Introduction
Since the early seismic measurements of the Wegener Expedition on the Greenland ice sheet 1929-31 (Reference Brockamp and BrockampBrockamp, 1935) many investigations on the temperature dependence of seismic waves in ice have been carried out by various authors. Besides being of general interest, it is essential for the computation of ice thicknesses from reflection shooting to know how seismic velocities vary with temperature. Table I shows the results of various laboratory and in situ investigations and how they differ much from each other. In particular there seems to be an inconsistency between the laboratory and in situ measurements. However, Reference Bentley and OdishawBentley ([e1964]) and Reference RöthlisbergerRöthlisberger (1972) have already pointed out that the results of the field measurements in the Antarctic are in good agreement with the ultrasonic results of Reference RobinRobin (1958).
Results
The main reason for the inconsistency and also for the differences between the various field results has been that there were not enough field data available and that some field data applied for the determination of dv/dT did not represent properly the velocities in polycrystalline ice at the given temperature. The reason for the latter may in some cases have been the inclusion of velocities obtained from refraction profiles which were too short to yield the maximum velocities, and the inclusion of velocities affected by anisotropy in the ice, but in some cases also inaccuracy. If such velocities are used for the determination of the temperature dependence the result is not reliable, especially if there are, statistically, not enough values. To determine the temperature relation the author has used all the velocity values available obtained either on the Greenland or the Antarctic ice sheet (Table II). Glaciers have been excluded because of their complexity. To make sure that the velocities correspond to maximum velocities in the ice, only velocities from refraction profiles longer than 3 000 m were taken. The velocities are plotted against temperature in Figure 1. The relation for the P-waves is
The correlation coefficient is 0.94 showing that the result is highly significant. The gradient dv p/dT = — 2.30 m/s deg is in perfect agreement with the ultrasonic laboratory result of Reference RobinRobin (1958).
x is the maximum distance and also the distance range except for the second and third values from Crary (1963), which correspond to only one geophone spread at the given distance, and the values from Reference Beitzel, Crary and WashingtonBeitzel (1971) for which the range was 12 000–16 000 m, 17 000–22 000 m and 12 000-17 000 m for the three values entered respectively.
It is well known that the breaks of the shear waves are often hard to identify in the seismic records. The gaps in shear-wave velocities in Table II is obviously due to this fact. The shear-wave velocities are also plotted versus the temperatures in Figure 1 yielding the linear relation (r = 0.99)
The gradient dv s/dT = —1.2 m/s deg is close to the value Reference Brockamp and QuerfurthBrockamp and Querfurth ([1965]) computed from their ultrasonic measurements on single crystals. Unfortunately, there are no shear-wave values for temperatures below –29° C.
Poisson's ratio σ was calculated from the P- and S-wave velocities (Fig. 2). There is no significant temperature dependence of Poisson's ratio seen from the graph. Assuming a constant Poisson's ratio of 0.329, shear-wave velocities have been calculated from P-wave velocities at temperatures below — 30° C (open circles). These values fit well to the extrapolated straight line from Equations (2). This could be an indication that we may extrapolate Equations (2) to approximately —60° C.
Conclusions
From carefully selected seismic velocity values, the temperature dependence of P- and S-wave velocities has been determined. The gradients dv p/dT = -2.30 m/s deg and dv s/dT - —1.2 m/s deg are in close agreement with the ultrasonic measurements of Reference RobinRobin (1958) and Reference Brockamp and QuerfurthBrockamp and Querfurth ([1965]) showing that there is no discrepancy between seismic field and ultrasonic laboratory results.