2.1. Diffusional creep

At very low stresses, ice deforms by the diffusion mechanism like other materials. Depending on the diffusion path there are two different processes: One is called the lattice diffusion mechanism which is the flow of point defects through bulk grains, and another is the boundary diffusion mechanism which is caused by the flow of point defects through grain boundaries. Their constitutive equations are respectively given by (Herring, 1950; Coble, 1963; Raj and Ashby, 1971):

(1)

(2)

The meaning of letters in the equations are explained in Table I.

Table 1. Nomenclature and Numerical Values

The linear stress dependence of the strain-rate is included in both lattice and boundary diffusion. If we assume that the activation energy for boundary diffusion Q _b is much less than that for lattice diffusion, as is the case in metals, the boundary diffusion mechanism is dominant only at low temperatures. Disposition of the crossover between two mechanisms depends upon the estimate of Q _b/Q and its actual method of evaluation is given in Section 3.

2.2. Dislocation creep

At temperatures above about 0.5 T _m (T _m is the melting temperature in K) and under relatively higher stresses than those at which diffusional creep prevails (approximately 10^-2 MPa), the dislocation creep mechanism is dominant. The constitutive equation for this mechanism may be properly derived from a consideration of the factors which control dislocation velocity as proposed by Goodman and others (1977). However, we adopt here the third-power law which is generally accepted from many experimental results. Then, the constitutive equation for this region is:

(3)

The activation energy Q _d is known to be 66.2 kJ/mol below 265 K but to increase abruptly above 263 K to the melting point (Barnes and others, 1971). In constructing the present map, Q _d was taken as 126 kJ/mol at temperatures above 265 K.

2.3. Onset of cleavage crack

The onset of cleavage cracks, that is, the propagation of cracks from the piled-up dislocations near the boundaries takes place at a critical stress given by (Petch, 1969):

(4)

In this equation, γ ₃ is the surface energy of the crystal, G the modulus of rigidity, d the grain diameter, and k _f is a constant. This equation is derived from the assumption that the work done on the number of dislocations piled-up is transferred to the internal surface energy of a cleavage crack. The constant k _f is given by

(5)

when the pile-up of dislocations occurs only on one primary slip plane, as in the case of ice (Stroh, 1957).

When a cleavage crack is formed, many secondary dislocations appear around the crack to release the large strain at or around its tip. Thus we must consider an additional energy γ _p in addition to the internal surface energy γ _s. As stated in the Appendix, γ _p may be expressed to a good approximation as,

(6)

where V _d is the velocity of dislocations under stress and B is a constant to be determined from experimental data. Then, rewriting Equation (4), the critical shear stress for the start of cleavage-crack propagation is given as

(7)

Since V _d is proportional to the applied shear stress (Fukuda and Higashi, 1973) and its temperature dependence should be of the Arrhenius type:

(8)

where V ₀ is the velocity at a standard stress and temperature. The value of the activation energy Q ^′ calculated from the data of Maï (1976) is a little less than that for creep (52.4 kJ mol^-1). Insertion of Equation (8) into Equation (7) gives an intrinsic expression for the temperature dependence of τ _c, but it may be converted to

(9)

This is an equation which can be used to give the criterion for the onset of cleavage crack or used for drawing the boundary between the dislocation creep and DGC regions on a deformation map.

2.4. Dislocation glide with cracks

The stress at which cracks first appeared in specimens of polycrystalline ice in the deformation process was reported by several investigators. Hawkes and Mellor (1972) reported the stress to be 2–4 MPa at 266 K, and Gold (1972) made the observation of 0.6 MPa at 242–268 K. Parameswaran and Jones (1975) reported the value of 0.1–0.5 MPa at the very low temperature of 77 K. Therefore, polycrystalline ice subjected to stresses above a few bars should almost certainly include cleavage cracks and these should influence the deformation behaviour of the ice. Our experiments with Antarctic core ice which already includes many cracks or air bubbles showed that this ice deformed faster than laboratory-grown ice even at the lower stress level which would correspond to the dislocation creep region of the map, although the stress dependence of the strain-rate (τ ³) did not change. This softening effect of the cracks can be understood as a result of increased numbers of dislocations generated from the crack surface. When polycrystalline ice is subjected to stresses above a few bars, the number and size of cracks increase with increasing stress and time.

