Principle

The barometric method is based on the precise evaluation of the pressure P and temperature T of dry air extracted from an ice specimen by its melting refreezing under a vacuum in a volume-calibrated cell. The real air sample contained in the cell is hereafter considered to be a mixture of two ideal gases: dry air and water vapor. Thus, if-P_means is the pressure measured in the cell, the pressure P of dry air will be given by:

where Р_H2O the partial pressure of saturated water vapor at temperature T. Air content V of the ice is then obtained from the following relationship:

where M_i is the mass of die ice specimen and U is the volume occupied by the air sample in the cell and equal

where U_cal is the volume of the calibrated cell while M_i/ρ_i represents the volume of the refrozen pure ice whose density. &rho_i , is mostly a function of its temperature (Reference Bader,Bader, 1964).

A diagram of the measuring system is shown in Fig. 1. An ice sample with known mass. M_i , is melted under a vacuum in cell 1 and then gradually refrozen by cooling the bottom of the cell to avoid air-bubble trapping during the freezing process. The cell and part of the line containing the extracted gas is immersed, before pressure measurement, in a liquid cryostat (shown in Fig. 1 by the dotted square to keep the air sample homogeneous at a low temperature T (−30°C). The low temperature ensures a minimum of water-vapor pressure P_H2O in the line. The pressure P_meas of the gas is then measured with a type 590 Barocel (DATAMETRICS) pressure transducer (2 in Fig. Fig. 1).

Fig. 1 Diagram of the measuring system.

The extraction line has three calibrated volumes U_c, U_B and U_E delimited in Figure 1 by dashed outlines. Volume U_C includes the volume of the empty cell plus the internal volumes of the valve v₁, and tubes up to the valves v₂ and v₃. Volume U_B is the sum of the internal volumes of the Barocel itself and fitting tube up to the valve v₂. The sum U_C + U_B will allow us to calculate U_cal the calibrated part of the line which is occupied by extracted gas and refrozen ice at the time of pressure measurement. Volume U_E is used only for self-calibration of the system. It includes expansion chamber 3 plus internal volumes of the valve v₄ and all fitting tubes up to the valves v₃. v₅ and v₆.

Optimum parameters of the measuring system

To estimate the accuracy of the experimental technique, we use the general equation relating the error ΔΥ of the function Y = f(x ₁,x ₂,...,x _n) to the individual errors Δx _i of die variables x_i obtained from direct measurements

According to Equation (5), the error of the air-content value determined from Equation (3) can be calculated as

where ΔM _i and ΔT are the errors of sample mass and cryostat temperature (direct measurements), while ΔP and ΔU are the estimates of pressure P and volume U errors, obtained from Equations (2) and (4) respectively:

and

If all individual errors are determined, the optimum ratio between sample mass. M_i. and cell volume, U_call , for obtaining the best accuracy for air-content measurement can be evaluated on the basis of Equations (2)–(4) and (6)–(8). Assuming reasonable values and ranges: V =

0.05%we found that for samples ofM _i = 20–30 g the best accuracy 0.2–0.3% of air-content measurement would be obtained with U_cal . The pressure measured by the Barocel transducer would then be within the range 5–40 mbar. Taking into account that volume U_E should he about 10 times more than (U_c + U_B) to maintain a similar pressure range during the calibration procedure, a pressure transducer with a full scale of 100 mbar and a main calibrated volume (U_C + U_B) = 100−200cm³ are considered to be optimum for the measuring device. It is also shown in the next section that the limit of accuracy of 0.2–0.3% cannot be practically reached even with optimum parameters of the system because ol uncertainties associated with the implementation of the method.

Description of the device

The vacuum line shown in Figure 1 is built using stainless steel tubing (6.35mm) and CAJON VCR fittings. A diaphragm type of NUPRO valve is chosen for the valves v₁₋ because of its negligible change of internal volume between “close” and “open” positions, while NUPRO bellows valves are installed as V_5,6. The line can be evacuated by a turbo molecular pump backed by a rotary oil pump. A Pirani-type gauge is used for vacuum control.

