2.1. Sample preparation ; measuring cell

The crystal growth and the determination of the dopant concentration was done by J. Bilgram. The NH₃-doped crystals were produced by the Czochralski method (Bilgram, 1973), the HF-doped and the pure crystals by zone melting (Bilgram and others, 1973). The samples were shaped to roughly die desired dimensions on a lathe and then the two electrode faces cut plane and parallel by means of a microtome. Impurities which might have settled on the crystal faces during the treatment were removed by sublimation in the vacuum of the evaporation plant for 5 to 10 min at a temperature of —10^°C. This procedure removed about 0.1 to 0.15 mm of the crystal on each side, so the parts of the crystal disturbed by the cutting were eliminated to a large extent. The crystal thus cleaned on the surface was then cooled down to the temperature of boiling nitrogen and at this temperature both electrode faces were covered with gold by evaporation. After gold plating, the crystal was warmed up to the cold-room temperature of — 15^°C over a period of 5 h. On one side the gold electrode was divided into a central electrode and a guard ring by cutting a groove into the surface. After this treatment the crystal was placed in a tight “Teflon” (polytetrafluorethylene) box. The empty space was filled with high-purity silicone oil or heptane which served as pressure-transmitting medium. This measure suppressed sublimation which would have caused the evaporated layer to peel off. When a doped sample was in the box, the fluid contained a certain amount of dopant which prevented losses of NH₃ or HF through diffusion,

The NH₃ samples were prepared immediately after termination of the Czochralsky growth procedure. The HF samples were worked out of large ice pieces with an age of several months.

The samples were single crystal discs of 45 mm diameter and 6 to 8 mm thickness. The guarded electrode was about 20 mm in diameter and the gap between guard ring and centre electrode was 0.4 to 0.8 mm.

The concentration of the dopant was determined after the measurements by melting the sample and analysing the concentration with ion-selective glass electrodes.

The “Teflon” box (Fig. 1(a)) served as both measuring cell and storing vessel. Gold-plated bronze leaf springs provide contact to the guard ring, which is on the top side in Figure 1(a), and to the unguarded electrode. The contact force was 0.2 to 0.4 N. The bottom of the box forms a membrane of 0.7 mm thickness which enables transmission of the pressure into the interior.

The box is supplied with SMC coaxial connectors which made storage and measurements in different types of device possible without removing the crystal from its environment.

2.2. Suppression of the out-diffusion

With the sample dimensions used, about 50% of the NH₃ as well as of the HF is lost within 24 h when stored in free air. The fluid in the measuring cell is, therefore, enriched appropriately with the dopant to suppress the diffusion losses. In this way the crystal can be kept stable to the degree that the concentration-dependent low-frequency conductivity stays constant within a few per cent for several weeks. Before the crystal is measured for the first time, it is stored in the box at — 15^°C for several days. This removes the inhomogeneity introduced during the preparation time of about 7 h, and an equilibrium between crystal and enriched fluid is reached.

Fig. 1. (a) Measuring cell. During measurements, the pressure vessel is immersed in a bath of ethanol kept at constant temperature. (b) Dispersion of an inhomogenenously duped ice crystal. For explanation of the lettering on the curves see text.

The achievement of the method described above can be seen from Figure 1(b). Curves A, B give the dispersion of C _p and G _p of an NH₃-doped crystal about 20 h after termination of the growth process. The fluid was pure silicone oil, so out-diffusion was possible. Even after 100 h, the diffusion was still going on as was indicated by the still decreasing G _p at low frequencies. At this stage the low-frequency increase of C _p was reduced a little. The fluid was finally replaced by fluid containing NH₃. 120 h after the exchange the G _p dispersion reached a stationary state and the curves C, D were measured. Obviously the crystal has regained so much NH₃ that the low-frequency conductivity exceeds the initial value. Only a small part of the additional low-frequency dispersion remained.

The initial concentration, measured using ice pieces from parts close to the sample in the same single crystal, was 4 × 10^-6 mol/l, the final concentration (after the measurement of curves u and D in Figure 1(b)) 9 × 10^-6 mol/l.

It is quite obvious that the low-frequency dispersion is caused by dopant inhomogeneity. For HF-doped crystals this effect has not been investigated but a similar behaviour is expected when crystals are kept in doped fluid.

