3.1. Compression tests

For all compression tests, a minimum of three tests were performed at each strain rate for each group of specimens (‘pure’ or ‘doped’). Over the course of these experiments, the mechanical behavior observed was found to be very reproducible, sometimes leading to data so closely overlapping that it could be difficult to discern the difference between two separate tests when plotted on a single plot. The only exception to performing three tests per strain rate, was for the tests conducted at −20°C and 1 × 10⁻⁶ s⁻¹. For these tests and the tension (creep) tests conducted at −6°C, only two tests were performed for each pure and doped specimen, as time did not allow for any additional testing (tension tests were approximately 13 d per two experiments). However, the results from these tests were found to be generally in agreement and in support of all other experimental data and observations.

For compression tests conducted at −10°C, the Ca⁺⁺ doping demonstrated either a strengthening effect or no effect on the observed peak stress (usually near 1% strain) and flow stress (taken always to be at 5% strain) depending on the strain rate, as shown in Figure 4. The strengthening effect was most pronounced at the highest strain rate applied, of 1 × 10⁻⁴ s⁻¹ (Fig. 4a), but was also observable at 1 × 10⁻⁵ s⁻¹ (Fig. 4b). For tests conducted at 1 × 10⁻⁶ s⁻¹ (Fig. 4c), it is much more difficult to discern any effects of the Ca⁺⁺, although there does seem to be a flattening of the Ca⁺⁺ peak, a somewhat common feature among most tests.

Fig. 4. Results from all compression tests conducted at −10°C and constant strain rates of 1 × 10⁻⁴, 1 × 10⁻⁵ and 1 × 10⁻⁶ s⁻¹.

Results for tests conducted at −20°C, as shown in Figure 5, demonstrate a much more discernable difference between the magnitudes of the peak stress and flow stress for the Ca⁺⁺-doped specimens versus the undoped specimens. From results for 1 × 10⁻⁵ s⁻¹ (Fig. 5a), a much higher peak stress and flow stress was observed for the Ca⁺⁺-doped specimens than for the undoped specimens. For 1 × 10⁻⁶ s⁻¹ (Fig. 5b), it is again difficult to discern a difference between the doped and pure specimens, although there does appear to be a distinctive flattening of the peak of Ca⁺⁺-doped specimens. In both Figures 4, 5, small irregular bumps in the stress/strain curves (as very prevalent in Fig. 5b) are due to issues with the data acquisition software and were not caused by any known physical effect.

Fig. 5. Results from all compression tests conducted at −20°C and constant strain rates of 1 × 10⁻⁵ and 1 × 10⁻⁶ s⁻¹.

3.2. Strain-rate sensitivity index

To compare the differences in the mean peak stress $\overline {\sigma _{{\rm ps}}} $ and mean flow stress $\overline {\sigma _{{\rm fs}}} $ from Figures 4, 5, which are summarized in Table 1, the strain-rate sensitivity index m can also be used to quantify the effects of Ca⁺⁺ in the flow stress regime (Manley and Schulson, Reference Manley and Schulson1997). Provided that superplastic flow is responsible for the flow stress observed at 5% strain and an Arrhenius type of relationship is followed as given in Eqn (1) (Glen, Reference Glen1968):

(1) $$\dot \varepsilon = A\sigma ^n {\rm exp}\left[ {\displaystyle{{ - Q} \over {RT}}} \right],$$

where A is a material constant, σ is taken to be $\overline {\sigma _{{\rm fs}}} $ , T is the absolute temperature, R is the ideal gas constant, Q is the activation energy, and n is the stress exponent, then m (n = 1/m) can be solved for directly from Eqn (2) (Manley and Schulson, Reference Manley and Schulson1997; Smolej and others, Reference Smolej, Skaza and Fazarinc2009) for a given temperature

(2) $$m = \displaystyle{{\ln \left( {\overline {\sigma _{{\rm fs}}} _2} \right) - {\rm ln}\left( {\overline {\sigma _{{\rm fs}}} _1} \right)} \over {\ln (\dot \varepsilon _2 ) - {\rm ln}(\dot \varepsilon _1 )}}.$$

Table 1. Mean peak stress $\overline {\sigma _{{\rm ps}}} $ and mean flow stress $\overline {\sigma _{{\rm fs}}} $ from test results given in Figures 2, 3

The significance of m is that it quantifies the magnitude by which Ca⁺⁺ may be acting to either enhance or retard the ice deformation rate.

