Failure modes

Mechanical failure of any particular ice specimen in the program could be described by one of four possible modes (Fig. 3). The first was brittle Gacture. One manifestation of this was axial cleavage (Fig. 3a), where the sample broke along one or more cracks which usually ran along the axis of the specimen. Brittle fracture was also exhibited in some specimens by a coalescence of smaller, but substantial, cracks that formed an apparent wide (several centimetres) shear fault, inclined at angles in the range of 20–40° to the axis of the sample. Similar shear faults have been observed before in polycrystalline fresh¬water ice (e.g. Rist and Murrell, 1994) and are the result of confining stresses at the ends of the samples, due to the end platens, which prevent axial cleavage. Brittle Gacture by either axial cleavage or wide shear faulting is referred to below as the fracture mode. The second failure mode was ductile failure, designated as plastic (Fig. 3b). The sample was loaded to a maximum value and began to deform ductilely, primarily by microcracking, because confining pressure prevented large brittle fractures. The third failure mode was shear-slip (Fig. 3c), where the specimen initially fractured along a shear plane and then slipped along the plane. In theory, an angle of 45° will yield the maximum shear force per unit along a plane passing through a cylinder experiencing uniaxial stress. This was verified, in practice, for a number of samples which failed in this manner but it was more common for the shear plane to be inclined at angles in the range of 30–45° to the sample axis Finally, there was combined plastic and shear-slip failure (Fig. 3d), designated as plastic shear-slip.

Table 1. Triaxial test parameters. Key: *F, fracture; P/SS, plastic/shear-slip; P, plastic; SS, shear-slip

Table 2. Triaxial test statistics

Figure 4 shows the stress and strain records corres¬ponding to the four tested specimens shown in Figure 3. Figure 4a illustrates the characteristics of fracture failure where the load rises in a fairly linear fashion to a peak value at which point the sample fails The sample cannot support any significant load after the failure. All uniaxial tests resulted in the fracture mode of failure.

Figure 4b shows characteristics of plastic failure. Load rises fairly linearly at first and then the slope decreases as the plastic failure initiates. A rounded maximum peak value is attained, after which the load decreases smoothly to a fairly constant value at the higher strains. In general, the difference between the height of the peak and the steady load at the higher strains decreased as strain rate decreased, temperature increased and confining pressure increased. The resulting deformation was evident as radial expansion of the sample, sometimes uniform and at other times more pronounced in certain areas, e.g. Figure 4b shows more expansion at the bottom of the specimen than at the top. This ductile deformation of ice, apparently caused by extensive non-interacting micro-cracking, has been observed by others (e.g. Jones, 1982; Rist and Murrell, 1994).During tests where plastic failure occurred, in the present study, microcracking could be heard.

An example of shear-slip failure is illustrated in Figure In this test, the load rose linearly to a peak value at which point an abrupt shear fracture and slip occurred, followed by somewhat erratic small-amplitude variations. The latter indicated fairly continuous slippage along the shear plane with small-amplitude variations, possibly due to slight stick-slip behaviour, in shear stress during the sliding. In general, for tests conducted at −11°C, 5 ± 10⁻²s⁻¹ strain rate and at 6.89 and 13.79 MPa, the load following the initial slip was significantly lower than the initial peak if the shear plane did not Intersect one of the end platens. In cases where the shear plane did intersect with a platen, multiple shear planes developed, parallel and/or orthogonal to each other, and the load after the first slip could peak to values of the same magnitude or even higher than the first peak. For the shear-slip tests conducted at lower confining pressures (other parameters the same), the load record was similar to Figure 4c, but much smoother after the initial fracture. Following the peak stress, the load dropped sharply and then followed a fairly smooth curve that appeared to approach asymptotically some low constant value. Smooth and continuous slipping was also reflected in the strain data. In the figure, the slight anomalous negative readings, appearing at about 0.27s in the strain record, arise from oscillations of the extensometer due to the initial bump of the piston when it makes contact with the sample. Shear-slip tests, at −1°C, confining pressure of 1.38 MPa and at a strain rate of 5 × 10⁻³s⁻¹ showed no sharp initial peak at all and the load and strain records looked very similar to that of plastic failure, as in Figure 4b. Shear-slip type failure has been observed in granular fresh-water ice at temperatures below −78°C (Durham and others, 1983), in sea ice at −10°C (Sammonds and others, 1989) and granular fresh-water ice at −40°C (Rist and Murrell, 1994). In only one instance did we observe shear-slip accompanied by large secondary axial cracks, similar to that of Rist and Murrell (1994). This may have resulted from a leak in the rubber membranes surrounding the specimen; however, at the time, the discarded membranes were not carefully inspected to confirm this, and the confining fluid would have evaporated from the specimen. The load record for this test was also anomalous in that the value towards the usually stable region near the end of the test was only about 50% of that of other tests conducted with the same test parameters.

