Unconfined ice Shelves

We define axes as in Figure 2. The x-axis is horizontal in the direction of flow and the is z-axis measured vertically upwards from sea-level. The ice thickness is H and the elevation of the upper surface is h. The surface slope is θ. The density of the ice is ρ which we, for the moment, assume to be constant with depth. Direct stresses are denoted by σ _xx , σ _yy , and σ _zz , and shear stresses are denoted by σ _xy , σ _xz and σ _yz . We assume the flow-law form (Reference PatersonPaterson, 1969, chapter 6)

where

is the strain-rate. Stress deviators are defined through

where p is hydrostatic pressure, and δ _ij = 1 if i = j, and δ _ij = 0 if i ≠ j. The effective stress τ is defined by

B is an empirical constant which is temperature dependent; we begin by assuming it to be constant through the ice shelf. We take n = 3.

Fig. 2. Symbols used in discussion of ice-shelf stresses. The rectangle abfe lies on the upper surface of the ice shelf and the rectangle cdhc; is horizontal at some depth in the body of the ice shelf.

For quasi-static creep the general conditions of stress equilibrium are:

In treating the case of an unconfined ice shelf we make the following assumptions:

• (a) that the ice shelf is floating in hydrostatic equilibrium, so that

  

  (7)
  where ρ _w is the density of sea-water.

• (b) that the ice shelf is free and uniform in the y-direction; no quantities vary in this direction, and shear stresses σ_xy and σ_yz are zero.

• (c) that ∂σ _xz /∂x = 0. We shall see later (Equation (17)) that this is strictly true if ∂θ/∂x = 0.

The equilibrium Equations (4), (5), and (6) then reduce to

Integrating Equation (9) we have, in general,

where f(x, y) is some arbitrary function of x and y. At the upper surface, z = h(x), vertical force balance requires that σ_zz = θσ _zx . However, we are for the moment assuming that σ _zx is zero, therefore, since no quantities depend on y, and neglecting atmospheric pressure, we have σ _zz = 0 at the upper surface. Then it follows that

Consider now the stress deviators. We have

but since the ice shelf is unconfined in the x and y directions we must have

and hence

Also, assuming that ice is incompressible we have

and, therefore, through the flow law (Equation (1))

Hence,

In calculating τ ² in the flow law we shall treat the shear stress σ _xz as small compared to the stress deviators. The result of our calculation will justify this assumption. By Equations (11) and (12) this leads to

The equation for flow in the x-direction is then, from Equations (1), (11), and (13),

Inserting Equation (10) we then have

To achieve equilibrium of forces we must balance the total force of σ _xx acting over a vertical column in the ice shelf with the total force of sea-water pressure acting on it. That is,

Performing these integrations using Equation (14) we find, assuming that

is uniform with depth, that

which we have simplified using Equation (7). B is the average of B over depth. Substituting this into Equation (14) and now assuming B uniform with depth, we have:

This gives σ _xx , as a function of depth for any thickness of ice shelf. The equation was achieved by overall balance of total internal force due to weight of ice with total external force due to sea-water pressure. We now ask whether stresses exactly balance each other at all depths through the ice shelf. We find that they do not, and that a vertical shear stress σ _xz must be present to make up the balance.

Consider the equilibrium of a vertical column abcdefgh (Fig. 2). The sum of all forces on the six surfaces must be zero. We shall consider forces in the x-direction. There is zero traction on the surfaces abfe, abcd, and efgh, so if there is any imbalance between forces on aehd and bfgc it must be counteracted by shear σ _zx along cdhg. This is equivalent to integrating Equation (8) with respect to z. We have:

Performing these integrations using Equation (16) we find

This shows that on our simple model, in which density and flow parameter are constant with depth, shear stress varies linearly with depth, and is independent of flow parameter. It is zero at sea-level and maximum at the bottom of the ice shelf.

By considering stresses on a small element near the surface, and using Equations (10) and (17), it can be shown that the shear traction on the slanting upper and lower surfaces is indeed zero, as it should be. Vertical forces at the surfaces do not balance properly, since we earlier assumed that σ _zz = 0 at the upper surface, and yet we have now shown the existence of a non-zero shear stress σ _zx = −ρgθh/2. Since σ _zz = θσ _zx we should strictly now have

The analysis thus contains a slight discrepancy. The error is a second-order correction and could be included if the whole procedure were to be iterated further.

