus increasing the amount of air entrapped. These undulations and water film deformation interacting with a rough ice surface could also explain the presence of larger pores, which cannot be directly related to the impact of a spray on a water film.