Fig. 3. Examples of each type of ice failure, (a) Fracture. Test No. 23.4, see parametersm Table 1; (b) Plastic. Test No.6.2; (c) Shear-slip. Test No. 14.5, (d) Plaslic/shear-slip. Test No. 28.4.

Figure 4d illustrates plastic/shear-slip failure. Load linearly to a peak value at which point the sample fractured and slipped along a shear plane. Load began to accumulate to another peak value where an abrupt shear-slip along the plane occurred again. This pattern repeated itself fairly regularly until in the latter half of the test curvature became evident in the load rises, indicating plastic failure within the bulk specimen and possibly continuous slippage along Lhn shear plane. Successive load peaks were often as high and rometimes even higher (Fig. 4d) than previous ones in the same test! The maximum peak could occur anywhere in the record. The multiple-slip phenomenon, and remarkable recovery of strength with successive slips, has been observed by others (e.g. Durham and others, 1985). Though not classified as plastic/shear-slip, there were a couple of plastic tests where the load curve was typical for plastic failure but the samples exhihitcd a rather thick (approximately 1cm) shear plane. The ice m the plane was highly deformed, whereas thr rest of the specimen was relatively undeformed. One of these experiments belonged to the -−11°C, 6.89MPa, 5 × 10⁻⁵s⁻¹ test series dini the other to the −11°C, 3.45MPa, 5 × 10⁻³s⁻¹ test series. For each shenr-slip that occurred during plastic/ shear-slip tests there was a loud audible hang.

Fig. 4. Plots of stress minus cell pressure vs time and axial strain vs time for the triaxial tests shown in Figure 3. (a) Fracture. Test No. 23.4, see parameters in Table 1; (b) Plastic. Test No. 6.2; (c) Shear-slip. Test No. 14.5; (d) Plastic/shear-slip. Test No. 28.4. Strain records are not meaningful after the flat plateau is reached. The slight anomalous negative readings, appearing at about 0.27 s in the strain record oJ Figure 4c, arise from oscillations of the extensometer due to the initial bump oJ the piston when it makes contact with the sample.

Figure 5 shows the types of failures that resulted throughout the ranges of confining pressure and strain rate for tests at −11°C. All uniaxial experiments failed in fracture. Plastic failure was evident in the 5 × 10⁻³s⁻¹ strain-rate region at all confining pressures, except 0.0 MPa, and at the two confining pressures where tests were conducted at 5 × 10⁻⁵s⁻¹ Plastic/shear-slip occurred in the 5 × 10⁻³s⁻¹ strain-rate range at confining pressures in the range of 1.38–6.89MPa. Shear slip occurred in the 5 × 10⁻²s⁻¹ strain-rate region at all confining pressures, except 0.0 MPa, and in the 5 × 10⁻³s⁻¹ strain-rate region at a confining pressure of 3.45 MPa. Plastic, shear-slip and plastic/shear-slip were evident at the confining pressure of 3.45MPa in the 5 × 10⁻⁵s⁻¹ strain-rate range.

Fig. 5. Plot of all experiments performed at −11°C, indicating the strain rate, confining pressure and the type of failure for each test.