From Equations (11) and (16) we find that

Therefore,

Surface slopes of unconfined ice shelves are generally small. For Erebus Glacier tongue (Reference HoldsworthHoldsworth, 1974), θ is approximately 3 × 10⁻³. Since z can be at most some six times the magnitude of h we see that σ _zx is at most five per cent of the magnitude of σ _xx′. σ _zx is therefore generally negligible in comparison with σ _xx′ especially since we generally find ourselves comparing the squares of these quantities, as in Equation (3).

We can also perform the calculation for a real case in which density and temperature vary with depth. The calculation is lengthy and does not lead to a simple analytic answer like that of Equation (17), but it follows the same principles as above. For a particular case we look at Erebus Glacier tongue and use data from Reference HoldsworthHoldsworth (1974). We assume that density varies with depth according to the model of Reference SchyttSchytt (1958) and we adopt a temperature variation similar to those in Reference WexlerWexler (1960). We assume that the flow parameter B has a Boltzmann temperature dependence (Reference PatersonPaterson, 1969, p. 83)

where

and T is the absolute temperature.

We fit the constant A in order to agree with value of B found by Holdsworth from his data. The result of the calculation, carried out for a point five kilometres from the hinge zone, is shown in Figure 3a. It is shown together with the result obtained by assuming a constant density and flow parameter, as in Equation (17). The shear stresses in the two cases are significantly different, but show the same form and order of magnitude.

Fig. 3. Shear stress as a function of height z above sea-level for (a) Erebus Glacier Tongue (unconfined); (b) Amery Ice Shel, (confined). The solid line shows the result of assuming density and temperature constant with depth, and the dashed line shows the result of allowing them to vary realistically.

Confined bay ice shelves

Consider now an ice shelf in a parallel-sided bay (Reference ThomasThomas, 1973[b], fig. 2). The ice shelf is confined in the y-direction and undergoes shear at the sides. We assume that shear stress at the sides reaches a limiting value τ _s (Reference ThomasThomas, 1973[b]) and write

and, therefore,

where λ is the half-width of the ice shelf. We still assume that ∂σ _xy /∂x = 0, since τ _s and λ are independent of x, and that ∂σ _zx /∂x = 0. We assume that σ _zy = 0. We can then write Equations (4), (5), and (6) as

Now

and therefore σ _yy′ = 0 by Equation (1) so that we have from Equation (2)

We continue to treat shear stresses as small in the effective stress expression Equation (3) and we find this leads to

Therefore, by Equations (1), (19), and (20)

From Equation (18) we still have

and so

Creep in a bay ice shelf is given by (Reference ThomasThomas, 1973[b])

where x = X marks the seaward margin of the ice shelf. By considering the dependence of this function on x we find that to first order in small quantities δx we can write

We can now, as before, consider the balance of stresses on a column in the ice shelf. Consider the column abcdfegh (Fig. 2). We must equate the forces in the x-direction over all the surfaces of the volume, but we now have to include horizontal shear stress on the surfaces abcd and efgh. The force due to stresses on these surfaces is simply

so we can write

We perform these integrations using Equations (21), (22), and (23) and we find that

Again, we find that the simple model with a constant density and flow parameter leads to a shear stress which is linearly dependent on depth and zero at sea-level. The two terms in Equation (24) are of different sign, since τ _s is negative; the shear stress may therefore have different senses, depending on which term dominates. In practice the term ρgh/2 is generally the greater, which corresponds to the state of extending flow generally found in ice shelves.

From Equations (19), (21), and (22) we find that the horizontal stress deviator is given by

and therefore

Looking at data for the Amery lce Shelf (Reference ThomasThomas, 1973[a]) we see that surface slopes are about 3 × 10⁻⁴. This means that shear stresses are at most some 0.4% of direct stress deviators. It is therefore again true to say that they are negligible.

As for the unconfined ice shelf treated above we can also carry out the calculation using realistic assumptions about density and temperature profiles. Using data for station G2 on the Amery Ice Shelf we find again that shear stress is essentially of the same form and magnitude as that calculated on the simple model. Figure 3b shows shear stress as a function of depth for the two models.