Constant axial strain-rate tests

Typical stress–strain curves for sand–ice samples deformed at 0.002 66 min⁻¹ are shown in Figure 1. For convenience and clarity, only selected data points are shown. These were based on a continuous record obtained using load and displacement transducers (Reference AlkireAlkire, unpublished). For the higher confining pressures, the curves show an initial yield followed by a second, approximately linear, portion leading to failure at a larger deviator stress. The first yield occurs at around 0.01 axial strain which is close to that observed for yield of polycrystalline ice (Reference Goughnour and AnderslandGoughnour and Andersland, 1968). The peak stress occurs at larger strains and appears to be related to the increase in frictional resistance. This behavior has also been observed for unfrozen clay soils in which the cohesion component of strength develops to its maximum value at small axial compression strains, while the frictional component of strength requires larger strains to fully develop (Reference Schmertmann and OsterbergSchmertmann and Osterberg [1961]).

Fig. 1. Influence of confining pressure on the stress–strain behavior of sand–ice material at 97% ice saturation.

It is essential that samples with similar void ratio be used in making the above comparisons. Stress–strain curves for three sand–ice samples with slightly different initial void ratios are shown in Figure 2. For the same confining pressure, 4.826 MN/m², a change in void ratio of less than 0.03 results in a significant change in the stress–strain curve.

Fig. 2. Influence of void ratio on the stress–strain behavior.

The influence of reduced ice content on stress–strain curves is shown in Figure 3 for the same axial strain-rate and temperature. For an ice saturation of 55%, the initial yield followed by a second linear portion again develops at higher confining pressures. The peak deviator stress has been reduced in comparison to the curves on Figure 1 with similar confining pressures. This is an indication of the reduced load-carrying capacity for samples with smaller amounts of ice in the void spaces.

Fig. 3. Influence of confining pressure on the stress–strain behavior of a sand–ice material at 55% ice saturation.

Creep tests

Step-stress creep data shown in Figure 4 include three levels of deviator stress D = (σ ₁ − σ ₃), and seven levels of confining pressure σ ₃. Minimum creep rates and the percent of maximum deviator stress are given for each section of the curve. The jump in strain at each increase in confining pressure corresponds to cell expansion as recorded by the displacement transducer. Step-stress creep data shown in Figure 5 include two levels of deviator stress and seven levels of confining pressure for an ice saturation of 60%. For the same deviator stress, comparison with Figure 4 shows a much larger creep strain with the reduced ice content. The per cent of maximum deviator stress shown on Figures 4 and 5 refer to the maximum shear strength based on the constant axial strain-rate tests.

Fig. 4. Step-stress creep curves for high ice saturation sand–ice samples and constant deviator stresses.

Fig. 5. Step-stress creep curves for low ice saturated sand–ice samples and constant deviator stresses.

Confining pressure

Constant axial strain-rate tests summarized in Figure 1 show that confining pressure has a substantial strengthening effect on the sand–ice samples. The curves show that the cohesive component of strength due to the ice matrix develops to its maximum value at axial compression strains close to 0.01, while the frictional component of strength continues to develop to its maximum value at a much larger axial strain. Failure strains up to 0.06 correspond to the higher confining pressures. As the confining pressure is increased the material appears to become increasingly dependent on the frictional nature of the sand. This fact is more clearly shown in Figure 6 where the maximum principal stress ratio has been plotted against confining pressure. Comparisons with data for unfrozen silica sand shows that the cohesive component becomes very small when confining pressures approached 7 MN/m². For the low ranges of confining pressure, the behavior of sand–ice material depends primarily on the cohesive nature of the ice matrix.

Fig. 6. Maximum principal stress ratio at failure versus confining pressure for frozen and unfrozen silica sand.

Void ratio

The large influence which small changes in initial void ratio have on the stress–strain behavior of sand–ice material is shown in Figure 2. For a constant confining pressure of 4.826 MN/m² the sliding friction and particle reorientation effect should be relatively constant. Particle crushing is negligible for silica sand for the range of confining pressures used in this study (Reference Lee and SeedLee and Seed, 1967). Therefore, the dilatancy component would appear to be primarily responsible for the change in the stress–strain curves. For unfrozen sand dilatancy increases the shear strength by requiring energy to move particles up and over one another. For a sand–ice material energy is required to overcome the forces of adhesion between the ice and sand, hence it would be expected that the increase in deviator stress for a small change in void ratio would be greater than for unfrozen sand. Equipment limitations did not permit measurement of volume changes during the triaxial tests, however volume measurements taken before and after each test, given in Figure 7, show a volume increase for all samples tested at the lower confining pressures. Data from Reference Lee and SeedLee and Seed (1967) given in Figure 7 for unfrozen silica sand show that the dilatancy factor is suppressed with increased confining pressure. A similar trend is noted for the sand–ice material.

Fig. 7. Confining pressure versus volume change for the triaxial compression tests.

