3.1. Observations of calving

In general two types of ramp calving are possible, and these have been observed.

• (a) Reeh-type calving (Reference ReehReeh, 1968), where, due to the imbalance of water pressure and ice stress, the margin of a floating section tends to curl forward and downward. Maximum effective stresses tend to build up at a distance behind the ice front approximately equal to the ice thickness there. As a result when calving occurs it tends to produce prismatic blocks of ice. Often, ice structure may significantly modify the geometry of the calving.

  About 28–30 m of ramp ice must have broken away in front of R1 between 31 August 1969 and lake freeze-up of the same year because there was no evidence of the berg in the immediate vicinity of the margin in May, 1970 and open water was necessary to allow drift of the berg. Since the ice thickness there is estimated (on the basis of the hydrostatic condition and some water depth soundings) to be 25 to 35 m, it is concluded that the calving was probably of the Reeh type.Footnote *

• (b) Calvings induced by changes in water level more rapid than the ramp can adjust to.

  Water level may rise (Fig. 2) at rates exceeding 16 cm d⁻¹ during the latter part of June and early July. By direct observation and by precise levelling it may be shown that the ramps, essentially in hydrostatic equilibrium in winter, are unable to adjust to the water-level rise by upward deflection and consequently some ramps may be completely flooded, submersing 1–2 m high vertical ice fronts at the ends of the ramps. As a result an upward buoyancy force acts along the length of the ramp (Fig. 5) tending to bend it upwards.

On 17 July 1970 at about 16.00 h a series of cracking noises were heard on the T1 ramp and at about 16.55 h a large fissure, about 400 m long appeared (Fig. 4) followed by a slow rigid rotation of the several detached blocks. The largest block of roughly triangular shape, measured about 100 m from the fracture line to the apex. At the end of its motion, the lakeward edge of this block (the apex) had risen from about 0.6 m above water level in the marginal lead to 6.5 to 7 m above water level (Fig. 5). The edge of the block adjacent to the ice cap had fallen from a few centimeters to 1.5 m, thus producing a normal fault. Despite heavily crushed ice in the fault zone, it was possible to detect a slight curvature of the fracture plane with depth. The fracture plane was essentially perpendicular to the plane of the surface.

The time of the calving was correlated directly with the water-level curve (Fig. 2) which was at that time approaching the maximum value, i.e. 2.08 m above the May low level. Since there were no other abnormal phenomena, e.g. meteorological or hydrological, at that time it may reasonably be assumed that the calving was entirely caused by up-bending of the ramp due to its submergence below the equilibrium level.

The progressive movement of the detached block was recorded until August 1971 (Fig. 6).

Fig. 6. Plot of the positions of the detached ramp from 17 July 1970 to 2 August 1971. Figure 3 shows the position of the berg after the break-up of lake ice.

4.1. Bending stresses

The bending stresses through the slab may be determined if the stress–strain (or strainrate) relationship is known as well as the position of the neutral axis. Assuming the neutral axis to be defined by the point of contraflexure in the fracture curve (Fig. 5), the position of the neutral axis in bending lay, most probably, on the compression side of mid-depth of the slab. If the depth of the neutral axis below the top surface is denoted as , and if the variability and accuracy of measurement of the reconstructed post-fracture cross-sections is considered, then the factor ξ could have values

For a given value of ξ it is possible to compute the corresponding ratio N _e of the elastic compression modulus E _c to the elastic tension modulus E _t (Appendix A). A similar computation may be done for the plastic case.

It is possible that, before any fracture, the bending stresses developed according to a centrally located neutral axis and that, subsequent to the formation of a basal crack, the effective neutral axis moved upward so that the geometry of the later part of the crack was influenced by the actual crack history. In this connection the observations of Section 3.1 should be considered. Bearing in mind these possibilities, the range of bending stresses was calculated.

4.1.1. Elastic bending stresses

Following usual beam theory, (Reference TimoshenkoTimoshenko, 1958) the deviator stresses are obtained (Appendix B). The compressive stress

(4)

and the tensile stress

(5)

In the computations of the actual principal stresses, the hydrostatic stress (Section 4.4) may be taken into account. Because δ is small in the present case, the term (1 − δz ²)/(1 + δz ²) can be neglected in Equation (4).

The maximum stresses for a given vertical section are obtained by putting in (4) and H in Equation (5). These stresses (Appendix B) are plotted in Figure 5 as functions of x for ξ = 0.7 and ξ = 1.0. The corresponding surface compressive stresses are 0.21 MN m⁻² and 0.15 MN m⁻², respectively. The basal tensile stresses are 0.11 MN m⁻² and 0.15 MN m⁻² respectively at the hinge. The stress distribution through the slab is shown in Figure 7. These stress values may be considered as limits, the actual value lying somewhere between the upper and lower value of a pair.

Fig. 7. Bending stress distribution through the ramp at the hinge-line section, according to elastic and plastic theory, for two possible neutral-axis positions.