For all compression tests, $\overline {\sigma _{{\rm fs}}} $ is plotted on a log/log scale in Figure 6 for tests conducted at −10°C (Fig. 6a) and −20°C (Fig. 6b). In these plots, the slope between points is representative of n and hence also m. Although it is not the point of this paper to make any broad statement about the most appropriate value of n, n and m values are reported in Table 2 to facilitate a more tangible discussion of the results. At −10°C (Fig. 6a), there is a distinct shift in the slopes between 1 × 10⁻⁵–1 × 10⁻⁶ s⁻¹ and 1 × 10⁻⁵–1 × 10⁻⁴ s⁻¹. This transition is generally thought to be due to a change from a purely plastic regime of deformation to a more ductile-to-brittle regime of deformation (e.g. Duval and others, Reference Duval, Ashby and Anderman1983; Schulson, Reference Schulson1990; Renshaw and Schulson, Reference Renshaw and Schulson2001; Schulson and Duval, Reference Schulson and Duval2009). This theory is supported by n-values for the region from 1 × 10⁻⁵ to 1 × 10⁻⁶ s⁻¹ that are much closer to n = 3, which has been widely reported as the stress exponent commonly observed for creep in polycrystalline ice (Glen, Reference Glen1958), whereas n-values for the region from 1 × 10⁻⁵ to 1 × 10⁻⁴ s⁻¹ are claimed by some (Barnes and others, Reference Barnes, Tabor and Walker1971; Weertman and others, Reference Weertman1983) to be much higher. At −20°C (Fig. 6b), n-values are again much higher than would be expected for purely plastic flow in polycrystalline ice, which would also suggest that a high-stress ductile-to-brittle regime of deformation is taking place as a result of the lowering of the temperature from −10 to −20°C. Although crack density was not a variable that was quantitatively measured in the post-test specimens, it was qualitatively quite clear at −20°C that there was a great deal more damage and microcracking that had been imparted to the specimens that had been tested at −20°C than for those tested at −10°C. An increase in the brittle behavior of a material with a decrease in its temperature is not particularly surprising, and is likely responsible for the rather high n-values observed at −20°C (n = 10; Table 2). It should be pointed out however, that for similar testing conditions, similar values of n were observed by Barnes and others (Reference Barnes, Tabor and Walker1971) (see their Fig. 2). More to the point of this study, however, is that m-values calculated for both possible deformation regimes show that the Ca⁺⁺-doped specimens have generally either a higher or at least a non-differentiable strain-rate sensitivity index when compared with the m-values of the undoped ice. These results could be interpreted as either a lowering of the stress exponent and hence a reduction of the strain rate when in the ductile-to-brittle transition region of deformation, a possible strengthening effect, or as a non-differentiable effect when in a deformation regime of pure plastic flow.

Fig. 6. Mean of flow stresses from all tests (at 5% strain) plotted as a function of the applied constant strain rate at temperatures of −10 and −20°C.

Table 2. Strain-rate sensitivity m and stress exponent n given as a function of $\overline {\sigma _{{\rm fs}}} $ (see Table 1)

3.3. Tension tests

Under a constant load, deformation tests in uniaxial tension were performed to further elucidate the possible effects of Ca⁺⁺ in polycrystalline ice. A total of four tests were performed with two undoped specimens and two Ca⁺⁺-doped specimens. The results, shown in Figure 7 as both strain versus time (Fig. 7a) and strain rate versus strain (Fig. 7b), demonstrate very little difference between the creep rates for undoped and doped specimens. These results would also seem to be in agreement with the former observations made in the above section with regards to pure plastic flow and compression testing at 1 × 10⁻⁶ s⁻¹.

Fig. 7. Results from four creep tests conducted at −6°C showing little difference between pure ice and ice doped with Ca⁺⁺ in (a) true strain as a function of time and (b) strain rate as a function of true strain.

3.4. Microstructure

For both the doped and undoped specimens, polarized light imaging was used to quantify the mean grain diameter as a function of strain rate for all constant strain-rate compression tests. Example images are shown in Figure 8. Although discernable by only visual inspection in this figure, the plot in Figure 9 shows that CaSO₄-doped compression specimens tested at 1 × 10⁻⁶ s⁻¹ had a much larger mean grain diameter at 5% strain than the undoped specimens. The mean grain diameter was calculated using the ASTM E1382 linear intercept length method (ASTM, 2004) in four evenly spaced (10 pixel increments) directions of 0°, 45°, 90° and 135° via an automated image analysis algorithm given by Lehto and others (Reference Lehto, Remes, Saukkonen, Hänninen and Romanoff2014). A minimum of 10 000 intercepts were measured in each direction for each binary image over the entire area of the thin section. The relative grain size dispersion d, as given in Eqn (3) (Lehto and others, Reference Lehto, Romanoff, Remes and Sarikka2016), was then used as a metric to quantify the approximate variance in grain size over the distribution of intercepts measured, where d _max and d _min are respectively the maximum and minimum distances found between two intercepts, d _avg is the mean grain diameter, and $P_{99\%} $ and $P_{1\%} $ are the 99 and 1% probability level grain sizes respectively.

