Experimental

For both admittance and depolarization measurements the electrodes were circular parallel plates, the upper electrode having a diameter of 18 mm with a guard-ring with inner diameter 20 mm and outer diameter 35 mm mounted on a teflon disk; the samples were monocrystalline disks (24 mm in diameter, 2 to 5 mm in thickness) with the c-axis normal or parallel to the electrodes, which were pressed against the sample surfaces by the long steel rods on which they were mounted, somewhat like sugar tongs.

The samples were cut from cylindrical monocrystals grown in the laboratory in lucite tubes, at the rate of 0.05 μm s^–1. We used a modified Bridgman method, starting from out-gassed water with a conductivity of 10^–5 Ω^–1 m^–1 (at 25°C and 2 kHz).

To avoid accidental sample fractures caused by mechanical stresses induced by the electrodes during the thermal cycles, the interfaces with the ice were never frozen. Some measurements were also made with mica layers between the ice and the electrodes. The sample surfaces were flattened by lapping with alumina paper and silk cloth, after the removal of an ice layer of about 1 mm contiguous to the cut surfaces. A pressure of about 1 bar was applied to the electrodes to avoid air gaps at the interfaces.

Fig. 1. Diagram (not to scale) of the apparatus used for the measurements of the complex admittance at frequencies higher than 0.1 Hz.

To measure the admittance at frequencies higher than 0.1 Hz, we made use of the phase-sensitive system sketched in Figure 1. For lower frequencies, in the range 2 to 10⁻³ Hz, a circuit quite similar to the other (Fig. 2) measured the integral of the current across the sample during a half-period, starting at the time the applied voltage reached zero or its peak value.

Fig. 2. Diagram (not to scale) of the apparatus used for the measurements at frequencies between 10−³ Hz and 2 Hz.

Results and observations

The relative dielectric constant k′ and relative loss k″ were calculated from the experimental values of the equivalent parallel conductance and capacitance, whose absolute values were obtained by comparison with standard resistors and capacitors. As the plots of k′ and k″ as functions of the frequency clearly show the composite nature of the spectrum, we analysed it with the sum of between one and three parallel mechanisms each with Debye relaxation, plus a d.c. conductivity:

(1)

(1')

where Δk_i is the dielectric strength of the ith dispersion, τ_i = τ _o exp (E_i/k_BT) is its relaxation time, E_i its activation energy, ω the angular frequency, ε ₀ the permittivity of free space, and k_∞′ the high-frequency relative permittivity of ice, taken as 3.2. The data were fitted to these equations and the parameters obtained.

In Figure 3 we present the values of the relaxation times for one of our samples obtained from the admittance data, plotted against the reciprocal temperature. As stated above, at constant temperature the existence of superimposed relaxation mechanisms is suggested by the many steps in the curves of k′ and k″. When the temperature is changed, the continuity of the relaxation time and of the dielectric strength Δk_i convinces us that the same mechanism is being observed. In the case of the spectrum usually referred to as “Debye spectrum” (S₂ in Fig. 3) there are specific reasons for dropping the continuity requirement.

We observed four spectra, indicated as S₁, S₂, S₃ and S₄ in order of increasing relaxation frequency. We did not investigate in detail the spectrum S₁ but we simply ascertained its presence, always at the lowest frequencies of measurement. We attributed this spectrum to space charge at the electrodes.

Considering spectrum S₂, we observe two distinct behaviours as a function of the temperature. In the range T > T _c = 190 K the plot of ln τ ₂ has a slope equivalent to an activation energy of 0.64 eV, with a value of τ_o = 7.7 × 10⁻¹⁶ s. As may be expected a certain scatter in the results is found from sample to sample, a few of them showing a somewhat lower slope (down to 0.60 eV). The value of 0.64 eV coincides with that found by Camplin and Glen (1973) for the Debye spectrum, and is the highest among those reported in literature. Since the pre-exponential factor is also of the right order of magnitude, we identify the spectrum S₂ with that due to the reorientation of the water dipoles caused by intrinsic Bjerrum defects.

In Figure 3 it can be seen that at temperatures lower than T _c the slope of ln τ₂ decreases and then increases again, as in the spectrum reported by Ruepp (1973).

Fig. 3. Values of the relaxation times obtained from measurements of admittance (open symbols) and from TSD measurements (full symbols) as a function of the reciprocal temperature. The figures below the designations of the spectra indicate the energies in electron volts deduced from the best-fitting straight lines.