The extraction cell is a glass metal container. The bottom part of the cell is made of glass to allow observation of ice melting and refreezing, while its upper part and the lid are made of stainless steel. A copper “O” ring gasket is used to ensure good air-tightness between the cell and the lid, and to keep the cell volume as constant as possible during successive manipulations. The internal volume U_C of the empty cell and related tubing was designed to be about 137 cm³.

The pressure transducer (type 590 Barocel) has a thermal base set at 40°C and measuring a pressure range up to 100 mbar. The pressure applied to its diaphragm is always maintained lower than 100 mbar to avoid hysteresis problems. The output signal is directly proportional to pressure and recorded by a DATA-METRICS-type 1450 pressure read-out. The accuracy of the transducer is about ±0.05% of the reading. The internal volume of the Barocel with no pressure applied is about 5.0cm³, while the diaphragm displacement under a pressure of 100 mbar can be as much as 0.16 cm³, The volume U_B of the Barocel and the tubing up to valve v₂ is about 15cm³, so that the resultant volume U_C + U_B ≈ 152 cm³.

The expansion chamber (3 in Fig. 1), which is made of stainless steel, has a lid for introducing a standard volume during the calibration procedure. The lid is coupled to the chamber with a copper “O” ring gasket. The internal volume U_E of the chamber, together with the related tubing (up to valves v₃, v₅ and v₆), is about 1363cm³.

The alcohol bath is cooled by a cryostat which maintains the temperature T at −30°C with a long-term temperature stability of ±0.05°C. The bath temperature is controlled by a high-quality stable platinum resistance thermometer. A good homogenization ol 30 1 of ethanol provides a ±01°C; temperature uniformity.

Calibration procedure

The procedure for calibrating the volumes U_C,U_B and U_E is similar to that described by Schwandcr 1984. The calibration is carried out with the aid of two standard stainless steel volumes U_I (sphere) and U_II (cylinder) which have at 20°C the following characteristics:

The dry air at atmospheric pressure P_a is expanded from a volume U_c into pre-evacuated volumes U_E and U_B sueecssively. and the resultant pressure in the manifold is measured with Barocel. The operation is repeated under three different conditions: (i) both volumes U_c U_E are empty (the resultant pressure after expansion is P₁ (ii) volume U_C contains the standard solid volume U₁(P₂); (iii) U_C contains the standard volume U_II (P₃). All parts of the line during the calibration are equilibrated at room temperature and pressure values P_1,2,3 are converted to 20°C:. The atmospheric pressure is assumed to remain constant throughout the calibration time. From the above procedure, the volumes U_C and (U_E+U_B) as well as atmospheric pressure P_a , can be obtained:

is a dimensionless parameter of our system which allows calibration of the Barocel by adjusting the pressure P₁ read on the transducer in order to have P_a obtained from Equation (11) equal to the atmospheric pressure measured by a mercury barometer with an absolute precision of ±0.01%.

Volume U_B can be determined by expanding dry air at a pressure P₁ from U_B to the pre-evacuated volume U_C containing the standard U_I . The resultant pressure P₄ allows us to calculate U_B:

>

The measured pressures during the calibration procedure (P₁₋₄ ) are in the range 13–90 mbar. By applying Equation (5), the accuracy of the volume (U_C + U_B) is ±0.15% and the absolute calibration of the Barocel has a precision of about ±0.2%.