(3) $$d = \displaystyle{{d_{{\rm max}} - d_{{\rm min}}} \over {d_{{\rm avg}}}} = \displaystyle{{P_{99\%} - P_{1\%}} \over {d_{{\rm avg}}}}. $$

Fig. 8. Post-test polarized light images of thin sections taken from specimens tested in uniaxial compression at constant strain rates of 1 × 10⁻⁴, 1 × 10⁻⁵ and 1 × 10⁻⁶ s⁻¹. All tests were terminated at 5% strain.

Fig. 9. Comparison of mean grain diameter between compression-tested specimens at 5% strain following constant strain-rate compression tests of 1 × 10⁻⁴, 1 × 10⁻⁵ and 1 × 10⁻⁶ s⁻¹.

To limit the effects of measurement uncertainty due to extrema occurring at the tails of the linear measured intercept (i.e. grain size) distribution, the maximum and minimum grain sizes are replaced with the 99 and 1% probability grain sizes, as calculated with a cumulative distribution function (Lehto and others, Reference Lehto, Remes, Saukkonen, Hänninen and Romanoff2014). The values of d calculated for the six thin section images shown in Figure 8 were nearly identical, with an average value of 4.56 and SD of only 0.09.

Thin sections from creep-tested specimens that had reached approximately 25% strain are shown in Figure 10. In these images, there is very little difference that can be discerned between the microstructures of the two specimens and little difference was found between the mean grain diameter for each specimen. Mean grain diameters for these doped and undoped thin sections were found to be 0.45 and 0.42 mm, respectively, with an average value of d of 4.6 ± 0.05.

Fig. 10. Polarized light images of thin sections taken from specimens tested in uniaxial tension under a constant load of 38 kg (0.75 MPa initial stress). Tests were terminated near 25% strain.

As mentioned above, microcracking was observed in all compression specimens at strain rates of 1 × 10⁻⁴ and 1 × 10⁻⁵ s⁻¹, but was much more prominent at tests conducted at −20°C. At 1 × 10⁻⁶ s⁻¹, microcracks were not observed, perhaps suggesting that deformation was only by pure plastic flow at this applied strain rate. The microcracks were characterized via scanning electron microscopy in backscattered electron mode. It was found that cracks had predominantly occurred along grain boundaries, suggesting intergranular fracture as the primary mode of failure.

3.5. Microchemical analysis

Using EDS in the SEM, creep-tested and compression-tested CaSO₄-doped thin sections were analyzed to ascertain the local chemical compositions. C, O, Ca, S, Na and Cl could all be detected via EDS at grain boundaries and triple junctions. Based on the observation of predominantly Ca and S peaks from some precipitates, while Na and Cl peaks were observed from others, it is assumed that these precipitates consisted, respectively, of CaSO₄ and NaCl. It is not clear whether or not these precipitates formed as a result of surface sublimation of the specimen while in the SEM or if they were already present (Cullen and Baker, Reference Cullen and Baker2000). In either case, it would seem that the impurities must have been concentrated at grain boundaries and triple junctions regardless of when the precipitation occurred. When sampling the ice crystal lattice away from the grain boundary, only O could be detected. Figure 11 shows a doped thin section from a compression test conducted at −10°C and a strain rate of 1 × 10⁻⁴ s⁻¹, when the most significant cracking was observed. In this image, the black voids are cracks residing along grain boundaries and the precipitates sampled via EDS were primarily found to be NaCl. The NaCl was most likely present as an impurity of the original anhydrous CaSO₄ that was used to create the doped specimens, which claimed an impurity concentration of 0.01% Cl. Figure 12 shows a doped thin section from a creep test conducted at −6°C, terminated at a final true strain of 25%. The precipitates in this thin section were found to primarily be CaSO₄, as shown in the EDS spectra. Again when sampling the region away from the grain boundary, only an O peak could be detected via EDS.

Fig. 11. Image collected from a SEM in backscattered electron mode showing intergranular fracture and precipitation at grain boundaries in a compression-tested specimen taken to 5% strain under a constant strain rate of 1 × 10⁻⁴ s⁻¹. Precipitates in this image were predominantly that of NaCl, as shown with the spectra (right) collected with EDS.

Fig. 12. Image collected from a SEM in backscattered electron mode showing precipitation at grain boundaries in a creep-tested specimen taken to 25% true strain under a constant load of 38 kg (0.75 MPa initial stress). Precipitates in this image were predominantly that of CaSO₄, as shown with the spectra (right) collected with EDS, while only O could be detected in the inner matrix of the grain.