eight exposures are processed simultaneously to obtain a moderate further im-
provement in all of the parameters.
The foregoing set of results demonstrates the effectiveness of the process
of self-calibration when it is properly implemented. The only external information
exercised was the minimum required to define uniquely the coordinate system of
object space (i.e., three translations, three rotations and scale were arbitrarily
defined). Absolute scale was ultimately derived from measurements of targets
attached to a calibrated invar tape stretched diagonally across the target array
(see Figure 8). The general rms accuracy of the triangulation of the 650 targets
constituting the range turned out to average about .030mm in all three coordinates,
or about 1:150,000 of the 5 meter length of the sides of the range. À conventional
survey with first order instruments would, we believe, be hard pressed to match such
accuracies.
Over the past decade the Photogrammetric Structural Measurements Service
of DBA Systems has employed photogrammetric triangulation in over fifty projects
requiring the precise determination of coordinates of targeted points on parabolic
antennas ranging in diameter from 1 meter to 100 meters. A general review of this
continuing endeavor in close-range photogrammetry is provided in Kenefick (1971).
The process of self-calibration was originally adopted in 1965, with each particular
project itself providing the observational material needed for calibration. Until
1968, however, we generally exercised moderately tight constraints on x, , y, , c
in conformance with values derived from stellar calibrations, due allowance
being made for the known thickness of special focussing spacers. Since then, our
policy has been to exercise the process of self-calibration to the fullest extent
whenever geometrically feasible. This has enabled us to achieve accuracies in
excess of 1:100, 000 of the maximum diameter of the photographed object from the
reduction of as few as four to six plates.
In the usual application of the process of self-calibration, such as is
illustrated in Table 2, most points appear in all of the photographs; thus, photo-
graphic overlap amounts to virtually 100 percent over the region of interest. In
such situations, the coefficient matrix of the normal equations for the adjustment
is solid, i.e., it is completely filled with non-zero elements. This makes it
increasingly burdensome to form and solve the normal equations as more and more
exposure stations are added. Our current computer program for self-calibration
can accommodate up to nine exposure stations in a simultaneous, in-core reduction
on a Xerox Sigma 5 computer with 32K memory. This is more than adequate capacity
to effect an accurate calibration in those projects characterized by total overlap,
high convergence and diversity of swing angles. However, circumstances may arise
in which a large number of partially overlapping photographs may provide the most
appropriate scheme for coverage. For example, large scale coverage of a high dam
could well entail the exposure of perhaps as many as fifty, systematically overlapping
frames taken from a fixed pair of exposure stations located on opposite sides of the
dam. Here, any given point will appear on only a relatively small number of different
