Experimental methods

We have measured the thermal linear expansion of two congelation sea-ice samples using a Michelson interferometer and a helium-neon laser light source (632.8 nm wavelength). An interferometric technique was used because it is a highly accurate method for measuring mechanical displacements and is widely used to measure the thermal linear expansion of solids (Reference Peck and ObetzPeck and Obetz, 1953; Reference PattenPatten, 1971; Reference Keller, Salathé and TschudiKeller and others, 1972; ASTM Ε 289–70, 1979; Reference Bowles, Post, Herakovich and TenneyBowles and others, 1981). Interferometry has the added benefit of avoiding the problems associated with the fluid immersion technique used by Reference PetterssonPettersson (1883) and Reference MalmgrenMalmgren (1927) to determine the β_s.

Our apparatus included the interferometer, cold stage/ sample holder, temperature-control unit, and computer-controlled data-acquisition unit (Fig. 2a). A sea-ice sample with a target mirror frozen to its front surface was housed in a cylindrical holder. The sample and holder were then placed in a urethane-insulated cold stage that constituted one leg of the interferometer. Plastic sheeting was placed under the sea-ice sample to insure that it was not restrained along its bottom edge (Fig. 2b). A few drops of water were used to freeze the bottom back edge of the sample to the holder, eliminating any possiblity of sample movement during a test. Sample temperatures were measured near the front and back faces of the sample using two thermistors (Fig. 2b). The optically flat, front-surfaced target mirror and sample holder were made from fused quartz, because its coefficient of thermal linear expansion is about two orders of magnitude lower than that of ice (0.37 ×10⁻⁶ °C⁻¹ for fused quartz compared to about 50 ×10⁻⁶ °C⁻¹ for ice). A fused-quartz mounting rod extending from the back of the sample holder through the rear of the cold stage was fixed in place with clamps. The front hole of the cold stage was covered with an optically flat glass window (Fig. 2b).

Fig. 2. (a). Michelson interferometer assembly (details of the cold stage are shown in Figure 2b). Vibrations from the bath’s compressor and pump motors, and fluid pressure pulses caused by the pump were attenuated using large damping masses on inlet and outlet cooling tubes and a surge chamber on the cold-stage inlet, (b). Cold stage and fused-quartz sample holder.

Sample temperatures were controlled to within ±0.03 °C by circulating a glycol-water mixture through a precision constant-temperature bath and tubing coil in the cold stage. The cold stage was protected from vibrations caused by the bath’s compressor and pump motors by passing the connecting tubes through two large damping masses. Fluid pressure pulses caused by the pump were attenuated using a long, air-filled, sealed coil of copper tubing connected to a Τ adaptor (surge chamber) on the input line of the cold stage.

An unventilated, insulated room was used to isolate the apparatus from external air-temperature fluctuations, and an oil-bath damping system was used to isolate the apparatus from possible external vibrations.

The two cylindrical sea-ice samples used in the tests were prepared from cores that had been taken from a first-year congelation sea-ice sheet at Harrison Bay, Alaska. Two adjacent ice plugs were removed from the core for each test sample. The first set of ice plugs was cut with their long axes oriented parallel to the ice-sheet surface (that is, perpendicular to the ice-growth direction and in the direction of random ice-crystal c-axis orientation. The second set of ice plugs was cut with their long axes in the direction of ice-sheet growth (parallel to the ice-crystal a-axes). The first plug from each sample set was used to determine sample salinity before conducting a test; the test sample was made from the second plug. After a test, the sample’s salinity was measured (Table I). The front and back faces of the samples were trimmed parallel with a microtome and their lengths determined to within ±0.03 mm using a dial caliper. Sample lengths were 71.25 mm for the 2 ppt sea ice and 69.33 mm for the 4 ppt sea ice. Sample diameters were nominally 38 mm.

Thermal linear expansion of a sample was measured by counting the number of interference fringes that passed a fixed point during a known temperature change. Two photodetectors were placed side by side within the width of a fringe to determine sea-ice displacement magnitude and direction. Figure 3 shows the voltage measurements for each detector from our first test, in which 2 ppt salinity ice was warmed. Each voltage maximum indicates the passage of a fringe; displacement direction is determined from the phase shift between the detectors. For ice expansion, the fringes moved outward and channel 1 detected fringe passage before channel 2. Conversely, channel 1 detected fringe passage after channel 2 when the ice contracted. The passage of one fringe at a fixed point corresponds to a displacement of one-half the wavelength of He—Ne light. In our experiment, the resolution was about 1/2 wavelength (316.4 nm). However, under ideal conditions, it was possible to resolve displacements to about 1/8 wavelength (79.1 nm).

Fig. 3. Output voltage from the two photodetectors and the temperature record for the first warming test on 2 ppt saline ice. The arrows show the start and end times for the test.