General features of the data

The trends in the data can be stated as Follows. There Vvas a consistent increase in the strength of the ice with decreasing temperature. For example, Labrador ice tested at a cell pressure of 1.38 MPa and strain rate of 5 × 10⁻³s⁻¹ experienced a 79% increase in strength over the temperature range −1° to −16°C (Figs 6 and 7). There was also an increase in strength with confining pressure for ice at the lower temperatures (Figs 6,7 and 8). Others (e.g. Jones, 1982; Murrell and others, 1991) have observed an increase in strength of polycrystalline ice with confining pressure in the pressure range here. Labrador ice tested at −11°C and a strain rate of 5 × 10⁻³s⁻¹ experience a 105% increase in strength as confining pressure increased from 0 to 13.79 MPa. However, far warmer ice (−1°C), a noticeable weakening occurred at the higher confining pressures (Fig. 6). This was attributable to the freezing-point depression which results from confining pressure and which would have a non-negligible effect only on ice near the freezing point (i.e. −1°0). The decrease in strength with higher confining pressure at −1°C and overall shape of the data trend at that temperature (Fig. 6) are suggestive of the teardrop-shaped failure envelope proposed by Nadreau and Michel (1986).

Fig. 6. Four plots of strength minus cell pressure us cell pressure for traxial tests on Labrador ice at a strain rate of 5 × 10⁻³s⁻¹ end at temperatures ranging from −1° to −16°C. Each point represents the mean of five tests and the corresponding error bar represents the standard error in the mean. Standard error is equal to the standard deviation divided by the square root of the sample size. Data from Arockiasamy and others (1983), and Gammon and others (1983), have been plotted for comparison.

Fig. 7. Plots of strength minus cell pressure vs temperature at ceil pressures of 1.38 and 6.89 MPa for triaxial tests on Labrador ice at a strain rate of 5 × 10⁻³s⁻¹.

The increase in strength with increasing confining pressure at the low confinement end, and the relative independence of strength on increasing confinement at the higher confining pressures, are distinctive features of the data They suggest that a frictional sliding mechan ism, for example, the one proposed by Schulson and others (1991), controls the behaviour at low confinement and that plastic processes (discussed by Duval and others (1983)) govern the behaviour at high confinement.

Fig. 8. Plot of strength minus cell pressure for triaxial tests on Labrador ice at a temperature of −ll°C and a strain rate of 5 × 10⁻⁵3⁻¹. Also shown are the strength values for the four types of Greenland ice at two confining pressures.

The strength of the ice was found to depend strongly on strain rate. For Labrador specimens at −11°C, ice strength was predictably lowest for tests at 0.05 × 10⁻³s⁻¹ (Fig. 9). On the other hand, ice tested at 50 × 10⁻³s⁻¹, though greater in strength than the 0.05 × 10⁻³s⁻¹ tests, was lower in strength than ice tests at 5.× 10⁻³s⁻¹ Such behaviour has not been observed in other triaxial experiments on fresh-water ice (e.g. Jones, 1982; Murrell and others, 1991), suggesting a distinct difference in the behaviour of glacial ice from ice grown in the laboratory. The behaviour in the present study can be explained by viewing the chart records for the tests. They indicate that at 5 × 10⁻³s⁻¹ brittle behaviour (i.e. formation of shear-slip planes) generally occurred at higher stress than in tests at 50 × 10⁻³s⁻¹. Hence, the ice tested at 5 × 10⁻³s⁻¹ igher strain rates precipitated brittle fracture in the specimens before the test got very far into the ductile regime, fn uniaxial compressive tests, in the same range of strain rate, Cole (1987) and Schulson (1990) observed a decrease in strength as strain rate increased. Schulson (1990) discussed this in terms of competition between tensile stress build-up and stress relaxation at wing-crack tips. The former dominates at the higher strain rate so crack extension is facilitated. At lower strain rates, stress relaxation at the crack tip dominates and crack extension is suppressed.

