Mechanical details

Since a linear machine would have to be prohibitively long to be able to reach a steady state, a circular design similar to that of a large Couette viscometer was preferred (Fig. 1). The outer, moving part consists of two steel hemispheres (1–2), with a steel annulus between them. On the inside of this annulus, another annulus made of plastic-impregnated wood (3) is fastened. This has 20 cogs which pull a circle of ice around, simulating the drag of basal ice by a glacier. The arrangement is secured by threaded bolts and nuts (9). This almost spherical enclosure of about 0.60 m diameter can withstand a pressure of 100 bar.

Fig. 1. Diagram of the viscometer.

A cog wheel moved by a worm gear (6) is driven by an electrical motor through two gearboxes and a speed reducer. A drum made of moulded plastic (10) with diametrically-opposite raised obstacles simulates the bedrock, it is attached to a stationary steel hub (10). The hub transmits the torque to a calibrated steel rod (8); the opposing torques on this rod and on the worm gear balance through the U-shaped supports (7). At its upper end the hub is fastened to a flared hollow column (5) which centres the upper surface.

Between the toothed annulus and the drum an ice ring is formed. Its dimensions are given in Figure 2. When the machine operates the flow is two-dimensional and the sliding on the cogs (principally by melting–refreezing) is negligible. The velocity on the bumps is 100 m/year if the mobile enclosure makes one revolution in 98.5 h. Experiments were made with velocities in the range 60–1 000 m/year.

Fig. 2. The drum with its two obstacles and the ice annulus. Only two driving cogs are shown, there are 20 in all. Dimensions in millimetres.

Pressure control

The pressurized enclosure is divided into two chambers by a base (4). The upper chamber is filled with water, the lower one with oil. The same pressure, provided by a nitrogen cylinder, is applied to the water through (17) and to the oil through (19). This arrangement was designed because the viscometer was not originally in a cold room. At that time the oil chamber was cooled and the machine was insulated with a polyurethane jacket. The main difficulties were that it was impossible to remove the ice from the viscometer at the end of an experiment, because of the delayed elastic response of bubbly ice. It was also difficult to keep both sides of the ice watertight, in order to allow the water pressure in the cavities to be independent of the confining pressure. Further, it was difficult to maintain the ice at the melting-point for a long time with only negligible melting. This problem was solved when a new building for the Laboratoire de Glaciologie was constructed in 1973. Today, with the viscometer in a room at 0±1°C, this cooling device is used only for making the ice ring and for adjusting the temperature exactly to the melting-point at the experimental pressure.

The pressure in the cavities at the lee of the obstacles is recorded with the pressure gauge (13), and may, at the moment, be fixed independently through the pressure intake (14) and the pressure flask (18), but when the experiments reported here were made there were only two alternative configurations:

• (i) closed tap; the pressure in the cavities adjusts itself according to the velocity, the confining pressure, and the size of the cavities (Lliboutry’s autonomous regime);

• (ii) open tap; the pressure in the cavities is atmospheric (Lliboutry’s interconnected regime).

Nevertheless, by starting with the tap closed and then letting a few cubic centimetres of water flow out through the tap, the pressure in the cavities could be modified for some hours. In this way, for given values of velocity and confining pressure, several values for the cavity pressure were obtained with the same ice specimen.

As already mentioned, it was very difficult to keep the interface between the plastic drum and the ice watertight. In the original drum, the surfaces were marked with concentric circular grooves, but this drum consisted of four sections and two obstacles fastened together. Some regelation ice formed in the joints and progressively separated the sections (an undesirable glacial quarrying of the bedrock had been simulated). Subsequently, the two obstacles were rigidly fastened to the circular sectors. The drum now in use is moulded as a single unit. The solution for the lower surface was to produce a very slight local freezing using the cooled oil chamber. For the upper surface, the answer was to allow the cheek to move with the ice (an O-ring being incorporated at the junction). Nevertheless, in order to keep the upper cheek reliably watertight, a slight refreezing along the ring (16) has been used since 1977. The refrigeration comes from another cooling system which moves with the steel enclosure.

Temperature control

Temperature control was difficult until the viscometer was set up in a room at 0°C. Three thermistors were originally provided (Fig. 3): one inside the hub (S1), another within the ice (S2), and a third on the driving cogs (S3). The first thermistor, since it had a much faster response to changes in the cooling-rate, was used for temperature regulation. In the present version of the viscometer, the thermistors on the obstacles (Fig. 4) achieve an adequate temperature control. The temperature variations on the up-stream side of the bumps are recorded in the most recent tests, the temperature response is almost instantaneous.

Fig. 3. February 1973 experiment.

• A. The appearance of the marks before deformation.

