The Creep of NaCl-Doped Ice Monocrystals

Abstract

Monocrystals of ice grown from NaCl solutions (concentration 5 X 10^–4 to 10^–2 mol/l) have been tested in creep at —10°C by basal glide. The maximum resolved shear stress ranged from 0.6 to 2.5 bar. The resulting creep curves show a deceleration, that is, the creep rate decreases with time. At the highest concentration the creep is essentially transient; the strain tends to a fixed value. This is unlike the behaviour of similarly orientated monocrystals of pure ice or of ice grown from solutions of other dopants so far reported in the literature.

The possible causes for this behaviour are discussed and the implications for the mechanical properties of polycrystalline ice, and in particular sea ice and glacier ice, are described.

Résumé

Des monocristaux de glace obtenus par croissance à partir de solutions de NaCl (concentrations 5X 10^–4 à 10^–2 mol/l) ont subit des essais de fluage à -10°C, le plan basai étant le plan de glissement. La valeur maximale de la contrainte réduite est comprise entre 0,6 et 2,5 bar. Les courbes de fluage obtenues montrent une décélération c'est-à-dire une diminution de la vitesse de déformation au cours du temps. Aux concentrations les plus élevées, il y a essentiellement un fluage transitoire: la déformation tend vers une valeur limite. Ce comportement est très différent de celui de monocristaux de même orientation de glace pure ou de glace dopée avec d'autres composés tel qu'il est indiqué dans la littérature.

Les origines possibles de ce comportement sont discutées et les explications quant aux propriétés mécaniques de la glace polycristalline (en particulier de la glace de mer ou de glacier) sont décrites.

Zusammenfassung

Eis-Kinkrislalle, die aus NaCl-Lösungen (Konzentration 5 x 10^–4 bis 10^–2 mol/l) gezüchtet wurden, wurden im Kriechversuch bei -10°C durch basale Gleitung verformt. Die maximale Schubspannung in der Gleitebene erstreckte sich von 0,6 bis 2,5 bar. Die gewonnenen Kriechkurven zeigen ein verzögertes Kriechen, d.h. die Kriechgeschwindigkeit nimmt mit der Zeit ab. Bei der höchsten Konzentration findet man im wesentlichen ein Übergangskriech-verhalten; die Verformung strebt einem festen Wert zu. Dies ist vom bisher in der Literatur beschriebenen Verhalten ähnlich orientierter Einkristalle aus reinem Eis oder von Eis aus Lösungen anderer Dotierungsstoffe verschieden.

Die möglichen Ursachen für dieses Verhalten werden besprochen, und die Bedeutung für die mechanischen Eigenschaften von vielkristallinem Eis, im besonderen von Meereis und Gletschereis, wird beschrieben.

Introduction

The creep of pure monocrystals of ice 1h orientated for basal glide has long been known to be accelerating, that is, the strain-rate increases with lime since loading (Glen and Perutz, 1954). The corresponding deformation behaviour in a constant strain-rate test is: after an initial rise of stress with strain up to a maximum or upper yield stress τ_max, the stress drops with continuing strain at a decreasing rate; the material work-softens (Weertman, 1973).

More recent work on doped ice by Jones and Glen (1969) with HF and NH₃, dopants, Nakamura and Jones (1970) with HCl, and Nakamura and Jones (1973[a], [b]) with HCl, HBr, NH₄OH, NH₄F, NaF, KF, NaOH, H₂0₂, and He has shown that the same form of accelerating creep curve or strain-stress curve with yield drop is found with these dopants present. The main difference in behaviour from pure ice monocrystals, where any was observed, was a lower stress in the constant strain-rate tests and a steepening or flattening of the curves relative to pure ice; the doped material still work-softened. In this paper, however, results clearly different from the work reported above are presented for NaCl-doped ice the creep shows a work-hardening effect.

Method

Crystal manufacture

The water used to prepare the NaCl solutions was dcionized and had impurity levels F- ≤ 10^-8 and Cl– ? 10^-6 mol/l. The electrical conductivity originally 10^-5 Ω ^–1 m^–1 rose in contact with air to 10<^-4 Ω^–1 m^–1. Water of the same purity was used for cleaning all glassware. The water was boiled to remove air and then cooled under reduced pressure before the dopant was introduced.

The dopant was prepared from analytical grade crystalline NaCl dissolved in the pure water to produce a series of standard solutions.

The crystals were grown, at —7°C, by the method reported by Glen and Perutz (1954) in glass tubing. They were supported at an angle of 45° to the solution surface so that the c-axis of the resulting crystal was 45° from the cylinder axis, i.e. orientated for easy glide. The glass tubes had a nominal inside diameter of 3 mm and a nominal length of 80 mm. This gives long thin crystals with a ratio of gauge length to diameter well above six, the value recommended from normal tensile-testing practice. Growth took 2 d, so giving an average growth rate of 0.5 μm s^-1.

