84
in practically all phases of the process. This
fact increases the universality of the system
and makes it flexible for a wide range of ap-
plications. The immediate interaction capa-
bility is, of course, a feature completely miss-
ing in off-line analytical procedures and, al-
though present in analog systems, its poten-
tial there is rather limited. Most of the mod-
ifications and changes in the on-line system’s
function, as decided on by the operator at the
time of execution, are built into the pro-
gramming software supplied by the manufac-
turer of the system, and can be potentially
expanded or further developed by users. Ob-
viously, the key component of the system is
the computer, and its performance limits the
function of the system. Fortunately, contem-
porary minicomputers, such as the PDP
series 1l, are powerful and fast enough to
handle practically everything needed in
close-range photogrammetry.
The full potential of an analytical on-line
system can be exploited only ifthe closed-loop
design is used. The open-loop version has
limitations both in the scope of its functions
and in the lower accuracy because of lack of
feedback.
TYPICAL FEATURES OF ANALYTICAL CLOSE
RANGE PHOTOGRAMMETRY
One of the main characteristics of close-
range photogrammetry is the impossibility of
preserving standard conditions in the data
acquisition phase. For example, the range of
photo scales is substantially different in such
applications as scanning electron microscopy
and terrestrial photogrammetry. Also, the use
of photogrammetric cameras is, for various
reasons, not entirely universal. In some in-
stances, the practical aspects prevail and a
preference is shown for ordinary non-metric
cameras which may be more readily availa-
ble, more versatile, less bulky, or easier to
operate. Fast moving objects call for photog-
raphy with movie cameras or with other
high frequency systems. Finally, some
photogrammetric evaluations must simply
rely on given photoimaging systems, such as
scanning electron microscopes, X-ray
machines, ophthalmologic instruments, line
scanners, etc. As a rule, these cannot be mod-
ified for metric use or replaced by metric
cameras.
This variety must be reflected in the way in
which the image geometry is defined for the
on-line analytical processing. In most appli-
cations the image is considered to be a central
projection, with some systematic deviations
from the concept due to lens distortion and
film deformation. For non-metric cameras
PHOTOGRAMMETRIC ENGINEERING & REMOTE SENSING, 1976
these parameters are either unknown or unsta-
ble and must be derived with the use of
self-calibrating procedures (Kolbl, 1972) orin
an on-the-job calibration (Faig, 1975). In
some instances, the central perspective may
not be an adequate imaging model because
the distortion may exceed certain reasonable
limits, e.g., in the fish-eye or anamorphotic
lens design. Sometimes, the perspective
bundle becomes very narrow or is rep-
resented even better by a parallel beam of
imaging rays (Kratky, 1975a and b). Evident-
ly, the character of images should be re-
flected by various modified projection equa-
tions.
Another generalization is required if the
imaging geometry becomes time dependent.
In contrast to a simple frozen model of an
instant exposure, one is confronted with the
dynamics of sequential imaging typical for
TV cameras, scanning electron microscopes,
and other systems employing line-scanning
principle. All these geometries, atypical in
photogrammetry, can be handled in on-line
analytical systems, provided that the calibra-
tion of the dynamic projection is feasible.
Although metric cameras should be
applied wherever possible, one cannot al-
ways guarantee their arrangement in a regu-
lar setup which yields a normal or nearly
normal photogrammetric case. The pictures
to be photogrammetrically treated may be
taken individually, in pairs, or in larger
groups depending on the form ofthe object. It
is also quite typical for close-range photo-
grammetry that a set of pictures produces a
complete view of an enclosed three-
dimensional object from directions around
the full circle. With the use of mirrors all
partial images can be contained in a single
stereopair. In this instance, and very often
also in otherwise standard stereopairs, the
area of interest for the photogrammetric proc-
essing covers only a minor part of the over-
lapping photographs. The configuration of
control and intersection points used for the
model reconstruction is then not too suitable.
Consequently, a standard solution turns out
to be unstable or inaccurate and may ulti-
mately even fail. To ensure a reliable photo-
grammetric reconstruction one has to use
some additional information on the exterior
orientation of cameras. These auxiliary data
can then be used in the form of constraints to
the solution when applied and enforced with
properly assigned weights. In on-line analyt-
ical systems the operator can enter the con-
straints at execution time, immediately check
their effect, and possibly make modifications
in a rerun. In a similar way the operator can