Reduced ice content

A comparison of stress–strain curves in Figures 1 and 3 show a reduced deviator stress for sand–ice samples with an ice saturation of 55%. A summary of these data shown in Figure 8 suggests that the reduction in deviator stress is in proportion to the amount of ice in the sand voids. Only two levels of ice saturation are included because of difficulty in obtaining a uniform ice distribution within the samples at other ice contents. For the four levels of confining pressure and small differences in void ratio, the parallel lines indicate that the reduction in peak deviator stress is due primarily to a decrease, in cohesion of the ice matrix. A similar relationship has been reported by Reference KaplarKaplar (1971) and Reference VyalovVyalov (1959). A linear extrapolation of the lower curve to zero deviator stress suggests that about 18% ice saturation is required to develop any significant strength for zero confining pressure. The curves do not extend beyond 100% ice saturation.

Fig. 8. Peak deviator stress versus ice saturation for various confining pressures.

Failure criteria

Constant strain-rate data are summarized in Figure 9 in terms of the maximum shear stress at failure. It was convenient to let

and

represent the coordinates of a stress point. The normal stresses, σ ₁ and σ ₃, represent the major and minor principal stresses at failure, respectively. A series of tests with different confining pressures define K _f-lines as shown in Figure 9 for silica sand at two levels of ice saturation.

Fig. 9. K _f failure lines for frozen and unfrozen silica sand based on constant axial strain-rate triaxial tests.

The slope angle α appears to be reasonably constant for the range of normal stresses considered and the intercept a is dependent on the degree of ice saturation. Geometric transformation gives

and

where ϕ is the angle of internal friction and c the cohesion. Using the Mohr–Coulomb failure law (Reference Lambe and WhitmanLambe and Whitman, 1969; Reference WuWu, 1966) the shear strength of the sand–ice material will be

where τ _ff is the shear stress on the failure surface at failure and σ _ff the normal stress on that plane at failure. The apparent angle of internal friction, ϕ, for the high ice saturation, equal to 31.4°, is less than the friction angle of 37° for the unfrozen sand (Reference AlkireAlkire, unpublished). The ice interferes with full development of frictional resistance, perhaps by limiting effective intergranular contact between sand particles. Using the K _f-line for unfrozen sand as a basis for separating the frictional and cohesive components of shear strength, the data also suggest a decrease in the cohesion as confining pressures increase, in agreement with data shown in Figure 6.

The above analysis, by necessity, must be based on total stresses. When the ice saturation approaches 100% the sand–ice behavior may be analogous to undrained tests on saturated soil where the slope angle α would decrease to zero. Evidence of this behavior has been given by Reference Chamberlain, Chamberlain, Groves and PerhamChamberlain and others (1972). Their data show a decrease in strength when confining pressure becomes large enough to induce pressure melting and ice/water phase changes in ice-saturated sand. The development of excess pore-water pressures reduces intergranular contacts, thereby reducing sliding friction.

Creep behavior

Step-stress creep tests were used by Reference Andersland and AlNouriAndersland and AlNouri (1970) to show that a linear relationship exists between secondary creep rate and a term which included both deviator stress, D = (σ ₁− σ ₃), and mean stress, . Using the same test techniques, the data shown in Figures 4 and 5 extend the range of confining pressures to 6.89 MN/m². The new data confirm earlier results for confining pressures up to about 1.38 MN/m². At higher pressures the observed strain-rates are greater than would be predicted on the basis of data taken at low confining pressures.

A plot of deviator stress versus axial strain-rate for each level of confining pressure, as shown in Figure 10, illustrates their inter-relationship. Time dependency has been eliminated by using the minimum strain-rates observed at the end of each hour during step loading. The decrease in strain-rate with increase in confining pressure corresponds to the decrease in slope of the family of lines. The axial creep rate , may be expressed as

Fig. 10. Effect of confining pressure on axial strain-rates for sand–ice with high ice saturation. (Strain-rates obtained at 1 h intervals except as noted.)

Taking the logarithm of both sides of Equation (4) gives

where (0.4343m) is the absolute value of the slope of the lines of equal confining pressure, D is the deviator stress equal to (σ ₁ − σ ₃), and b is the time-dependent intercept on the ordinate. Values of m versus confining pressure plotted in Figure 11 give a bilinear relationship with the equation

where C _i is the intercept and G _i the slope for the respective segment. The two lines intersect at a confining pressure of 1.38 MN/m². Combining Equations (4) and (6) gives

where b(t) equals 4.7 × 10⁻⁶ min⁻¹ for time intervals equal to 60 min during step-stress loading. For σ ₃ ⩽ 1.38 MN/m², C ₁ equals 0.432 min⁻¹ (MN/m²)⁻¹ and G ₁ equals 0 .127 min⁻¹ (MN/m²)⁻²; and for σ ₃ > 1.38 MN/m², C ₂ equals 0.282 min⁻¹ (MN/m²)⁻¹ and G ₂ equals 0.020 min⁻¹ (MN/m²)⁻². Equation (7) shows that creep rates are more responsive to confining pressures below 1.38 MN/m². The term b(t) presumably is related to the structural changes which occur in the sand–ice material during creep.

Fig. 11. Graphical determination of the coefficients used in Equation (4).

For the reduced ice content step-stress creep data shown in Figure 5, Equation (7) is also applicable. The deviator stress for the reduced ice content D _L is set equal to the deviator stress for the high ice content D _H times the degree of ice saturation J expressed as a decimal. Substitution into Equation (7) gives

The parameters b(t), C _i , and G _i for the low degree of ice saturation approximate the values based on the high degree of ice saturation. Calculated and experimental strain-rates were in excellent agreement (Reference AlkireAlkire, unpublished).