Theory of thermal stresses

The problem we wish to solve is that of the stresses in a thermally fluctuating region of some 5 m thickness attached to a large mass of ice which is thermally stable but which may anyway be creeping longitudinally under the stresses of external constraints and its own weight.

Let us begin by looking at the simpler case of a thermally active region at the surface of a completely static, unstraining larger block of ice. Because the surface layer is much greater in lateral extent than in thickness and is everywhere joined to the larger mass (indeed they have no well-defined boundary), we can say that any temperature changes in the surface layer cannot give rise to large-scale movement (expansion or contraction) of the layer relative to the stable block beneath. This is an application of Saint Venant's principle concerning edge effects: if a surface rests on and adheres to a massive block as described and undergoes thermal variations, we should expect the tendency towards thermal expansion and contraction to lead to actual motion only in the vicinity of a free boundary. Far away from the edges no relative motion of the surface layer and the block can occur. The same condition of zero actual strain applies in the case of sea ice or lake ice which is restrained by rigid banks at its boundary. We are therefore treating the case of laterally restrained thermal expansion and contraction: any tendency of the ice to expand or contract results not in strain but in the creation of just enough stress to restrain the tendency. It will also be assumed that the ice does not fracture under tension, an assumption which will be justified once we have calculated the stresses involved.

In order to calculate the stresses we use a method in which we in effect transform our spatial frame of reference to an expanding frame of coordinates. We choose these expanding coordinates so that they expand at the same rate as would an unrestricted body undergoing thermal expansion: they therefore represent the frame in which the material in question would be stress-free. So, if the material is subject to a temperature-time gradient of [inline img 5] and has a linear coefficient of expansion a, it tends to remain stress free by expanding at rate [inline img 6] To treat it we therefore transform from real-space coordinates Xi to expanding coordinates Xi related by:

If we then require that the material remain unstrained in real space we are introducing an effective strain-rale of:

relative to the stress-free frame xi and are therefore introducing the stress associated with it.

We shall assume that this stress is simply that required for the strain-rate concerned according to the empirically determined flow law for ice. This assumption is not exact, although it is one generally made in related literature (for instance Gatewood, 1957, p. 1). An exact analysis involves taking complete account of the thermodynamics of irreversible processes, and finding values for Onsager's "cross-coupling" coefficients for a material with a non-Newtonian flow law (Boley and Weiner, 1960, p. 1-40). If such an analysis were possible it should lead only to minor modifications of the stresses involved (Boley and Weiner, 1960, p. 41-44); the "cross-coupling" is an expression of a relationship analogous to the complementary relationship between stretching and heating a rubber band: if much expanded it will warm slightly, and if much warmed it will contract slightly. Only very tiny errors are involved, however, in calculating the stresses in a stretching rubber band on the assumption that it remains isothermal.

The advantage of the formulation in terms of the expanding coordinates is that we can now readily treat the real case in which the thermally active layer rests on top of a continuum which is itself undergoing gross strain. If the ice mass as a whole is undergoing longitudinal strain-rates ⋵i relative to the real coordinates xi, then it is undergoing longitudinal strain-rates

relative to the thermal stress-free system x/. We shall not enter here into any treatment of shear stresses: the shears in the vertical plane are in the case of an ice shelf anyway negligible, and shears in the horizontal plane may be eliminated from the analysis by choosing xi along the principal axes. The orientation of the principal axes is unaltered by the transition to the frame xi

We are now in a position to make an analysis of stress. An elastic model is unrealistic, since ice responds elastically only over a time scale of 5 to 10 s (Gold, 1958). We shall therefore consider creep, and for high-density ice we shall use as flow law the form most widely accepted on the basis of theoretical expectation and experimental confirmation, that is (Paterson, 1969):

In this equation, expressed here relative to the system AT/, we have an expression for the strain-rate $$$$i as a function of the stress deviator $$ oj*, the temperature T, and the effective stress T. The quantities A, Q, and n are empirically determined constants and R is the gas constant.