Fig. 9. Three plots of strength minus cell pressure us cell pressure for triaxial tests on Labrador ice at a temperature of −11°C and strain rates ranging fftm 5 × 10⁻⁵ to 5 × 10⁻²s⁻¹ Data from Nadreau and Michel (1987) and Lachanct and Michel (1988) haue been plotted for comparison.

From Figure 5, it appears that the strain rate at which the transition from ductile to brittle behaviour occurs increases with confining pressure. This is consistent with the behaviour one might expect from the wing-crack model of Schulson (1990), since a confining stress would decrease the sliding velocity of the faces of the primary crack. This could lower the rate of tensile stress build-up in the region of wing-crack tips to levels below that required for crack extension. The samples tested in this program, however, were not inspected for the presence of wing cracks.

Whether the apparent drop in strength of the Labrador ice at a confining pressure of 3.45 MPa (Fig 6), pronounced at −11°C and slight at −1°C, is a real phenomenon or an artifact of the selection of ire samples is not certain. More experiments would he required to resolve this.

Frictional behaviour and activation energy

The frictional behaviour during shear-slip events of ice that failed in the plastic/shear-slip mode was very similar to that reported by Rist and Murrell (1994). A sampling of shear and normal stresses, corresponding to stick-slip maxima from several tests spanning the full temperature range of the data, was found to agree with the frictional relationship reported by Rist and Murrell (1994), i.e. τ = 1.5 × σ ^0.65, where τ and σ are the shear stress and normal stress on the shear plane.

Because a significant amount of energy was dissipated in the shear plane during a slip event in a plastk/shear-slip test, it is likely that melting, resulting from friction and possibly pressure melting on asperities, occurred. The energy dissipation during a typical shear-slip event, in a tert such as that illustrated in Figure 4d, can he calculated from estimates of force, obtained from the stress records, and displacement, taken from the strain recordr and photographs of tested samples. The extent ofslippage per event is approximately 0.6 mm The shear stress during the slippage, assuming the shear plane is at 45° and taking the differential stress in the sample during the slip as die stress midway between the peak and minimum stress during the slip, is typically 4 MPa. Hence, the shear force multiplied by the distance of the slippage yields the energy dissipated, approximately 25J. This amount of energy eould create a layer of liquid at the shear plane that was approximately 7 μm thick. At the lower temperatures, rcfreezing of melt after a shear-slip would enable the ice sample to regain its original rtrength. The presence of lubricating melt could also explain why the for the tests conducted at the highest strain rates (Fig 4c) was not of a pronounced stick-slip nature In that case, the nominal actuator speed and stiffness of the ice/apparatus system did not allow low enough relative speeds between the two faces of the shear plane, or long enough time durations il the slippage momentarily stopped, for refreezing and healing to occur Similarly, for the shear-slip testr conducted at −1°C, the ice was not sufficiently cold to cause rapid enough refreezing of melt to bond the surfaces. It is interesting that liquid-layer thicknesses, of similar magnitude (< μm), have been detected at the ice/steel interface when single crystals of fresh-water ice have been crushed against an instrumented stainless steel platen at −10°C (Gagnon, 1994).

In this test program, data were not obtained at a enough range of temperature and strain rate to permit calculation of an independent activation energy. However, for the purpose of compariron, a semi-independent value was determined. The familiar power-law creep equation for ice is

(1)