• B. Subsequent appearance of the marks after 5.05 revolutions.

There is significant diformation in the “basal" layer.

Fig. 4. Diagram showing the sensors attached to each obstacle.

Formation of cavities

The upper hemisphere is now fitted with observation ports for the observation of the ice, but ice modifications were originally observed by releasing the confining pressure and opening the chamber.

The ice annulus is made by soaking crushed ice with melt water from similar ice (or tap water in the case of commercial ice), and cooling the mixture. Air bubbles cannot be completely eliminated, and the normal density of this artificial, isotropic ice is about 0.86 Mg/m³.

There was originally a large gap between the upper surface of the drum and the driving cogs in order to allow ice to flow outwards during the formation of the cavities. This process has not, in fact, been observed, probably because bubbly ice is compressible. Under the pressure of several tens of bars, generated at the up-stream surface of the obstacles, the bubbly ice contracts by about 4% by collapse of the air bubbles. Bubbly ice behaves as a viscoelastic material, with a large delayed elasticity. Thus, on the down-stream side of the bumps there is no immediate elastic rebound, and cavities are formed from the beginning of the experiment. They grow a good deal during the first half revolution, and very slowly after this.

Consequences of this are: (1) a large torque is measured even when both the confining pressure and the pressure in the cavities are at atmospheric pressure; (2) at the beginning of the experiment, when the cavities are not yet formed, the torque does not rise to very high values, even with high sliding velocities. The torque will be expressed as a mean drag over the “bedrock" τ_b. τ_b is always less than 3 bar, even for a sliding velocity U of 145 m/year.

A new drum with larger cheeks was constructed after the discovery of this unexpected behaviour. This increase in size does not allow any ice outflow, but does permit any water at the working pressure to penetrate between the ice annulus and the driving cogs. Of course, there is a danger that, if the bubbly ice is not compressible enough to allow the formation of large cavities, the mean pressure within the ice ring will rise well above the confining pressure. This is prevented by allowing the ice annulus to melt very slowly (rather than freeze very slowly by cooling too strongly). This is a makeshift arrangement which makes very accurate and continuous control necessary. In Penelope’s successor (a new machine called Telemachus) a much better solution has been adopted; the confining pressure is obtained by squeezing the ice with a ram coupled to a hydraulic jack.

Variation of the drag with time

Surprisingly, the variations in the torque when the machine starts are almost independent of the size of the cavities. Figure 5 is an example of this behaviour, it refers to an experiment of May 1970, with a sliding velocity U = 111 m/year, in the autonomous regime, using ice frozen from tap water. There was no confining pressure, but the mean pressure in the ice was certainly higher than atmospheric.

Fig. 5. Variations of the drag with time during the May 1970 experiment. The machine was stopped at 17 h and 51 h for about two hours so that the deformation of the frames could be observed.

At time t = 0, the machine was started, at this stage cavities are not present. The rapid increase in the drag should be governed by the elasticity of bubbly ice (the machine is stiff enough to make its elastic deformation almost negligible). At t = 16.5 h (0.188 revolution) and 51.5 h (0.586 revolution) the machine was stopped; the drag was observed to fall exponentially, this shows the delayed elasticity. When the machine was set in motion again there was:

• (1) a sudden increase of the drag (up to τ_b = 2 bar the first time, up to 1 bar the second time, when the cavities are larger);

• (2) a progressive increase by a further bar more in about 10 h (the sliding during this time is about 12 cm);

• (3) a lowering by almost the same amount and then regular oscillations with a period of about 140 min (corresponding to 2.0 cm of sliding).

These slow, regular oscillations have been observed in all the experiments. They neither correspond to the periodicity of the cogs (which, reduced to the “bedrock" is 5.36 cm) nor to any periodicity in the temperature-monitoring system. The relaxation time of the visco-elastic ice has been found to be of the order of minutes, not of hours. These drag oscillations at constant velocity may be the same phenomenon as the fluctuations in strain-rate observed by Reference DuvalDuval (1976, in press) during tertiary creep under a constant load. He attributes the strain-rate fluctuations to successive periods of prevailing strain-hardening and recrystallization. The larger preliminary drag, without fluctuations, would then correspond to transient and secondary creep. Nevertheless, these oscillations almost disappeared when the initial bumps were changed. The first ones did not have an exact sine profile, being steeper at their ends (Fig. 6). So, these oscillations may be alternatively related to some process of periodic microfracturing as has already been introduced by Reference MichelMichel (1978).

Fig. 6. Diagrams showing the motion of the frames put in the ice during the (A) March 1970, and (B) April 1970 experiment.

