Solute diffusion and distribution

Distribution and diffusion of the solute were studied using equations of Reference Tiller, Tiller, Jackson, Rutter and ChalmersTiller and others (1953)

and, as a criterion for constitutional supercooling,

For potassium fluoride solutions at the low concentrations used in this work, the slope m of the liquidus can be closely approximated by an empirical equation derived from the work of Reference Karagunis, Karagunis, Hawkinson and DamköhlerKaragunis and others (1930),

The symbols are used as follows:

Interface model

The model of the interface developed by Reference LeFebreLeFebre (1967) and modified for constant freezing rates by Reference Osterkamp and WeberOsterkamp and Weber (1970) involves the following equations:

R _i being thus related to I _m, assuming constant current from the charge generator, for the case where the interface is shunted by a resistance much smaller than the resistance of the interface or of the ice;

this last equation assuming equal densities for the positive and negative ions near the interface.

The following further symbols have been introduced:

To these symbols should be added q ₀′, the charge layer thickness in the ice, in mm, defined as the distance q in which V(q) of Equation (7) decays to one-tenth of its initial value V _i.

(a) Voltage, current, and charge

The dependence of freezing potential on growth rate is similar to that reported for KCl solutions by Reference Osterkamp and WeberOsterkamp and Weber (1970), although in the present case voltages were generally higher and the highest potential occurred at a faster freezing rate. The voltages of Table I are also similar to those obtained by Reference GrossGross (1967) in his constant-rate study of KF solutions.

The behaviour of the current, shown in Figure 5, can be interpreted as a rise to a maximum near 11 μm/s followed by a sudden drop and a subsequent new rise as the freezing rate is increased. Such a pattern resembles that reported for cesium fluoride solutions by Reference GrossGross (1965), who reported similar results for potassium fluoride solutions. He did not measure freezing currents at constant freezing rates, however. It appears that the present paper is the first to report freezing currents measured during growth from ionic solutions at constant rates of freezing.

Fig. 5. Plot of maximum discharge current I _m through a 100 kΩ shunt, versus growth rate R. The vertical bars shown (where the spread is large enough) for 5 × 10⁻⁵ Normal represent the spread of the data.

Alternatively, Figure 5 allows interpretation as a monotonic increase with growth rate except for a spike near 11 μm/s. This latter view seems more in accord with the behaviour of the charge transfer shown in Figure 6. The unusual values at 11.2 μm/s will receive further discussion near the end of this paper.

Fig. 6. Plot of total charge transfer Q, through a 100 kΩ shunt versus growth rate R. Vertical bars on points for 5 × 10⁻⁵ Normal represent the spread of the data.

Reference Costa RibeiroCosta Ribeiro’s (1950) law of currents seems to predict a straight line in Figure 5; his law of charges seems to predict a horizontal straight line in Figure 6, since for each experiment with our cell the same volume of ice is formed between the lower and upper electrodes. The very different results reported here may be due to the different growth conditions or to the greater complication in aqueous solutions than in the covalent compounds for which Costa Ribeiro’s laws were primarily formulated.

Figure 7 shows a linear relation between the charge transfer Q and the ratio of current to freezing rate, I _m/R; the least-squares fitted line drawn in the figure has a slope of 7.2 mm. Since Q represents an integration over time of the discharge current, this 7.2 mm must be a characteristic distance z such that the product of a mean time interval z/R with the maximum current I _m is equal to Q. What is remarkable is the constancy of z over the concentrations and growth rates studied.

Fig. 7. Charge transfer Q versus the ratio of maximum discharge current I _m to freezing rate R.

