Effect of pressure on final density

Figure 2 shows the effect of pressure on the final densities with an initial density ranging between 550 and 610 kg m⁻³ for samples sintered at various temperatures for 60 min. The plotted initial and final density was averaged from three replicates with std dev.. The diameter, initial and final average height of all samples are 2.6 (same as the inner diameter of the die), 7.4 and 4.8 cm, respectively. A clear enhancing effect of pressure on the final density at a lower temperature was observed. Figure 2 shows that maximum densification did not occur until the sintering pressure had increased to 40 or 70 MPa at temperatures above −7.9°C, and the higher sintering pressure did not result in further densification. The density peak pressure was defined to describe the lowest pressure that was necessary to achieve the full density of 920 kg m⁻³ as ice (Russell-Head and others, Reference Russell-Head, Budd and Moore1984; White and McCallum, Reference White and McCallum2018). The density peak pressure corresponding to the temperature of −7.9 and −12.5/−17.3°C was 70 and 40 MPa, respectively. Further experiments are required to confirm the density peak pressure at −3.5°C with sintering pressures below 10 MPa. The density of sintered snow increased with sintering pressure for the same duration of sintering time as was reported by Ebinuma and Maeno (Reference Ebinuma and Maeno1985) and Deimand and Klokov (Reference Diemand and Klokov2001). However, both of their experiments were not performed long enough for the sintered snow to reach ice density to make an accurate comparison with our results.

Fig. 2. Pressure dependence of final density sintered at various temperatures: solid line and dashed line represent final and initial density, respectively.

Effect of temperature on final density

The effect of sintering temperature on the final density of snow is shown in Figure 3. It was found that density decreased linearly with temperature at 10 MPa and fluctuated in a very narrow band at pressures above 70 MPa. The fitted line plot in Figure 3 illustrated the linear relationship between density ρ and temperature T as ρ = 0.0055T + 0.9401 with the R ² value 99.2%. We concluded that the temperature has an impact on the transition of snow to ice in the pressure range below 10 MPa; however, more experiments need to be done at pressures between 10 and 40 MPa to figure out the exact pressure range within which temperature has an impact. It should be noted that the final density kinked at 40 MPa and −7.9°C, which requires a further microstructure study to understand the underlying mechanisms. The uncertainty in the offsets is, for example, the grain size of the snow. The final density at −3.5°C was close to ice density and relatively higher compared with the densities at other temperatures, indicating that the warmer temperature approaching the melting point favored snow sintering similar to the temperature effect on other materials (metal and ceramic). However, more experiments at temperatures from −3.5 to 0°C are required to conclude the effective temperature range for enhancing snow sintering.

Fig. 3. Temperature dependence of final density sintered at various pressures.

Effect of the time on the relative density

Figure 4 shows the effect of time on the relative density at various temperatures and pressures with the three replicates. Since the initial density of each sample with the same setting varied slightly (Fig. 1), we opted not to calculate the average relative density during the densification process to illustrate randomness. Under the loading rate of 6.6 MPa min⁻¹, the pressure-acceleration period of 10, 40, 70, 80 and 100 MPa was finished at the time 1.5, 6.1, 10.6, 12.1 and 15.2 min, respectively, i.e. all the samples loaded the same at the first 1.5 min then reached to the pressure-holding period accordingly. In general, all curves in Figure 4 very closely resemble each other, exhibiting a short period of slow increase turning to a rapid increase in relative density with respect to loading time followed by slower increments prior to reaching maximum relative density. The time required to obtain the maximum relative density was stabilized within 20 min at various sintering parameters excluding at pressure 10 MPa. Although the maximum relative density correlates to the sintering temperature and warmer temperatures favor densification, at least 60 min was needed to sinter snow to ice at 10 MPa. The sintering kinetics occurred with relatively greater speed after sintering 1 min at pressures over 40 MPa with minor effect by temperatures on the time required to attain the maximum relative density. At −3.5°C and 40 MPa, the sintering kinetics were so rapid that 99.2% relative density was reached in 5 min. However, the ice under the pressure of 47 MPa melts at −3.5°C (Eqn (1)) resulting in a limitation to accelerate the sintering time by higher sintering pressure.

