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Left
Image A LIS
Reference
Points ce
Ephemeris Ephemeris
Data L Data R
1
Satellite *' Satellite
Parameters Parameters
Estimation . Estimation
1 1
Geometric Correction
| ' and :
Epipolar Resampling
Geometric Correction
| and
_Epipolar Resampling
Left Image
Right Image
Library
Library
Top Down
Area Matching
Match
Control
Points
1
D.E.M.
generation
Fig. 1 : Matching Process
2. THE GEOMETRIC CORRECTION MODEL
2.1. SPOT Imaging Characteristics
The SPOT satellite is an earth resource satellite espe-
cially designed for cartographic applications. Its sensor
package consists of two High Resolution Visible (HRV)
imaging instruments. Each HRV is made up of a lin-
ear array of Charged Coupled Devices (CCD), i.e. 6000
detectors for the panchromatic mode, accounting for a
spatial resolution on the ground of 10m. Images are
obtained by using the 'pushbroom' scanning tech-
nique, whereby each line is scanned by the CCD-array
and successive lines are produced as a result of the
satellite's movement along its orbit (Chevrel et al,
1981). As for panchromatic images, lines are scanned
at a sample interval of 1.504 milliseconds. Each HRV
has a pointable mirror, which allows off-nadir view-
ing in the cross-track direction over a range of X27? rel-
ative to the vertical.
2.2. Rectification Method
Before the matching algorithm can be applied, both
stereoimages should be resampled in a cartographic
reference plane (by preference an epipolar registration
473
so that relief displacements are confined to the x-direc-
tion). Thereby, all image distortions such as satellite
orbit and attitude variations, earth shape and rotation,
effects of sensor geometry, panoramic effect, etc.
should be removed. A precision rectification of SPOT
imagery when only a few reference points are known,
requires modelling the satellite motion and attitude in
a rigorous way (Pattyn, 1991).
In order to calculate the intersection point of the
image vector pointing towards the earth (i.e. vector
from the satellite's perspective centre towards a detec-
tor in the CCD-array) and the reference ellipsoid, one
has to know at any time the position and orientation
of the satellite along its orbit and the viewing direc-
tion of the CCD-array in the HRV-instrument. The
nominal position and orientation of the satellite at
moment t is derived from the Ephemeris data, sup-
plied with each SPOT scene. At sample intervals of 1
minute satellite's position and velocity vectors are
given in a geocentric reference system. By applying a
7th degree Lagrange interpolation polynomial, satel-
lite position coordinates are generated at equally
spaced time intervals of 5 lines within the time span
of the acquisition of one scene (i.e. 9 seconds). These
points are then described by a second degree polyno-
mial in function of time, which is convenient for
scenes smaller than 300 km (Hottier and Albattah,
1990) :
X, 2 Zi
= X
7° = a +at+at + y2
S t 3
with [X, Y. Z.] the satellite's position and X, £, X4 po-
sition errors along its orbit. The three axes defining
the nominal orientation of the satellite at moment t
are also derived from the Ephemeris position and ve-
locity vectors, forming the orthogonal matrix R,.
Satellite attitude drift rates are measured every 125 ms
during image scanning. The relative attitude angles
Aw A¢ Ax are calculated by numerical integration.
Since the attitude offset (wy $9 ky) is not known, rota-
(1)
tion angles w ¢ x are obtained using reference points in
the adjustment phase.
ot) = ag * Ao(t (roll)
$(0 2 dy * AQ(0 (pitch)
k(t) = Kg * AK(t) (yaw) Q)
These attitude rotation angles are then used to form
the orthogonal matrix R,.
Assuming a principle distance of 1, a rectangular sen-
sor coordinate system is formed. The components of
the viewing vector (i.e. vector from the centre of per-
spective to a detector in the CCD-array) are derived by
linear interpolation between the normalised vectors
of the look angles for the detectors at each end of the
