Experimental Apparatus

The apparatus is shown schematically in Figure 1. A rectangular-shaped ice sample was frozen onto an acrylite disk A, which was mounted on a metal block M. The block M was driven either forwards or backwards on the upper surface of the thick rigid framework by a motor through reduction worm gears, and the ice sample on it was moved at a constant speed ranging from 1.5 × 10^-7 to 7.4 × 10^-3 m/s.

Fig. 1. Schematic diagram of the experimental apparatus.

A steel ball, 6.4 mm in diameter, contacting the ice surface was mounted and fixed to a brass cylinder, to the top of which a metal lever L was firmly fixed. One end of the lever was free, while the other end was connected to a universal joint. A load which ranged from 0.4 to 31 N, was exerted onto the ice surface by suspending a weight from the lever. The weight which corresponds to a given load was immersed in an oil bath that prevented the weight from shaking.

The friction force between the fixed steel ball and the moving ice surface was continuously measured by the use of a force-measuring system which consisted of a transducer, a bridge-box, a strain meter and a recorder. The ice sample can be shifted in the transverse direction by moving the mount M SO that each friction run may be made on a virgin ice surface. The ice sample can also be rotated into any horizontal orientation by turning the disk A SO as to measure the friction force on ice for various crystallographic orientations.

Ice Samples and Steel Ball

Tyndall figures were artificially produced at a corner of a large single crystal of ice collected from the Mendenhall Glacier, Alaska. By the aid of the Tyndall figures, two rectangular ice pieces were simultaneously cut out from the ice crystal in a way in which the frictional surface of the one was set parallel to the crystallographic basal plane (0001) and that of the other parallel to the prismatic plane (01Ī0). These two pieces were placed side by side and frozen to an acrylite disk so as to form a bicrystal sample of ice. This sample was annealed for several hours at - 3°C, and then the upper surface was turned on a lathe. It was annealed again at -3°C until the turned surface became glossy like a mirror, and then brought into a cold room at an experimental temperature of -0.5 to - 30°C. When it was exposed to a lower temperature than -10°C, its surface occasionally became cloudy. Samples with surfaces becoming cloudy were excluded from the experiment, and only samples with glossy surfaces were used for experimental studies on friction.

Fig. 2. A steel ball slider mounted on a brass cylinder.

Steel balls with different sizes ranging from 1.6 to 12.7 mm in diameter were used in the experiment, for most of which a ball of 6.4 mm in diameter was used. The steel ball was cleaned by immersing it in an ultrasonic cleaning-bath filled with a mixture of alcohol and acetone and then in a bath filled with distilled water. The ball was cleaned again by washing it in the bath of distilled water and dried under an ultra-violet lamp.

Experimental Results

(1) Friction curve

It was observed that friction on the prismatic plane is twice as large as that on the basal plane as illustrated in Figures 3 and 7. As seen in Figure 3, the friction force fluctuates more on the prismatic plane than on the basal plane, and it abruptly decreases at the grain boundary between the two crystals composing the bicrystal ice sample.

Fig. 3. A typical friction curve of a steel ball on ice.

Fig. 7. μ_k-V-W diagrams, (a) for a prismatic plane, and (b) for a basal plane.

(2) Load effect

The effect of load on friction was studied. As an example, the coefficient of friction μk for both the basal and prismatic planes, at a sliding velocity of 7.4 × 10^-5 m/s and at a temperature of - 10°C, was plotted against the lower range of loads, less than 5 N, for both cases, while it linearly increased with the increase in load in the higher range of load. A similar tendency to that in Figure 4 was observed for different sliding velocities as seen in Figure 7.

Fig. 4. (a) Dependence of friction on load for a basal and a prismatic plane of ice. (b) Contact area and ploughing cross-section against load.

The friction F in the present experiment is composed of two factors: F = F _s+F _p, where F _s and F _p respectively are concerned with the adhesion of ice and the ploughing of ice. F _s and F _p are, respectively, proportional to A/W and A*/W, in which W is the load applied, and A and A* are the contact area and the ploughed area, respectively. It was found in the experiment that the ratio A/W is constant for any load, but the ratio A*/W increases with increasing load as shown in Figure 4(b). Since the ploughing area A* was so small in the lower range of load, the ploughing effect was very small as compared with the sliding effect. It may, therefore, be concluded that the increase of μk in the higher range of load may be attributed to the increase of the ploughing effect.

(3) Velocity Dependence of friction

In order to clarify the dependence of the friction of ice on sliding velocity, the friction force was measured with different sliding velocities for various loads. A typical example of the results obtained is shown in Figure 5, in which the coefficient of friction _μk is plotted against the sliding velocity obtained for both the basal and prismatic planes. As seen in this Figure, μk decreases with an increase in the sliding velocity V. The width ϕ of the track of the ball was also measured for each run of the experiment, and a similar tendency was obtained between ϕ and V to that obtained between μk and V. This shows that the larger friction at lower sliding velocities can be attributed to the larger plastic deformation of ice at the contact area.

Fig. 5. (as) Dependence of friction on velocity, and (b) the width of a sliding track against load.

(4) Temperature dependence of Friction

The coefficient of friction μk and the width of the sliding track ϕ are respectively plotted in Figure 6(a) and (b) against the ice temperature when the temperature was raised from -20°C up to -1°C at a rate of 1.5 deg/h. It was found that friction reaches a minimum value at a temperature of, in one instance, -7°C when the sliding velocity is 7.4 × 10^-5 m/s and the load is 4.8 N. As seen in this figure, the friction at a temperature below the temperature of minimum friction increases on lowering the temperature, which is due to the increase of shearing strength of ice at the lower temperature (Reference ButkovichButkovich, 1954; Reference Tusima and FujiTusima and Fujii, 1973). The friction at higher temperatures above the temperature of minimum friction markedly increases as the ice temperature approaches its melting point. This increase may be closely related to the increase in the width of the sliding track as shown in Figure 6(b). We may conclude that the increase in the friction is caused by the ploughing of ice at the contact area. It should be noted that the temperature of minimum friction shifted to a higher temperature as the friction velocity was reduced. For example, it was at -4°C and -2°C when the velocity was 1.5 × 10^-5 and 1.2 × to^-6 m/s, respectively.

