2.1 Experimental procedure

Specimens in the form of bars of rectangular section (8 mm × 2 mm) are mechanically cut from a single-crystal block freshly grown by the Bridgman method. The diffusion coefficient of hydrogen fluoride in ice being very high (Reference FletcherFletcher, 1970, p. 137) this property is used for doping the specimens by covering them over with an HF solution. The HF concentration is estimated from the electrical resistivity of the melted specimen after measurement. Moreover, the displacement of the relaxation peak (Reference VassoilleVassoille and others, 1977) confirms the result.

The rectangular bar is cut in two parts:

• (i) One part is about 20 mm long and is fixed on the goniometer of a Lang camera. Before each series of measurements of dislocation velocity, the crystallographic orientation of the specimen is determined and a topographic observation of the whole crystal is done. Then, a section of this crystal is chosen in order to observe the displacement of dislocations induced by a comprcssional stress applied by putting a load on the crystal. This displacement is measured by the double-images technique showing the position of the dislocations both before and after the application of the load. The whole Lang assembly is put in a box where the temperature is controlled between 250 and 272 K.

• (ii) The second part, about 80 mm long, is mounted in an inverted torsional pendulum. The variations of the logarithmic decay of oscillations with temperature is automatically provided (Reference EtienneEtienne and others, 1975); the amplitude of oscillations is variable, thus measurements of internal friction as a function of strain amplitude are possible.

Hence, both measurements (dislocation velocity and internal friction) are made on the same material.

2.2 Results on dislocation velocity

Experimental points (Reference MaïMaï and others, 1978) shown in Figure 1(b) exhibit, in the case of HF doped ice, a non-linear relation between velocity and stress in the whole temperature range 251–270 K. It must be recalled (Reference MaïMaï, 1976) that with the same ice before doping, this non-linear relation is observed only above 260 K (Fig. 1(a)).

Fig. 1. Experimental points and theoretical curves giving the dislocation velocity in pure ice (a) and HF-doped ice (b).

Furthermore HF induces an increase of the velocity of dislocations which is about twice that before doping.

2.3 Results on internal friction

When ice is doped with HF, the relaxation peak is observed at lower temperature than in case of pure ice (Fig. 2) indicating that the relaxation time is 70 times shorter. The HF content, which is supposed to be in substitutional solution, is then between 10 and 20 p.p.m. (Reference VassoilleVassoille and others, 1977).

Fig. 2. Internal friction versus temperature before HF doping (dashed line) and after doping for five different specimens (curves 1 to 5).

The high-temperature internal friction is clearly modified: it is increased (Fig. 2) and also it becomes more amplitude dependent (Fig. 3). Furthermore, the amplitude dependence appears at lower temperatures than in the case of pure ice.

Fig. 3. Internal friction versus strain amplitude before (a) and after (b) HF doping.

It is noteworthy that the curves of Figure 3 are correlated with those of Figure 1; indeed, as the high-temperature internal friction is interpreted in terms of movement of linear defects, only a non-linear relation between velocity and stress can induce an amplitude-dependent internal friction.

3.1 Effect of a substitutional doping agent on dislocation velocity in ice

In an ice crystal we write [I]_C for the molar fraction of a substitutional impurity and [I]_NC for the molar fraction of the same impurity in the extended cores of dislocations. The chemical potential of this impurity has to have the same value in the two phases; hence

where [I]_{C max} and [I]_{NC max} are the maximum values of the impurity concentration in the crystalline and non-crystalline part respectively.

The partition coefficient is introduced as Ks = [I]_{NC max} /[I]_{C max} .

Therefore

It is necessary to estimate a value of K _S in order to calculate the contribution ΔG(I), due to the impurity atoms, to the total variation of the free enthalpy induced by the extension of the dislocation core by one unit length in an ice crystal containing a concentration [I]_C of dopant. [I ]_{C max} can be obtained from the liquidus line of the equilibrium phase diagram of ice and impurity. [I]_{NC max} corresponds to the maximum value of the concentration when the core begins to melt; in fact, melting is only possible when there is an equilibrium between the increase in interfacial energy and the decrease in configurational energy. The approximation of linearized free-enthalpy–temperature curves is used once more and Figure 4 shows that this melting occurs at a temperature T in a material having a concentration of impurity [I]_{NC max} ; this temperature is between T _F and T _F′ (T _F′ being the temperature at which a bulk mixture of ice and impurity of the same composition would begin to melt), as indicated in Figure 4 and by the relation

where Δγ is the increase of interfacial energy when the interface between crystal- and non-crystalline core is transformed into an interface between crystal and liquid, ΔS ₀ is the melting entropy of the mixture of water and impurity (it is assumed that ΔS ₀ is of the order of magnitude of the melting entropy of ice).