2.3. Measurement of sample impedance

The impedance of the sample was measured as a function of frequency in the range 1 Hz to 100 kHz. In the frequency range of 200 Hz to 100 kHz a General Radio type 1615-A capacitance bridge was used. The measurements in the low-frequency range 1 Hz to 1 kHz were made with a version of the bridge described by Berberian and Cole (1969). Both bridges had an accuracy of better than 1%.

In general the measurements were made with a voltage of 0.6 V amplitude across the sample. At this voltage, no voltage dependence of the impedance was observed with highly doped crystals. Lightly doped and pure crystals showed voltage dependence in the low-frequency region which made a reduction of the measuring voltage necessary. Measurements were possible down to 50 mV.

3.1. Evaluation of dispersion parameters

The sample impedance Z is given by the two bridge readings C _p and G _p according to the defining formula

which corresponds to a parallel equivalent circuit. The raw data G _p and C _p are proportional to the conductivity σ and to the dielectric constant e respectively. For the case where the dispersion is a Debye dispersion with a single relaxation time, the plot C _p versus G _p forms a straight line whose end points are given by (G ₀, C _s) and (G _∞, C _∞) (Gränicher, 1969[a]). The quantities in the brackets represent the limiting values of C _p and G _p at low and high frequency respectively. All samples reported in this work fulfil this linear relationship quite well. Additional dispersion regions appear as deviations at the ends of the line. Figure 2 (a) shows as an example a plot of the dispersion curves C, D from Figure 1(b). In the low-frequency region the conductivity is affected only to a small extent by the extra dispersion. The limiting value G ₀ can therefore easily be determined. When G ₀ is known, C _s can be determined from the plot of C _p versus G _p as shown in Figure 2 (a). Highly doped crystals show, in certain cases, a downward deviation at low frequencies. Here too the procedure described above is used.

3.3. Separation of the conductivities σ₀ and σ_∞ into the orientational and ionic part

According to Jaccard’s (1964) theory the conductivities σ _∞ and σ ₀ can be expressed in terms of the conductivities σ _DL and σ _± attributed to the orientational and the ionic defects respectively.

Fig. 2. (a) Determination of the limiting valued C _s when an additional low-frequency dispersion is present. C _p and G _p are proportional to the dielectric constant ε and to the conductivity σ respectively. (b) Separation of conductivities into orientational and ionic contribution. The example is taken from Figure 4.

As long as one of the two quantities σ _± or σ _DL is small compared to the other, one of them can be neglected in the expression for σ ₀ and σ _∞, and the determination of the components is simple. When the components are of similar order of magnitude, as is the case with doped crystals, a more refined procedure is necessary. The two equations above can be solved for σ _DL and σ _± giving the following set of formulae

where

with

The ratio of the effective charges has been determined by the author (Hubmann, unpublished) with the result e _±/e _DL = 1.63 ± 2%. When the ions are dominant the + sign is to be used in the formula for p, and vice versa. Which of the two possibilities is present is clear in most cases. In the vicinity of the crossover (σ ₀/σ _∞ > 0.9) care must be taken in using this method. Inhomogeneities prevent the values σ ₀/σ _∞ = 1 being reached leading 10 faulty interpretation. In addition to this, a superimposed low-frequency dispersion can similarly lead to erroneous conclusions. Figure 2(b) shows the result of the separation procedure just described. It looks rather convincing.

5.1. General

Figure 4 presents the conductivities σ _∞, σ ₀ and the static dielectric constant ε _s as a function of pressure as measured at various temperatures. At atmospheric pressure the crystal under consideration had a conductivity crossover at about —45^°C. At — 15^°C the crystal is in the domain where the orientational defects dominate but it is already close to the crossover. Increasing pressure increases the ionic conductivity and decreases the orientational conductivity. Thus the crystal is shifted toward the crossover. This change is also indicated by a decrease in ε _s. When the conductivities σ _∞ and σ ₀ are close enough, as is the case at —25^°C and — 35^°C, it is possible to shift the system across the crossover by pressure. At —51 and —61^°C the ionic regime is already reached at atmospheric pressure. Now pressure induces a shift deeper into the ionic domain. It is remarkable that values for ε _s of more than 180 can be reached. It is interesting to note here that the behaviour under pressure also follows the universal relation mentioned in the Introduction.