In Figure 4 the dielectric strength of the spectrum S₂ is plotted as a function of the reciprocal temperature. As can be seen, at a temperature of around T _c Δk has a pronounced decrease. The existence of a minimum in Δk and of a related change in the activation energy of τ is also found for crystals doped with HF (e.g. by Camplin and Glen, 1973). In the treatment given by Jaccard (1959, 1964) this behaviour is expected when the numerical current of Bjerrum defects equals that of ions. These latter defects are replaced by Bjerrumion aggregates in the model proposed by Bilgram and Gränicher (1974). An increase of the minimum temperature for Δk with increasing HF concentration seems now established. A second minimum in Δk appears in samples with an HF concentration higher than 10⁻⁵ mol 1⁻¹; this second minimum occurs at higher temperatures than the first one, and seems not to be associated with anomalies of τ. The lowest measured temperature of a Δk minimum in HF doped samples, as far as we know, is about 200 K, reported by Von Hippel and others (1972); the dopant concentration in their crystal was less than 10⁻⁸ mol 1⁻¹. The curve of Δk ₂ of Figure 4 is similar to a curve of HF-doped ice with a minimum of the first type. The temperature at which our minimum occurs is lower than that which would occur with the doping concentration of about 10⁻⁸ mol 1⁻¹ reported above. The authors just mentioned also report that for crystals which are chemically pure but with some amount of crystalline imperfections, the Δk tends to decrease at low temperatures, together with a bending of the ln τ graph. Unfortunately even for the samples that do not show the bending, the reported measurements stop at 190 K. Therefore in the common temperature range of measurement, our results are in substantial agreement with theirs.

Fig. 4. Values of dielectric strength Δk obtained from measurements of admittance (open symbols) and from TSD measurements (full symbols) as a function of the reciprocal temperature. The same symbols as in Figure 3 have been used for each spectrum.

However as regards the results of Ruepp and Käss (1969), Ruepp (1973), Gough and Davidson (1970), and Camplin and Glen (1973), the agreement is restricted to the simple bending of the ln τ graph. In the first two papers a change in the activation energy is reported for the intrinsic spectrum of “pure” ice between 230 K and 210 K, while only Ruepp reports that the dielectric strength tends to decrease, at much lower temperatures, about 120 K. Camplin and Glen, for “pure” ice in the range 270–220 K, and Gough and Davidson, for reconverted ice (I → II → I), measured activation energies similar to that we found for τ ₂ at the higher temperatures, but did not find any decrease in Δk down to the lowest temperatures of measurement.

At temperatures a little lower than that at which ln τ ₂ changes its slope a new spectrum S₃ appears, whose dielectric strength, reported in Figure 4, increases rapidly. This spectrum also has a Debye behaviour, with an activation energy of 0.33 eV and a value of τ ₀of 4.0 × 10⁻¹¹ s.

A further spectrum S₄, with a dielectric strength almost constant with the temperature (Fig. 4) is observed at the higher frequencies of measurement, down to a temperature of 155 K, after which it was no more observable. Apart from the larger values of the activation energy we found, 0.37 eV, it behaves like that referred to as the high-frequency spectrum by Ruepp (1973). The appropriate value of τ ₀ for S₄ is 2.5 × 10⁻¹⁴ s.

Experimental

We investigated the behaviour of the ice samples in the low-temperature range, where the extrapolated values of the previously reported relaxation times are of the order of tens of seconds, by thermally stimulated depolarization current measurements, without changing the experimental set-up.

The TSD measurements were made by cooling the ice samples under an applied static electric field and by subsequently heating them, after the field had been removed. The constant heating rate dT/dt = α was of the order of 0.1 K s⁻¹, and the current was measured as potential difference across a calibrated resistance of 10⁸ to 10¹⁰ Ω, by means of an electrometer with 10¹⁵ Ω input impedance and 10⁻³ s rise time.

Fig. 5. TSD spectrum obtained by polarizing the sample between 190 K and 77 K, heating rate 0.11 K s⁻¹, polarizing field F_a = 3 × 10⁴ V m⁻¹. (?) experimental points, (——) best fitting curves obtained as described in the text.

Results and observations

The TSD spectrum of “pure” ice crystals has been found to be quite complex from the experiments of Bishop and Glen (1969), Jenevau and others (1972), and Johari and Jones (1975); that of the same sample to which Figure 3 refers is shown in Figure 5. It was obtained by applying a polarizing field F _a = 30 kV m^–1 from 190 K to 77 K; by so doing it was possible to suppress the whole high-temperature portion of the spectrum, which clearly appears to derive from a charge storage in front of the electrodes. As it is sufficient to apply the field at temperatures lower than 190 K to avoid this effect, we may think we are dealing with mobile charges probably trapped at the low temperatures in sufficiently deep traps, in agreement with the results of Gelin and Stubbs (1965).