(b) Diffusion and distribution of solute

Using Reference PohlPohl’s (1954) solution of the diffusion equation, which afforded a calculation of the distribution coefficient from both the slope and the intercept, Reference GrossGross (1967) obtained values on the order of 10⁻³ or 10⁻⁴ from the slopes and 10⁻¹ or 10⁻² from the intercepts. The values for K shown in Table II, calculated from intercepts by Equation (2), are comparable to Gross’s intercept values, but values closer to 10⁻⁴ are to be expected (Reference Gross and GouldGross, 1968). It should be noted that after the long time needed to reach the steady state, Pohl’s solution for the diffusion equation becomes equivalent to Equation (2).

Another means of calculating distribution coefficients is offered by Equation (3) provided that the onset of constitutional supercooling can be determined. Constitutional supercooling favors a breakdown of the interface to a cellular or a dendritic form, which leads to solute inclusion between the cells. This causes an increase in the apparent coefficients of diffusion and distribution. If, following this reasoning, 11.2 μm/s is chosen as the slowest freezing rate at which constitutional supercooling appears, the equality in Equation (3) yields the values listed in Table IV. A straight line fitted to the points by the method of least squares yields the relation

for the distribution coefficient K (dimensionless) and the solute contration C (in mol/1). It should be noted that this equation is based on measurements made only over the concentration range from 2 × 10⁻⁵ to 10 × 10⁻⁵ mol/l.

If a linear dependence on growth rate, at least for the higher concentrations, is assumed for the apparent coefficient of diffusion at slower growth rates (Fig. 3), extrapolation to zero growth rate yields an intercept close to the limiting value D ₀ = 0.80 × 10⁻⁹ m²/s cited for KF solutions by Reference Gross and GouldGross (1968).

(c) Parameters of LeFebre’s model

Values for the interface thickness q ₀′ (Table III) are larger by as much as an order of magnitude than the 1.0 mm found by Reference LeFebreLeFebre (1967). It should be recalled that his growth conditions differ in many ways from ours, notably in that this freezing rate was initially quite fast and then decreased with time. The values of q ₀′ are computed from the time required for the freezing potential to decay to one-tenth of the value it had when the interface passed the upper electrode. For KF solutions LeFebre measured a time interval of about one minute; the corresponding time intervals for our experiments varied from five minutes to one hour, depending on the growth rate. The difference in values for the interface thickness was most likely due to two factors; (1) the freezing rate, which in our work was typically many times slower, and (2) the cell geometry, especially the shape of the electrodes and the distance between them.

The arithmetic mean of the values shown for q ₀′ is 6.5 mm. This is similar to the characteristic distance z = 7.2 mm which was found from current measurements (Fig. 7). From Figure 8 it can be seen that the ratio Q/q ₀′ is approximately constant but does increase slowly with growth rate, except for an anomaly near 11.2 μm/s. Such a correlation suggests that there is a connection between the voltage-related distance q ₀′ and the current-related distance z. This supports the large values found for the boundary layer in our work. It also suggests that q ₀′ has a dependence on electrode separation of the same order as that of Q.

Fig. 8. The ratio of the charge transfer Q to the interface thickness q ₀′, averaged over all concentrations, versus the freezing rate R.

Inversely proportional to q ₀′ is the decay parameter a; its small value and the smaller area of the interface in our cell account for the lower values of the interface capacitance in Table III as compared with LeFebre’s value of 2 000 pF.

As might be expected from Equation (6) and Figure 7, the ratio of the mean charge density listed in Table I to the charge generator parameter I _g′, also a charge density, has a nearly constant value of about , as Figure 9 illustrates. This ratio indicates the fraction of separated charge which finds its way through the thickening layer of ice and the external shunt.

Fig. 9. The ratio of the charge transfer per unit volume of ice between the electrodes, P, to the charge generator parameter I _g′ averaged over all concentrations, versus the freezing rate R.

Figure 10 is a study of the relation between the charge generator parameter I _g′ and the maximum freezing potential; according to Equation (6) this relation ought to be linear. In view of the clustering of the points in Figure 10, the best way of fitting a straight line seems to be the method of averages, choosing the line which passes through the origin and the centroid of some or all of the experimental points. The straight line drawn in the figure passes through the centroid of all points except the three distant ones at 11.2 μm/s and yields the Equation

Fig. 10. Maximum freezing potential V _m versus the charge generator parameter I _g′.

