Instrument

Our video logging tool is a downward-looking wide-angle video camera with integral light-emitting diodes (LEDs) to provide illumination. This charge-coupled device (CCD) camera is a “SeeSnake” model made by DeepSea Power & Light Inc. We mounted the camera in a simple rigid frame of about 10 cm diameter with tapered ends. We recorded images from the SeeSnake camera with an 8 mm video camcorder.

The tool hangs by a single triaxial cable containing both video and power conductors. We also used the cable to measure the depth of the camera. We ran the cable over a pulley placed atop a survey tripod positioned over the hole. We raised and lowered the tool by hand. A camming cable brake attached to the pulley housing allowed the tool to hang suspended during measurements.

Once the bands were in place, we recorded their relative positions with the video logging tool in January 1995. One year later we repeated the survey. For the first log, we made a permanent mark on the cable when we could image each band. We measured the distance between this mark and the borehole casing with a vernier caliper (see Fig. 1) for this and all subsequent images of this particular band edge.

Fig. 1 Schematic of the video tool in the borehole.

The two-dimensional image of a band in the hole (Fig. 2) shows the edge of the band as a circle. We determine the location of the camera relative to the band by measuring the observed apparent radius of the band at a given camera position. The distance d between the camera lens and the edge of the band can be expressed in terms of the focal length f of the lens, the actual radius of the band r _a, and the observed radius of the band r _o:

(1)

Ideally we would select an optimum distance from each band to position the camera for caliper measurements, calculate the desired apparent radius r _d for that distance, and make the caliper measurement when the camera is positioned so that r _o = r _d. Since we did not have fine adjustment ability to position our tool, and had no accurate means of assessing the apparent radius in the field, we used the following “bracketing” approach to ensure we had positioned the camera in the same way from year to year.

Fig. 2 Downward-looking image of a band at ≈50 m. In the center of the field of view is a corner reflector for looking directly out to the sides which was not used in this analysis. Only the direct image of the band (dark circle) was used.

For each band, we repeated the measurement at least three times, moving the camera vertically by approximately 1 cm each time. The resulting dataset consists of several images of the top and bottom edges of each band, each image taken from a different height above the band. Acquiring multiple images ensured that we could interpolate the measurement to the same distance d relative to the band for each year. Although rearranging and integrating Equation (1) shows that observed apparent radius varies with the inverse square of the distance d, over the short range of our survey the relationship is almost linear.

Data reduction

We first digitized the video images using a commercially available video frame grabber. We then found the radius of the band edge on each video image. Since the band was markedly darker than the surrounding firn, we used an edge-detection process to enhance the edge of the band. After extraneous edges were removed, the apparent radius of the band was determined by fitting a circle to the bright pixels of the band edge, using a least-squares process. For each band, we plotted the apparent radius of the band against the height of the permanent mark on the cable above the top of the borehole casing. The result (Fig. 3) was an almost linear relationship. Repeating the process the following year gave a similar line at a different height. The offset between the two lines gives the displacement of the band relative to our reference mark (i.e. the top of the casing). This displacement divided by the elapsed time between measurements (approximately 1 year) gives relative velocity w _r(z) between the borehole casing and the band at depth z.

Fig. 3 The observed apparent band-edge radius in an image as a function of position of the logging tool. The caliper measures the distance from a mark on the cable to the top of the borehole casing. Separation between the two lines measures the total shortening of the firn column between 44.58 m and the borehole casing.

Sources of error

Noise appears to grow sharply at depths >85 m. At these depths the decreasing contrast between the ice and band makes the band edge more difficult to distinguish in the video image. This source of error is addressed in the next section. Modifying the markers to have an easily visible edge would help to overcome this. In addition, since the expected signal for vertical strain becomes very small at these depths, the signal-to-noise ratio declines with depth. Bands such as the ones we used have slipped in past experiments (Reference Raymond, Weertman, Thompson, Mosley-Thompson, Peel and MulvaneyRaymond and others, 1996). Although we have no reason to conclude that bands were displaced in our experiment, it is impossible to exclude displacements smaller than ±2 mm. A further uncertainty in this system is introduced by the cable. The plastic-sheathed video cable was not designed or tested for consistent elastic or thermal response, and the effects of aging are unknown. If the cable stretches by a certain amount one year and a different amount in a subsequent year, error is introduced. Since the stretch would be affected by the temperature profile along the cable, laboratory tests on the cable are impractical. Using an accurately calibrated logging cable that could carry a video signal would minimize this source of error.

Measurement uncertainty

To address the uncertainty in our measurement of w _r(z) at depth, we define a new parameter γ. We expect a smoothly varying vertical velocity pattern. Below 85 m, our velocity data have a much larger spatial variability than we would expect firn or ice to exhibit. As indicated above, this is likely due to difficulty in distinguishing band edges. A “least-squares” smooth curve through the points might not reflect the true profile. Therefore we use physical constraints to extend our relative velocity curve below the last reliable points. Measured values of horizontal strain at the surface combined with conservation of mass provide a lower limit on the vertical strain rate below 80 m. The magnitude of the vertical strain rate (|∂w/∂z|, the slope of the velocity curve) cannot be smaller than the total horizontal strain rate (|∂u/∂x + ∂v/∂y|): unless the firn is dilating, material flowing out in the horizontal direction must be replaced by material from above. The upper limit is taken as a curve drawn through our highest relative velocity measurements. The true vertical velocity profile is then somewhere between the two extremes. We define the partitioning coefficient γ, 0 ≤ γ ≤ 1 as a measure of the position of the actual velocity profile w _r(z) relative to the two extremes. Once a value of γ is chosen,

(3)

where and are the lower and upper limits, respectively. The measured w _r(z) data points, and the range of w _r(z) profiles allowed by Equation (3) are shown in Figure 4a. A sampling of the measured w _r values are listed in Table 1, along with measured densities.