The use of the stress deviator $$at* instead of the stress σί expresses the observed fact that strain-rate is independent of hydrostatic pressure, and is related only to the deviation of stress from hydrostatic pressure (Rigsby, 1958). The two quantities are related by:

The Boltzmann exponential term in Equation (9) expresses the increasing ductility of ice as temperature increases (Glen, 1955).

The effective stress τ arises from the second invariant of the stress-deviator tensor, which is expressed by:

The term τ^η * appears in the flow law as a result of general requirements on the form of flow law allowable (Nye, 1957; Glen, 1958): because randomly oriented polycrystalline ice (which is what we are assuming glacier ice to be) is isotropic the law must be independent of axis orientation and therefore be expressible as a general relationship involving only the three invariants of the stress deviator and the strain-rate tensors. On requiring that under given stress conditions the components of strain-rate be proportional to the components of stress deviator, following the Lévy-Mises equation, we find that we may eliminate terms involving the third invariant; and we find also that by Equation (10) the first invariant vanishes identically, so that we are left with a relationship involving only the second invariants. We posit :

with ê' arising from the second invariant of the strain-rate tensor

and it has been found by experiment that n lies in the range between 1.5 and 4.2 for conditions of steady-state deformation. The experimental results are summarized in, for instance, Weertman (1973). We shall ignore here the possibility of fatigue hardening, for which no evidence exists, and shall ignore any transient flow characteristics ; such transients correspond to the time taken to establish stable deformation mechanisms in secondary creep and generally die out in a few hours (Glen, 1955). We shall use here the value of n = 3.

For the purposes of the analysis in hand we can treat stresses as invariant under the transformation between frames xi and xi. This is justified because stress has dimensions

Now mass and time are invariant between (slowly moving) inertial frames, and although length is not strictly invariant since we are transforming between relatively expanding frames, it will be seen that we are dealing with strains in the order of 10^-3, so that errors arising from the treatment of stress as invariant are tiny.

Because the volume of ice is changing we no longer have the familar equation for the null divergence of the velocity field

but instead have the equation

where 3a dT/dt represents the rate of change of volume per unit volume. However, by substituting Equation (8) into Equation (13) we find

in the stress-free frame, as one might expect.

Through Equation (9) this means we have also:

We proceed as follows. At a point, the factor A exp [- Q/RT] τ^ζ$$$ in Equation (9) is the same for all components $$ aj*, and we can therefore write it as y and say :

and

Hence

or

where

From Equation (14) we can write

and hence by Equation (15)

so that we can express τ in terms of a and σ,*. Shear stresses are being assumed negligible so that Equation (11) becomes

and therefore we have

by virtue of Equations (15) and (16), leading to

Our expression for strain-rate as a function of stress deviator is then, by Equations (9) and(17):

We can therefore calculate thermal stresses according to the formula

and use Equation (15) for the other principal stress a₂*

We notice that ι+α+α² is necessarily positive non-zero, and so cannot lead to a singularity.

Numerical results for stresses

Equations (18) and (15) can now be used to calculate the thermal stresses associated with realistic values for the parameters T, dT/dt, i_u and e₂. To begin with we shall look at the case of an ice sheet not itself undergoing gross strain. That is :

and therefore by Equation (8)

Thus

and the stresses are

with a = 5.3 X 10-5 deg-' (Hobbs, 1974, p. 347), Q/R = 7.293 X 10¹ deg (Weertman, 1973), and A = 1.05 x 1o^-12 N^-3 m⁶ s^-1 (from Paterson, 1969, p. 83.

Fig. 6. Progress of the stress wave-form though the top 10 m ofa glacier, fir the case of a glacier not undergoing gross strain.

The value used here for A is at the upper end of the range found experimentally (Weertman, 1973); stresses calculated from it are therefore the minimum to be expected. Figure 6 shows the stress as a function of time of year for depths 0.5, 1, 2, 3, 4, 5, and 10 m. Figure 7 shows the values of (a) the maximum magnitude of stress $$ lc*|_max occurring over the year, (b) the mean magnitude of stress $$|σ*| over the year and (c) the overburden pressure — pgy due to overlying ice. It is seen that in the top 3 m of surface cover, stresses of thermal origin dominate those due to the weight of ice above. The mean stress over the year taking account of sign is very nearly zero: it is not precisely zero, since the symmetry of the surface temperature form is destroyed by the effects of selective phase delay of the temperature waves, and this combined with the cubic form of the flow law leads to a net bias of compressive stress over extensive stress at most depths. The magnitude of the effect is however entirely negligible, having a value at 3 m of 0.005 bars.