Fig. 4. Experimentally measured relative density versus time for ice under various pressures and temperature: (a) at 10 MPa; (b) at 40 MPa; (c) at 70 MPa; (d) at 80 MPa for −7.9°C, 100 MPa for −12.5 and −17.3°C. Note that the pressure melting point at 100 MPa is −7.41°C close to −7.9°C. The highest sintering experiment pressure for −7.9°C was chosen at 80 MPa.

Relative significance of the sintering factors

The range analysis technique was used to determine the effects of sintering factors on final density and the optimum set of factors that would maximize final density. For the three sintering factors (pressure, temperature and sintering time), each factor was designed with four levels, as shown in Table 2. As the time required to reach 100 MPa at the loading rate of 6.6 MPa min⁻¹ (3.5 kN min⁻¹) was ~15 min, the sintering time level was from 15 to 60 min at 15 min intervals. An L₁₆ (4³) orthogonal array (Ross, Reference Ross1996) was employed with the column assignment and the final density of sintered snow as shown in Table 3. Experiments 3 and 4 were not calculated because the experiment at pressures over 70 MPa for temperature −3.5°C was unable to be performed, limited by the ice pressure melting point. The range analysis of the sintered density is shown in Table 4, with K _i1, K _i2, K _i3 and K _i4, corresponding to the sum of 1, 2, 3 and 4 level of i (i = A, B, C) factors, respectively. Also, k _i1, k _i2 and k _i3 correspond to the average values of 1, 2 and 3 level of i (i = A, B, C) factors, respectively, and R signifies the range corresponding to each factor, representing the degree of influence of various factors on the results.

Table 2. Factors and levels for the sintering experiments

Table 3. Orthogonal experiment scheme

Table 4. Range analysis of sintered density

The maximum and minimum range R indicates that pressure has the greatest impact on the final sintered density, followed by sintering time at temperatures between −3.5 and −17.3°C and sintering time longer than 15 min. The ice density could be effectively achieved through orthogonal experiment optimization with the appropriate parameter combination. The optimization for process parameters was conducted by the greatest density sintered at the level of factors. According to the optimization scheme on the final density, the best optimization scheme to sinter snow to ice is A₂B₃C₁ (−7.9°C, 70 MPa and 15 min). This does not conflict with the most rapid sintering kinetics found in this study at −3.5°C and 40 MPa within 5 min, as the sintering time in the range analysis was from 15 min (Table 2). From the optimization scheme of range analysis and the experimental results of sintering kinetics, the full density of sintered snow may be achieved either under higher pressure at a lower temperature with longer sintering time or under a lower pressure at a warmer temperature rapidly.

The evolution of relative density

The density evolution curves for snow at various temperatures and pressures are shown in Figure 5. The snow shows evident densification with increasing pressure reaching a maximum density, with its behavior overlapping during the pressure-acceleration period. There are two ways by which maximum density may be attained at the pressure holding period. For instance, the snow was able to sinter to a higher density during the pressure-holding period at 10 MPa from −3.5 to −17.3°C, and at 40 MPa from −7.9 to −17.3°C. However, the snow completed sintering and obtained maximum density as soon as the pressure reached 70, 80 or 100 MPa at temperatures of −7.9, −12.5 and −17.3°C, and 40 MPa at −3.5°C.

Fig. 5. Relative density–pressure relationships at different temperatures using one of the three replications as a representation: (a) at −3.5°C; (b) at −7.9°C; (c) at −12.5°C; (d) at −17.3°C.