Fig. 4. Linearized approximation of the variation of the free enthalpy with temperature in the case of liquid water, ice, and non-crystalline core phase.

Equation (3) can be written

Then from the equilibrium phase diagram, it is easy to obtain [I]_{NC max} corresponding to each value of (T _F – T _F′) determined as a function of the temperature T using Equation (4).

At this stage an attempt can be made to apply this result to the case of ice doped with HF. In Figure 5, the liquidus line is shown and the solidus line is drawn with the points which correspond to a maximum content of HF in ice as determined by Reference Haltenorth and KlingerHaltenorth and Klinger (1977). (It has been assumed that HF forms mainly a substitutional solution.) In the range 240–270 K, the values of [HF]_{C max} , [HF]_{NC max} and K _s are calculated from data in Figure 5 and Equation (4); these values are given in Table I.

Fig. 5. Phase diagram HF-H₂0; experimental points are given by Reference Haltenorth and KlingerHaltenorth and Klinger (1977).

It will be noticed that such values cannot be obtained without r*(HF) being known. However, an attempt will be made to calculate approximate values for (T _F– T _F′); since experimental data on HF-doped ice show that the relation between the dislocation velocity and the stress on the one hand is less linear in the whole temperature range 250–270 K (i.e. r*(HF) > r*) and, on the other hand, exhibits only a small variation with temperature (i.e. the decrease of r*(HF) with temperature is less than that of r*), for every temperature a value r ₀ ^*(HF) has been used in Equation (4) which is the average between r*(T) and r*(273). (The theoretical curve r*(T) which is chosen is that leading to the interpretation of experimental data, as will be mentioned later.)

The results presented in Table I indicate a strong accumulation effect of HF molecules in the dislocation cores: this conclusion is in agreement with the hypothesis of Reference Haltenorth and KlingerHaltenorth and Klinger (1977), nevertheless, the whole quantity of HF molecules being in the cores of the dislocations (maximum density: 10¹⁰ m^–2) proved to be about three orders of magnitude less than the total content of HF in the crystal, which is self-consistent with our preceding assump-tion indicating that HF would mainly be found in substitutional solution.

Furthermore, K _S seems to increase slightly with temperature, especially in the vicinity of T _F; since the thermodynamic approach which was introduced to describe the melting of mixture ice–impurity is probably not precise enough, this K _S variation will not be taken into account and an average value of K _S ≈ 5 × 10³ will be used.

The accumulation of HF molecules in the dislocations cores induces an additional variation of the free enthalpy ΔG(HF) which is given by

Once more, only the upper limit of the parameter ΔH _HF is known: it is the enthalpy of dissolution of HF in water (3 × 10⁹ J m^–3) taken from an infinite dilution until a concentration of about 0.1 is reached; the other parameter, ΔS _HF, is approximately the entropy of mixing HF molecules (concentration K _S[HF]_C) with H₂0 molecules in the dislocations cores (about 10⁶ J m^–3K^–1).

In this case the relation giving ΔG (Reference PerezPerez and others, 1978) must be modified to take into account ΔG(HF); thus r*(HF) can be calculated in the case of an ice crystal doped with HF (with global concentration [HF]_C) from the relation

Theoretical curves of r*(HF) as a function of temperature corresponding to [HF]_C = 10^–5 and to several values of the parameters ΔH _HF and ΔS _HF, are shown in Figure 6. It appears clearly that doping ice with HF induces an increase of r* which is, moreover, less dependent on temperature, in agreement with the preceding remarks about the experimental data.

Fig. 6. Theoretical values of r*(HF) versus temperature with [HF]_C = 10^–5; K_S = 5 × 10³; ΔS₁ = 5 × 10⁵ J m^–3 K^–1; γ₁ = 4 × 10^–3 J m^–2 (A) or 7 × 10^–2 (B); ΔH_HF = 10⁹ (a), 2 × 10⁹ (b), 2.5 × 10⁹ (c) J m^–3; and ΔS_HF = 3.66 × 10⁶ (a), 7.33 × 10⁶ (b), 9.14 × 10⁶ (c) J m^–3 K^–1, Dashed lines: [HF]_C = 0.

