ant matching on the basis of curved lines has been carried
out by Schenk et al. (1991) using the y-s representation
of zero crossings (see also Ballard, Brown 1982 for an
explanation of the y-s domain).
An elegant rotation and scale invariant solution which
can also determine the overlap between the images is
relational matching (Shapiro, Haralick 1987; Vosselman
1992). It should be noted, however, that relational mat-
ching is still a subject of intensive research, and it is
difficult and time consuming to define, extract, and match
structures suitable for imagery with different image con-
tent. Therefore, from a practical point of view rotation
and scale differences should be eliminated or at least
measured during the image acquisition phase, and image
overlap should be determined prior to matching. For
instance, in aerial triangulation standard overlap values
are available, and rotation and scale differences usually
do not exist or are at least approximately known. The
same holds true for satellite imagery. Also in close range
applications rotation differences around the optical axis
are not common. An image scale varying within the im-
ages, however, is a common issue in close range applica-
tions, and complicates automatic relative orientation of
these images considerably.
Once approximate values for overlap, rotation, and scale
differences have been determined, the orientation para-
meters can be refined in a coarse-to-fine approach. It is
argued here that feature based matching with point pri-
mitives should be used for this task, because points are
geometrically more stable than lines and areas. For in-
stance, a relative orientation based on straight lines is
only possible with a minimum of three images (see e.g.
Strunz 1993) and has to deal with a number of singular
cases. A disadvantage of points is that they are less
distinct, and usually can’t be interpreted in a semantic
way. However, the distinction of points can be increased
by defining them as intersections between lines, and sem-
antic interpretation of the features to be matched is not
needed in relative orientation. For point extraction - to
be carried out in each image separately - a number of
so-called interest operators exists in the literature (e.g.
Moravec 1977; Hannah 1980; Forstner 1986; Deriche,
Giraudon 1993).
In the next step conjugate points are to be found. At this
stage approximate orientation parameters are already
known. Therefore, the collinearity equations can be used
304
International Archives of Photogrammetry and Remote Sensing. Vol. XXXI, Part B3. Vienna 1996
Figure 4: Illustration of the epipolar constraint: The con-
jugate points P' and P’’ lie on the epipolar lines ¢’ and e”’.
e’ and e’’ are the intersections of the epipolar plane and
the 2 image planes. The epipolar plane is defined by the
point P and the base b between the 2 projection centres.
for mapping points from one image to the next, leading
to the epipolar constraint (see figure 4). This geometric
constraint reduces the search space from two dimensions
to one, and thus increases the speed and reliability of the
algorithm. Besides, a radiometric check should be incor-
porated. Assuming the model surface to be locally a
horizontal plane, the correlation coefficient can be con-
sidered an appropriate measure, because scale and rota-
tion difference have already been taken care of. Points
are then considered to be candidates for conjugate
points, if they fulfil at least approximately the epipolar
constraint, and the corresponding cross correlation coef-
ficient is above a predefined threshold. Note, however,
that the epipolar constraint is valid for central perspecti-
ve imagery only.
For the actual parameter computation an iterative stand-
ard or a robust least squares bundle approach can be
used. An interesting alternative is the so-called "8-point-
algorithm" in which relative orientation is formulated as
a linear problem of eight independent parameters. Solu-
tions of this kind have long been known to exist (Rinner
1963; see also discussion in Brandstätter 1992). The 8-
point-algorithm as it is used today was suggested by
Longuet-Higgins (1981) and has since been investigated
a number of times in computer vision (e.g. Tsai, Huang
1984; Huang, Faugeras 1989; Weng et al. 1989; Hartley
1995). Some applications can also be found in photo-
grammetry (Brandstätter 1992; Müller, Hahn 1992;
Wang 1994). There are two advantages of a linear algo-
rithm c
needed
and no
perform
dy avai
lishing
the con
critical
phase.
less sta
oriental
non-lin
After tl
the thi
points,
elimina
as piec
cludes
Subseq
level. I
to spee
tures ii
Witkin
each le
compu
repeate
Since i
te feat
readily
in ana
often 1
pair L
deviati
manua
the au
coordi
param
ximate
point
ted or
ders c
Anoth
orient:
have r
sible f
ces.