We can conclude from Figure 5 that the density evolution at pressures between 10 and 40 MPa to reach maximum final density depended largely on temperature during snow sintering. From Figure 2, the maximum final density under 10 and 40 MPa is attained at −3.5 and −3.5/−17.3°C, respectively. The sintering of snow at 40 MPa and −3.5°C may contain more liquid water compared with colder temperatures (>−3.5°C) due to the ice melting point was decreased to −2.958°C by pressure melting; this is in line with the theory that the compressibility of wet snow increases at a larger liquid content due to the higher phase-equilibrium temperature of the stress-free surfaces enhanced by pressure melting at stressed surfaces (Colbeck, Reference Colbeck1979). During the pressure-holding period, snow was sintered at 10 and 40 MPa to a higher density with a maximum density increase from 87 to 98% sintered at 10 MPa and −3.5°C, and from 97 to 100% at 40 MPa and −17.3°C, respectively. The underlying reason that during pressure-holding period warmer temperature favors snow to ice transition at a lower pressure (10 MPa) while a colder temperature benefits snow transition to ice at higher pressure (40 MPa) may be owing to two mechanisms: relatively more liquid content at 40 MPa and −3.5°C, and particle rearrangement as reported by Liu and DeLo (Reference Liu and DeLo2001) during Ti-6Al-4V powder compaction. However, more experiments are required to emphasize the role of temperature on these phenomena. Schleef and Löwe (Reference Schleef and Löwe2013) found that the initial density of snow varied only by 0.01 g cm⁻³ causing a 12–16% densification rates change over the 2 d observation. Specific surface area decrease clearly contributes to the densification in the absence of an externally applied overburden stress, while it is affected neither by the initial density nor by densification during creep for any of the applied stresses between 0 and 318 Pa. It is likely that the variability between replicates caused by the initial density or the grain size/structure of the snow can cause the offsets on the evolution of relative density.

Uniaxial compressive behavior of sintered snow

The samples for unconfined uniaxial compression experiments were sintered at 70 MPa and −12.5°C for 20 min to reach the maximum density, achieving an average density of 0.914 kg m⁻³. The samples had a cylindrical shape with a diameter of 26 mm and an average height of 66.9 ± 1 mm.

Figure 6 shows the stress–strain curves for sintered snow at strain rates from 5 × 10⁻⁴ to 10⁻¹ s⁻¹. At lower strain rates, i.e. at strain rates lower than 5 × 10⁻³ s⁻¹, the stress linearly increases with the strain at first, and then the slope of the curve gradually decreases, becomes zero and then becomes negative; that is, the stress exhibits a rounded peak. All recovered samples deformed at strain rates lower than 5 × 10⁻³ s⁻¹ either like a barrel where the central section was bulged or like a foot where the upper or lower part was bulged, showing ductile behavior (Fig. 7). At high strain rates, i.e. above 5 × 10⁻² s⁻¹, the stress first increases linearly with the strain, reaching a sharp peak accompanied by a sudden stress drop to zero. All recovered samples deformed at strain rates over 5 × 10⁻² s⁻¹ broke along the axis of compression into one main part and many small pieces due to axial splitting (Fig. 7). At the strain rate 10⁻² s⁻¹, the stress increases linearly at first and then reaches a maximum, but after the peak the stress decreases abruptly but does not drop suddenly to zero. The recovered samples did not break completely; that is, some cracks were observed on the side surface of the sample, and no cracks were observed in the center, showing combined ductile and brittle character (Fig. 7). The shape of the stress–strain curve corresponding to the macroscopic appearance of the deformed sample indicates a change of sintered snow from ductile behavior to brittle behavior as the strain rate increases. The transitional strain rate when the stress–strain curve shows the feature of both ductile and brittle dual-like behavior is at 10⁻² s⁻¹, consistent with results of Arakawa and Maeno (Reference Arakawa and Maeno1997) at −10°C.

Fig. 6. Stress–strain curves of sintered snow. The curves on each figure are lined up in order of strain rate. Three types of deformation (ductile, ductile-to-brittle transition and brittle) show on the top of the figure.