where n and A are material constants, σ is the differential stress, Q is the activation energy, R is the molar gas constant and Τ is the absolute temperature. The steady-state stress data from the tests that failed in the plaatir mode, corresponding to 6.89 MPa throughout the full temperature range, were least-squares fitted to Equation (1) assuming a value of n = 4.2 from Rist and Murrell (1994). The fit was excellent (R² > 0.99) and the activation energy obtained was Q = 101 kJ mol⁻¹. The value is high compared to that of others (eg. Rist and Murrell (1994): Q = 69 kJmol⁻¹; Budd and Jacka (1989): Q = 72 kJ mol⁻¹; Sinha (1978): Q = 67kJmol⁻¹) corresponding to temperatures at or below −10°C. A high value to be expected, however, since half the data points used for the present calculation correspond to temperatures above −10°C. Others have found high values for the activation energy at temperatures above −10°C (e.g. Barnes and others, 1971) and this has been attributed to the presence of liquid at grain houndaries The same effect apparently operates at lower temperatures when the confining pressure is sufficiently high. A value close to ours was found by Durham and others (1983)for triaxial tests on ice performed over the temperature range of −15° to −30°C, at a confining pressure of 50 MPa The high activation energy (n = 4 and Q = 91 KJ mol⁻¹) was attributed to grain-boundary softening associated with the presence ofliquid at grain boundaries. Apartfrom the high temperature effect on our calculation of activation energy, we speculate that another grain-boundary effect, namely, the rcdurtion of crack-initiating stresses at grain houndaries due to intragranular air-bubble inclusions, discussed below may have influenced our value.

Strength characteristics of the ice types

At −11°C and a strain rate of 5 × 10⁻³s⁻¹ h Greenland ice at a confining pressure of 3.45 MPa was invariably stronger than Labrador ice (Fig. 8) under corresponding conditions. At zero confining pressure, ice from sources G3 and G2 was approximately 6% lower in strength than Labrador ice while ice from sources Gl and G4 was distinctly higher in strength, 10% and 42%, respectively (Fig. 101.

For Greenland ice, which was relatively free of cracks, there appeared to be an inverse correlation hetwecn uniaxial and triaxial strength Figure 8 indicates that ice which was weak at zero confining pressure benefited the most in strength when confining pressure was applied. This pattern was broken For Labrador ice possibly because of its relatively high density of cracks. The presence and distribution of bubbles, discussed below, may be responsible for the phenomenon in Greenland ice

In general, there was rough agreement in trends and absolute values between the present results and those from other uniaxial and triaxial experiments on iceberg ice. Extrapolating our results to account for the differences in test conditions, indicated rough agreement with the uniaxial test data of Arockiasamy and others (1983), Gammon and others (1983) and Nadreau and Michel (1987) (Figs 6 and 9). Similarly, the data of Nadreau and Michel (1987), for tests at confined pressures, were roughly compatible with our data (Fig. 9). The mean uniaxial compressive strengths of ice from three different icebergs, determined by Lachance and were perhaps the excepuon, in that two of the values were quite low compared to our value (Fig. 9). Curiously, their value (4.4 MPa) for ice obtained from the same Labrador iceberg referred to here was considerably lower than our value (7.82 MPa). We have no explan¬ation for this.

Fig. 10. Chart of uniaxial strength for Greenland and Labrador ice tested at a temperature of −ll°C and a strain rate of 10⁻³s⁻¹. On each vertical bar the dark horizontal line through the hatched area represents the mean value of a set of strength data and the corresponding hatched areas represent the standard error in the mean.

The unconfined compressive strength of the iceberg and glacier ice studied here is greater than columnar pond ice (Gammon and others, 1983) and fresh-water granular ice grown in the laboratory (Schulson and Cannon, 1984; Cole, 1987) with grams of comparable size. Granular ice with small grains is stronger in unconfined compression than the iceberg and glacier ice tested here, except perhaps the Greenland 4 ice. This is the result of the inverse dependence of unconfined compressive strength on grain-size (Cole, 1987), since iceberg ice is generally composed of large grains (Gagnon and Gammon, 1995).

Influence of air bubbles

Variations in porosity, grain-size and shape, crack density and orientation, and preferred crystallographic c-axis orientauon all play some role in determining the strength of ice. However, no unambiguous correlations of strength with these parameters were identifiable from the data. Analysis of the bubble population, on the other hand, demonstrated that the dominant factor differentiating the uniaxial strengths of the four Greenland ice types is the bubble density, that is, the number of bubbles per unit volume. The detailed ice characterization data (Tables 3 and 4) of Gagnon and Gammon (1995), which included air-bubble dimensions and fractional porosity measure-

Table 3. Ice-characterization data (Gagnon and Gammon, 1995)

* Moderate preferred c-axis orienta tion implies 20% of grains align simultaneously to extinction . Strong preferred c-axis orientation implies greater than 35% of grains align simultaneously to extinction.

