Introduction

The propagation in sea ice of acoustic waves and pulses has been used extensively to investigate the elastic properties of that material (e.g. Reference AndersonAnderson, 1958; Reference Pounder and LanglebenPounder and Langleben, 1964). In these studies it has sometimes been noted that the high-frequency components tend to suffer greater attenuation than the low-frequency components, but no quantitative data on attenuation in sea ice are available. There have been numerous investigations however of acoustic attenuation in other polycrystalline substances such as metals and rocks (e.g. Reference Mason and McSkiminMason and McSkimin, 1947; Reference Knopoff and MacDonaldKnopoff and MacDonald, 1958) and one on freshwater ice (Reference WestphalWestphal, 1965). The latter has measured the attenuation coefficient of glacier ice over a frequency range of 2·5 kHz to 15 kHz by spectral analysis of the pressure pulses from small explosions of seismic blasting caps. In polycrystalline materials, it has generally been found that the attenuation can be related to scattering at the grain boundaries and to internal friction between the grains.

This paper reports on a series of detailed in situ attenuation measurements which were made on the natural cover of sea ice in Tanquary Fiord, Ellesmere Island during the spring of 1967 near the Defence Research Board base camp at lat. 81° 25′ N., long. 76° 50′ W. Observations were made over a frequency band extending from 10 kHz to 500 kHz using CW transmission along a horizontal path. These investigations had been started in 1965 and a preliminary account of some results of the field work and of associated laboratory experiments has appeared in Reference Pounder and LanglebenPounder and Langleben (1968).

Experimental Methods

The ice cover in Tanquary Fiord was about 8 ft (2·5 m) thick. Acoustic measurements were made over a horizontal transmission path starting at an extreme range of 25 ft (7·6 m) to a minimum range of 4 ft (1·3 m). Vertical cylindrical holes were drilled in the ice cover to a depth of 5 ft (1·5 m) to house the sound source and the detector, and were filled with kerosene to provide good acoustic coupling to the ice. After completion of a set of measurements, a new hole was bored for the detector at a lesser range from the sound source and the procedure was repeated.

The acoustic transducers were piezoelectric barium titanate crystals in ceramic discs of thickness: in (6 mm) with a natural frequency of about 450 kHz in thickness expansion. Discs of 1, 4 and 6 in (2·5, 10 and 15 cm) diameter served in turn as transmitting transducers and a disc of in (1·3 cm) diameter was used as receiving transducer. Each transducer was encased to provide water proofing and adequate electric shielding, and in the process the resonant frequency was reduced by about a factor two.

For use, each transducer was mounted at the end of a long pole in (1·9 cm) in diameter, with its axis perpendicular to the length of the pole. The transducers were then immersed to a depth of 4 ft (1·3 m), i.e. mid-way between the top and bottom of the ice cover, to minimize any possible boundary effects on the measurements. Optical alignment of receiving and transmitting transducers was achieved by adjustment of vertical height and orientation fiducial markers on the poles.

The measuring system may be described as follows. The sound source was driven, in CW excitation, by a Hewlett Packard (HP) 651A oscillator through an HP467A power amplifier. This oscillator was swept in frequency by an HP297A mechanical sweep drive which also generated an electrical output for the X-axis deflection on an HP135C X−ϒ recorder. The receiving system consisted of an HP400E voltmeter, used as a pre-amplifier, HP466A and 450A amplifiers in cascade and a diode detector leading to the Y-axis input of the recorder. The gain of the system was variable over a wide dynamic range with calibrated attenuators.

In operation, the oscillator was set to sweep the desired frequency band and a graph of received signal as a function of frequency was automatically traced out on graph paper by the X−ϒ recorder. The procedure was repeated for each reduction in transmitter–receiver range. Care was taken to ensure that the transmitter was driven at constant voltage. In this way, no absolute power measurements were necessary to determine changes in received power or intensity level with changes in length of transmission path.

Observations and Results

Observations of the ice cover in the vicinity of the operating site indicated that it consisted of two-year-old ice of thickness about 8 ft (2·5 m). Its salinity along the transmission path was about 0·1 % by weight and its temperature at the same depth about −6° C. Horizontal and vertical thin sections revealed the typical structure of sea ice, crystals long in the growth direction perpendicular to the surface and of horizontal dimensions varying from about 1 cm to greater than 5 cm. The typical crystal size in the horizontal was about 2 cm.

Measurements of relative signal intensity level were made at receiver–transmitter ranges of 25, 20, 18, 16, 15, 14, 12, 10, 8, 6, 5 and 4 ft (7·6, 6·1, 5·5, 4·9, 4·6, 4·3, 3·6, 3·0, 2·4, 1·8, 1·5 and 1·3 m) in the order given. At each range, the frequency was swept over the band 10 kHz to 500 kHz. Three such series of measurements were performed using in turn as transmitter, the 1 in (2·5 cm), 4 in (to cm) and 6 in (15 cm) transducers. Detectable signal was obtained over a considerable band of frequency at all of the twelve ranges used, particularly with the two larger transducers (Figures 1, 2 and 3). At high frequencies where the attenuation was severe, signal merged with background noise at the more distant ranges. At low frequencies, far removed from the resonant frequency of the encased transmitting transducers, the acoustic power output was low and once again the signal could not be distinguished from noise at the more distant ranges used.

Fig. 1. Transmitter of diameter 6 in (15 cm). Signal intensity level as a function of range al frequencies between 10 kHz and 500 kHz. Values of the attenuation coefficient, listed in the ATTEN column, are the negative of the slopes of the straight lines.