Fig. 7. Images of compressed samples showing ductile and brittle macroscopic appearance of the deformed sample at strain rate ranged from 5 × 10⁻⁴ to 10⁻¹ s⁻¹.

Figure 8 shows the relationship between the compressive strength and the strain rate. The compressive strength increases with strain rate in the ductile region to a maximum at ductile-to-brittle transition and then drops in the brittle region. The strain rate-sensitive behavior of snow-sintered ice is consistent with previous reports from Yasui and others (Reference Yasui, Schulson and Renshaw2017) and Schulson and Duval (Reference Schulson and Duval2009). In the ductile region, the compressive strength σ _f can be described by the power law $\sigma _{\rm f} = ( {\dot{\varepsilon }/B} ) ^{1/n}$, and increased by a power of 1/n with increasing strain rate. The values for the stress exponent n and the constant B, as derived from Figure 7 in this study and Yasui and others (Reference Yasui, Schulson and Renshaw2017), are presented in Table 5. The stress exponent, n, for snow-sintered ice was ~2 times larger than that of water-frozen ice, however, similar to 18% silica ice. The compressive strength of snow-sintered ice and water-frozen ice was estimated by power laws in Table 5 at 10⁻⁵ and 10⁻⁴ s⁻¹ and at 5 × 10⁻⁴ and 5 × 10⁻³ s⁻¹, respectively. The R ² of the power law fitting relationship of snow-sintered ice and water-frozen ice is 0.9997 and 0.9705, respectively. In making this comparison with the extrapolation, we found that the compressive strength of snow-sintered ice was ~1.2–2.2 times as large as that of water-frozen ice reported by Yasui and others (Reference Yasui, Schulson and Renshaw2017) with decreasing strain rate from 5 × 10⁻³ to 10⁻⁵ s⁻¹. The time required to fabricate a sample with a diameter of 30 mm and a height of 60 mm prepared by the water-frozen method at −10°C in Yasui and Arakawa (Reference Yasui and Arakawa2008) was not specified. The freezing rate of ice grain and water mixture was ~2.8 μm s⁻¹ by radial freezing method at −4.5°C reported by Cole (Reference Cole1979). At least 1.3 h are required to fabricate an ice sample with a diameter of 26 mm. However, with the high-pressure sintering method, as short as 5 min is enough to obtain the ice sample with the same diameter and similar or even higher compressive endurance.

Fig. 8. Compressive strength of sintered snow, pure ice and silica ice versus strain rate. The ‘cross’ and ‘square’ symbols showing ‘pure ice’ and ‘18% silica ice’ present the results of Yasui and others (Reference Yasui, Schulson and Renshaw2017). The lines are fitted by $\sigma _{\rm f} = ( {\dot{\varepsilon }/B} ) ^{1/n}$ according to the least-squares method. The solid line is fitted by using our results in a ductile regime (strain rate smaller than 5 × 10⁻³ s⁻¹) and extrapolated to 10⁻⁵ with a dashed line. The dotted line is fitted using the results of Yasui and others (Reference Yasui, Schulson and Renshaw2017).

Table 5. Constants B and n in the power law describing ductile behavior (Yasui and others, Reference Yasui, Schulson and Renshaw2017)

Practical application perspectives

This research provides valuable data, which go beyond former studies and connects snow density evolution to high-pressure applications. Moreover, this study offers insight into strategies to produce fast compacted snow that can be used for construction in polar regions.

1. (1) The snow density can be controlled scientifically regarding the snow strength for the design of polar infrastructure according to the sintering effect of snow under various pressures as a function of time and temperature. The construction time in the harsh environment can be minimized reasonably by choosing the optimal equipment with appropriate compaction load depending on in situ natural atmospheric temperatures, and is affected by the snow density varied from site to site in the polar regions.

2. (2) Considering the increased rates of ice fabrication, low limitations on temperature, and reliable sintered snow strength, high-pressure sintering is beneficial for easy, broad and efficient utilization of snow as a promising material for construction in polar regions.