Fig. 6. (a) Dependence of friction on temperature, and (b) dependence of the width of the sliding track on temperature.

(6) Sliding track of friction

As described before, it is important to measure the width of the sliding track left on the ice for interpreting the experimental results. The track width, the contact area, the average pressure acting on the contact area, and the cross-section ploughed for different loads are summarized in Table II.

The contact area A can be expressed by using the track width ϕ as follows:

(2)

where k is a factor which is dependent on the visco-elastic properties of the contact area, the value of k being between 0.5 and 1.0. Figure 8 shows the real contact area in the process of friction of a glass ball on ice. We know that the value of k is equal to 0.8 from this Figure.

TABLE II. SOME EXPERIMENTAL RESULTS OBTAINED IN THE EXPERIMENT ON FRICTION OF ICE AND THE PREDICTED VALUES OF THE SHEAR FRICTION μ _s AND THE PLOUGHING FRICTION

Fig. 8. Real contact area in the process of friction.

(7) Effect of the size of ball

The degree of ploughing of ice by a steel ball may become larger as the ball becomes smaller in size. In order to examine the size effect of the steel ball on the friction coefficient of ice, steel balls of different diameters ranging from 1.6 to 12.7 mm were used as a slider. The experimental results obtained are shown in Figure 9, as an example, in which the friction coefficient μ _k is plotted against the diameter R of a ball. As was expected, the friction coefficient increased with the decrease in size of the ball for a smaller range of diameters than 9.5 mm when the load, the sliding velocity, and the temperature were 4.8 N, 7.4 × 10^-5 m/s and - 10°C, respectively. However, the friction remained unchanged when a steel ball larger than 9.5 mm in diameter was used.

Fig. 9. Size effect on the friction of ice.

Discussion

It was found that friction on ice is very low even at a very small friction velocity; namely the coefficient of friction μ _k varied from 0.005 to 0.16 for friction velocities ranging from 1.8 × 10^-3 to 1 × 10^-7m/s. Such low friction on ice at extremely small friction velocities cannot be explained by frictional heating on the contact surface.

The temperature rise of ice, ΔƬ, due to friction can be expressed as follows (Reference Bowden and TaborBowden and Tabor, 1950):

where μ is the coefficient of friction, W the load applied, V the friction velocity, a the radius of the contact area and k _l and k ₂ the thermal conductivities of slider and ice. The maximum temperature rise ΔT predicted from this formula is only 0.3 deg even when the maximum values of load W and friction velocity V used in the present experiment and the maximum value of friction coefficient 0.2 were substituted into the formula. It is obvious that the temperature rise due to frictional heating cannot cause melting of the ice.

It was also confirmed that melt water cannot be produced at the contact surface by pressure except at high temperatures.

According to adhesion theory, the frictional force F on ice can be divided into the shear resistance F _s and the ploughing resistance F _p: F = F _s+F _p. The coefficient of friction μ_k(= F/W) can, therefore, be written as the sum of the shear term μ _s and ploughing term μ _pμ _k + μ _sμ _P.

According to Reference Bowden and TaborBowden and Tabor (1950), F _s and F _p were respectively given by:

(3)

where s and p are respectively the shear and the ploughing strength of ice, R is the diameter of slider, ϕ is the width of the sliding track and k is a constant. The coefficient of friction μ _k can, therefore, be expressed as

(4)

As the first term, Πkϕ ²/4W, and a part of the second term, ϕ ³/6RW, are constant for a given load and a temperature, this formula can be simply expressed as

(5)

where A and α are constant.

A linear relation was actually obtained between μ _k and I/R in the experiment on the effect of slider size (Fig. 9(b)). This is evidence that the adhesion theory can be adopted for the friction of ice.

The values of s and p were estimated as follows: As described when considering the size effect, only a shear deformation took place in the contact area when a slider of diameter R ≥ 9.5 mm was used.

The shear strength s is, therefore, given by s = 4F/Πkϕ ², where the value of k is 0.8 as mentioned before. The value of the ploughing strength p was estimated from Equation (5).

Since μ _p = ϕ ³p/6WR, the value of p can be obtained by substituting values ϕ, W and R used in the experiment. The values thus obtained for s and p are 10 bar and 2 000 bar, respectively. By substituting into the Equation (1) these values of s and p, together with the experimental data obtained from Figure 5, the values of F _s and F _p, and hence those of μ _s and μ _P were obtained. These values are summarized in Table II, together with some experimental data obtained for various load. As seen in this table, the coefficient of shear friction μ _s does not vary with load, while that of ploughing friction μ _P increases markedly with the increase in the load. The predicted values of (μ _k= μ _s+μ _P) agreed fairly well with those obtained by experiment for any load that ranged from 1,4 to 31 N as seen from the last column of Table II in which the ratio of (μ _s+μ _p) to μ _k observed in the experiment was given. The fact that the predicted value based on the adhesion theory agreed well with those observed in the experiment affords additional strong evidence that the adhesion theory is adoptable for the friction of ice. The difference between friction on the basal and prismatic planes can be understood by the different values of s and p in the two planes as seen from Figure 9. It should be emphasized that ice still exhibits a very low friction even though the ploughing effect is fairly large at very small sliding velocities.