Fig. 7. Comparison of thermal stress with overburden pressure, as a function of depth.

We consider next the case of an ice shelf undergoing gross strain. Strain-rates measured on George VI Ice Shelf are typically in the order

(personal communication from J. L. W. Walton). The minus sign denotes compression.

Use of these parameters in Equations (18) and (15) leads to the graphs in Figure 8. These results show that in the top 2 or 3 m of a glacier the thermal effects lead to stresses alternating quite rapidly between extensive and compressive, and these alternations are enough to dominate the stress due to dynamic creep even when there is an overall strain of some ±10 ¹⁰ s ^r present. Such a strain is moreover at the upper end of the range of strain-rates to be expected on ice shelves (see for instance Thomas, 1973, Table I).

We can therefore safely say that, in the top 3 m of ice cover, stresses due to temperature change dominate those originating both in gross deformation and in weight of overlying ice.

Fig. 8. Progress of the stress waveform through the top 10 m of a glacier, for the case of a glacier undergoing gross strain-rates $$ il — ~1.9 ° ^s~' ^and έ_ζ =0.6X io~¹⁰ s~^:. The solid line shows the stress along the major principal axis, and the dashed line shows the stress along the minor axis

Effect of the stresses

We now have a picture of the surface cover of a glacier undergoing quite pronounced alternating compressive and extensive stress throughout the year. What effects can such stresses have? First of all let us determine whether our assumption that no tensile fracture occurs was justified, and then proceed to consider the possibility of other modes of permanent deformation.

We have found that thermal stresses in high-density ice are generally in the order of 0.5-1.0 bar, and in any case always less than 4 bar; the corresponding strain-rates are less than 5X 10^-9 s^_I. The fracture behaviour of ice has been studied under conditions both of constant applied stress and of constant applied strain-rates. Butkovich (1954) finds the critical fracture stress under tension to lie in the range 13.7 to 18.7 bar for the temperature range 0 to — 40°C, and Gold ([1971]) finds that the critical strain-rale under compression is about 10^-7S-1. We can therefore say that for high-density ice in the temperature range considered it is unlikely that fracture under thermal stress can occur unless local inhomo-geneities cause stress concentrations.

The assumption of no fracture is therefore validated and we can consider the effect of the stresses as calculated. Let us look at the possibility of the formation of surface rumples due to buckling and boudinage under stress. This would be an effect analogous to the formation of rumples in the surface tarmac of a road during a heat wave.

It might at first be objected that the magnitude of strain involved, which is in the range 10^-4 to 10^-3 in the surface four metres, is too small to result in fold formation of significant amplitude, for geological orogenesis is generally concerned with continuing compressive strains of the order of 5% to 25%, or about 10^-3. A strain of 10^-3, which anyway fluctuates about zero strain, might seem unlikely to result in folding of appreciable magnitude. An order-of-magnitude calculation shows that in fact such strains need not be insignificant: consider the case of a flexible incompressible bar, pinned at its ends and undergoing thermal expansion (this is the well-known problem of the buckling of railway tracks when warmed). Assuming that a straight bar distorts into an arc of a circle we find (Fig. 9) that a small strain e in a bar of length L results in a deflection h at the highest point of

Fig. 9. Buckling of a pinned incompressible bar subject to compressive strain.

For the case of strain 10^-3 this amounts to o.o19L, or a deflection of 8.7 in for rumples of wavelength 450 m, and of 19 cm for rumples of wavelength 10 m. These are large deflections. The model of a pinned incompressible bar does not, of course, correspond closely to reality; nor does the model we used above to calculate stresses on the assumption that deformation is perfectly homogeneous pure shear, for it emerges that such deformation is generally unstable to the formation of folds. Reality lies somewhere between the two models, so that we should expect some buckling inhomogencity to occur, but with an amplitude less than 0.019L; the model of a flexible bar sets an upper limit, perhaps a generous upper limit, on the allowable amplitude.

