in image
)e repre-
] points,
l'he spa-
nd point
1 ??) se-
cies. For
Ling Wu,
estima-
are set
ch). The
‘imation
on via
1 control
possibly
e image,
matches
it corre-
ors. The
| in that
rrespon-
orrectly.
npletely
ge infor-
1dencies
IAMPEL
mon fit
e orien-
'rpreted
rom the
imator,
n whith
(7)
(8)
1ations
(9)
inction
ique to
| adap-
n itea-
ights is
al mat-
action
calcu-
w;* - w- f(t*-!) (10)
leads to an iterative LS procedure weighting down those ob-
servations with large test statistics t.
As weight function a weighted combination of the following
two functions are used
A(t) 3 I and = ezp(—0.5(t/cy^)
1 + (t/c)?
(11)
with the critical value c = 3.
The first function guarantiees a global convergency. The se-
cond one cancles the effect of large outliers onto the result
[cf. HAMPEL 86 / FÓRSTNER W. 89]. The influence of the
second function at the first iteration is zero and continously
increasing with each iteration. Therefore the inconsistencies
depending on the problem of partial matches are cleaned in
the first few iterations while the effect of the wrong correspo-
dencies between image edge and model edge onto the result
is increasingly reduced with each iteration.
The observation equation for the LS-fitting of the 3-D con-
trol point models into the image are given by the well known
equations of a spatial resection here applied to homologous
straight line segments. For each homologous line a set of fol-
lowing 4 equations is added to the normal equations resulting
from equating the start point and end point of an image edge
p! to the start and end point of the model edge p" using the
projective equations.
Ps : es p, Y"
(soya w«
The weight matrix is given by eq. 3.
The start and end point for each homologous line are treated
seperatily to allow all the partial matches shown in Fig. 2,
especially when calculating the weights using eq. 3 respec-
tively eq 5. The measurement checking the start point-, the
end point- and line-hypotheses are test statistics with respect
to the local coordinate system (u, v). To calculate these sta-
tistics the residual vectors e,, e, and the covarinace matrix
of the residuals has to be transformed into the local coordi-
nate system using the same rotation matrix R4 shown in eq.
6. Thus the test statistics t are calculated as
1; E eu I 0,
te = Cue] Tu. : (13)
i = (Cu eye) Dr ( - )re
The residuals in the local (u,v) system are analogous to lon-
gitudinal and lateral error of the fit of image and model edge.
Thus these test statistics are the proper measurements for
checking the start point-, the end point- and line-hypotheses.
The test statistic are normally and (square root) Fisher dis-
tributed. We have
ncNO, &NO,) AVE (1)
The test for the point or line-hypotheses consists of compa-
ring the test statistics with critical value e.g. c — 3. If the
test statistcs exceeds the critical value, for numerical reasons
the weight of the observation is set to zero so having no in-
fluence on the result. Otherwise it is used to calculate the
respective weights in the manner previously described.
The test statistics ¢, and t, are used to weight down the
wrong the start and (or) end point corespondencies. From
the statistical point of view this means: Keep the line infor-
mation while rejecting the hypothese that the start and (or)
end point of the image edge matches the start and (or) end
point of the model edge.
The test statistic tj, which measures the lateral error is used
to weight down or eliminate wrong egde correspondencies.
Thus after 6 to 8 iterations the above descriped outliers are
eliminated or weighted down so heavily that their influence
onto the result can be neglegted.
4 Selfdiagnosis
It is important for each automatic system that it is able to
make a selfdecision for the acceptance of the result. The ori-
entation procedure presented in this paper, is part of an au-
tomatic process which is planned to run in night-time or on
weekends without any human manipulation. Therefore the
system must be able to decide wether the determined orien-
tation parameters are correct or better had to be rejected.
Thus an objective quality control measure is necessary. Gross
errors can hide behind small residuals or excellent fitting of
data and model, therefore they do not necessarily produce
large variances in the estimated parameters. Therefore a ad-
ditional sensitivity analysis for selfdiagnosis is used.
The concept of sensitivity analysis developed by Baarda
[BAARDA W. 67 ,68] is based on the measures for the in-
ternal and external reliability. The elementary theory has
been expanded and specified for our purpose [cf. FÓRSTNER
W. 83, 92 ]. The sensitivity analysis is used to investigate
the influence of a single control point model onto the esti-
mated orientation parameters, taking the geometry of the
design (control point arrangement) into account. A single
control point model is represented by several image to mo-
del edge matches. Therefore the sensitivity analysis is applied
to groups of observations, namely all the edges belonging to
one control point model.
The following measures, calculated for each control point mo-
del in the aerial image, are used for evaluating the quality of
the orientation:
The Fisher test statistic
Ty-1
e 31.1 ei
TP = A (15)
: riot?
i09
depends on the geometry of the design and the size of an
undetected gross error in the observation group x;. This test
statistic is Fisher distributed. A gross error in the observation
group x; could be detected whith a significance level a by
checking
T? > F(a,n;,n — ny) (16)
with
n; (Number of image edges from model i)-4
n —n; = (Number of the remainding image edges) - 4
a = significance level e.g 95%
595