Note: Three different mutually orthogonal orientations are distinguished by the absence or presence of a single or double letter P (for perpendicular) which appears after the ice-source ID number in the lefthand column.

Table 4. Fractional porosity (Gagnon and Gammon, 1995)

ments for the Greenland ice types, were used for the analysis. The buhhle density was determined from the expression

(2)

where v is the fractional porosity of the iee and V_bubble is the mean bubble volume of the ice, given by

(3)

where L and S are the mean long and mean short diameters of the bubbles.

Figure 11 shows the uniaxial strength vs bubble density for the iee from the four different Greenland sources at −11° C and strain rate of 5 × 10⁻³s⁻¹. The uniaxial strength and bubble density are distinctly related. The uniaxial strength increases by approximately 49% over the range of bubble density 0.5− 3 mm⁻³. Bubble characteristics for the particular Labrador iee used in uniaxial compression tests are not known. However, lor comparison, the data have been placed on the graph using the bubble density for Labrador ice from another location at the quarry site on the Labrador iceberg Gagnon and Gammon, 1995). The relatively small degree of scatter in the data for the Greenland ice results from the fact that the four samples tested for each type came from a single block of ice. The Labrador samples, on the other hand, came from four different blocks of ice that were quarried from non-adjacent sites, separated by several metres.

Fig. 11. Uniaxial strength vs bubble density for Greenland ice tested at a temperature of −ll°C and a strain rate of 10⁻³s⁻¹. The line through the data represents the best fit. Data from uniaxial strength tests on Labrador ice have been includedfor comparison. The actual babble density for the Labrador ice data is nol known.

To explain the apparent dependence of llexural strength of glacial ice on bubble density, Gagnon and Gammon (1995) speculated that, in glacial ice, grains may be “softened” by the presence of internal air-bubble voids, that is, able to accommodate more strain for a given stress than grains without bubbles. This would reduce the iiilergranular stress concentrations that lead to crack initiation at grain boundaries. Hence, the more bubbles in the ice. up to a certain degree at least, the greater the llexural strength is. The present data for Greenland ice indicate that the same strengthening effect holds for the uniaxial strength of glacial ice. Granular ice. such as that grown in the laboratory, that has not experienced significant grain-boundar migration has air bubbles primarily located at the grain boundaries. There is evidence (e.g. Toope and others, 1991; Ebinuma and Maeno, 1992) that the presence of bubbles at grain boundaries in laboratory ice weakens it. The flexural strength of sea ice also decreases as the porosity, i.e. amount of brine and air inclusions at grain boundaries, increases (Timco and O’Brien, 1994). Hence, the strengthening effect of in tragranular bubbles and weak¬ening effect of intergranular bubbles may be the dominant mechanisms that explain why the uniaxial compressive strength of iceberg and glacial ice is generally greater than laboratory-grown granular ice of similar grain-size. Though the relevance to the discussion above is unclear, we note the possibility that crack propagation in ice may be inhibited by diffusion of stress at crack tips that intersect bubbles.

The discussion above suggests thai ice from deep within glaciers and ice shelves would have a higher uniaxial strength than iee from shallower depths, since more reenStallization and grain-boundary migration would have occurred as a result of higher stresses and longer exposure to the stresses. Consequently, air bubbles would end up inside grains rather than at the grain boundaries, where they would have initially been in the early stages of ice formation from snow. This conclusion is supported by the uniaxial compressive-strength data from ice samples taken from a core through the entire thickness of Hohson’s Choice Ice Island (Poplin and Ralston. 1992). Linder the same test conditions of temperature and strain rate, ice from the bottom region of the core was stronger than ice from the top region. The authors could not account for this in terms of temperature, crystal structure or density of the ice. However, information about the physical characteristics and number of bubbles and their locations would be required to establish conclusively a relationship between bubbles and strength for ice from Hobson’s Choice Ice Island.