Fig. 4. Pressure dependence of the conductivities σ ₀, σ _∞ and of the dielectric constant ε_s at various temperatures. Ice single crystals c _NH3 = 5 × 10 ^-5 mol/l. Field parallel to c-axis. The scales are linear for pressure and for dielectric constant and logarithmic for the conductivities.

It is clear that a direct interpretation of the pressure dependence of the two measured quantities σ _∞ and σ ₀ is not possible. Both conductivities consist of two components which are comparable in magnitude. Therefore decomposition into σ _DL and σ _± according to the procedure described in Section 3.2 gives better insight as is obvious from Figure 2(b). For this reason the behaviour of the derived quantities σ _DL and σ _± as a function of pressure is discussed in the following.

5.2. Temperature dependence of the activation volume

The pressure dependence is usually discussed in terms of the activation volume

(1)

Because In (σ _i ) depends linearly on the pressure (see Fig. 2(b)), this is an adequate description. Figure 5(a) gives a summary of the data obtained. The activation volume of the ionic conductivities is negative, that of the orientational conductivities positive. A small temperature dependence exists.

Some NH₃-doped crystals (c _NH3 = 5 × 10^-5 and 1.2 × 10^-4 mol/1) show, at low temperatures, no linear relation between ln (σ _DL) and pressure. In this case approximate values for the activation volumes at p ≈ 1 bar and for p ≈ 1 kbar are given and the temperature dependence is indicated by the dashed lines. Because there are not enough measurements available it is not possible to decide whether this expresses a systematic trend or only an individual deviation of a peculiar crystal. The second possibility appears to be more likely.

5.3. Activation volumes as a function of doping

A survey of activation volumes versus the concentration is given in Figure 5(b). The scales for the NH₃ and HF concentrations have been chosen in a way that, roughly speaking, the concentrations of H₃O⁺ and L-defects increase when going from left to right and the concentrations of OH^- and D-defects decrease. To give an idea about the type of defect dominant, the approximate position of the crossovers (I, II) have been estimated and indicated on the diagram.

6.1. Scheme of interpretation

Because there are two species of orientational defects and two species of ions, the conductivities σ _DL and σ ₊ can be split once again into two different terms

(2)

(3)

In these expressions e _DL, e _± are the effective charges, n; the defect concentrations, and u _i the mobilities. In many cases one of the two terms in Equations (2) and (3) is so small it can be neglected, simplifying the discussion. The pressure dependence of each term is written as follows:

(4)

The magnitude of the first term is small, of the order of the linear compressibility, and can therefore be neglected for a qualitative consideration. The second term reflects the influence of pressure on the “quasi-chemical” processes (dissociation and recombination) by which the defects are formed. Finally, the third term gives the pressure dependence of the kinetics of an elementary displacement step. From this it is obvious that the pressure coefficient denned by Equation (1) is caused by two contributions which are different in nature. A more detailed discussion of the elementary processes and some estimates on the values to be expected can be found in the paper by Chan and others (1965). Based on certain assumptions on the defect chemistry, Gränicher (1969[b]) devised a programme using measurements on doped ice which makes it possible to determine the activation volumes of each defect separately.

Fig. 5. (a) Activation volumes of σ _DL and σ _±. △V _DL are positive, △V _± negative. The doping concentrations (in mol/l) and the pressure-transmitting fluid used were: ? c _NH3 = 1.2 × 10 ^-4, Heptane + NH₃ ; Δ c _NH3 = 9 × 10 ^-5, Heptane + NH₃; ? c _NH3 = 5 × 10 ^-5, silicone oil + NH₃; • pure, Heptane; ? c _HF = 4.5 × 10 ^-4, Heptane + HF;

c _HF = 5 × 10 ^-6, Heptane + HF; × c _NH3 ≈ 1.5 × 10 ^-4; + c _NH3

≈ 8 × 10 ^-5; F c _HF ≈ 3 × 10 ^-5; H c _HF ≈ 5 × 10 ^-6. The last four samples in this sequence were measured in pure silicone oil. (b) Activation volumes at various concentrations. Open signs △V _DL, full signs △V _±. ? represent data from measurements in pure transmission fluids. They are on this ground inhomogeneously doped and their concentration must therefore be taken as very approximate.