Let us try to calculate a wavelength for buckle formation. There is a fairly extensive literature on buckling and orogenesis of visco-elastic media under stress, due largely to Biot (1961, 1965). The resulting predictions have been used before for glaciological applications: the surface undulations on the Ross Ice Shelf have been modelled as a gross folding of the ice shelf under compression (Kehle, 1964), and surface rumples on the Meserve Glacier, Antarctica, have been modelled as due to compression of a medium with exponentially decaying viscosity with depth (Holdsworth, unpublished). More recent work (Smith, 1975, 1977) has stressed the importance of the fact that the material in question is non-Newtonian and it is Smith's development to which we shall refer.

We shall need to look at the profiles of stress and viscosity with depth at various times during the year. For the "viscosity" of a non-Newtonian material we shall adopt the parameter "effective viscosity", which characterizes the relationship between an increment in stress, $$ δσ*, and the resulting increment δέ in strain rate. For an increment in longitudinal stress acting against a background of longitudinal stress this quantity is given by

or, using the results found earlier in this Section,

and, for a = 1,

Fig. 10. Stress as a function of depth for six days of the year.

Inspecting the profiles of stress and of viscosity against depth (Figs 10 and 11) we see that the form is essentially that of a series of two or three layers of some 2 m thickness, alternately in compression and extension at stresses between 0.5 and 1 bar. The form of Equation (19) used for the viscosity leads to singularities as the stress deviator σ,* passes through zero, implying that the viscosity becomes infinite at these points; this feature is due to the cubic form adopted for the power flow law, and disappears if we consider ice to show more nearly Newtonian behaviour at low stresses, as found by Butkovich and Landauer (1960). Apart from this feature, the viscosities of successive layers show a steady but quite minor increase with depth.

Fig. 11. Effective viscosity as a function of depth for six days of the year.

Figure 12 shows the type of stress model we would wish to analyse, although, since the form of stress with depth is continually changing, we cannot expect to make an analysis of buckling behaviour which will be precisely valid throughout the year. The model of Figure 12 is further complicated by the fact that our analysis of stress has considered successive layers to be in differently expanding coordinate frames, so that there are difficulties in expressing the boundary conditions at an interface. The treatment of buckling behaviour proceeds by considering the instability of small perturbations in the interface between two layers; we find out the rate at which a small perturbation grows or decays under the stress conditions applying, and thus determine the initial growth rate as a function of the wavelength of the perturbation. The wavelength which has the greatest initial growth rate is identified as the "dominant wavelength", and it is this wavelength which we should expect to find occurring. From the analysis of Smith (1975) we can see that the primary driving force of interfacial instability arises from a discontinuity in longitudinal stress deviator in passing from one layer to another; in his analysis, which is for homogeneous pure shear of a stratified viscous block, the stress discontinuity arises through the requirement that a stratified block of layers of different viscosities deform at a uniform strain-rate. The layers must therefore sustain different longitudinal stress deviators. In our case we again have an interfacial stress discontinuity, indeed a larger one, in which successive layers are under stresses of opposite sense. In the absence of a precise analysis, the most we can say is that such a physical situation would seem very likely to lead to buckling instability. As to the wavelength, we can make a fairly firm order-of-magnitude estimate by making a general survey of the results from the many possible models of buckling which have proved susceptible to an exact analysis (Fig. 13). It is found in general that the dominant wavelength is primarily a function of the layer thickness, and is very insensitive to other factors: it depends in a minor way on the viscosity ratios of successive layers, on the conditions of stick or slip at the boundaries, and, if gravitational forces are taken into account, on the ratio of deviatoric stress to gravitational stress. It is found, however, that for all but the most extreme cases we have a ratio L/d of buckling wavelength L to layer thickness d of between 4 and 6.

