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The International Archives of the Photogrammetry, Remote Sensing and Spatial Information Sciences. Vol. XXXVII. Part Bl. Beijing 2008
In these equations planimetric ground space coordinates (X,Y)
are the ratio of polynomials of image pixel coordinates (r,c) and
vertical ground coordinate (Z).
Rational function coefficients can be solved by sensor physical
model or without it. If physical sensor model be known then we
make a grid in image space. Then we used this grid and physical
sensor models to produce another grid in 3D object space. Grid
dimensions depend on ground dimensions and ground object’s
height differences. In other words grid dimensions fill all 3D
ground space. This grid has many layers. Each layer points in
each layer have the same elevation. Number of layers should be
more than three to avoid rank deficiency of design matrix (Tao
and Hu, 2000). After making the grid we had used ground
coordinates with their similar image coordinates to calculate
rational function coefficients by least square method. In this
method there isn’t any need to true ground information and it is
named ground independent (Tao and Hu, 2000). This method
were used for geometric correction of high resolution satellite
images (Paderes et al., 1989; Madani, 1999; Yang et al., 2000;
Baltsavias et al., 2001; Tao and Hu, 2000). We should know
physical sensor model to produce 3D ground grid. For solving
rational functions coefficients, we should used ground control
points (GCPs) that were collected by general methods like map
and DEM and calculating rational function coefficients. This
method of solving rational functions was named terrain
dependent (Tao and Hu, 2000). We used this method in remote
sensing when physical sensor model is unknown (Toutin and
Cheng, 2000; Tao and Hu, 2001a, b). There is limited research
on solving rational functions by terrain dependent method that
had done by Tao and Hu.
3 EXPERIMENT AND RESULTS
3.1 Simulated data set
For making simulated data set, first we suppose of a grid in
ground space. Number of points should be sufficient. For
calculating left and right image coordinates of ground points,
we
used collinearity equations. Simulated is related to 1:10000
image scale. There totally 96 points that make a 12*8 grid.
Figure 1 shows a 3D view of ground surface and these ground
points. Heights of points had been choose such that the ground
be approximately £ . Heights of points are
between 10-100m.
Simulated data is related to 1:10000 image scale. There are
totally 96 points that make a 12*8 grid. Figure 1 shows a 3D
view of ground surface and these ground points. Heights of
points have been chose such that the ground be nearly
. They are between 10-100m. systematic error that
have is 10pm.
Figure 1. Simulated ground points
3.2 Aerial data
In the next step, we used true aerial data for testing the models.
These images are stereo that show a part of Germany. We used
Softcopy for measuring ground control points’ coordinates.
These points are nearly a grid and fill the
entire image surface. Then we used collinearity equations with
interior and exterior parameters to calculate image coordinates
of ground points on stereo images. Calibrated focal length of the
camera for taken aerial images is 152.844 and the approximate
scale of these images is 1:15000. Figure 2 shows a 3D view of
ground surface and extracted points. Maximum height
difference of existed points is 120 meters.
Figure2. Extracted ground points from aerial images
3.3 Space data
Stereo images had taken by IRS-1C satellite. These images
show Mashhad city of Iran. Size of each image is 4096*4096
pixels and the overlap area of two images is 90 percents. There
are 53 ground control points and their similar points in the
images. Height of these points are between 930-1075m.
3.4 Results of simulated data
All the experiments have done in three different cases of control
point’s height distribution. We used terrain dependent rational
functions in these experiments.