Testing and data reduction

All crystals were examined visually for flaws and grain boundaries under normal illumination and between crossed polaroids; imperfect crystals were rejected. The c-axis orientation was determined optically before the crystals were mounted in the tensile-test, machine, as used by Homer (unpublished). The crystals were subjected to a constant load and their elongation measured as a function of time by a displacement transducer (Sangamo Weston Controls Ltd., Miniature DC/DC Transducer Type DR/0.100). Its output voltage was displayed on a chart recorder.

The temperature was controlled by a Pt-resistance thermometer and an electronic temperature control unit (Fielden Electronics Ltd., Type Ti B 2) and kept within the range —10 to —11°C.

The tensile load and the resulting displacement were converted into maximum resolved shear stress τ and maximum resolved shear strain γ in the basal plane, using the equations of Schmid and Boas (1950, p. 59) where necessary.

Dopant concentrations

In order to measure the ionic concentrations, the specimen was melted in 5 cm³ of the pure water or else a sample of suitable size was prepared by melting ice which grew close to the tested sample. The Cl^– measurement used a Cl^–-ion electrode from Orion Research Inc., Model 94-17, in conjunction with the double-junction reference electrode, Model 90-02, and Specific Ion Meter, Model 401. This equipment gave good repeatability, any variation being of the order of 5%. The Na+ levels were difficult to determine. Flame photometry and atomic absorption spectrometry (using an Atomic Absorption Spectrophotomcter Evans Electro-selenium EEL240) gave a Na+ concentration of ≤1.5x 10^–6?. The concentrations in the mother solution and those found in the crystal arc given in Table 1.

Table 1. Dopant Concentrations in the Mother Solution and in the Crystals

Fig. 1. Creep curves of ice momcryslals grown from. NaCl solutions, concentration c₀ of mother solution between 5*10^–4 to 1*10^–2 mol/l, temperature -10°C, maximum resolved shear stress τ=2.5 bar.

Fig. 2 Creep curves for ice monocrystats grown from NaCl solutions with concentration c₀ of the mother solution 10^–2 mol/l . One crystal was loaded in two steps, the maximum resolved shear stress, originally 0.6 bar,was increased after 1h to 1.2 bar. The other crystal had a constant load for which τ= 1bar.

Results

Creep curves

The variation of the resolved basal shear strain with time for differing dopant concentrations and different loading sequences is shown in Figures 1 and 2. The general appearance of all these curves is of decelerating creep. The errors incurred in calculating the resolved strain, which are estimated at ≤10%, are such as to affect only the ordinate of the curves and not the sign of the curvature.

Figure 1 shows the shear strain over time for a range of dopant concentrations, the hardening effect being more marked at the higher concentrations. At the highest concentration the creep is essentially transient; the strain tends to a fixed value.

Figure 2 a shows two different loading sequences. One crystal was first loaded so that the resolved shear stress τ = 0.6 bar. After its creep had stopped, the load was increased, bringing τ to 1.2 bar. It then began to creep again but came to a final resolved shear strain very similar to that which one might expect for a direct loading of this magnitude in one step. For comparison a curve for τ =1 bar is shown.

The apparatus was checked in various ways to exclude an experimental artefact. Pure monocryslals grown by the same method as the doped crystals and tested in the same test machine showed an accelerating creep.

Discussion

Incorporation of NaCl into ice

The first point of importance is to establish which kinds of impurities and defects are introduced into the ice monocrystals when they grow from dilute aqueous NaCl solutions. As our chemical analyses are insufficient for this, a comparison with data from the literature may help Maeno (1973) detected no K⁺ in monocrystals grown from KC1 mother solutions with concentrations between 10^–5 and 2*10^–3mol/l; the Cl^– concentration in his mono-crystals was a factor 2 X 10^–2 to 10^–1 below that of the mother solution. According to G. W. Gross (personal communication during the Symposium), we may expect the Na+ concentration in our crystals to be more than one order of magnitude below the Cl^– concentration.

The freezing of KF and NaF solutions (Cobb and Gross, 1969) resulted in cation concentrations in ice smaller than those of the anion, the difference being greater at lower concentrations of the mother solution and at low freezing rates. "Chlorides of sodium and potassium showed similar trends in general to the fluorides, but at a given solution concentration the fraction incorporated into the ice was generally smaller for the chlorides" (Cobb and Gross, 1969, p. 800). Although the ice in these experiments was polycrystalline, we think that the above results may be applicable to our ice samples.