Fig. 12. Schematic diagram of a typical surface thermal stress state.

Since we are concerned here with layers of thickness approximately 2 m we can assert that any surface rumples which are the result of thermal stress may be expected to be of wavelength between 8 and 12 m. Thermal stresses do not, therefore, provide an explanation of the rumples of the wavelength found on ice shelves.

Analyses of buckling behaviour invariably restrict themselves to "incipient" buckling-— that is, the initial growth rate of infinitesimal perturbations. No attempt is made to quantify post-buckling behaviour, and for this reason no estimate is made of the amplitude of folding at a late stage in the process. The fact that in our case the ice is undergoing periodic extension and compression instead of steady stress may increase the growth rate of rumples: for the formation of rumples under compression will result in regions of thinner ice in which stress will concentrate when the system is placed under tensile stress. The rumples should be accentuated by a process of necking. There is also the possibility of melt water and accumulation finding their way into fissures in the ice (Shumskiy, 1955) ; such processes would render the process of expansion and contraction irreversible, and lead to compressive stress dominating. This is especially true in the case of melt-water percolation, which will lead to additional stresses due to the volume change on freezing.

For an unstraining ice mass we can say nothing about the preferred orientation of rumples since there is perfect symmetry in the horizontal plane, but we might expect quasi-hexagonal patterns as with cracks in frozen ground. For a straining ice mass we should however expect the rumples to form perpendicular to the principal axes of longitudinal stress, for these are the directions in which the total stresses are a maximum.

Fig. 13. Modes of buckling under stress: (a) viscous layer resting on a semi-infinite viscous medium (Biot,1961); (b)non-Newtonian layer embedded in an infinite non-Newtonian medium (Smith, 1975,1977). The shaded areas represent the more competent (more viscous) medium.

Calculation of stresses

We shall now pass on to an analysis of thermal propagation and stresses in firn and snow. As pointed out in Section 3, the effective diffusivity of firn of density about 0.50 Mg $$ m-J is not significantly less than that of the high-density ice already treated, so the analysis of propagation of temperature waves can be carried over without modification. We can also retain the value quoted for the expansion coefficient a, since a connected structure of matter with air spaces expands at the same rate as a solid body of the same matter (it is just a matter of geometrical enlargement). Thermal strain-rates therefore remain the same. Since there is something of a contradiction in assuming that a firn layer could be subjected to the temperature wave of our Fossil Bluff model and yet remain firn, when in fact Fossil Bluff is a region of extensive summer melt, we shall also look at the effect of surface temperature waves corresponding to more realistic lower mean annual temperatures. We shall do this simply by reducing the term T_o in Equation (5) from -11°C to -21°C and to -31°C, but retaining the other parameters relating to the fluctuation of temperature about this mean

We shall not be able to follow the stress analysis of Section 4, since (a) the rheology of firm is not the same as that for ice, and (b) we shall find that we can no longer assume, as we could for high-density ice, that no tensile fracture occurs. To show this let us look at the flow and fracture behaviour of firn, and in particular its behaviour under tension.

Detailed study has been made of the densification of snow under compression, which can occur by a number of mechanisms, for instance: melting and refreezing; grain-packing by rearrangement; evaporation and condensation; grain-boundary diffusion of molecules; volume diffusion of molecules; plastic flow; and viscous flow (Anderson and Benson, 1963).

In the case of snow, densification proceeds primarily by the process of readjustment and closer packing of grains, while simultaneously there is the continuous process of "spheroidization" of grains, which occurs by processes such as evaporation and condensation, diffusion, and plastic flow. Grain packing continues until a critical close-packing density is approached, at a porosity of around 36-40%. After this point densification must proceed by mutual intrusion of particles (Benson, 1962).

