International Archives of the Photogrammetry, Remote Sensing and Spatial Information Sciences, Vol XXXV, Part BS. Istanbul 2004
Table 1: Results for repeatability check for the case of the baseline targets
Standard deviation of mean Standard deviation of position of radiometric Mean of absolute differences
position (m) centre (m) (m)
target X Y Z Xrad Yrad Zrad Rmean (DX) (DY) (DZ)
1 | 2.30E-04 | 4.41E-05 | 3.35E-04 | 2.00E-04 | 1.56E-04 | 4.03E-04 | 1.34E400 0.0007 0.0004 0.0010
2 | 833E-05 | 833E-05 | 2.73E-04 | 7.26E-05 | 1.41E-04 | 3.00E-04 | 1.30E+00 0.0006 0.0007 0.0007
3 |833E-05 1.13E-04 | 1.05E-04 | 1.20E-04 | 2.60E-04 | 1.48E-04 | 1.89E+00 0.0007 0.0006 0.0015
4 | 2.19E-04 | 2.11E-04 | 2.00E-04 | 3.69E-04 | 3.10E-04 | 2.15E-04 | 4.27E+00 0.0004 0.0013 0.0024
mean | 1.54E-04 | 1.13E-04 | 2.28E-04 | 1.90E-04 | 2.17E-04 | 2.67E-04 | 2.20E+00 0.0006 0.0007 0.0014
Table 2: Results for repeatability check for the case of the targets on the wall
Standard deviation of mean Standard deviation of position of radiometric Mean of absolute differences
position (m) centre (m) (m)
target X y Z Xrad Yrad Zrad Rmean (DX) (DY) (DZ)
1 5.16E-05 1.43E-04 | 4.83E-05 | 4.83E-05 | 5.16E-05 | 8.76E-05 | 1.46E-01 0.0127 0.0124 0.0038
2 | 1.40E-08 | 8.76E-05 | 3.16E-05 | 0.00E+00 | 4.71E-05 | 5.27E-05 | 1.37E-01 0.0091 0.0007 0.0024
3 | 4.22E-05 | L49E-04 | 4.71E-05 | 3.16E-05 | 1.43E-04 | 1.05E-04 | 2.29E-01 0.0033 0.0099 0.0021
4 | 0.00E+00 | 9.49E-05 | 7.89E-05 | 4.83E-05 | 6.75E-05 | 1.06E-04 | 2.22E-01 0.0086 0.0070 0.0022
S | 3.16E-05 | 1.14E-04 | 8.23E-05 | 4.22E-05 | 5.68E-05 | 9.94E-05 | 4.10E-01 0.0099 0.0068 0.0019
mean | 2.51E-05 1.1SE-04 | 5.77E-05 | 3A41E-03 | 7.32E-03 | 902E-05 1 229E-0] 0.0087 0.0074 0.0025
In each scan, the mean X, Y and Z values were calculated for
each of the targets. Also, in order to evaluate the repeatability
of the reflectivity, the mean value and standard deviation were
calculated. Another part of the process was the calculation of
the radiometric centre of each target i.e. the weighted mean X,
Y and Z values, using the reflectivity as a weight. Using the
derived mean values, the standard deviation was calculated for
each one of the targets. Furthermore, in order to see how the use
of reflectivity values implemented in the calculations affects the
results, the mean absolute difference of the mean and the
weighted mean values were calculated in each case. These
calculations, though fairly simple, provide an efficient way to
evaluate the repeatability.
Table 1 shows the results from the target data collected at the
baseline. In Table 2 the results for the case of the targets on the
wall are given. The small standard deviation in both cases
indicates that the repeatability of the scans is very high.
Regarding the mean absolute differences, in the first case they
appear to be rather small. This can be attributed to the fact that
the acquired point clouds for each one of the targets were
trimmed before any computations, so that the remaining points
would describe only the target. However, this was not the case
for the targets on the wall. The whole area that was scanned for
each one of the targets was exported. This resulted in
differences of a few millimetres, especially along the X and Y
directions.
The above results indicate that the repeatability of the
measurements is very high and that the reflectivity should
definitely be used in order to identify the centre of the target.
3. ALGORITHM PRESENTATION
When Cyrax retroreflective targets are available, it is possible
to define the position of their centres using the proprietary
software. However, this is possible only during the data
collection stage because of the way that this process is
implemented. Specifically, the scanner acquires the data needed
for defining the centre of the target after the user has selected a
point near the actual centre of the target using the viewer of the
software. The scanner then performs a dense scanning around
the depicted position. A grid of 38x38 points is created and the
centre of the target is defined using these data. The density of
the scan data at this stage is found to be of approximately 1mm.
However, the way that the centre of the target is defined
remains unknown.
Although not very well documented, the topic of automatic
target identification has been previously addressed in the
literature (Gordon et al., 2001; Lichti et al., 2000)]. In Lichti et
al. (2000) three different methods are described. The first
defines the centre of the target as the position with the
maximum radiance. The second defines the centre by the mean
position of the radiometric centre of the 4 strongest returns. The
third algorithm defines the centre of the target as the
radiometric centre of all returns. These methods will be referred
to henceforth as ‘maxrad’, “maxrad4’ and 'radcent,
respectively. In the following experiments, these methods will
be applied and used for comparison purposes with the new
developed methods.
All the aforementioned methods have significant flaws that are
not mentioned in the literature. The methods ‘maxrad’ and
‘maxrad4’ often fail because the position with maximum signal
strength does not always correspond to the actual centre of the
target. This is clearly shown in Figure 1 which shows part of a
target with three different markers indicating the position of the
centre as calculated using each of the three aforementioned
algorithms. The red points correspond to points of the target
with a relatively large value of reflectance. They also show the
topographic artefacts that are observed for the highly reflective
areas of a target. In Figure la, a front view of the target and the
calculated centres is given, whereas in Figure 1b, the same
target is presented from a different angle for visualisation
purposes.
In both figures, the ‘maxrad’, ‘maxrad4’ and ‘radcent’ positions
of the centre are indicated in black, green and blue respectively.
It is obvious that the 'radcent' algorithm has the best
performance in this case. This was also confirmed by several
experiments that were conducted and will be presented in the
following section.
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