The non-linear observation equations for the image coordinates can be
formulated according to the condition of collinearity:
x; pe SP DA OI di)
i j X » - J ^ ^ t ^ ^ 3 A X ram
| €? 713,3 0374 725 5, Fa (3, -8,)
ad f o4, EU me UI, ied,
i,j V ° . - 3 A ^ Vea ^ ^ 3 P 2 2
nisl Fel Rs 15, y 35 yii)
with:
- image coordinates of point Pi in image I;
A A : °
hes Yau = residuals of Xi Yi j
fj = calibrated. focal length of image Ij
xi 3 2, = unknown object coordinates of point P,
X; VIT 2, = Unknown object coordinates of the perspective
centre of image lj
^ “A 3 3 ^
rud ver 33. j = Unknown elements of the rotation matrix R, of
image I; with three independent rotation para-
meters Wy $i Kj
Because it is not possible to determine the exterior orientation of all
images I; So-called orientation images Ik (k=1...1) are introduced. The
exterior Orientation is in fact only computed for the images It.
The parameters of an image I; are then represented as functions of the
parameters of neighbouring orientation images. In case of linear func-
d, |, -d, d.-d,
Xx. = ki jd X
j k
d 17d, di 41 7d,
- 214 -
