Results from Bvrd Glacier. Antarctica

Results from work on the Byrd Glacier, undertaken in 1978—79 as part of a study by Terence Hughes, of the University of Maine, and completed some time ago (Reference BrecherBrecher, 1982), are presented as an example of what the method can be expected to yield. Similar results should be obtainable on ice stream B or elsewhere, under similar conditions.

Byrd is one of the largest and most active outlet glaciers from the East Antarctic plateau. The main ice stream is about 25 km wide. An area more than 100 km long and about 40 km wide was measured. Thirteen perimeter position and elevation control points, eleven on the glacier fjord walls and two on the glacier, and twelve additional elevation control points, more or less down the glacier’s center line, were established (Fig. 1). Surface velocities were measured from two sets of aerial photographs, of 152 and 170 exposures, respectively, taken 56 days apart in the 1978-79 antarctic summer. Only the minimum number of points to form the two blocks properly were measured. Average spacing between points on the glacier was about 2.5 km. Points were selected separately in each block for optimum location in the photogrammetric sense and then identified and marked in the other block as well, incidentally, it is surprisingly easy to find and identify the same glacier-surface features in photographs taken at different times. Coordinates of 1467 terrain points were determined from 6738 image point measurements. Surface velocities for 601 common moving points, 472 of them on the main ice stream, were determined. The standard deviation of the photograph tie-point measurements is 16,3 μm, which is equivalent to 0.8 m in position and 1.8 m in elevation, at the average scale of the photographs. This appears to be a reasonable indication of the precision of the photogrammetric work. Redundancy of measurements is more than twice as large as in usual practice; the residuals approximate a normal distribution very well and only 154 (1.1%) are larger than three standard deviations.

Fig. 1. Overviews of photo blocks and control layout for Byrd Glacier and Ice Stream B. Triangles are position and elevation control points, circles elevation control only. Open triangles on ice stream B are control points not imaged on the photographs due to displacement of the flight lines from their desired positions. Control point positions on Ice Stream B were determined by Doppler satellite surveying relative to nearby points on stagnant ice (North and South camps) and to McMurdo and South Pole stations.

It is difficult to give a satisfactory estimate of accuracy, however, as no unambiguous checks are available. From various indirect approaches, it appears that both positions and elevations are accurate to a few meters. Taking 5 m as a reasonable, and perhaps too conservative, value yields errors of about 5% to 15% for all velocities except for the very lowest, near the glacier edge, where it yields about 40%. Velocities agree within 2 to 4% with values reported by Reference SwithinbankSwithinbank (1963) and with values from ground surveys in 1978-79 (Reference Hughes and FastookHughes and Fastook, 1981). Velocities determined independently by ground and photogrammetric methods at 13 common points agree within 0 to 4% and the RMS of the differences is 2%. This good agreement and the “reasonableness” of the results suggest that the 5 m accuracy estimate, above, may be too pessimistic. A value of 3 m may be more realistic.

The results are presented as velocity vectors and as contours of constant total velocity and its x and y components. The coordinate system was chosen to make the x direction parallel to the general flow direction, as judged by the vector plot (Fig.2a). The total velocity contour plot (Fig.2b) clearly shows that the dynamic center line of the glacier is displaced appreciably from the geometric center line over about two-thirds of the glacier’s length and that the maximum velocity of 875 m a¹ occurs well upstream on the glacier, presumably due to the buttressing effect of the Ross Ice Shelf. Not surprisingly, the x velocity (Fig.2c) is very similar to the total velocity and the y velocity plot (Fig.2d) clearly shows the appreciable right turn, beginning about half-way down the glacier.

Fig. 2. Surface velocity on Byrd Glacier, a) Velocity vectors, b) total velocity, c) x velocity and d) y velocity contours. Contour interval is 20 m a⁻¹ . Coordinate system chosen to make x direction parallel to general direction of ice flow. Vectors on extreme downstream end have been truncated to allow figure to fit on page.