Fig. 4 (a) The measured vertical motion of markers relative to the surface. The shaded grey area indicates the region encompassed by 0 ≤ γ ≤ 1. (b) A modeled density profile (dashed line) compared to two measured density datasets from a hole 50 m away. The modeled density is constrained to converge on that of pure ice (0.917 g cm⁻³). The shaded grey area indicates the range of possible density depth profiles for 0 ≤ γ ≤ 1.

Table 1 Values of relative velocity w _r and density measurements ρ ₁ from Reference FitzpatrickFitzpatrick (1994) and ρ ₂ from Reference Grootes, Steig and StuiverGrootes and others (1994). Final accepted w(z) and expected w_ρ predicted by steady state and Sorge’s law are also shown

Absolute velocity

Our goal is to arrive at a true vertical velocity for each surveyed point in the borehole, to be used in calculating a depth–age scale. For any given marker, the true vertical velocity is found by adding the measured velocity w _r(z) relative to the surface marker to the absolute downward velocity w _o of the surface marker. For a steady surface, ideally we could measure w _o using survey-quality repeat GPS measurements such as those made by Reference Hamilton and WhillansHamilton and Whillans (1996). Since we do not have such data, we infer w _o using measured density profiles from the main core site 50 m away.

Conservation of mass in a vertical column of ice from the surface to the depth z _bot of the borehole (here 130 m) gives

(4)

where ρ _o is the density of snow at the top of the hole. Reference FitzpatrickFitzpatrick (1994) and Reference Grootes, Steig and StuiverGrootes and others (1994) measured density ρ as a function of depth z, and Reference MorseMorse (1997) measured the horizontal strain rate (∂u/∂x + ∂v/∂y) at the surface using a network of poles. Equation (4) says that in steady state any mass that comes in the top of the box, and does not go out the sides, must come out the bottom.

Now, to express w _o entirely in terms of readily measurable quantities, we first recognize that w _o = w(z _bot) − w _r(z _bot), where we have already measured the relative velocity w _r(z _bot) of the bottom of the hole. Second, we note that the mass flux w _o ρ _o through the upper surface of the ice sheet can also be written as , where is ice-equivalent accumulation rate, and ρ _ice is the density of ice. Third, we note that the density ρ(z _bot) at the bottom of the hole has reached the ice density ρ _ice. Incorporating this information into Equation (4) leads to

(5)

We then use and γ as free parameters in the density model described below.

Density profile

Since the firn is compressible, vertical velocity is coupled to firn compaction. We find w _o by selecting the pair of parameters [, γ] that, when combined with our measured dw/dz and used in the calculations below, simultaneously produces a pair of coupled solutions w(z) and ρ(z) such that ρ(z) best matches measured densities. We then accept that corresponding velocity solution w(z).

Expanding Equation (2) with the assumptions above and then solving for ∂p/∂z yields

(6)

which can be integrated numerically to obtain a density profile, using measured values of ∂u/∂x, ∂v/∂y and ∂w/∂z. We computed density distributions using a range of possible values for both and γ. For each [, γ] pair, we compared the modeled density profile to measured density data from the main borehole 50 m away (Reference FitzpatrickFitzpatrick 1994; Reference Grootes, Steig and StuiverGrootes and others, 1994). Our preferred profile is the one that matches the measurements most closely in a least-squares sense. Equation (6) can also be solved to predict a w(z) profile, based on a measured ρ(z) profile and a surface velocity. Using a value for the surface velocity from our final accepted velocity profile (derived in this section), the resulting velocity profile w_ρ agrees well with our accepted final w(z) profile; both can be seen in Table 1. To quantify our confidence in our preferred profile, we use the “bootstrap” method (Reference Press, Teukolsky, Vetterling and FlanneryPress and others, 1992, p.691).

Bootstrapping confidence levels

The goal of bootstrapping is to place confidence bounds on a measurement or on a calculated result, where the underlying sampled population cannot provide traditional statistical information. In the current situation, we look for confidence bounds on our calculated w(z) and ρ(z), yet we have only one density sample from any given depth and therefore cannot calculate a standard deviation for these underlying data. In the bootstrap method, the lack of repeated measurements is compensated for by using the actual dataset D ₀ to create a number of synthetic datasets D ₁, D ₂, …, each with the same number of points as the original set. Each synthetic dataset is populated by drawing samples at random from the measured dataset with replacement. Replacement ensures that in the synthetic datasets some measurements will be repeated (and thus be more highly weighted) and some will be omitted. For each of these synthetic datasets we find a “best-fit” calculated density profile. The resulting set of “best-fit” values of and γ serve as a population from which we can calculate meaningful statistics. One such population of 224 sets of fitted parameters is shown in Figure 5, along with our resulting preferred value for and its 95% confidence interval. This confidence interval is used to estimate the error range on the velocity profile and the associated depth–age scale discussed below.

Fig. 5 The population of 224 “bootstrapped” and γ, the best-fit (solid vertical line) and 9.5% confidence interval on (dashed vertical lines). is indicated in ice equivalent units.

The preferred velocity profile, shown by the bold curve in Figure 6, uses and γ = 0.35. The shaded region contains all profiles with inside the 95% confidence interval in Figure 5.

Fig. 6 The vertical velocity profile. The bold line shows the best fit. The shaded region contains all profiles with inside the 95% confidence interval in Figure 5.

Surface density measurements provide further support of our optimization. All model runs within our 95% confidence interval produced surface densities in the range 0.32 g cm⁻³ ≤ ρ ≤ 0.35 g cm⁻³; these values fall within the range of measured surface densities at Taylor Dome (M. Duvall, unpublished field report, 1994).