The following discussion took place after the reading of Dr. J. F. Nye’s paper on “The Mechanics of Glacier Flow” at a meeting of the British Glaciological Society held at University College, London. The paper was published in the “Journal of Glaciology,” Vol. 2, No. 12, 1952, p. 82–93.

Mr. M. M. Miller: Could bed-rock hummocks or transverse rock thresholds beneath a glacier serve as one of the more important “tripping mechanisms” for the primary development of shearing along selected planes:

Dr. J. F. Nye: In a zone of compressive flow the precise spot at which thrusting began might well be some irregularity in the bed. Thrusting might also be started when some weak surface in the ice itself, suitably orientated, enters a region of compressive flow.

Mr. Miller: Perhaps shear planes do not always extend to the bottom of the glacier. in glaciers of sufficient thickness could they pass into a zone where “plastic adjustment” would he the controlling factor in the release of stresses set up within the glacier at depth?

Dr. Nye: I agree. Not only might they extend from the top surface downwards without reaching the bottom, but I imagine it would be possible for them to start at the bottom and extend upwards without reaching the top. There might also be internal shear faults which do not penetrate to either surface.

Mr. J. M. Hartog: In making any general assumptions on the nature of an ice cap as a prelude to mathematical analysis of its behaviour, it is important to consider its thermal regime. In the Arctic, glaciers have been found which are isothermal to a great depth, while others have temperatures considerably below zero even 100 ft. below the surface.

Mr. G. Seligman: Would anybody present throw any further light on the question of crevasse depths? In practice they are not found more than 30 m. (100 ft.) deep in temperate glaciers. To what extent do those of Arctic glaciers differ?

Mr. Miller: In Greenland and Antarctica, crevasses have been seen to exceed 120 ft. in depth. On the other hand in the Alaskan glaciers, or in the Alps, this figure seems to be the absolute deepest limit. By actual hand measurement on the Taku Glacier, and the Seward Glaciers in S.E. Alaska, we have found them never to exceed 100 ft. and most of the deeper ones are no more than 90 ft. By seismic soundings on the Taku in 1949, we determined the maximum depth of fracture in the surface “tensile zone” to be 120 ft. This, of course, took into account the very thin V-shaped wedge of fracture which could not normally be measured by hand line at the bottom of the crevasses.

On the matter of temperature effects concerning these supposed differences, the less viscosity found in very cold sub-zero or polar ice may be of considerable influence. Once a fracture occurs to depth in such ice it could conceivably be more difficult for the crevasses to close than in the case of the probably less rigid walls of a crevasse in an isothermal glacier.

Dr. Nye: To put the same thing in another way, the curve A in Fig. 1Footnote * depends on temperature. The lower the temperature the higher the curve. In general, therefore, higher shear stresses may exist in polar than in temperate glaciers. Thus, in theory, the tensile layer should extend deeper into polar glaciers, and crevasses once formed should be more sluggish in closing up. It is interesting to hear that there is some evidence for these effects in practice.

Mr. W. V. Lewis (Department of Geography, Cambridge): May not the crevasses in Greenland glaciers be deeper than those in the Alps and Norway partly because of the greater speed of opening induced by tension effects between the quickly moving ice and the valley sides?

Dr. Nye: That would certainly seem to be a possibility. Other things being equal, the faster a glacier flows the greater the shear stress component τ _zx (Fig. 9) on its surface towards the margins. The greater then is the marginal tensile stress (§5). The stress will thus remain tensile to greater depth before becoming neutralized by the hydrostatic pressure, and the marginal crevasses could be deeper.

Dr. G. G. Meyerhof (Building Research Station, D.S.I.R.): An indication of the maximum theoretical depth h to which crevasses, irrespective of how they were formed, will remain open can be obtained from plastic theory (e.g. K. Terzaghi, Theoretical Soil Mechanics, Wiley, New York: 1943, p. 152).

Let

where

then provided the distance l between adjacent crevasses is greater than 4h ₀, it may he shown that

(1)

Similarly if the distance l < 4h ₀, then

(2)

which gives a minimum depth of

(3)

for a very close spacing of crevasses.

Since for glaciers k is between 0.5 × 10⁻⁶ and 1.5 × 10⁻⁶ dynes cm.² as mentioned by the author, the maximum theoretical depth would vary between about to and 70 m. depending on the values of k and l. These estimates appear to be in fair agreement with the observed depths mentioned by previous speakers.

Dr. Nye: I am doubtful about the application of Dr. Meyerhof’s equations (1) and (2) to this problem. At a depth d the two extreme principal stresses in the wall of an open vertical crevasse would be a pressure, A + ρgd, acting vertically, and A acting horizontally (A = atmospheric pressure). This gives a maximum shear stress of . At points below a depth 2h ₀, therefore, the ice is on the point of yielding. However, in the soil-mechanics calculations yielding is only supposed to occur if the average shear stress on a potential failure surface reaches the critical value, and, if l > 4h ₀, as Dr. Meyerhof points out, this only happens when d = 4h ₀. The failure surface in this case is a plane inclined at 45 degrees to the vertical which runs up from the bottom of the crevasse to the surface. But I am not convinced that shearing along such a plane is the way in which collapse would occur. At points below a depth of 2h ₀ it seems unlikely that the restraint exerted by the surroundings would be enough to prevent the ice from being squeezed out plastically. In view of the fact that ice has no sharp yield point I should think that the most likely method of failure would be a bulging out of the wall of the crevasse, the bulging becoming more pronounced the greater the depth. 2h ₀ is then a rough measure of the depth at which this bulging becomes rapid.

Mr. Hartog: Applying the formula that Dr. Nye derived for the greatest height of an ice cap

where h = height in m.. and x = radius at base in m., and assuming that the North East Land ice cap Sørfonna is circular in plan, and of approximately 14 miles radius on a flat base 300 m. above sea level, all of which is reasonable as a first approximation, then the maximum height attained comes out at 740 m. above sea level approximately. The height was found by Professor Ahlmann in 1931 to be 764 m.

Dr. Nye: I am grateful to Mr. Hartog for pointing out this satisfying agreement. The fact that the formula for a horizontal bed and with 2h ₀ = 23 m. fits the observed height shows that the average shear stress on a horizontal plane passing through the edge of the ice cap is close to 1 bar.