VxXy4 73k, dXy4 tbka i dYiacteraa dZga = Jin
Vy =dg+1,2 dX Tb» dYyatera2 dZga - Je?
(2.3)
Where
dpi 7 7 (ka ma; tfo *muyqia
bea 7 7 (p mao fia *mi) qi
Cp 7 7 (X mas fa miaYygka
apa 2 7 7 (yi mai Hi *m qa
bia» 7 7 (ea *ma2 tfo, *moyq a
Crest. 7 7 (yj m3 fi *mayqia
Jena Xu S fea Pina Aqu
Jj 2 7 Yka * fea * Vka /dka
In Equation (2.3), the a, b. c coefficients and J are
evaluated at the approximations. In matrix form,
Equation(2.3) is given as
Vin = Aya dP, - Jua (2.4)
Where
Via (VXpa, Vyga)-.
dPi-(dX,4, dY,.4, dZ. )
Ue. Qaa Ja 2).
and
de hi JP el €t Li)
Aga |
Gk + 1,2 bi. L7. Ch + 1 2/
With the statistical model given by Equation (2.1).
we obtain the least squares estimation by using the
Kalman filter(Kalman, RE. 1960)
Piri =P FAP;
7 P -Dy Air (Dur + Arr Dic Akt)” (Ain P-L)
Dank =
Dig = Dig, Aka (Dirt Arr Dix Aer)” Aca Dy.
(2
Un
)
Where Li (Xi. ya) . Dr; is the covariance matrix
of observation xy; and yy; Dia is the covariance
matrix of 3D object coordinates estimated by all k+1
images; (Ac; Pi - Lim ) is the difference between the
observations (image coordinates) of the (k+1)th
image and the projected image coordinates from the
3D coordinates Py to the (k+1)th image plane.
By Equation (2.5), the updated 3D coordinates and
their covariance matrix are calculated based on the
new observation in the (k+1)th image and the
previous 3D coordinates.
International Archives of Photogrammetry and Remote Sensing. Vol. XXXI, Part B3. Vienna 1996
3. THE OPTIMIZATION CRITERION FOR
PRECISION AND RELIABILITY
3.1 Precision Criterion
According to Equation (2.5), it is obvious that
À Du = Dix - Dirt =
De A Du, t Au Dee) Ars Die 3.1)
is a positive definite matrix only if the matrices Dy.
and D,, are positive definite. This ensures that every
observation Equation (2.3) will improve the
precision of 3D coordinate estimates. The efficiency
dependents mainly on both the Dy; and 3D object
coordinate covariance Dy projected on (k+1)th
image plane (Ai Dy A^ ).
Generally, we consider the relative gain matrix
Di. ^ Du D V
D^ Aa (Dp Avy Dia Aa) 28a DR (3.2)
and define
TD A Du pa) = :
Tri | - Di; (Dij * Aca Di Axa)! ] = maximum
(3.3)
as the precision criterion of optimization for (k+1)th
image.
The total precision criterion 1s
Tr (Dirt ) = Minimum (3.4)
Let u, be eigenvector of the matrix Di, with its
eigenvalues given as A, (17 1, 2, 3)
and suppose
If we select A‘, ^ (ui,u;) in Equation (3.3), the
precision gain becomes greatest. That means when
the direction of the image observation is
perpendicular to the 2D error ellipse plane defined
by the eigenvectors u; and u, this particular image
observation makes the greatest contribution to the
enhancement of the accuracy of the 3D object
coordinates.
In the special case, when there are only two images
intersecting the 3D object point, we have
In get
and D
| Á
Tr
D
Tr(A
(C-E
Simil:
Tr(D»
where
i and.
S; is tl
]
S;is t
]
Ci ist
(
Hj 1S 1
3.2 R
A sta
mode
obser
dL:
N