For better accuracy, it would be necessary to use the values of r*(HF) instead of r ₀*(HF) in Table I and to recalculate as implied by iterative methods. Nevertheless, this proved to be unnecessary since the substitution of r ₀*(HF) by r*(HF) leads to a variation in Ks which is small with regard to the approximation implied by taking Ks constant and equal to 5 × 10³.

Not only do the HF molecules modify the radius of dislocation cores, but also the structure relaxation time τ ₁ calculated in the preceding part of this work ( Equation 1)). In fact, the concentration of broken bonds C in the dislocations cores is probably modified by the presence of the HF molecules and becomes C′. Due to thermal activation, the hydrogen bonds whose energy is situated between ϵ and ϵ + dϵ exhibit the following equilibrium:

Following both this equilibrium and the linear distribution law it was assumed that the number of intrinsic broken bonds L _B among those considered is given by:

The HF molecules can form only one hydrogen bond instead of two in the case of H₂O molecules; thus, to have the bond ab (Fig. 7a) broken, two conditions are required, first the H₂O molecule a can be replaced by one HF molecule (the probability is Ks[HF]_C), and secondly the proton of HF is placed in position 2 (the probability is ½). Hence the number of extrinsic broken bonds can be expressed by

Fig. 7. Concentration of broken bonds such as AB as discussed in the text (a) as a function of [HF]_C for several temperatures (b).

In fact, there is a modification of the equilibrium (6) when impurity molecules such as HF are added and the number of broken bonds is L _B′. The analysis of this modification of equilibrium is similar to that of Reference KrögerKröger (1974) concerning the effect of HF on the concentration of ionic or Bjerrum defects in ice; this analysis being complicated, two extreme cases will be discussed:

• (i)

  
  the number of broken bonds L _B′ is approximately L _B,

• (ii)

  
  is approximately L _B (HF).

The limit between those two cases is given by

which corresponds to a critical value of ϵ given by:

Then the total number of broken bonds can be calculated

The concentration of broken bonds is:

This result is in agreement with the fact that when [HF]_C is high, C′ is equal to ½Ks[HF]_C, which corresponds to extrinsic broken bonds only (ϵ₀ ≈ 0) and when [HF]_C is small, C′ approaches the concentration of intrinsic broken bonds C (ϵ₀ ≈ E). The variation of C′ versus [HF]_C is numerically calculated and the result is shown in Figure 7b in the case of a temperature ranging between 240 and 270 K. Such a result will be used and the velocity of dislocations will be given by (Equation 2) in which r* and C arc replaced by r*(HF) and C′ respectively.

3.2 Application to velocity measurements

In our previous paper, it was shown how (Equation 2) could be used in the case of pure ice. Owing to the improvement of the theory, it is possible now to explain the results in both the cases of pure and HF-doped ice.

Though (Equation 2) is difficult to compare directly with the experimental data since the physical factors C (or C′) and r* (or r*(HF)) are not known, the latter depending on ΔS₁ and γ ₁ (and ΔH _HF, ΔS _HF), the effect of shear stress appears to be correctly described by the present analysis.

In fact, at low temperature (i.e. with low values of r*) and (or) at very low shear stress

Then we have

thus v _d varies linearly with the stress τ, and this linear dependence disappears when τ increases and the non-linearity is the more pronounced the higher the temperature or the higher the HF content. This remark is in very good agreement with experimental data.

(Equation 7) has been used to obtain E from the temperature dependence of the slope at zero stress of the curves v _d (τ), within a temperature range included between 251 and 270 K (Fig.8(a)). The values 0.10 eV < E < 0.11 eV was obtained. Thus the value E = 0.105 eV was used to draw the theoretical curves of v _d against τ and T.

Fig. 8. Comparison between plots of either logarithm of the slope at zero stress of dislocation velocity (a) or logarithm of low stress internal friction (b) (solid line: pure ice; dashed line: doped ice).

In the case of HF-doped ice, (Equation 7) is still valid with C replaced by C′, so it is possible to obtain C′ from low-stress values of the velocity of dislocations measured in HF-doped ice (concentration ≈ 10^–5). Figure 9 shows that the values of C′ are slightly higher than C (in both cases the calculation is done with τ ₀ = 10^–13 s and b = 4.5 × 10^–10 m). Moreover the calculated points are in agreement with the theoretical curve plotted using results from Figure 7: thus the analysis of the preceding section does take into account the effect of HF, which induces an increase of the velocity by a factor ≈ 2.