The coefficient of I _g′ in (12) can be equated to R _i AR of Equation (6) to yield, after adjustment for the units of distance, area, and volume, the interface resistance

where the freezing rate R remains expressed in μm/s. This relation, independent of concentration in the narrow concentration range studied, passes through the midst of the values obtained by the relation R _i = V _m/I _m and greatly smoothes out these values.

According to Equation (13), the interface resistance varied from 66.9 MΩ at 3.3 μm/s to 15.8 MΩ at 14 μm/s or, after dividing by the interface area of 531 mm², a resistance per unit area from 0.13 MΩ/mm² to 0.03 MΩ/mm² for the same freezing rates. These values are reasonably close to those reported for constant freezing rates by Reference GrossGross (1967).

Reference GrossGross (1965, cf. his figure 3) found that the hydrogen ion content in the melted ice showed a maximum at some freezing rate, indicating that at that freezing rate the charge separation is maximum. It is possible that the peak in the parameter K ⁻ – K ⁺ is related to the peak in Gross’s hydrogen-ion curve, but comparison is difficult because of the difference in growth conditions.

A semi-logarithmic plot of K ⁻ – K ⁺ versus V _m is shown in Figure 11. The points for the lower concentrations are irregular and represent best values rather than mean values at the slower growth rates. But for all concentrations there is a sharp rise after 8.8 μm/s. An interesting feature is the nearly exponential relationship for the higher concentrations and slower growth rates. The relation might be expressed in the form

where V′ is a normalizing voltage found from the slope and (K ⁻ – K ⁺) _V=0 is the intercept. For example, for 5 × 10⁻⁵ N solutions, V′ ≈ 6 V and (K ⁻ – K ⁺) _V=0 5 × 10⁻⁴. It is difficult to assign physical meanings to these values.

Fig. 11. Plot of the difference between the ionic distribution coefficients (K ⁻– K ⁺) versus maximum freezing potential V _m, Straight lines join points for the same concentration in order according to the growth rate.

Between about 9 and 12 μm/s the increased values of discharge current, charge transfer, and the related parameter (K ⁻ – K ⁺) indicate increased solute incorporation. Coincident with these greater values it was observed that during freezing at 11.2 μm/s or faster the cloud in the ice became coarser, made up of slightly larger gas bubbles, and at the same time interior strains were such that the crystal always cracked or even shattered into many pieces while it was being slowly drawn out of the freezing bath for remelting.

These observations support Drost–Hansen’s (1967) hypothesis that freezing potentials are to be explained by a selective incorporation of ions to relieve stresses in the ice, and Seidensticker and Longini’s (1969) suggestion that the Workman-Reynolds effect may depend on “interface states” which exist at the surface or frozen-in bubbles and at grain boundaries in the ice.

(d) Comparison with steady-state results for KCl solutions

The comparisons with results of other experimenters which have been made in this article are affected by differences in the conditions of growth, and the effects of the differences are not properly known. The study of KCl solutions by Reference Osterkamp and WeberOsterkamp and Weber (1970), however, was done with the same cell as the work reported here and under similar conditions. A detailed comparison of the two sets of results is presented in Table V. The effect of concentration is relatively small in Tables I to III, so that the differences in Table V can be attributed mainly to the solutes.

The ratio of the apparent coefficient of diffusion for KF to that for KCl in Table V is 0.82. close to the ratio 0.80 of the values at infinite dilution for these coefficients, cited by Reference Gross and GouldGross (1968). The fact that the fluoride ion is accepted into the ice more readily than the chloride ion means that the peak freezing potential, the charge transfer, and the coefficient of distribution will be greater for KF than for KCl solutions, as can be seen in the table.