We can assume that the strain-rate in the DGC region takes the form

(10)

where K ^′ is a constant and S is the total surface area of cracks. At low stresses, S is constant for ice specimens containing some cracks, but at higher stress S varies with τ in the way described below. If the cracks are to be formed by dislocation pile-ups near grain boundaries as Stroh proposed, the number of cracks, and therefore S, should be proportional to the mobile dislocation density which is equal to from Orowan’s relation. Generation and pile-up of such mobile dislocations in individual grains may be controlled by the structure of boundaries surrounding grains. V _d ^′ is the average velocity of dislocations in grains of polycrystalline ice and it should be proportional to the velocity of a single dislocation V _d. Considering that is proportional to τ ³ and V _d to τ, we obtain from Equations (8) and (10) the following relation,

(11)

where K is a constant which is to be determined from the experimental data. The flow rate in the DGC region is dependent on -τ ⁵.

In the low temperature (<0.7 T _m ) area of the DGC region, the total strain-rate may be largely controlled by cracking itself. In this area, the motion of dislocations does not play a role in glide but is only involved in nucleating cracks according to Stroh’s model. Here, the constitutive equation may be written as

(12)

where N is the crack density and h is the thickness of a crack. Since V _c should be strongly stress dependent but weakly temperature dependent, the contours of equal strain-rate may tend to be parallel to the abscissa. However, no quantitative calculation was carried out for this region.

2.5. Fracture region and ideal strength

The fracture region is based on the experimental observation that polycrystalline ice fractures readily when it is subjected to a rapid deformation at a rate exceeding 10^-3 s^-l. No constitutive equation is given for this region. Methods of drawing the boundary between this and the DGC region will be given in Section 3.

At higher stresses above the ideal strength τ _t , the crystal can deform without the need for any defect. Since τ _t is of the order of 0.1 G, the strain-rate is infinite at stresses greater than this value.

4.1. Stress dependence

In the high temperature (>0.6T _m ) range of the proposed map, the stress exponent n in the dependence of strain-rate on stress increases from one (diffusion creep), through three (dislocation creep) to five (DGC) with increasing stress. This increasing stress dependence agrees well with experimental data previously obtained for the flow law of ice. The data are restricted to a comparatively narrow area on the map in both stress and temperature ranges. Available data are plotted on the map by squares or lines as indicated in the legends. Bromer and Kingery (1968) found n to be one in an area of effective shear stress from 1.2 × 10^-2 MPa to 1.2 × 10^-1 MPa and for temperatures between 260 K and 270 K. Mellor and Testa (1969) found n to be 1.8 at effective shear stresses from 5.8 × 10^-3 MPa to 2.9 × 10^-2 MPa and at a temperature of 271 K. These data do not agree well with the regions of the map. Colbeck and Evans (1973) examined the creep data of glacier ice at effective shear stresses between 3.5 × 10^-3 MPa and 5.8 × 10^-2 MPa at the pressure-melting point and proposed a polynomial flow law containing linear, cubic, and fifth-power stress terms. This expression indicates that a linear term is dominant at low stresses and the cubic and fifth-power terms dominate with increasing stress. Barnes and others (1971) found n to be three in a wide range of stresses from 5.8 × 10^-2 MPa to 5.8 MPa and temperatures from 225 K to 271 K. At low stresses, their data suggest that stress exponent n is indeed three, but there is a tendency for it to increase to five at higher stresses (near 5.8 MPa).

4.2. Activation energy

It has been reported that the activation energy for the creep of ice at high temperatures near to the melting point (above approximately 265 K) is much higher than that at a lower temperature, that is to say almost twice as high as the normal activation energy. If this is considered, then a bend appears on any boundary between different fields near the ordinale at T _m as shown by the dotted line on the boundary between dislocation creep and DGC. Another example of this is the bend downwards from the horizontal boundary between lattice-diffusion creep and dislocation creep. At higher stress above 10 MPa, we should incorporate a pressure-melting region in the map but it is not shown in this diagram.

4.3. Hydrostatic pressure

Our recent experiments (Higashi and Shōji, 1974 and unpublished data) on the deformation behaviour of deep Antarctic core ice under hydrostatic pressure revealed that the strain-rate decreases with increasing pressure while the fracture stress increases. This effect must be caused by the closure of cracks under hydrostatic pressure and it is expected that the line of onset of cleavage cracking or the boundary between dislocation creep and DGC will be shifted upward to higher stress levels on the map and the dislocation creep region will be expanded. This effect should be taken into consideration when we wish to apply the map to our understanding of ice How within glaciers or ice sheets.

The effects of other factors such as grain size and the distribution of c-axis orientations must be considered in a practical use of the map. Grain-size changes affect the region of diffusion creep and the boundary between the dislocation creep and DGC regions as predicted by Equations (1), (2), and (9). Finally, it should be emphasized that the map proposed here was constructed for uniaxial compressive stress without any superimposed hydrostatic pressure.