International Archives of the Photogrammetry, Remote Sensing and Spatial Information Sciences, Vol XXXV, Part B3. Istanbul 2004
In order to acquire a higher accuracy of the geocoded image,
three different geometric corrections method were performed
and tested. They are 2-D polynomial method, rational function
method and rigorous model method. It was found that the
rigorous model method, proposed by Toutin, 2000, gave the
best result on the geometric correction of the IKONOS image
with a root mean square error approximately one pixel (4m).
3. TOPOGRAPHIC CORRECTIONS
In this study, three topographic correction methods were tested
and compared. They are the Cosine Correction, Minnaert
Correction and a Normalization Method.
3.1 Cosine Correction
In this method, the surface is assumed to have Lambertian
behaviour, i.e. to be a perfect diffuse reflector, having the same
amount of reflectance in all view directions. Thus, the
Lambertian correction function attempts to correct only for
differences in illumination caused by the orientation of the
surface (Jones et al., 1988).
For the Lambertian assumption, the most widely used
correction is this cosine method using the equation (1), (2) and
(3), proposed by Teillet et al. (1982),
cos i = cos E cos Z + sin E sin Z cos( A, — As) (1)
Ln(4)- L(A)/ cos i (2)
L, = L, cosz/cosi (3)
where L = radiance
Z = solar zenith angle
Ly7 radiance for horizontal surface
Ly = radiance observed over the inclined terrain
i = incidence angle with respect to surface normal
E = slope inclination
Z = solar zenith angle
A, = solar azimuth
As 7 surface aspect of the slope angle
Although the Lambertian assumption is simple and convenient
for topographic correction, there is a recognised problem in the
corrected images. Thus when correcting the topographic effect
under a Lambertian surface assumption, images tended to be
over-corrected, with slopes facing away from the sun appearing
brighter than sun-facing slopes due to diffuse sunlight being
relatively more influential on the shady slope (Jones et al.,
1988). Therefore, non-Lambertian topographic correction
method has been developed.
3.2 Minnaert Correction
In 1980, Smith ef al. introduced an empirical photometric
function, the Minnaert constant, to test the Lambertian
assumption for surfaces. The Minnaert function was developed
in 1941, and has been used for photometric analysis of lunar
surfaces (Justice and Holben, 1979).
In the study by Smith ef al. (1980), the Minnaert constant, k,
was derived by first linearizing the equation below:
642
k(A k(2)-1
L(à,e) = Lncos ( Vy eds (a) e
(4)
where L=radiance
/=wavelength
e=slope angle
L, = radiance when i=0
k = Minnaert constant
i = incidence angle
ER nA
Lcose - Lncos icos e (5)
After linearization, equation (2) becomes:
log (L cos e) = log Ln + k log (cos i cos e) (6)
Now, we can obtain the regression value of k using equation
(3), from the linear form of y=mx+c
where x = log (cos icos e)
y =log (; COS e)
c=logln
The value of the Minnaert constant lies between 0 and 1. It is
used to describe the roughness of the surface. When the surface
has Lambertian behaviour, the value of the Minnaert constant
is 1. Otherwise, it is less than 1.
After the Minnaert constant, k, is determined, a backwards
radiance correction transformation model can be developed.
Ln = L(cos e) Kcos' i cos" e) (7)
If we compare this method with the non-Lambertian cosine
method mathematically, it can be seen that the Minnaert
constant, k, is used to weaken the power of topographic
correction. In other words, it is used to describe the roughness
of the surface of the terrain. As a result, the problem of over-
correction in the area facing away from the sun can be solved.
3.3 Normalization Method
The normalization method used here is modified from the two-
stage normalization proposed by Civco, 1989, and consists of
two stages. In the first stage, shaded relief models,
corresponding to the solar illumination conditions at the time
of the satellite image are computed using the DEM data. This
requires the input of the solar azimuth and altitude provided by
the metadata of the satellite image. The resulting shaded relief
model would have values between 0 and 255.
After the model is created, a transformation of each of the
original bands of the satellite image is performed to derive
topographically normalized images using equation (8).
(mx) |
Hk
àDN,, » DN,; * | DNajjx C (8)