Fig. 2. Transmitter of diameter 4 in (10 cm). Signal intensity level as a function of range at frequencies between 10 kHz and 500 kHz. Values of the attenuation coefficient, listed in the ATTEN. column, are the negative of the slopes of the straight lines.

Fig. 3. Transmitter of diameter 1 in (2·5 cm). Signal intensity level as a function of range at frequencies between 10 kHz and 500 kHz. Values of the attenuation coefficient, listed in the ATTEN. column, are the negative of the slopes of the straight lines.

The data analysis for each series of measurements was handled in the following manner. Values of recorded signal intensity level were read off the graphs at the grid points of the frequency axis (10 points per inch) and were then put on punch cards. Computer data processing averaged the signal intensity level within frequency increments (38 increments for the frequency band covered) and prepared in tabular form values of signal intensity level under column headings of transmission range and row headings of frequency. It should be pointed out that, as part of the computer program, these signal levels had been range corrected to allow for beam spread of the transmitter. The directionality characteristics of the transducers when immersed in the oil-filled cylindrical holes in the ice cover had been investigated and it was found that they behaved essentially as point sources in these conditions.

In the next step of the analysis, signal intensity level was plotted as a function of range for each of the frequency increments in turn, producing 38 graphs. The straight line of best fit and its slope was computer calculated for each graph using the method of least-squares. These slopes should have established values of the attenuation coefficient and its variation with frequency. However, some of the data points on the graphs were obviously spurious, a not uncommon occurrence in acoustical measurements. Points which deviated most from the line of best fit were removed one by one, recalculating a new line of best fit each time, until the scatter was limited to within 3 db.

The final results of this procedure are shown in Figures 1, 2 and 3 for the three series of measurements with transmitting transducers of respectively 6, 4 and 1 in (55, 10 and 2·5 cm) diameter. In each diagram, the ordinate is received signal as intensity level in decibels and the abscissa is the length of the transmission path or range in feet. The series of graphs display the measured points and the lines of best fit at the various frequencies. The two columns beside the graphs list the relevant frequencies in order of increasing magnitude and the corresponding attenuation coefficients in db m⁻¹ (1 db m⁻¹ = 0·115 nepers m⁻¹) which are equal to the negative of the slope of the lines of best fit. The trend indicated in these figures is that the attenuation coefficient increases with increasing frequency, i.e. that the slope becomes progressively more negative. Since attenuation is a property of the medium and not of the measuring system, the data of Figures 1 to 3 were combined, weighting the slopes at each frequency according to the number of points used to establish the slopes. The results are plotted as points in Figure 4 for attenuation coefficient (db m⁻¹) against frequency (kHz). It is seen that attenuation is an ever rapidly increasing function of frequency. The attenuation coefficient increases from a value of less than 1 db m⁻¹ at 10 kHz, to about 5 db m⁻¹ at 100 kHz and to more than 35 db m⁻¹ at 500 kHz. As comparison, Reference WestphalWestphal (1965) obtained a value for the attenuation coefficient of 0·215 nepers m⁻¹ (1·9 db m⁻¹) at 15 kHz in glacier ice.

Fig. 4. Attenuation coefficient as a function of frequency.

A considerable body of evidence exists (e.g. Reference MasonMason, 1964, p. 163) to indicate that in polycrystalline materials the attenuation may vary as the sum of two frequency-dependent terms. One involves a linear dependency on frequency and is caused by frictional loss mechanisms between grains. The other is a term in the fourth power of the frequency and arises from scattering at the grain boundaries caused by discontinuities in the elastic constants in going from one crystal to the adjacent one. The data of Figure 4 were accordingly fitted, using the least-squares method, by an equation of the form

where α is the attenuation coefficient, f is the frequency, c ₁ × 4·45 × 10⁻² db m⁻¹ kHz⁻¹, and c ₂ = 2·18 × 10⁻¹⁰ db m⁻¹ k Hz⁻⁴.

It is seen that the curve fits the data points reasonably well. The points seem to follow a series of oscillations above the curve which may be caused by thermal relaxation processes. However no attempt was made to investigate these features.

Discussion

Calculations indicate that the linear term in the above equation is the predominant one in the frequency band studied. It accounts for more than 99·9% of the attenuation at frequencies below 60 kHz, for 99% at about 120 kHz, for 60% at somewhat less than 300 kHz and for 60% at about 500 kHz. This result is not entirely unexpected when one considers that sea ice has a complicated substructure of platelets with heavy concentration of liquid brine in cells between the platelets and also numerous air bubbles. The brine cells, air bubbles, platelets and even grains may act as sites of strain concentration resulting from passage of the acoustic pressure wave. Reference SavageSavage (1965) points out that localized temperature fluctuations would be induced at such sites and that the diffusion of these fluctuations by conduction produces the loss mechanism which he calls thermoelastic internal friction.

As for the scattering term, since the velocity of compressional waves in sea ice of the properties encountered is about 3·7 × 10³ m s⁻¹ (Reference LanglebenLangleben, 1962), the wavelength of the acoustic waves approaches the typical horizontal dimension of the ice crystals, about 2 cm, at a frequency of approximately 130 kHz. It would thus appear that, in a lossy medium such as sea ice, Rayleigh-type scattering is insignificant compared with other loss mechanisms until frequencies having wavelengths very much less than the average crystal size are attained.

Acknowledgements

This work has been supported by the U.S. Naval Ordnance Laboratory under ONR Contract NONR 4915 (00), Task No. NR307–290 and by the Defence Research Board of Canada under D.D.P. Contract GR.813007. Dr G. Hattersley-Smith arranged the logistics of the field trip and Mr P. Stalinski assisted with the measurements.