Feldt and Ballard (1966) have summarized the laboratory and field results for the consolidation of snow and have provided a theoretical formula in good agreement with these results which treats snow as subject to Newtonian (viscous) flow characteristics and as having a macroscopic coefficient of viscosity calculable according to:

where p is the porosity of the snow, and b and $$ φ are empirically fitted constants. This form of relation is derived on the assumption that flow is dominated by the process of viscous flow of inter-particle bonds, and proceeds according to this until the critical density is reached. The critical porosity of 36-40% corresponds to density between 0.59 and 0.55 Mg m $$ K

The parameter N/V is strongly temperature dependent, so that snow becomes rapidly more viscous at low temperatures; experimental data from various sources are given by Feldt and Ballard (1966, p. 156), and are plotted here in logarithmic form against temperature (Fig 14). A straight line has been fitted to this logarithmic plot. The data show a large degree of scatter, owing to the many factors which can affect the viscosity of a snow sample of given density and temperature; its method of formation or preparation, its degree of age-hardening, its grain-size, and also the rate of loading used when testing it. The best value for b was found to be 1.78.

Fig. 14. Logarithmic plot of n/v against temperature, to determine the relationship between snow viscosity and temperature. Data from Feldt and Ballard {1966).

Literature on the tensile behaviour of snow is sparse. It has however been shown (Shinojima, 1967) that behaviour under tension is only slightly different from that under compression. He finds, admittedly in a different range of densities and stresses, that the coefficient of viscosity under tension is typically greater than that under compression by a factor of 1.61 but shows the same dependence on density and temperature. The greater viscosity under tension has been explained (Salm, 1975) as due to the fact that the mechanism of flow assisted by pressure melting under compression is no longer available. If we combine all these findings we can construct a general empirical formula for the effective macroscopic viscosity η_β of firn under tension:

or

where Θ is the temperature in degrees Celsius. On this basis we can proceed directly to the stresses resulting from the strain-rates caused by temperature variations. In considering the possibility of fracture under tension, we shall be concerned not with the average stresses occurring in the firn cover, but with the maximum stress occurring during the year; for a crack to form we only require one occasion on which the critical fracture stress is exceeded. We calculate the stresses using the strain-rates used in Section 4 and the viscosity of Equation (20). Table I shows the maximum stress calculated in this way, and also a "typical" value of high stress occurring during the winter period, when most of the high stresses occur. By "typical" we mean here a value of stress which is exceeded on 50 d out of the 365 d during the year, and is therefore quite a common occurrence. These stress values are calculated for three different temperature regimes : those with mean annual temperatures of — 11°C-21°C and -31°C

The effect of temperature reduction is dramatic, to the extent that, if we assume no cracking occurs, then stresses at the surface attain absurdly high levels. If indeed no fracture did occur then we should expect these large stresses, alternately tensile and compressive, to play an influential role in the diagencsis of snow, for they are well in excess of the stresses due to overburden of snow; we could picture the surface cover of a glacier as undergoing a vigorous alternating stress, which must result in accelerating of grain rearrangement and more rapid firnification. Let us however consider the possibility that fracture occurs and relieves the stress.

The tensile strength of firn has been studied (Butkovich, 1956) and is found to be a function of density and temperature : the fracture stress is found to increase quite rapidly with increasing density, and to depend on temperature only by a factor of about 0.9% deg"¹. For firn of density 0.50 Mg m^-3 and temperature between — io°G and — 40°G we find the tensile strength to lie in the range 4.1 to 5.2 bar.

Table I shows stresses present as a function of depth, and we sec that for T₀ — —11 °C tensile cracking can be initiated down to just over 0.5 m depth; for To = — 21°C it can be initiated down to 1 m depth; and for T₀ = —31°C it can be initiated down to 3 m depth. Once initiated, we should expect the process of stress concentration at the tip of a crack to allow it to propagate well beyond the region in which the fracture stress is achieved (Parmerter, 1975) and its eventual depth will be governed by the same rules as apply to crevasses (Weertman, 1977). Indeed the thermal crack will become a crevasse, and this observation leads to a possible explanation of the initial stages of formation of a crevasse, for crevasses are often found to form in places where the tensile stress driving gross deformation does not exceed 4 bar, which is the minimum stress required to initiate a crevasse. The very high thermal stresses are enough to "nucleate" crevasses, which can then grow if the gross stress conditions are suitable.