Estimation of the real pressure within the ice

As already explained, we can have no confidence that the mean pressure in ice p _i (which simulates the glacier weight) equals the confining water pressure p _c. Nevertheless, this important parameter has been estimated by the following procedure:

If the pressure in the cavities is suddenly changed by —Δp (the length of the cavities having no time to change), the change of the drag Δτ_b is the same as if the pressure of ice against the up-stream side of the obstacles had been increased by Δp. Following Lliboutry’s notation (Reference LliboutryLliboutry, 1975) let N = p _i—p be Terzaghi’s effective pressure and s the ratio of the area in contact to the total area of the “bedrock”. The mean pressure of ice against the obstacle where there is contact is N/s. Since it has been shown in many experiments that Δτ_b is exactly proportional to Δp, we assume that the same ratio exists between τ_b and N/s. It is then sufficient to measure τ_b, Δτ_b/Δp, and s to obtain N.

For example, during the experiment of February 1973, with U = 208 m/year, Δτ_b/Δp = 0.066±0.001. Since τ_b = 3.7 bar,

Now the length of ice in contact with each obstacle was 9.0±0.2 cm, and since λ = 53.6 cm, s = 9.0/53.6 = 0.17, and thus N = 9.5 bar. During this experiment p = 0 and p _c = 5 bar, relative to atmospheric pressure. If we had assumed p _i = p _c, we should have obtained the incorrect value for N of 5 bar. Nevertheless, this estimation is still not entirely accurate because s changes progressively when p is altered. For this reason, and because it has not been possible until recently to maintain pressure values steady for several weeks, we cannot give any law for τ_b(N) at the moment.

Ice petrology

The thermal conductivity of “Afcodur-PVC" (1.6 kJ/m/deg/h) is of the same order of magnitude as that of rock (e.g. 3.6 kJ/m/deg/h for limestone). Some regelation ice is found in the cavities, near the point where the ice annulus separates from the “bedrock”. Nevertheless, as will be shown in the next section, most of the sliding comes from plastic deformation. This is consistent with the theory without cavitation, which indicates that

where U _p is the plastic sliding contribution, U _f is the contribution to sliding made by the melting–refreezing process, and λ_* is the transition wavelength. The latter is estimated by Reference LliboutryLliboutry (1975), in the metre-bar-year unit system, as

In all our experiments U > 60 m/year and τ_b > 1 bar, whence λ_* < 0.16 m. Since λ = 0.536 m, we have U _p/U _f > 11.

After 1.5 revolutions the ice nearest to the hub becomes slightly clearer. After 8.5 revolutions a layer of blue, perfectly bubble-free ice, 3 cm thick, has been formed. We shall see that this “basal" ice close to the obstacles and the cavities has been deformed the most. It is not regelation ice because small geometric figures marked in the ice during experiments become deformed but do not disappear (Fig. 3). The ice crystals are very minute (about 1 mm² in cross-sectional area, as measured on thin sections), and the air bubbles have been expelled into the cavities, where the pressure is less. Reference MerrillMerrill (1960) has already observed a slow migration of bubbles near a sampling hole dug in the wall of a tunnel in cold ice. With temperate ice, large strain-rates, and a strong recrystallization the expulsion of air bubbles is much faster.

A strong ice fabric develops during the experiments which is similar to one observed in glaciers (Reference RigsbyRigsby, 1960; Reference Vallon, Vallon, Petit and FabreVallon and others, 1976). It is very well developed in the blue ice. A stereogram is given (Fig. 7). The c-axes cluster in a girdle with four maxima, two of the maxima (with 25% of the crystals in each one) point laterally at about 45° from the plane of symmetry, another (15% of the population) points backwards (when seen from above, i.e. from the driving cogs towards the hub), the fourth maximum points forward. This ice fabric, already observed in glaciers, was reproduced for the first time in our laboratory, in 1968 using Penelope. Since then Reference DuvalDuval (1976, in press) has shown that this ice fabric always forms by syntectonic (parakinematic) recrystallization when the state of strain is not simple shear.

Fig. 7. Ice fabric formed in blue ice.

First rough technique

The first method used to observe strains was to put a square frame (47×47 mm²) within the ice in a plane perpendicular to the axis of the machine with two sides parallel to the “bedrock” (the circumference of the drum). The sides of the frame were 5 mm thick, and saw-cuts were made at the four corners to allow it to deform to a rhombus. Successive positions of the frames are shown in Figure 6. The deviations of these frame angles from π/2 are given in Table 1. In both experiments the ice was made with tap water. Deformation occurred whilst the frame was moving along the up-stream side of the obstacle. There was no significant deformation after this until the second obstacle was reached, only rotation occurred, with the “upper side” moving faster. The deformation over the second obstacle was less, probably because the rhombus no longer had two sides parallel to the “bedrock”.