With Cl^– as the predominant solute in our ice crystals, we might expect our results to be similar to those obtained for HCl-doped ice monocrystals. Constant strain-rate tests on such crystals by Nakamura and Jones (1970, 1973[a], [b]) showed a yield drop like tests with other dopants The HCl-doped crystals were even "softer" than pure ice in the sense that the stress required to maintain a constant strain-rate was smaller compared with pure ice, but this "softening" effect was less pronounced than it was for HF-doped crystals. These results do not agree even qualitatively with ours. As the work by Jones and Glen (1969) and Nakamura and Jones (1970, 1973[a], [b]) used the same method of crystal growth as the present work, we can feel reasonably sure that our result is not an artefact of growth technique.

Kuroiwa's (1964) measurements of the mechanical anelastic damping of polycrystalline ice grown from solutions of NaCl, NaOH, and HCl give further information about the effect of doping. The relaxation peak of the anelastic damping due to re-orientation of H₂0 molecules, is influenced by the solute dispersed within the grains. But, whereas the behaviour of the relaxation peak of the NaOH-doped ice is very close to that of a pure crystal, the HCl-doped crystal shows a large difference from pure ice. NaCl-doped ice lies in between but closer to the HCl-doped ice, the activation energy for these two types being the same. An additional anelastic damping peak appearing at low temperatures suggests that all three dopants can separate in the ice in the form of aggregates.

Shape of the observed curves

The shape of the creep curves for the NaCl-doped ice is similar to that for metals, for which the explanation given is that a large number of dislocations, created almost instantaneously after application of stress, interact with each other (Weertman, 1973). NaCl may increase the density of dislocations above the normally low level (relative to metals) found in ice because of the manner in which it is incorporated, or it may provide a mechanism for their more rapid generation. In both cases their interaction may result in a decelerating creep as in metals. Another possibility is that incorporated NaCl may form obstacles at which the existing dislocations are getting held up or pinned, thus decelerating the creep. One way of approaching a choice between these two mechanisms via creep-test data would be to observe the rate of change of creep on loading and compare this with the results from pure specimens. A consistently faster initial response from the doped material may well indicate a higher dislocation density than in the pure material. Conversely, if the effect is due to trapping of dislocations, we could expect the creep to be slower compared with pure crystals at their slowest. This is now being investigated.

A final point worth noting is that Harrison and Tiller (1963) have reported a cellular structure developing at the ice-water interface for NaCl solutions freezing at rates similar to those estimated here. Structures attributed to the same mechanism as that identified by Harrison and Tiller have been well shown by scanning electron-microscope micrographs produced by Sinha (1977), of the internal structure of sea-ice crystals (in which the salt concentrations are two to three orders of magnitude greater than in the crystals we have tested). It may well be that such a structure still exists at our concentrations and so acts as obstacles to dislocation movement. Unfortunately, Harrison and Tiller's work did not include any of the dopants that we know to give an accelerating creep curve.

It is probable that we will have a lattice-impurity content throughout the crystal as well as any internal structure. Paren and Walker (1971) have estimated the solubility limit for sea salts in cold ice to be 2 x 10^–6 mol/l. If this is valid, then it may be that the change in hardening effect between the different curves of Figure 1 shows the increasing effect of the internal structures.

Implications for poly crystalline ice

Barnes and others (1971) discussed the contributions made by creep, surface regelation and grain-boundary processes in resisting indentation of the surface of pure polycrystalline ice in the pressure-melting regime. Over the range of loads 10-190 bar and loading times 10⁺⁴ to 10^–4 s, they estimated the contribution from creep to range between 30 and 40% In a polycrystalline NaCl-doped ice we might, following our results, expect the creep component to be reduced as hardening progresses and so the proportion to be borne by the other processes would increase.

Glacier ice

The bulk NaCl content of temperate glaciers is probably below the minimum tested here Although Lliboutry (1971) gave a range of 10^–3 to 10^-4 mol/l for concentrations in falling snow, Souchez and others (1973) found bulk concentrations of Na+ from 4.3 x 10^–6 to 12 x 10^–6 mol/l for basal ice of Glacier d'Argentière, and Harrison and Raymond (1976) gave an estimated value of 0.7 x 10^–6 mol/l for the lattice impurity for all salts in Blue Glacier.

As we expect almost all the impurities to have migrated to the grain boundaries (Kuroiwa, 1964) the intragranular concentrations will be less than these bulk values. This would mean that the NaCl contribution to the monocrystal creep behaviour would be less than that shown by the upper curve of Figure 1, but it remains possible that even this low concentration might modify the behaviour from that of pure ice, and the effect could well be more important in polar glaciers where migration to grain boundaries is impeded.

Sea ice

Sea ice consists of polycrystalline ice with salts, mainly NaCl, included in pockets. According to our measurements, the creep of the ice grains may be expected to be quite different from that of pure ice, so that the mechanical properties of sea ice could not be treated theoretically by assuming it to be a system of pure ice with salt or brine inclusions. The properties of the ice phase in sea ice should be investigated but the present results give us a strong indication of what might be found.