Fig. 9. Concentration C as function of temperature; experimental points obtained from the slope of curves v_d(τ) at τ = 0 and theoretical curves obtained with E = 0.105 eV in the case of pure ice (a) or with data of Figure 7 in the case of doped ice (b).

In the range of non-linear behaviour, other factors (γ ₁, ΔS_l, ΔH _HF, and ΔS _HF) should be defined from the stress dependence of v _d and from the variation of this stress dependence with temperature. In the present work the values r* and r*(HF) are obtained from the results of Maï; these results are shown in Figure 10.

In the case of pure ice, a satisfactory agreement between experimental points and the theoretical curve is obtained by using γ _l = (5±1) × 10^–3 J m^–2 and ΔS ₁ = (5±1) × 10⁵ J m^–3 K^–1. In the case of HF-doped ice, two simplifying assumptions are made:

• (i) The parameters γ ₁ and ΔS ₁ are nearly the same as with pure ice.

• (ii) As suggested by the variation of experimental values of r* and of r*(HF) with temperature (Fig. 10) the effect of the doping agent is negligible near the melting point T _F of ice, that is ΔH _HF – T _F ΔS _HF ≈ 0.

Fig. 10. Variation of r* with temperature; experimental points correspond to X-ray observations in the case of pure ice (a) and of HF-doped ice (b). Theoretical curves are calculated with γ₁ = 5 × 10³ J m^–2, ΔS₁ = 5 × 10⁵ J m^–3 K^–1, ΔH_HF = 1.2 × 10⁹ Jm^–3, and S_HF = 4.4 × 10⁶ J m^–3 K^–1. All the results obtained by internal friction measurements done an six different specimens of pure ice are in the hatched band.

In these conditions, a reasonable agreement between experimental and the theoretical curves (b) (Fig. 10) is obtained by putting ΔH _HF = (1.2±0.2) × 109 J m^–3 and ΔS _HF = (4.4±0.7) × 106 J m^–3 K^–1 in (Equation 5).

Thus, these values of E (or C), and r* on the one hand, and C′ and r*(HF) on the other have been used in (Equation 2) to draw theoretical curves of v _d = F(τ, T) for pure and doped ice respectively, Figure 1(a) and (b) shows a comparison between the theoretical curves and Maï’s experimental results.

It is noteworthy that ΔS ₁ and γ ₁ are, as predicted, lower than the entropy of melting ice (1.1 × 10⁶ J m^–3 K^–1)and the ice–liquid-water interfacial energy (3 × 10^–2 m^–2) respectively; similarly, ΔH _HF and ΔS _HF are of the same order as the enthalpy of dissolution of HF in water (3 × 10⁹ J m^–3) and the entropy of mixing HF molecules with H₂0 molecules (about 106 J m^–3 K^–1) respectively.

3.3 Application to internal friction results

Since the high-temperature internal friction has been interpreted in terms of movement of dislocations, any description of this internal friction must imply the use of a relation between dislocation velocity and stress.

Indeed, the strain-rate of a crystal having a dislocation density ρ _d is

The logarithmic decrement is given by

where

is the energy dissipated during one cycle of sinusoidal stress, and is that maximum elastic energy during this stress cycle.

If the sine stress is given by

we obtain:

As a first step, it was proposed (Reference PerezPerez and others, 1976) that:

• (i) kink diffusion induces amplitude-independent internal friction;

• (ii) thermal activation of double kinks induces temperature and amplitude-dependent internal friction.

Actually, the result obtained at high-amplitude stresses or after HF doping have shown that this description is not in good agreement with all the experimental data.

Another attempt (Reference PerezPerez and others, 1978) was made by replacing v _d in (Equation 9) by an empirical expression in agreement with results recalled in Figure I.

In fact, it is now possible to calculate (Equation 8) by using (Equation 2); after some simplification we get

where

P is the period of the pendulum, and K = GP² ≈ 3 × 10⁹ N m^–2 s²

At low stress, (Equation 9) can be simplified and we have

Thus it can be concluded that though there is only one type of internal friction due to the movement of dislocations in ice, this can be observed either at low stress where it is only temperature dependent (Fig. 2) or at increasing stresses where it becomes amplitude dependent above a stress which is lower the higher the temperature.