Analytical procedure

A cubic ice sample of about 20–30g (representing about 3 cm of ice-core thickness) is placed, after weighing, into the pre-cooled extraction cell. The extraction cell is then attached to the vacuum manifold with a CAJON VCR fitting welded to the lid of the cell. The cell is evacuated for 10 min with a turbo molecular pump. During pumping, approximately 1% of the ice is removed by sublimation from the sample surface. After pumping, the cell is isolated by closing stopcock v₁ and the bottom part of the flask is immersed for 10min in an ultrasonic bath filled with warm water (50°C) to melt the ice. The experiments have demonstrated an efficiency of the ultrasonic bath in avoiding bubble formation during refreezing of the water. The ultrasonic bath is then replaced with the liquid cryostat and the bottom of the flask containing the melted water is immersed for 40min at −30°C. This results in gradual refreezing from the bottom of the cell. The refrozen ice is considered to be a polycrystalline bubble-free ice with a density of ρ_i = 0.9207 Mgm⁻³ at −30°C (Reference Bader,Bader, 1964). The extraction cell and that part of the line representing almost all the volume (U_C + U_B), except for the internal volume of the Barocel with its short connecting tubing, is then immersed in the alcohol bath as shown in Figure 1 by the dotted square. Valves v₁ and v₂ are opened to expand the air sample through the volume (U_C + U_B). The extraction line is kept in the liquid cryostat for 30 min. allowing tin-air sample to equilibrate at −30°C and to reduce the water-vapor pressure to 0.37–0.39mbar. At the end of the procedure, the absolute pressure P_meas (range within 10–30 mbar) and temperature T (around 243 K) of the extracted air are measured with the Barocel and the platinum resistance, respectively.

The total duration of the analytical procedure is slightly more than 2h. For comparison, the time efficiency of the vacuum-volumetric method described by Reference Raynaud, and WhillansRaynaud and others (1982) is about twice as slow.

Experimental uncertainties and corrections

In this section, we estimate the absolute precision of the air-content data obtained using the new technique, taking account of all possible sources of error and uncertainty associated with the calibration and analytical procedures described above. (The uncertainties due to cut-bubble effect are not considered here.)

An accuracy of about ±0.01 mbar for P_H2O evaluation is deduced from a comparison between the theoretical values and the direct measurements of water-vapor pressure using the Barocel, while the line containing an ice sample under vacuum was equilibrated at −30°C. Assuming

after calibration of the Barocel, a resultant absolute precision for determining the dry air pressure P from Equation (2) is betler than ±0.25%.

The mass loss during the time of sample preevacuation was experimentally defined as 0.2±0.1 g; therefore, the correction δM_i = −0.2g must be applied to the measured sample mass and the resultant error

To evaluate U_cal in Equation (4), a number of Corrections have to be made to (U_C + U_B ) as deduced through the calibration procedure: (i) the thermal shrinkage of the given extraction line immersed in the alcohol bath at −30°C with respect to its volume calibrated at 20°C is estimated to be −0.2 ± 0.01 cm³; (ii) the correction for the effect of the Barocel thermal base (40°C) during the calibration is 0.35 ±0.02 cm³; (iii) the effect of the temperature difference between the part of the extraction line immersed in the alcohol bath (−30°C), the short manifold exposed to the room temperature and the internal volume of Barocel (40°C) during the analytical procedure can be expressed as an apparent change of the volume (U_C + U_B) which corresponds to a correction of −1.9 ± 0.1 cm³; (iv) the effect of the Barocel diaphragm displacement, which is considered to be a linear function of the applied pressure, can be eliminated by an average volume correction of −0.13 ± 0.02cm³ (an estimate based on the difference between pressure measured in the course of the calibration and analytical procedures). Adding together these different uncertainties, the total volume correction δU is −1.9 ± 0.1 cm³. This leads to U_cal = U_C + U_B 1.9 cm³ with an absolute accuracy of ±0.25 cm³. As the density of refrozen ice in the extraction cell during our experiments was always the same as the density of pure ice within

, one can estimate, using Equations (4) and (5), the resultant error of the air-sample volume is .

Finally, taking ΔT/T≤0.05﹪, after calibration of the platinum resistance in the alcohol bath, we can calculate using Equation (6) an overall error

for absolute air-content values obtained using the new technique. The calculations made by using an overestimating approach, assuming ΔV/V=0.05﹪ instead of Equation (5) would lead .