Table I. Deviations of the frame angles from π/2 rad

In Experiment B, when passing over the first three-quarters of a bump, the clear frame (Fig. 6) was deformed by 0.125 rad. When passing over the second half of an obstacle, the dotted frame was deformed by 0.065 rad. Thus, on this occasion, the deformation went on in the same direction over the down-stream side of the obstacle. Over the whole bump it was about 0.16 rad instead of 0.29 rad as in Experiment A. Rotation was negligible in B.

Explanation of the results

The only simple analytical solution with which these results may be compared is that for the case of no cavitation, infinitesimal slopes, and Newtonian viscous ice. These assumptions are so far from the truth that we may assume without inconvenience that the ice slides over a sine curve z = a cos ωx from x = — ∞ to + ∞ instead of considering circular sliding where r = r₀+a cos ωθ. It can be shown that the variations in pressure over the driving cogs (ωz = 1.4) are 3.019 times larger than for a semi-infinite solid (Appendix). On the bumps (z = 0) the pressure variations are 2.443 times larger, the same applies for the drag which is

The frames were put midway between the cogs and the bumps (wz = 0.7). If cavitation does not occur in the Newtonian-viscous case, the total rotations on the up-stream side of a bump should be Ω = — 0.008 rad and the shear deformation ∊_xz should equal — 0.072. This is not the case in our experiments, because the general shear caused by the drag has been ignored. This shear for a full wavelength is

The experiments show that, in the case of cavitation, most of this shear concentrates over the area where ice and bedrock are in contact, the more so as the sliding velocity increases.

Much more precise numerical computations are in progress, using the finite-difference method and the finite-element method. They will be published elsewhere.

A more accurate technique for the measurement of strain

In order to measure the normal strains as well as the angular deformations, small plastic markers were put within the ice, along different radii, numbered 0 to 19. One layer J was 5 cm from the lower side, another layer R at 4 cm from the upper side. Their motion was identical, indicating that the flow was effectively two-dimensional. Only a few marker positions are indicated on Figure 8. In this figure, A indicates the starting point and D the end point. The position of the marks was accurately determined by measuring their distance to several driving cogs.

Fig. 8. Motion of marks during the January 1973 experiment.

Experiment of January 1973 (tap-water ice)

Only 1.323 revolutions were carried out at a sliding velocity of 145 m/year. The experiment was so short that blue ice did not form. The results are plotted in Figure 9. The markers which were on the same radius remained in a straight line. For the marks Ro and Jo, which passed over two obstacles, the total angular deviation was 0.211 ± 0.012 rad. For the marks J8, R12, and J12, which passed over three obstacles, the deviation was 0.476 ± 0.023 rad. It may be that during the first traverses over the obstacles the cavities were not yet well developed and the strain was less concentrated. The ice crystals, although still not very large, were of a significant size after 80 h (Fig. 10).

Fig. 9. The observed shear after 1.323 revolutions at a speed of 145 m/year in the January 1973 experiment.

Fig. 10. Ice fabric from the January 1973 experiment; tap-water ice deformed for 80 h.

Experiment of February 1973 (tap-water ice)

The velocity was 143 m/year for the first 1.3 revolutions and subsequently 208 m/year. The markers were placed as indicated on Figure 3A. After 5.05 revolutions lasting 270 h the situation was as shown in Figure 3B and 11. A bottom layer of blue ice, 2 cm thick, formed where the shear strain was strongest (γ_xz ≈ 0.83). Above it, in the bubbly layer, the square of 47×47 mm² became a rectangle of 53×40 mm². Final values for the strain are

and

Fig. 11. Observed shear in the February 1973 experiment; tap-water ice deformed by 5.05 revolutions.

The density of the bubbly ice has thus increased by 4% (0.860 to 0.895 Mg/m³). Figure 13 shows crystals with very fine grain size in the boundary layer of the blue ice.

Fig. 12. Ice fabric from the February 1973 experiment; tap-water ice deformed for 200 h.

Fig. 13. Observed shear in the April 1973 experiment; distilled-water ice deformed by 5.30 revolutions.

Experiment of April 1973

The velocity in this experiment was 143 m/year for a total duration of 365 h (5.30 revolutions). On this occasion the ice was made from distilled water instead of the tap water used in previous experiments. The same layer of blue ice about 3 cm thick was formed, but within it the shear strain was substantially less, as shown in Figure 14. On the other hand, τ _b was 1.66 times higher. Figure 14 shows the much larger blue-ice crystals which are obtained with distilled water. This indicates that the ions present in tap water enhance ice recrystallization and creep.

Fig. 14. Ice fabric from the April 1973 experiment; distilled-wafer ice deformed for 365 h.