Figure 3 presents these results as contours of partial derivatives of the velocity components in the two orthogonal directions (strain rates). These plots were produced at the suggestion of Ian Whillans and are interpreted with his assistance, as in Reference Whillans, Jezek, Drew and GundestrupWhillans and others (1984). The accuracy of these velocity gradients can be estimated from the positional errors. Because positional errors are highly correlated, displacements, and thus velocities, of points close together have much smaller errors than points farther apart. Conversely, errors of velocity gradients decrease with greater spacing. Taking reasonable values of position error and spacing, one arrives at errors in velocity gradients of about 1 x 10⁻³a⁻¹ (or one-fifth contour interval on the plots) over distances of 8 km or more. Errors increase linearly to about 5 x 10−³a⁻¹ (one contour interval) for points about 1.5 km apart.

Fig. 3. Contours of partial derivatives of surface velocity (strain rates) on Byrd Glacier, a) ∂ν_x/∂x, extension, b) ∂ν_x/∂x, lateral shear, c) ∂ν_y/∂x, flowline turning, d) ∂ν_y/∂y, spreading. Contour interval is 5x10⁻³a⁻¹ indicates minimum distance (8 km) over which error is estimated to be one-fifth contour interval (1x10⁻³a⁻¹) or less

In the plot of ∂ν_x/∂x (Fig.3a), extending flow at the upstream end of the glacier, a marked transition to no extension or compression in the region of maximum velocity and a hint of compression at the ice-shelf end can be seen. The plot of ∂ν_x/∂y (Fig.3b) shows the progressive development of a narrow shear zone against the fjord walls, particularly as the ice shelf is approached. More variation in flowline turning than is readily apparent in the vector plot is indicated in the ∂ν_y/∂x plot (Fig.3c). A “snaking” motion appears to be taking place at the upstream end and most of the turning to the north, farther downstream, takes place over a short distance. Lateral compression at the upstream end and spreading at the downstream end are shown by the ∂ν_y/∂y plot (Fig.3d), but the pattern over the glacier is complex.

Application to Ice Stream B. Antarctica

The approach outlined above for regions where no fixed control points can be established, is being applied to work begun in the 1984-85 field season on Ice Stream B in West Antarctica. This ice stream is about 250 km long and between 40 and 90 km wide. To keep the field effort required to set out the necessary control points within manageable limits, four separate blocks of photographs, covering limited areas of greatest interest, were laid out. The blocks are all about 30 km wide and between 60 and 100 km long. The total area covered, about 9100 km², is nevertheless equal to about one-third of the area of the state of Maryland, or of Belgium. About 260 photographs, at a scale of 1:52 000, are involved. Figure 1 gives an overview of this project and a comparison with the size and layout of the Byrd Glacier work described above. The ice stream B project covers roughly twice the area of the Byrd Glacier work and each of the four photo blocks is about half as big as the Byrd Glacier block.

Targets of black, plastic sheeting, 3 m square, suspended about 0.5 m above the surface on an array of bamboo stakes, were used to mark ground control points. Their positions were determined relative to nearby points on stagnant ice and to McMurdo and South Pole stations by Doppler satellite surveying. They defied burial by drifting snow and destruction by wind and their images proved reasonably easy to find, even though they were, in several cases, very far from their intended positions on the photographs. Due to too great reliance by the flight crew on positioning flight lines with an insufficiently-accurate, inertial navigation system (INS), the photo blocks are displaced some 8 to 12 km to the north-east of their intended positions and, as a result, about one third of the control points, usually along one edge of each block, were not photographed (Fig.1). Thus, only a limited part of this photography can be used for measurements. It is possible to overcome the navigation problem in relatively featureless terrain by using just one clearly-recognizable feature of known position, such as the field camp in this instance, to correct for INS drift with time and there is every reason to expect that satisfactory aerial photography will be obtained for this project.