2004 
International Archives of the Photogrammetry, Remote Sensing and Spatial Information Sciences, Vol XXXV, Part B1. Istanbul 2004 
  
"preventive regularisation". The term regularisation comes 
from the definition of a "regular matrix", i.e. a full-rank matrix, 
i.o.w. an invertible matrix. Alike, a singular normal equation 
matrix has to be made regular before a solution may be 
obtained. Such singularities may occur in our context when: 
— Not enough ground control information is available (datum 
problem), 
— Not enough deformation control information is available 
(degree of polynomial problem due to  over- 
parameterisation), 
— Bad distribution of ties respective high correlation between 
adjacent strips due to weak ground control (typical 
polynomial oscillations). 
ORIENT has built in a regularisation on the fly; i.e. when a 
singularity occurs (solving the normal equation system), a 
fictitious observation for the affected unknown will be 
generated allowing the decomposition process to continue. This 
is done automatically — the user is informed via protocol to let 
him make up his opinion about the validity of the results. 
We have also to take care of getting rid of wrong hypotheses 
ü,,b,,C, - 0 or W,,P,,K, = 0: Gross error detection by 
data snooping is used for that. Testing of significance of the 
d;,D;,C;. (0,,Q,, K; , and c, ,,c,, is also a must. 
4. MINIMAL DISTRIBUTION OF GROUND CONTROL 
POINTS 
We suppose that Lidar-strips have a similar geometric 
behaviour as strips in DGPS-supported aero-triangulation. We 
have to cope with deficiencies of the kinematic GPS as drift and 
even jumps on turns. In the meanwhile — as long as no 
exhaustive tests (simulations) are performed we suggest ground 
control to overcome the phenomena. The background of the 
following figure 3 is discussed in (Kraus, 19972). 
    
  
  
  
  
  
  
  
  
  
  
  
  
  
  
  
  
  
  
  
  
  
  
  
  
  
  
  
  
€ Ur m 
hr] e e 5 iP = e 
| 4 | { 
I d | r 7 
bos | i f 
[d ij 
KA | I 
F1 | ul 
i { i i i 
|| | | 
A i i 
£s | * * pn i 
F1 | 171 
i i | | i 
| | M M oM 
| | Pal 
i | ; i i 
b | à » © i & + A 
ool ®t BJ 6 II UT ue TI 
« Height Control Point 
x for Datum 
à Fuil Control Point 
& e Conlrol Point for 2nd degree 
Figure 3: Minimal distribution of ground control points 
5. BLOCK MONTAFON 
This block, covering Gargellental and Garneratal in the region 
Montafon of Vorarlberg, stretches in altitude from 880m to 
2875m, so spanning 2000m in height extent. So, this block had 
to be flown in two missions, one of them covering the valley 
regions with 24 strips the other one the superior areas with 52 
strips. 4 of the 24 were cross-strips, and 3 of the 52. 
559 
Mainly in the crossing strips tie positions were selected 
according figure 2 and then plane patches were searched for in 
every overlaying strip automatically. Acceptance criteria for tie 
patches were: more than 12 points with a standard deviation 
less than 5cm from the adjusting plane. Since the flown data 
had been clipped by the vendor at the project limits, a lot of 
strips lost their crossing partner. For these strips extra tie points 
had to be determined. Altogether, 1002 such plane-patches were 
used; the many, 340 of them occurred in 5 strips, 6 of them 
even in 15 strips, but also 244 only in 2 strips. Only 4 patches 
showed up as mismatch and had to be evicted by error detection 
methods. Additionally, the LVA Feldkirch hat prepared 42 
ground .patches (supported by 170 points on roofs in easily 
accessible areas) in a height range from 850m to 2114m. These 
control patches were found in up to 14 strips. 
Moreover, 18 patches on football fields were also used as height 
control. The adjustment of all these mentioned observations was 
done to determine GPS-shift and IMU-misalignment of each of 
the two flight missions; moreover, experiments with GPS-shift 
and IMU-misalignment individually for every strip were 
undertaken using preventive regularisation. The analysis of the 
variants is still in progress. 
6. CONCLUSIONS 
Geo-referencing can be greatly improved doing sophisticated 
adjustment of parameters based on a manifold of hybrid 
observations (GPS, IMU, laser scanner, tying planes, and 
ground control). Height corrections alone do not suffice. 3D- 
correction of exterior as well as interior orientation and 
calibration parameters is necessary. 
For high demands in accuracy — not mere precision — we need 
some ground control. The ideal configuration of control points 
is not yet known. With high probability the same procedure as 
used for GPS-supported aerotriangulation (Kraus, 1997a,p157, 
fig B5.3-5) can be recommended: i.e. control points in the 
corners of a block together with cross-strips at the ends of the 
block. These cross-strips may be replaced by chains of height 
control points at the ends of the block. 
The area of interest should be extended by about one strip- 
width to grant consistency of the strip-sewing . 
Quality control of a block is necessary: graphic representations 
of discrepancies is a must to detect any system anomalies. 
REFERENCES 
Burman, H., 2000, Adjustment of laser scanner data for 
correction of orientation errors, IAPRS Vol. XXXIII, Part B3. 
Amsterdam 2000. 
Cramer, M., 2000, Genauigkeitsuntersuchungen zur GPS/INS- 
Integration in der Aerophotogrammetrie, Dissertation, Fakultät 
für Bauingenieur- und Vermessungswesen, Universität Stuttgart 
Heitzinger David, 1996, 3D-Oberflächenmodellierung mit 
topologischen Grundelementen, Diplomarbeit IPF TU Wien 
(Begutachter: Kraus / Betreuer: Kager). 
Kager, H. ,1995, ORIENT, A Universal Photogrammetric 
Adjustment System, Reference Manual VI.7, Institute of 
Photogrammetry and Remote Sensing, TU Vienna. 
Kager, H., Kraus, K. , 2001, Height Discrepancies between 
Overlapping Laser Scanner Strips. In Grün/Kahmen (Eds.): 
Optical 3-D Measurement Techniques V, pp. 103 -110.