6.2. Orientational conductivity

From what has been said it is very surprising to see from Figure 5(b) that the activation volume of σ _DL is almost indifferent to doping concentration as well as to the doping species. In the region largely comprising the interval below and somewhat across the first crossover I the orientational defects are intrinsic. At — 25^°C this region is given by c _HF ≤ 10^-5 mol/1 or c _NH3 ≤ 10^-4 mol/l. Here σ _DL contains a term which describes the influence of pressure on the dissociation of two bonds into a L- and D-defect by a molecular rotation,

(5)

In the region beyond the second crossover II (in HF-doped crystals), on the other hand, the L-defects are extrinsic. One can write n _L = c _HF, so the term (1/n _L) dn _L/dp from the defect generation Equation (4) is zero. The pressure dependence is therefore determined by the term △V _i ^t alone, so one expects in this region a value of △V _DL which is different from the one in the intrinsic region. The discrepancy becomes more pronounced if one takes into account that σ _D can be dropped in Equation (2) for pure and HF-doped ice because u _D < u _L for structural reasons. From the measurements one must thus tentatively conclude that Reaction (5) is independent of pressure. How far △V _DL ^f = 0 can be brought into agreement with considerations given by Chan and others (1965) is left open.

The indifference of △V _DL on doping allows also a conclusion on the defect interaction proposed by Bilgram and Gränicher (1974) postulating mobile H₃O⁺·L aggregates. In the region between the crossovers I and II, L-defects are in the minority. Their number is controlled by the dissociation of aggregates

(6)

As consequence of this, one expects a value for △V _DL which differs from those in the intrinsic and in the extrinsic regions. Whether pressure-independence of the reaction (6) can be proposed is even more questionable than for (5).

On the NH₃ side the reasoning is different. As a result of the conductivity measurements it follows that σ _DL is not affected up to concentrations of 10^-4 mol/l, which means that the intrinsic region extends to this concentration. At lower temperature an increase of activation volume is observed.

6.3. Ionic conductivity

Fewer problems are encountered with the ionic conductivity, because there one finds the variations in △V _± necessary for an explanation. The intrinsic concentration of the ions is so small that even small amounts of impurities are sufficient to bring the crystal into the extrinsic state. The activation volume remains constant for small and medium HF concentrations. The value of — 7 cm³/mol in the diagram for pure ice was obtained from a sample with extremely low σ ₀. From measurements of Camplin and Glen (1973) it is known that there exists a concentration range where σ ₀ is proportional to the concentration of HF. This corresponds to a full dissociation of HF according to

One has n ₊ ≈ c _HF and (1/n ₊) n ₊/dp ≈ 0.

At higher concentrations the dissociation is no longer complete, this is a necessary condition for the existence of a second crossover. Now n ₊ ≠ c _HF and (1/n ₊) dn ₊/dp is controlled by the dissociation of HF. Hence in the range of incomplete dissociation the activation volume must change to another value as shown by Figure 5(b).

In the NH₃ case no unique explanation can be given at present because of a lack of data in the lower conductivity range. It is easy to see however, that similar arguments are valid.

6.4. Summary

The discussion above shows that the interpretation is strongly based on the defect chemistry assumed. Sections 6.2 and 6.3 rely on assumptions developed by Steinemann, Gränicher, and Jaccard in the early sixties and also on the observed linear dependence of σ ₀ on HF concentration (Camplin and Glen, 1973). These do not allow for interactions of the defects to form aggregates and also suppose that dopants are built into the lattice by substituting H₂O molecules. The discovery by Bilgram and Gränicher (1974), that these old assumptions lead to unexpected values for the mobility, gave a clear indication that the simple picture of the defect chemistry must be revised. The high diffusivities of HF (Haltenorth and Klinger, 1969) and NH₃ (Hubmann, 1975) in ice also suggest that interstitial impurities, and eventually lattice distortions from dislocations, play a role. Therefore it can be seen that the problem of defect chemistry must be solved before reliable conclusions can be obtained from measurements of conductivities under pressure. The results from these experiments can nevertheless give valuable hints toward elucidation of the processes of defect formation and interaction.