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a base of 90
International Archives of the Photogrammetry, Remote Sensing and Spatial Information Sciences, Vol XXXV, Part B2. Istanbul 2004
mm (ISM, 1998). The precision of the measurements is less
than half of the pixel size in ground units, hence better than
the theoretical accuracy expected.
4. TESTS AND VALIDATION OF THE PROPOSED
METHOD.
4.1 Application over synthetically distorted data.
The first attempt to check the algorithm was based on an
artificially distorted DEM. An inclined plane (fig. 3) has been
calculated and added to the manually collected DEM, ranging
from +4 to —5 meters. From this distorted DEM two
orthophotographs were created, one from the left and one
from the right photographs of the pair used for the manual
collection of the DEM points. The orthophotographs were
covering the aforementioned area (fig. 2) with a ground pixel
size of 0.25 meters.
The proposed algorithm has been applied on the two
orthophotographs. À combination of a feature and area based
matching algorithm was used incorporating adaptive template
and elliptical areas instead of the standard square templates
(Skarlatos, Georgopoulos, 2004). It is essential to note that
the algorithm provides matched points in an almost
predefined grid, but the feature extraction slightly distorts the
grid (Forstner, 1986) so that to match in interest points. In
addition it doesn’t interpolate, nor fixes the grid in the
predefined positions, returning a TIN. Therefore it is quite
often to have small gaps particularly in areas where the grey
tones are smooth.
The matching has been performed with a 25 pixel spacing
(equals to 6.25 meters in ground units) and maximum
template of 1521 pixels (equivalent to 39x39 square
template), necessary for the quarry area, where there is no
adequate grey tone variation. The resulting estimated
corrections, filtered with a rotational filter (Sonka et al, 1993)
can be compared with the artificial distortions (inclined
plane) in fig. 3. It is obvious that the algorithm has correetly
detected the pattern of the inclined plane. There are of course
some undulations and the covered area is a bit smaller than
the original, because the matching algorithms cannot match
pixels on the edge of the image. The reasons of the
undulations are the aforementioned problem of matching
points close to the edges and the DEM interpolation,
necessary for visualization of the differences, especially
along the edges where missing points create problem in the
interpolation.
Wo : LR
89
Figure 3. The artificial difference applied to the original
DEM, and the differences detected from the
algorithm as filtered DEM. The peak is due to
interpolation, since there were no points measured
in the close vicinity.
In order to verify that the algorithm is working properly, it
Was necessary to apply the proposed corrections by the
algorithm to the distorted DEM under investigation and
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compare it to the manually collected DEM. The algorithm
returns X, Y, dZ coordinates in random positions. In order to
compare it with the reference data, which are also in TIN
format (manually collected) it is necessary to convert one of
the two in DEM format. It is obvious that during this
interpolation there is some loss of accuracy (Al-Tahir et al,
1992). It was decided to convert the manually collected TIN
in DEM with 5 meters grid spacing. This ensures that the
deterioration will be hopefully held at a minimum. The
corrected points from the algorithm are then compared to this
surface and the differences from it are calculated and
statistically analyzed. In order to reduce the mismatches of
the matching algorithm, the mean (expectance zero) and
standard deviation of the corrections is calculated and a 9596
two-tail reliability check is performed on the corrections.
This is more like an internal precision check, without any
external data, which can be performed easily and does not
affect the validity of the proposed algorithm. The remaining
values are also statistically analyzed and presented in fig. 4.
The corrected DEM (the filtered one) has a mean of —0.11
meters, Standard Deviation (SD) 0.59 meters, Mean Absolute
Deviation (MAD) 0.36 meters and Root Mean Square (RMS)
error 0.60 meters. Two conclusions can be easily deducted
from these measures:
The mean of the corrected DEM is well under the precision
of the manually collected points
The MAD is equal to the expected accuracy (one pixel in
ground units, ISM 1998).
Difference of points Délsrence of poirts (25%)
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mean absolute sodas 0.40094 mean absolute devidtien 0.36065
QA rage ALLY | | D.4| range 174756 E
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Figure 4. Visualization and statistical
analysis of the
differences between the manually collected and
the corrected by the algorithm DEM.