The result shown in Figure 5 depends neither on the time during which F _a is applied nor on the use of partially blocking (i.e. gold or steel) or totally blocking (with two mica layers) electrodes. Two current peaks, P₂ and P₃, can be clearly seen, while a third smaller peak is almost hidden in the first part of the curve; this peak can be shown up with respect to the other two, by applying a field of higher intensity than the previous one, in a short temperature range just below the temperature at which its current maximum is expected to occur. In general by the use of this procedure and also by partial discharges of the polarization, one can isolate the contiguous peaks of a TSD spectrum, provided their maximum temperatures are sufficiently distant. We succeeded in doing so for peaks P₂ and P₃ but not in the case of P₄, because of the much higher efficiency of mechanism 3 with respect to 4. Therefore we think that these three peaks are mutually independent, that is their mechanisms can be activated separately.

In the analysis of a complete spectrum or of a peak isolated in the way described above, we made the following assumptions:

• a. the TSD spectrum is given by the sum of the currents F_i produced by distinct and independent mechanisms;

• b. each mechanism in isothermal conditions is governed by a relaxation equation of the form

  

  (2)

  where P is the polarization and τ the relaxation time;

• c. for each mechanism τ has a temperature dependence of the form:

  

  (3)

  with τ ₀ and E constant.

Following Kauzmann (1942), τ ₀ should be proportional to T ^–1, but for our purposes this further temperature dependence can, to a first approximation, be neglected with respect to the exponential one.

Equation (2) with the use of Equation (3) and d T/dt = α can be integrated to give the current density J for the relaxation kinetics:

(4)

where P(o) is the polarization at the temperature T ₀ at which the heating started.

According to Equation (2) the ratio P/J gives the relaxation time of the mechanism at each temperature, whatever its temperature dependence, and if hypothesis (c) also holds, a plot of In P/J versus 1/T would be a straight line. The value of P being found by integrating the values of J since these plots were drawn for each of the isolated peaks. We excluded all points with J values lower than 10% of the maximum, but we found that only that plot which referred to P₄ was straight in a sufficiently wide temperature range; on the contrary the two plots referring to P₂ and P₃ showed humps. Furthermore in the plot of P₄ the points at the highest temperatures bent upwards. This bending was due to the P₃ peak contributing to the J values at the higher temperature, it being impossible to suppress the contribution completely. Therefore to be able to determine the value of the activation energy by a different method, we used that proposed by Land (1969), which makes use of the condition to nullify the second derivative of the current with respect to the temperature, in either of the two curvatures.

The straight line corresponding to the values of E and of τ ₀ obtained by this method (0.37 eV and 1.7 × 10^–14 s) fits quite well the points of the low-temperature portion of the plot of ln(P/J) as shown in Figure 3; the values are in good agreement with those calculated at the higher temperatures for spectrum S₄.

The irregular shape of the plots of ln(P/J) for peaks 3 and 4 may be due to one or both of the following reasons:

1. Equation (2) is not the correct one to describe the relaxation;

2. the observed peak is the result of a continuous distribution of relaxation times or the result of a number of inseparable mechanisms.

We succeeded in maintaining hypothesis (c) by dropping hypothesis (b) and assuming that the isothermal relaxation is described by second order kinetics; that is:

(5)

where P* is a constant with the same dimensions as the polarization. With this hypothesis P ²/J gives the product P*τ and the logarithm of this quantity was actually linear as a function of 1/T for the peaks 2 and 3. Also in this case from the slopes of the two best-fitting straight lines we were able to obtain the values of the activation energies of mechanisms 2 and 3, which were 0.38 eV and 0.35 eV respectively; these values are very similar to those obtained for the dielectric spectra S₂ and S₃ at higher temperatures, but the τ ₀ values are still unknown.

Assuming P* to be equal to P(o) (the polarization of the sample at time zero) we found that the pre-exponential factors τ ₀ for both P₂ and P₃ (2.8 × 10^–11 s and 1.4 × 10^–11 s respectively) were of the right order of magnitude to give relaxation times comparable with those extrapolated from the higher temperatures values. The calculated τ are plotted in Figure 3 together with the best-fitting straight lines. These results were confirmed by means of Land’s method, which in this case refers to the equation:

(6)

The total current density .J _tot = J ₂?+ J ₃?+ J ₄ calculated with the values of E and of τ ₀ reported above, fits the experimental data quite well, as shown by the solid line in Figure 5.

If we wish to investigate also the correlation between total initial polarization (stored charge) and applied field, we cannot have recourse to the experimentally isolated peaks, as the techniques for obtaining them reduce the value of P(o) caused by the applied field. Therefore we determined its true value from the fit of the complete spectrum. Each value so obtained can be thought of as a contribution to the sample polarization that freezes-in when the temperature is lowered while an electric field is being applied. We estimate that this happens when the relaxation time of the mechanism is larger than 10³ s. Therefore the values of P(o) _i obtained from the fit of the complete spectrum, are associated with the temperatures at which the respective τ have such a value.

The contributions Δk_i to the dielectric strength were calculated by using the expression:

(7)

and are plotted in Figure 4.