Experiments were conducted by first establishing a reference state by maintaining a constant sample temperature until the interference fringes were stationary. Next, the sample temperature was changed to the desired final temperature and held constant until the fringes stopped moving (Fig. 3). For the tests on sea ice, temperatures were changed in steps to insure that the sample was at thermal equilibrium before starting the next temperature change. The number of fringes that passed the photodetectors was counted and the thermal linear expansion was calculated using

where ΔL is the change in sample length, L₀ is the initial sample length, Ν is the number of interference fringes, and λ is the wavelength of the light source. The instantaneous coefficient of thermal linear expansion, α was calculated using

where ΔL = (L₁ - L₂ ), ΔT = (T₂ - L₂ ), and T₁ and T₂ are the beginning and ending sample temperatures (Reference Touloukian, Kirby, Taylor and DesaiTouloukian and others, 1975). The accuracy limits of calculating β were estimated by combining the uncertainties of the constituent measurements:

where σ_β, σ_∆L , σ _L , and σ_∆T the uncertainties in the coefficient of thermal linear expansion, change in sample length, sample length, and the change in sample temperature (Reference BeersBeers, 1957). Values for are given in Table I; σ_∆T was nominally ±0.02 °C, was nominally ±0.03 mm, and 0.30 ¼m ό σ_∆L < 0.65 μm

The interferometric apparatus was tested by using it to determine the coefficient of thermal linear expansion for Alcoa 6061T6 aluminum alloy bar stock, β_A. A length of aluminum bar (70.05 ± 0.02 mm), with a target mirror frozen to the bar’s front surface, was placed in the sample holder and installed in the cold stage. The thermal linear expansion of the aluminum was determined over a temperature range of −16.9 ° to −7.52 °C and used to calculate the β_A. The β_A was 23.6 ± 0.3 ×10⁻⁶ °C⁻¹ at —11.8 °C, which compares favorably with the interpolated value of 22.8 ± 0.7 ×10⁻⁶ °C⁻¹ at −11.8°C determined from the table of recommended values for the β_A (Reference Touloukian, Kirby, Taylor and DesaiTouloukian and others, 1975).

Results and discussion

Our results for ΔL/L₀ and β are presented in Figures 4 and 5, and Table I. Table I gives values for the mean coefficients of thermal linear expansion for sea ice, β_ls, and the instantaneous β_ls. The mean β_ls, for each warming and cooling test, is the slope of the best-fit line through the ΔL/L₀ values (Fig. 4). There is no temperature-dependence for the mean β_ls, because of the manner of calculation. The instantaneous β_ls values are determined from Equation (10).

The mean and instantaneous β_ls determined for the initial warming of 2 and 4 ppt salinity ice are essentially the same as the values for fresh-water ice published by Reference ButkovichButkovich (1959) and Reference KheisinDoronin and Kheisin (1977), within the limits of uncertainty for our experiment (Fig. 5). The 4 ppt salinity ice exhibited hysteresis when it was cooled and rewarmed after the initial warming test. A general decrease in magnitude of the mean and instantaneous β_ls was associated with the hysteresis. Reference ButkovichButkovich (1959) observed a similar hysteretic behavior for fresh-water ice, in which the coefficients of thermal linear expansion, β_i, decreased with succeeding runs.

Fig. 4. Thermal linear expansion for sea ice. The arrows show the direction of temperature change during a test.

Fig. 5. Instantaneous coefficients of thermal linear expansion for sea ice determined in this study and coefficients of thermal linear expansion for fresh-water ice (0 ppt) determined by Reference ButkovichButkovich ( 1959).

Salinity decreased by 0.8 ppt for the 2 ppt salinity ice and 0.9 ppt for the 4 ppt salinity ice during the experiment. These salinity losses were probably caused by brine drainage during the temperature cycles. The amount of salinity change in the samples is too small to affect significantly the phase-change-related processes and are not considered to be important.

A comparison of the β_ls for the 2 and 4 ppt salinity ice, for the initial warming cycle, with the β_i indicates that they are the same, within the limits of experimental uncertainty. Furthermore, the fact that c-axis orientations for the two sea-ice samples were different indicates that the β_ls has little or no dependence on ice-crystal-axis orientation. This means that coefficients for thermal volume expansion can be determined from the β_ls using

The observed hysteresis for the β_ls may be the result of our experimental technique or may be accounted for by the uncertainty limits of our measurements. However, another possibility is that thermal-history effects on the defect structure induced in the ice could produce the observed hysteresis. For example, dislocations moving under the influence of thermal stresses will have different equilibrium positions upon warming and cooling, thus affecting the microscopic strain to a slight degree (personal communication from D.M. Cole). Further experiments will be needed to examine the causes of hysteresis in the β_ls.

Formulas Used In Calculating Equation (8)

Coefficients of thermal linear expansion and thermal volumetric expansion for fresh-water ice (Reference ButkovichButkovich, 1959):

where Τ is in °C. For α; we use

since the estimated difference between c-axis and a-axis thermal expansion is only 1.8% and was not detected by Reference ButkovichButkovich (1959).

Density of fresh-water ice (Reference PounderPounder, 1965):

>Brine salinity and dSydT (Reference Cox and WeeksCox and Weeks, 1986):

where = −3.9921, q₁ = −22.700, a ₂ = −1.0015, and a ₃ = −0.019956 for —1.6 ≥ Τ > −22.9 °C; a₀ = 206.24, a₁ = −1.8907, a ₂ = −0.060868, and a ₃ = −0.0010247 for −22.9 ≥ Τ >; −44°C.

Brine density and

(Reference ZubovZubov, 1945): the approximate formula for brine density given by Reference ZubovZubov (1945) does not account for thermal volume expansion of the brine. It describes the brine density as a function of brine salinity at Τ = 0°C (Reference Neumann and PiersonNeumann and Pierson, 1965). This formulation is adequate for our needs as the phase-transition effects are much greater than are the thermal expansion effects.

Relative brine volume (Reference Cox and WeeksCox and Weeks, 1986):

where the initial relative brine volume of the sea ice is taken from Reference WeeksWeeks (1962):

where S_i is the sea-ice salinity and the sea-ice density, ρ, is equal to