4.1.2. Plastic bending stresses

The bending stresses are now evaluated according to a plastic theory. It is assumed that a flow law (Reference NyeNye, 1953)

(6)

holds, where σ _ij ′ is a stress deviator component, is the strain-rate component; and λ = A ⁿ τ ⁿ⁻¹, where A is a physical constant, here called the plastic modulus, which depends on the ice properties, τ is the effective shear stress given by 2τ ² = σ _ij ′/σ _ij ′ and n is a constant (n ≈ 3 for the magnitude of stresses encountered in the present problem).

Following the methods described in Appendix A it is shown that the plastic modulus ratio N _p for the present problem is sufficiently given by

For

Ā _c is the average value of A for compression (above the neutral axis) and Ā _t is the average value of A for tension (below the neutral axis).

Using the methods presented in Appendix B, the plastic bending stresses are

(7)

in compression, and

(8)

in tension.

Equations (7) and (8) are used to compute the maximum stresses for a given vertical section and these are plotted against x in Figure 5. At the hinge section, the maximum compressive stress reaches 0.17 MN m⁻² for ξ = 0.7 or 0.12 MN m⁻² for ξ = 1.0. The maximum tensile stress (deviator) reaches 0.09 MN m⁻² for ξ = 0.7 or 0.12 MN m⁻² for ξ = 1.0. The complete stress distributions for this section are shown in Figure 7.

4.2. Induced normal stresses

A stress component will be induced in the vertical direction due to the horizontal compression or stretching caused by the bending.

For the elastic case, the simplifications involved in the derivation of the beam equation eliminate the need for consideration of the vertically induced stress. For the plastic case, considering the plane strain problem, the vertically induced stress deviator is equal to the horizontal stress component given by Equations (7) and (8) provided the signs are reversed.

4.3. Shear stresses

Because M(x) and hence σ _xx are changing along the length of the ice ramp, shear stresses are generated within the ice. The derivation of the shear-stress distribution, assuming elastic bending, is presented in Appendix C. For the section at the hinge the shear-stress distribution is plotted in Figure 8.

Fig. 8. Shear-stress distributions through the ramp at the hinge-line section according to elastic and plastic theory, for two possible neutral-axes positions. The shear-stress distribution for a grounded section is also shown.

For the plastic case, Equations (C2) and (C4) (Appendix C) become

(9)

for , and

(10)

for , where

For the section at the hinge, the plastic shear stress distribution is plotted in Figure 8. The maximum value of σ _zx is determined from either Equation (9) or (10) when z = 0, and is

The shear stress in the grounded ice is approximately given by

(11)

if the longitudinal stress is neglected. In Equation (11), z is measured vertically downward from the surface, of slope α _s. Figure 8 gives the shear stress distribution with depth according to Equation (11).

4.4. Hydrostatic stress

Within the grounded or floating ice the hydrostatic ice is approximately given by

(12)

4.5. Flow stresses

For the grounded part of the ice, the surface values of strain-rate (<1 × 10⁻⁵ a⁻¹) indicate stresses of order 0.01 MN m⁻² using the creep curves of Ramseier (in press). It is probably a fair assumption that the shear stress, as given by Equation (11) predominates in the ice below about mid-depth. However, in the zone surrounding the point of floatation of the ramp (Fig. 9) the longitudinal strain-rate and hence the longitudinal deviator stress is likely to reach high values (probably exceeding the bending stresses) because the ice, as it loses contact with the bottom, is forced to accelerate from the basal sliding rate to a flow rate approximately equal to the surface flow rate (27.6 m a⁻¹ at T1).

Fig. 9. Cross-section of the T1 ramp showing the principal deviator stresses, before fracture.

Thus the values of bending and shear stress are superimposed on the flow stresses preexisting in the ice. In the absence of a reliable method of determining these latter stresses, the present analysis deals in detail only with those stresses associated with the bending problem. Of particular interest is a knowledge of the directions of the principal deviator stresses at points throughout the slab.

In the lower part of the ramp near the grounding line, the flow stresses could significantly change the actual values of the principal stresses, but the directions of the principal stresses will not be materially altered as the shear stress decays towards the bottom and is small compared to the normal stresses.

4.6. Principal stresses

Under the limitations just outlined, the magnitude and direction of the principal deviator stresses at several points in the ice have been determined using Mohr’s circle construction to combine bending and shear stresses in the ramp. Both elastic and plastic cases for ξ = 0.7 and 1.0 are considered. For the grounded ice near the surface (point G), an estimated longitudinal stress had been combined with the shear stress. The results are shown in Figure 9. For the ramp there is apparently no significant difference in the principal stress orientations if either the elastic or plastic stresses of bending and shear, together with their estimated errors are considered. Consequently, fan diagrams are shown (Fig. 9) which combine all the possibilities considered here. A progressive rotation of the principal (deviator) stress axes, from the top surface to the bottom, is immediately seen. If the postulation is made that a fracture (originating in this case from the bottom) travels upward following the direction of the maximum compressive stress (or perpendicular to the direction of least compressive stress—or tension) then a theoretical fracture curve resembling the observed one is seen as a result. In the case of beams (Reference LavrovLavrov, 1969) subjected to down-bending, the fracture plane clearly becomes perpendicular to the direction of maximum compression indicating a final stage of failure due to crushing.